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"<|""Polynomial"" -> 1 +  + ^2, ""PolynomialCount"" -> 1, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 2 +  + ^2, ""PolynomialCount"" -> 2, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 +  + ^2, ""PolynomialCount"" -> 4, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 3 +  + ^2, ""PolynomialCount"" -> 8, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 +  + ^3, ""PolynomialCount"" -> 2, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + 2* + ^3, ""PolynomialCount"" -> 4, ""CountNormalization"" -> 0.4615384615|>"	"<|""Polynomial"" -> 2 + 3* + ^3, ""PolynomialCount"" -> 20, ""CountNormalization"" -> 0.4838709677|>"	"<|""Polynomial"" -> 2 + 3* + ^3, ""PolynomialCount"" -> 36, ""CountNormalization"" -> 0.3157894737|>"	"<|""Polynomial"" -> 1 +  + ^4, ""PolynomialCount"" -> 2, ""CountNormalization"" -> 0.5333333333|>"	"<|""Polynomial"" -> 2 +  + ^4, ""PolynomialCount"" -> 8, ""CountNormalization"" -> 0.4|>"	"<|""Polynomial"" -> 2 +  + 4*^2 + ^4, ""PolynomialCount"" -> 48, ""CountNormalization"" -> 0.3076923077|>"	"<|""Polynomial"" -> 3 +  + 6*^2 + ^4, ""PolynomialCount"" -> 160, ""CountNormalization"" -> 0.2666666667|>"	"<|""Polynomial"" -> 1 + ^2 + ^5, ""PolynomialCount"" -> 6, ""CountNormalization"" -> 0.9677419355|>"	"<|""Polynomial"" -> 1 + 2* + ^5, ""PolynomialCount"" -> 22, ""CountNormalization"" -> 0.4545454545|>"	"<|""Polynomial"" -> 2 + 4* + ^5, ""PolynomialCount"" -> 280, ""CountNormalization"" -> 0.4481434059|>"	"<|""Polynomial"" -> 2 + 2* + ^5, ""PolynomialCount"" -> 1120, ""CountNormalization"" -> 0.3332143282|>"	"<|""Polynomial"" -> 1 +  + ^6, ""PolynomialCount"" -> 6, ""CountNormalization"" -> 0.5714285714|>"	"<|""Polynomial"" -> 2 +  + ^6, ""PolynomialCount"" -> 48, ""CountNormalization"" -> 0.3956043956|>"	"<|""Polynomial"" -> 2 +  + ^6, ""PolynomialCount"" -> 720, ""CountNormalization"" -> 0.2764976959|>"	"<|""Polynomial"" -> 3 +  + 5*^2 + ^6, ""PolynomialCount"" -> 6048, ""CountNormalization"" -> 0.3084455324|>"	"<|""Polynomial"" -> 1 +  + ^7, ""PolynomialCount"" -> 18, ""CountNormalization"" -> 0.9921259843|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^7, ""PolynomialCount"" -> 156, ""CountNormalization"" -> 0.4995425435|>"	"<|""Polynomial"" -> 2 + 3* + ^7, ""PolynomialCount"" -> 5580, ""CountNormalization"" -> 0.4999743997|>"	"<|""Polynomial"" -> 2 + 6* + ^7, ""PolynomialCount"" -> 37856, ""CountNormalization"" -> 0.3217710815|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^4 + ^8, ""PolynomialCount"" -> 16, ""CountNormalization"" -> 0.5019607843|>"	"<|""Polynomial"" -> 2 + ^3 + ^8, ""PolynomialCount"" -> 320, ""CountNormalization"" -> 0.3902439024|>"	"<|""Polynomial"" -> 3 +  + 4*^2 + ^8, ""PolynomialCount"" -> 14976, ""CountNormalization"" -> 0.3067092652|>"	"<|""Polynomial"" -> 3 +  + ^8, ""PolynomialCount"" -> 192000, ""CountNormalization"" -> 0.2664446295|>"	"<|""Polynomial"" -> 1 + ^4 + ^9, ""PolynomialCount"" -> 48, ""CountNormalization"" -> 0.8454011742|>"	"<|""Polynomial"" -> 1 + 2*^4 + ^9, ""PolynomialCount"" -> 1008, ""CountNormalization"" -> 0.4609287674|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^9, ""PolynomialCount"" -> 99360, ""CountNormalization"" -> 0.4578511144|>"	"<|""Polynomial"" -> 4 + 3*^2 + ^9, ""PolynomialCount"" -> 1376352, ""CountNormalization"" -> 0.3069655782|>"	"<|""Polynomial"" -> 1 + ^3 + ^10, ""PolynomialCount"" -> 60, ""CountNormalization"" -> 0.5865102639|>"	"<|""Polynomial"" -> 2 +  + ^3 + ^10, ""PolynomialCount"" -> 2640, ""CountNormalization"" -> 0.4470938897|>"	"<|""Polynomial"" -> 2 + 2* + ^2 + ^10, ""PolynomialCount"" -> 291200, ""CountNormalization"" -> 0.2981888305|>"	"<|""Polynomial"" -> 3 +  + 6*^2 + ^10, ""PolynomialCount"" -> 8512000, ""CountNormalization"" -> 0.3013361369|>"	"<|""Polynomial"" -> 1 + ^2 + ^11, ""PolynomialCount"" -> 176, ""CountNormalization"" -> 0.9457743039|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^11, ""PolynomialCount"" -> 7700, ""CountNormalization"" -> 0.4781366782|>"	"<|""Polynomial"" -> 2 + 3* + ^11, ""PolynomialCount"" -> 2219460, ""CountNormalization"" -> 0.499999959|>"	"<|""Polynomial"" -> 2 + 2* + ^11, ""PolynomialCount"" -> 59865432, ""CountNormalization"" -> 0.3330353745|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^12, ""PolynomialCount"" -> 144, ""CountNormalization"" -> 0.421978022|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^12, ""PolynomialCount"" -> 13824, ""CountNormalization"" -> 0.3121481258|>"	"<|""Polynomial"" -> 3 +  + 2*^3 + ^12, ""PolynomialCount"" -> 5184000, ""CountNormalization"" -> 0.254803969|>"	"<|""Polynomial"" -> 3 +  + 5*^2 + ^12, ""PolynomialCount"" -> 261273600, ""CountNormalization"" -> 0.2265167361|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^13, ""PolynomialCount"" -> 630, ""CountNormalization"" -> 0.9998779148|>"	"<|""Polynomial"" -> 1 + 2* + ^13, ""PolynomialCount"" -> 61320, ""CountNormalization"" -> 0.4999993728|>"	"<|""Polynomial"" -> 2 + 3*^6 + ^13, ""PolynomialCount"" -> 46950120, ""CountNormalization"" -> 0.4999999984|>"	"<|""Polynomial"" -> 2 + 5*^2 + ^13, ""PolynomialCount"" -> 2484333600, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^5 + ^14, ""PolynomialCount"" -> 756, ""CountNormalization"" -> 0.6460355246|>"	"<|""Polynomial"" -> 2 +  + ^14, ""PolynomialCount"" -> 170352, ""CountNormalization"" -> 0.498629303|>"	"<|""Polynomial"" -> 2 + 2* + 2*^8 + ^14, ""PolynomialCount"" -> 139991040, ""CountNormalization"" -> 0.321105848|>"	"<|""Polynomial"" -> 3 + 2*^5 + ^14, ""PolynomialCount"" -> 15433134080, ""CountNormalization"" -> 0.3185734691|>"	"<|""Polynomial"" -> 1 +  + ^15, ""PolynomialCount"" -> 1800, ""CountNormalization"" -> 0.8239997559|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^15, ""PolynomialCount"" -> 401280, ""CountNormalization"" -> 0.4194884265|>"	"<|""Polynomial"" -> 2 + ^2 + ^15, ""PolynomialCount"" -> 876960000, ""CountNormalization"" -> 0.4310433792|>"	"<|""Polynomial"" -> 2 + 3* + 5*^2 + ^15, ""PolynomialCount"" -> 96689376000, ""CountNormalization"" -> 0.3054917007|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^16, ""PolynomialCount"" -> 2048, ""CountNormalization"" -> 0.5000076295|>"	"<|""Polynomial"" -> 2 + ^7 + ^16, ""PolynomialCount"" -> 983040, ""CountNormalization"" -> 0.3653853302|>"	"<|""Polynomial"" -> 2 +  + 3*^3 + ^16, ""PolynomialCount"" -> 2752708608, ""CountNormalization"" -> 0.2886424181|>"	"<|""Polynomial"" -> 3 + 2* + ^16, ""PolynomialCount"" -> 520863744000, ""CountNormalization"" -> 0.250769937|>"	"<|""Polynomial"" -> 1 + ^3 + ^17, ""PolynomialCount"" -> 7710, ""CountNormalization"" -> 0.9999923705|>"	"<|""Polynomial"" -> 1 + 2* + ^17, ""PolynomialCount"" -> 3796100, ""CountNormalization"" -> 0.4997182828|>"	"<|""Polynomial"" -> 2 + 3*^3 + ^17, ""PolynomialCount"" -> 22384531584, ""CountNormalization"" -> 0.498777505|>"	"<|""Polynomial"" -> 2 + 2* + ^17, ""PolynomialCount"" -> 4561057021824, ""CountNormalization"" -> 0.333309539|>"	"<|""Polynomial"" -> 1 + ^7 + ^18, ""PolynomialCount"" -> 7776, ""CountNormalization"" -> 0.5339375837|>"	"<|""Polynomial"" -> 2 +  + ^13 + ^18, ""PolynomialCount"" -> 7838208, ""CountNormalization"" -> 0.3641721292|>"	"<|""Polynomial"" -> 2 + 2* + ^4 + ^18, ""PolynomialCount"" -> 55435726080, ""CountNormalization"" -> 0.2615785736|>"	"<|""Polynomial"" -> 5 +  + 3*^2 + ^18, ""PolynomialCount"" -> 27124330415616, ""CountNormalization"" -> 0.2998242879|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^19, ""PolynomialCount"" -> 27594, ""CountNormalization"" -> 0.9999980926|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^19, ""PolynomialCount"" -> 30566592, ""CountNormalization"" -> 0.4996855398|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^19, ""PolynomialCount"" -> 499226178000, ""CountNormalization"" -> 0.4973027594|>"	"<|""Polynomial"" -> 2 + 3*^2 + ^19, ""PolynomialCount"" -> 199503336577688, ""CountNormalization"" -> 0.3325377884|>"	"<|""Polynomial"" -> 1 + ^3 + ^20, ""PolynomialCount"" -> 24000, ""CountNormalization"" -> 0.4577641084|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^20, ""PolynomialCount"" -> 62304000, ""CountNormalization"" -> 0.3573722539|>"	"<|""Polynomial"" -> 3 +  + 4*^2 + ^20, ""PolynomialCount"" -> 1280348160000, ""CountNormalization"" -> 0.2685084704|>"	"<|""Polynomial"" -> 3 + ^3 + ^20, ""PolynomialCount"" -> 958110720000000, ""CountNormalization"" -> 0.2401512739|>"	"<|""Polynomial"" -> 1 + ^2 + ^21, ""PolynomialCount"" -> 84672, ""CountNormalization"" -> 0.8478702773|>"	"<|""Polynomial"" -> 1 + 2*^5 + ^21, ""PolynomialCount"" -> 229686912, ""CountNormalization"" -> 0.4611149412|>"	"<|""Polynomial"" -> 2 + 4* + ^21, ""PolynomialCount"" -> 10957459615200, ""CountNormalization"" -> 0.4825686253|>"	"<|""Polynomial"" -> 4 + 3*^8 + ^21, ""PolynomialCount"" -> 8107845416745984, ""CountNormalization"" -> 0.3048357614|>"	"<|""Polynomial"" -> 1 +  + ^22, ""PolynomialCount"" -> 120032, ""CountNormalization"" -> 0.6295930456|>"	"<|""Polynomial"" -> 2 + ^5 + ^22, ""PolynomialCount"" -> 670824000, ""CountNormalization"" -> 0.4702877527|>"	"<|""Polynomial"" -> 2 + ^5 + ^22, ""PolynomialCount"" -> 34031246515200, ""CountNormalization"" -> 0.3140222654|>"	"<|""Polynomial"" -> 3 + ^3 + ^22, ""PolynomialCount"" -> 56613417213661440, ""CountNormalization"" -> 0.318555546|>"	"<|""Polynomial"" -> 1 + ^5 + ^23, ""PolynomialCount"" -> 356960, ""CountNormalization"" -> 0.9787179206|>"	"<|""Polynomial"" -> 1 + 2*^3 + ^23, ""PolynomialCount"" -> 2003046356, ""CountNormalization"" -> 0.4893617016|>"	"<|""Polynomial"" -> 2 + 3*^2 + ^23, ""PolynomialCount"" -> 259121741860800, ""CountNormalization"" -> 0.4999442649|>"	"<|""Polynomial"" -> 2 + 5*^4 + ^23, ""PolynomialCount"" -> 388083262835207968, ""CountNormalization"" -> 0.3261353154|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^24, ""PolynomialCount"" -> 276480, ""CountNormalization"" -> 0.3955078361|>"	"<|""Polynomial"" -> 2 + ^5 + ^13 + ^24, ""PolynomialCount"" -> 3583180800, ""CountNormalization"" -> 0.3044877681|>"	"<|""Polynomial"" -> 2 +  + 3*^15 + ^24, ""PolynomialCount"" -> 630789120000000, ""CountNormalization"" -> 0.2539892476|>"	"<|""Polynomial"" -> 3 +  + 6*^5 + ^24, ""PolynomialCount"" -> 1768359922237440000, ""CountNormalization"" -> 0.2215281624|>"	"<|""Polynomial"" -> 1 + ^3 + ^25, ""PolynomialCount"" -> 1296000, ""CountNormalization"" -> 0.9655952741|>"	"<|""Polynomial"" -> 1 + 2*^3 + ^25, ""PolynomialCount"" -> 15403487000, ""CountNormalization"" -> 0.4544935111|>"	"<|""Polynomial"" -> 2 + 3*^7 + ^25, ""PolynomialCount"" -> 5255180000000000, ""CountNormalization"" -> 0.4408364499|>"	"<|""Polynomial"" -> 2 + ^4 + ^25, ""PolynomialCount"" -> 17867524295448240000, ""CountNormalization"" -> 0.3330837072|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^6 + ^26, ""PolynomialCount"" -> 1719900, ""CountNormalization"" -> 0.6663411955|>"	"<|""Polynomial"" -> 2 + ^7 + ^26, ""PolynomialCount"" -> 48881851200, ""CountNormalization"" -> 0.4999981183|>"	"<|""Polynomial"" -> 2 +  + 2*^6 + ^26, ""PolynomialCount"" -> 19099907148329280, ""CountNormalization"" -> 0.3332609985|>"	"<|""Polynomial"" -> 3 + ^9 + ^26, ""PolynomialCount"" -> 118081513157050060800, ""CountNormalization"" -> 0.3270440237|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^27, ""PolynomialCount"" -> 4202496, ""CountNormalization"" -> 0.8453979555|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^27, ""PolynomialCount"" -> 128672022528, ""CountNormalization"" -> 0.455589823|>"	"<|""Polynomial"" -> 2 + 4* + ^27, ""PolynomialCount"" -> 124687792817280000, ""CountNormalization"" -> 0.4518534311|>"	"<|""Polynomial"" -> 4 + 3*^8 + ^27, ""PolynomialCount"" -> 739012021736787025920, ""CountNormalization"" -> 0.3036464353|>"	"<|""Polynomial"" -> 1 + ^3 + ^28, ""PolynomialCount"" -> 4741632, ""CountNormalization"" -> 0.4945907611|>"	"<|""Polynomial"" -> 2 + ^13 + ^28, ""PolynomialCount"" -> 314657860608, ""CountNormalization"" -> 0.385124799|>"	"<|""Polynomial"" -> 3 +  + 2*^3 + ^28, ""PolynomialCount"" -> 394355767615488000, ""CountNormalization"" -> 0.2964053969|>"	"<|""Polynomial"" -> 3 + 2* + 6*^2 + ^28, ""PolynomialCount"" -> 4186843047468800409600, ""CountNormalization"" -> 0.2548587752|>"	"<|""Polynomial"" -> 1 + ^2 + ^29, ""PolynomialCount"" -> 18407808, ""CountNormalization"" -> 0.9943292159|>"	"<|""Polynomial"" -> 1 + 2*^4 + ^29, ""PolynomialCount"" -> 1163185915872, ""CountNormalization"" -> 0.4915081755|>"	"<|""Polynomial"" -> 2 + 3*^6 + ^29, ""PolynomialCount"" -> 3156937172676719040, ""CountNormalization"" -> 0.4915116443|>"	"<|""Polynomial"" -> 2 + 5* + ^29, ""PolynomialCount"" -> 36383115599626484077920, ""CountNormalization"" -> 0.3276836132|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^30, ""PolynomialCount"" -> 17820000, ""CountNormalization"" -> 0.4978850489|>"	"<|""Polynomial"" -> 2 +  + ^30, ""PolynomialCount"" -> 2340264960000, ""CountNormalization"" -> 0.3409954964|>"	"<|""Polynomial"" -> 2 + 2* + 3*^6 + ^30, ""PolynomialCount"" -> 7505711216640000000, ""CountNormalization"" -> 0.2417758816|>"	"<|""Polynomial"" -> 5 +  + ^2 + ^30, ""PolynomialCount"" -> 202734508843560960000000, ""CountNormalization"" -> 0.2698408732|>"	"<|""Polynomial"" -> 1 + ^3 + ^31, ""PolynomialCount"" -> 69273666, ""CountNormalization"" -> 0.9999999995|>"	"<|""Polynomial"" -> 1 + 2*^5 + ^31, ""PolynomialCount"" -> 9947788640064, ""CountNormalization"" -> 0.4992629595|>"	"<|""Polynomial"" -> 2 + 3* + ^31, ""PolynomialCount"" -> 75066301016830616400, ""CountNormalization"" -> 0.4997313272|>"	"<|""Polynomial"" -> 2 + 3*^2 + ^31, ""PolynomialCount"" -> 1690974488061269530278720, ""CountNormalization"" -> 0.332245807|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^7 + ^32, ""PolynomialCount"" -> 67108864, ""CountNormalization"" -> 0.5000000001|>"	"<|""Polynomial"" -> 2 + ^5 + ^32, ""PolynomialCount"" -> 21158323814400, ""CountNormalization"" -> 0.3653853132|>"	"<|""Polynomial"" -> 3 +  + 2*^27 + ^32, ""PolynomialCount"" -> 209933999808121405440, ""CountNormalization"" -> 0.2885310923|>"	"<|""Polynomial"" -> 3 + ^7 + ^32, ""PolynomialCount"" -> 8630396149225129771008000, ""CountNormalization"" -> 0.2500595405|>"	"<|""Polynomial"" -> 1 + ^13 + ^33, ""PolynomialCount"" -> 211016256, ""CountNormalization"" -> 0.8106623367|>"	"<|""Polynomial"" -> 1 + 2*^5 + ^33, ""PolynomialCount"" -> 74349391670400, ""CountNormalization"" -> 0.4413569336|>"	"<|""Polynomial"" -> 2 + ^14 + ^33, ""PolynomialCount"" -> 1698391652794637882400, ""CountNormalization"" -> 0.4814394159|>"	"<|""Polynomial"" -> 4 + 3* + 4*^2 + ^33, ""PolynomialCount"" -> 73894260680697421638938880, ""CountNormalization"" -> 0.3154200729|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^8 + ^34, ""PolynomialCount"" -> 336849900, ""CountNormalization"" -> 0.6666463218|>"	"<|""Polynomial"" -> 2 +  + ^3 + ^34, ""PolynomialCount"" -> 241707101328000, ""CountNormalization"" -> 0.4927715961|>"	"<|""Polynomial"" -> 2 + 2* + ^4 + ^34, ""PolynomialCount"" -> 5690820879302716108800, ""CountNormalization"" -> 0.3324096981|>"	"<|""Polynomial"" -> 3 + 2* + ^34, ""PolynomialCount"" -> 530520519655922403828326400, ""CountNormalization"" -> 0.333309539|>"	"<|""Polynomial"" -> 1 + ^2 + ^35, ""PolynomialCount"" -> 929275200, ""CountNormalization"" -> 0.9465913754|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^35, ""PolynomialCount"" -> 640022670487200, ""CountNormalization"" -> 0.4477333935|>"	"<|""Polynomial"" -> 2 +  + 2*^4 + ^35, ""PolynomialCount"" -> 37018729933083360000000, ""CountNormalization"" -> 0.4451838563|>"	"<|""Polynomial"" -> 2 + 2*^4 + ^35, ""PolynomialCount"" -> 3481410931625967398682624000, ""CountNormalization"" -> 0.3216562041|>"	"<|""Polynomial"" -> 1 + ^11 + ^36, ""PolynomialCount"" -> 725594112, ""CountNormalization"" -> 0.3801162243|>"	"<|""Polynomial"" -> 2 +  + ^17 + ^36, ""PolynomialCount"" -> 1198031340699648, ""CountNormalization"" -> 0.2873462345|>"	"<|""Polynomial"" -> 2 +  + 3*^3 + ^36, ""PolynomialCount"" -> 94805865108852129792000, ""CountNormalization"" -> 0.2345403399|>"	"<|""Polynomial"" -> 3 +  + ^10 + ^36, ""PolynomialCount"" -> 16218682110734904771438182400, ""CountNormalization"" -> 0.2201854524|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^37, ""PolynomialCount"" -> 3697909056, ""CountNormalization"" -> 0.9955156935|>"	"<|""Polynomial"" -> 1 + 2*^6 + ^37, ""PolynomialCount"" -> 6084917182250596, ""CountNormalization"" -> 0.4999999618|>"	"<|""Polynomial"" -> 2 + 4*^13 + ^37, ""PolynomialCount"" -> 976638605860649569262880, ""CountNormalization"" -> 0.4966442953|>"	"<|""Polynomial"" -> 2 + 6* + ^37, ""PolynomialCount"" -> 166418711831937879676731844800, ""CountNormalization"" -> 0.3317236227|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^6 + ^38, ""PolynomialCount"" -> 4822382628, ""CountNormalization"" -> 0.6666615804|>"	"<|""Polynomial"" -> 2 +  + ^21 + ^38, ""PolynomialCount"" -> 17756781304550400, ""CountNormalization"" -> 0.4995053719|>"	"<|""Polynomial"" -> 2 + 2* + ^10 + ^38, ""PolynomialCount"" -> 3169647209041790653440000, ""CountNormalization"" -> 0.3310810764|>"	"<|""Polynomial"" -> 3 + 2*^13 + ^38, ""CountNormalization"" -> 0.3325368412|>"	"<|""Polynomial"" -> 1 + ^4 + ^39, ""PolynomialCount"" -> 11928047040, ""CountNormalization"" -> 0.8461826557|>"	"<|""Polynomial"" -> 1 +  + 2*^10 + ^39, ""PolynomialCount"" -> 47792134653419520, ""CountNormalization"" -> 0.4599303849|>"	"<|""Polynomial"" -> 2 + 4*^7 + ^39, ""PolynomialCount"" -> 22282434433467403069492800, ""CountNormalization"" -> 0.4777460172|>"	"<|""Polynomial"" -> 4 + 3*^2 + ^39, ""CountNormalization"" -> 0.3157887758|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^5 + ^40, ""PolynomialCount"" -> 11842560000, ""CountNormalization"" -> 0.430829823|>"	"<|""Polynomial"" -> 2 +  + ^40, ""PolynomialCount"" -> 105971029401600000, ""CountNormalization"" -> 0.3486558493|>"	"<|""Polynomial"" -> 2 +  + 2*^12 + ^40, ""PolynomialCount"" -> 60604186732174245888000000, ""CountNormalization"" -> 0.266540032|>"	"<|""Polynomial"" -> 3 + 2* + ^40, ""CountNormalization"" -> 0.2340988434|>"	"<|""Polynomial"" -> 1 + ^3 + ^41, ""PolynomialCount"" -> 53630700752, ""CountNormalization"" -> 0.9999251828|>"	"<|""Polynomial"" -> 1 + 2* + ^41, ""PolynomialCount"" -> 439433517384767232, ""CountNormalization"" -> 0.4939757081|>"	"<|""Polynomial"" -> 2 + 4*^3 + ^41, ""PolynomialCount"" -> 554569939857673089194295808, ""CountNormalization"" -> 0.4999999998|>"	"<|""Polynomial"" -> 2 + 2*^4 + ^41, ""CountNormalization"" -> 0.329317253|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^7 + ^42, ""PolynomialCount"" -> 57802864896, ""CountNormalization"" -> 0.5519996934|>"	"<|""Polynomial"" -> 2 + ^3 + ^25 + ^42, ""PolynomialCount"" -> 1003461046833143808, ""CountNormalization"" -> 0.3851741302|>"	"<|""Polynomial"" -> 2 + ^17 + ^42, ""PolynomialCount"" -> 1393458905948029351487078400, ""CountNormalization"" -> 0.2573968773|>"	"<|""Polynomial"" -> 3 +  + 6*^7 + ^42, ""CountNormalization"" -> 0.2947809595|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^6 + ^43, ""PolynomialCount"" -> 204064589160, ""CountNormalization"" -> 0.9975766868|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^43, ""PolynomialCount"" -> 3808085468614119220, ""CountNormalization"" -> 0.4988399072|>"	"<|""Polynomial"" -> 2 + 3* + ^43, ""PolynomialCount"" -> 13219399727033140565022758400, ""CountNormalization"" -> 0.4999999997|>"	"<|""Polynomial"" -> 2 + ^4 + ^43, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^44, ""PolynomialCount"" -> 200778006528, ""CountNormalization"" -> 0.5021679662|>"	"<|""Polynomial"" -> 2 + ^3 + ^44, ""PolynomialCount"" -> 8418921698880000000, ""CountNormalization"" -> 0.3761611497|>"	"<|""Polynomial"" -> 3 +  + ^8 + ^44, ""PolynomialCount"" -> 37026999134815796338596249600, ""CountNormalization"" -> 0.2866097773|>"	"<|""Polynomial"" -> 3 + ^9 + ^44, ""CountNormalization"" -> 0.2542782976|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^45, ""PolynomialCount"" -> 634404960000, ""CountNormalization"" -> 0.8113893045|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^45, ""PolynomialCount"" -> 27334762785792000000, ""CountNormalization"" -> 0.4163622634|>"	"<|""Polynomial"" -> 2 + 3*^7 + ^45, ""PolynomialCount"" -> 257382952508235635827200000000, ""CountNormalization"" -> 0.4075135907|>"	"<|""Polynomial"" -> 4 +  + 5*^5 + ^45, ""CountNormalization"" -> 0.2969555489|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^8 + ^46, ""PolynomialCount"" -> 998132265920, ""CountNormalization"" -> 0.6524783804|>"	"<|""Polynomial"" -> 2 + ^5 + ^46, ""PolynomialCount"" -> 94286575642834782672, ""CountNormalization"" -> 0.4893617016|>"	"<|""Polynomial"" -> 2 + 2* + 3*^11 + ^46, ""CountNormalization"" -> 0.3262047686|>"	"<|""Polynomial"" -> 3 + 3* + 4*^2 + ^46, ""CountNormalization"" -> 0.3261353154|>"	"<|""Polynomial"" -> 1 + ^5 + ^47, ""PolynomialCount"" -> 2992477516800, ""CountNormalization"" -> 0.9993530859|>"	"<|""Polynomial"" -> 1 + 2*^15 + ^47, ""PolynomialCount"" -> 282615537016442185920, ""CountNormalization"" -> 0.4995683546|>"	"<|""Polynomial"" -> 2 + 3*^8 + ^47, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 2*^7 + ^47, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^9 + ^48, ""PolynomialCount"" -> 2283043553280, ""CountNormalization"" -> 0.3893280029|>"	"<|""Polynomial"" -> 2 +  + 2*^2 + ^26 + ^48, ""PolynomialCount"" -> 467460447181524172800, ""CountNormalization"" -> 0.2812975056|>"	"<|""Polynomial"" -> 3 +  + ^12 + ^48, ""CountNormalization"" -> 0.2390278969|>"	"<|""Polynomial"" -> 5 +  + 3*^5 + ^48, ""CountNormalization"" -> 0.2084958643|>"	"<|""Polynomial"" -> 1 + ^9 + ^49, ""PolynomialCount"" -> 11398311767808, ""CountNormalization"" -> 0.9921259843|>"	"<|""Polynomial"" -> 1 +  + 2*^14 + ^49, ""PolynomialCount"" -> 2433659728813061898240, ""CountNormalization"" -> 0.4983270413|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^49, ""CountNormalization"" -> 0.4999743997|>"	"<|""Polynomial"" -> 2 + 6*^3 + ^49, ""CountNormalization"" -> 0.3216795791|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^4 + ^50, ""PolynomialCount"" -> 13122000000000, ""CountNormalization"" -> 0.5827338612|>"	"<|""Polynomial"" -> 2 +  + ^21 + ^50, ""PolynomialCount"" -> 6376114787733900000000, ""CountNormalization"" -> 0.4440822301|>"	"<|""Polynomial"" -> 2 + 2* + 2*^17 + ^50, ""CountNormalization"" -> 0.2931725751|>"	"<|""Polynomial"" -> 3 + 3* + 2*^3 + ^50, ""CountNormalization"" -> 0.3012180122|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^6 + ^51, ""PolynomialCount"" -> 37456800827040, ""CountNormalization"" -> 0.8483422152|>"	"<|""Polynomial"" -> 1 + 2* + ^51, ""PolynomialCount"" -> 19477945962331713964800, ""CountNormalization"" -> 0.4612425261|>"	"<|""Polynomial"" -> 2 + 3*^10 + ^51, ""CountNormalization"" -> 0.4826810419|>"	"<|""Polynomial"" -> 2 +  + 6*^2 + ^51, ""CountNormalization"" -> 0.3127003782|>"	"<|""Polynomial"" -> 1 + ^3 + ^52, ""PolynomialCount"" -> 44980696051200, ""CountNormalization"" -> 0.519361486|>"	"<|""Polynomial"" -> 2 + ^7 + ^52, ""PolynomialCount"" -> 48762698660935773696000, ""CountNormalization"" -> 0.3924513532|>"	"<|""Polynomial"" -> 3 +  + 3*^6 + ^52, ""CountNormalization"" -> 0.3018212817|>"	"<|""Polynomial"" -> 3 +  + 6*^2 + ^52, ""CountNormalization"" -> 0.2599687526|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^6 + ^53, ""PolynomialCount"" -> 169917983040000, ""CountNormalization"" -> 0.9998283425|>"	"<|""Polynomial"" -> 1 + 2*^13 + ^53, ""PolynomialCount"" -> 181144333455844503343776, ""CountNormalization"" -> 0.4953066085|>"	"<|""Polynomial"" -> 2 + ^6 + ^53, ""CountNormalization"" -> 0.4999999999|>"	"<|""Polynomial"" -> 2 + 5* + ^53, ""CountNormalization"" -> 0.3332919793|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^8 + ^54, ""PolynomialCount"" -> 178118842613760, ""CountNormalization"" -> 0.5339294285|>"	"<|""Polynomial"" -> 2 +  + ^54, ""PolynomialCount"" -> 387575901568016654008320, ""CountNormalization"" -> 0.3599173404|>"	"<|""Polynomial"" -> 2 +  + 4*^12 + ^54, ""CountNormalization"" -> 0.2560413846|>"	"<|""Polynomial"" -> 3 +  + 4*^3 + ^54, ""CountNormalization"" -> 0.296582362|>"	"<|""Polynomial"" -> 1 + ^24 + ^55, ""PolynomialCount"" -> 598690870272000, ""CountNormalization"" -> 0.9139355346|>"	"<|""Polynomial"" -> 1 + 2*^23 + ^55, ""PolynomialCount"" -> 1377643376561112664080000, ""CountNormalization"" -> 0.4343406615|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^55, ""CountNormalization"" -> 0.448138155|>"	"<|""Polynomial"" -> 2 + 2*^9 + ^55, ""CountNormalization"" -> 0.3329164757|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^56, ""PolynomialCount"" -> 598975092817920, ""CountNormalization"" -> 0.4654971575|>"	"<|""Polynomial"" -> 2 + ^3 + ^56, ""PolynomialCount"" -> 3511382802619638876733440, ""CountNormalization"" -> 0.3757300588|>"	"<|""Polynomial"" -> 2 +  + 2*^6 + ^56, ""CountNormalization"" -> 0.2954584148|>"	"<|""Polynomial"" -> 3 + 3* + ^2 + ^56, ""CountNormalization"" -> 0.2537711975|>"	"<|""Polynomial"" -> 1 + ^7 + ^57, ""PolynomialCount"" -> 2167072830474048, ""CountNormalization"" -> 0.8571140418|>"	"<|""Polynomial"" -> 1 +  + 2*^12 + ^57, ""PolynomialCount"" -> 12649371783849476658855936, ""CountNormalization"" -> 0.4592321599|>"	"<|""Polynomial"" -> 2 + 4* + ^57, ""CountNormalization"" -> 0.4812607349|>"	"<|""Polynomial"" -> 2 + 3* + ^57, ""CountNormalization"" -> 0.3150197333|>"	"<|""Polynomial"" -> 1 + ^19 + ^58, ""PolynomialCount"" -> 3238370502193152, ""CountNormalization"" -> 0.6516505708|>"	"<|""Polynomial"" -> 2 + ^5 + ^31 + ^58, ""PolynomialCount"" -> 39832077003341133762155520, ""CountNormalization"" -> 0.4904877583|>"	"<|""Polynomial"" -> 2 + 2* + 3*^5 + ^58, ""CountNormalization"" -> 0.3276743653|>"	"<|""Polynomial"" -> 3 +  + 3*^4 + ^58, ""CountNormalization"" -> 0.3276836132|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^59, ""PolynomialCount"" -> 9770466930024800, ""CountNormalization"" -> 0.9999944429|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^59, ""PolynomialCount"" -> 119749034667450800758766132, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 4*^7 + ^59, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 5*^4 + ^59, ""CountNormalization"" -> 0.3333326044|>"	"<|""Polynomial"" -> 1 +  + ^60, ""PolynomialCount"" -> 6774451200000000, ""CountNormalization"" -> 0.352553986|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^60, ""PolynomialCount"" -> 189934737091547627520000000, ""CountNormalization"" -> 0.2688316312|>"	"<|""Polynomial"" -> 2 +  + 4*^6 + ^60, ""CountNormalization"" -> 0.217253073|>"	"<|""Polynomial"" -> 5 +  + 6*^23 + ^60, ""CountNormalization"" -> 0.194175598|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^61, ""PolynomialCount"" -> 37800705069076950, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^61, ""PolynomialCount"" -> 1042403805237879424255410000, ""CountNormalization"" -> 0.499999172|>"	"<|""Polynomial"" -> 2 + ^6 + ^61, ""CountNormalization"" -> 0.4999406105|>"	"<|""Polynomial"" -> 2 + ^4 + ^61, ""CountNormalization"" -> 0.3323552144|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^6 + ^62, ""PolynomialCount"" -> 49588021611155412, ""CountNormalization"" -> 0.6666666654|>"	"<|""Polynomial"" -> 2 + ^3 + ^13 + ^62, ""PolynomialCount"" -> 3071795845073983194045339648, ""CountNormalization"" -> 0.4991904238|>"	"<|""Polynomial"" -> 2 + 2* + 2*^8 + ^62, ""CountNormalization"" -> 0.33289852|>"	"<|""Polynomial"" -> 3 +  + 5*^5 + ^62, ""CountNormalization"" -> 0.3313550336|>"	"<|""Polynomial"" -> 1 +  + ^63, ""PolynomialCount"" -> 122428597145960448, ""CountNormalization"" -> 0.8362453113|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^63, ""PolynomialCount"" -> 8366303371209607550317473792, ""CountNormalization"" -> 0.4605058066|>"	"<|""Polynomial"" -> 2 + ^2 + ^63, ""CountNormalization"" -> 0.4566169668|>"	"<|""Polynomial"" -> 4 + 3*^26 + ^63, ""CountNormalization"" -> 0.2963179383|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^64, ""PolynomialCount"" -> 143890337947975680, ""CountNormalization"" -> 0.4992198944|>"	"<|""Polynomial"" -> 2 + ^3 + ^64, ""PolynomialCount"" -> 19603400595173935832629248000, ""CountNormalization"" -> 0.3653853132|>"	"<|""Polynomial"" -> 2 +  + 4*^25 + ^64, ""CountNormalization"" -> 0.288080962|>"	"<|""Polynomial"" -> 3 + 2* + ^64, ""CountNormalization"" -> 0.2500595062|>"	"<|""Polynomial"" -> 1 + ^18 + ^65, ""PolynomialCount"" -> 549215642649655800, ""CountNormalization"" -> 0.9676237885|>"	"<|""Polynomial"" -> 1 +  + 2*^28 + ^65, ""PolynomialCount"" -> 71485327935248378062111200000, ""CountNormalization"" -> 0.4510749542|>"	"<|""Polynomial"" -> 2 + 3*^6 + ^65, ""CountNormalization"" -> 0.4447224624|>"	"<|""Polynomial"" -> 2 + 5* + ^65, ""CountNormalization"" -> 0.3306681937|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^9 + ^66, ""PolynomialCount"" -> 594287364124624896, ""CountNormalization"" -> 0.5315703123|>"	"<|""Polynomial"" -> 2 + ^3 + ^29 + ^66, ""PolynomialCount"" -> 174218430095662790629693440000, ""CountNormalization"" -> 0.372079052|>"	"<|""Polynomial"" -> 2 + 2* + 2*^24 + ^66, ""CountNormalization"" -> 0.2591699205|>"	"<|""Polynomial"" -> 3 +  + 5*^15 + ^66, ""CountNormalization"" -> 0.2902913532|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^67, ""PolynomialCount"" -> 2202596295934991760, ""CountNormalization"" -> 0.9999999948|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^67, ""PolynomialCount"" -> 691858536115550146318639224000, ""CountNormalization"" -> 0.4999977386|>"	"<|""Polynomial"" -> 2 + ^6 + ^67, ""CountNormalization"" -> 0.4978128092|>"	"<|""Polynomial"" -> 2 + 2*^9 + ^67, ""CountNormalization"" -> 0.3333318696|>"	"<|""Polynomial"" -> 1 + ^9 + ^68, ""PolynomialCount"" -> 2295419955465369600, ""CountNormalization"" -> 0.5288486018|>"	"<|""Polynomial"" -> 2 +  + ^13 + ^68, ""CountNormalization"" -> 0.3942168645|>"	"<|""Polynomial"" -> 3 +  + 4*^9 + ^68, ""CountNormalization"" -> 0.3066621946|>"	"<|""Polynomial"" -> 3 + 2* + 5*^5 + ^68, ""CountNormalization"" -> 0.2647012937|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^69, ""PolynomialCount"" -> 7176808547444088960, ""CountNormalization"" -> 0.8389010748|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^69, ""CountNormalization"" -> 0.4500877411|>"	"<|""Polynomial"" -> 2 + 4*^13 + ^69, ""CountNormalization"" -> 0.480258996|>"	"<|""Polynomial"" -> 2 + 3*^11 + ^69, ""CountNormalization"" -> 0.3067474909|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^5 + ^70, ""PolynomialCount"" -> 9416895732518400000, ""CountNormalization"" -> 0.5583494662|>"	"<|""Polynomial"" -> 2 + ^3 + ^55 + ^70, ""CountNormalization"" -> 0.4395883948|>"	"<|""Polynomial"" -> 2 + 2* + 3*^7 + ^70, ""CountNormalization"" -> 0.2853681148|>"	"<|""Polynomial"" -> 3 + 2*^29 + ^70, ""CountNormalization"" -> 0.2832623964|>"	"<|""Polynomial"" -> 1 + ^6 + ^71, ""PolynomialCount"" -> 33255955596453429120, ""CountNormalization"" -> 0.9999955979|>"	"<|""Polynomial"" -> 1 + 2*^20 + ^71, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^20 + ^71, ""CountNormalization"" -> 0.4991212654|>"	"<|""Polynomial"" -> 2 + 2*^10 + ^71, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^3 + ^9 + ^10 + ^72, ""PolynomialCount"" -> 23312749520045998080, ""CountNormalization"" -> 0.3554400048|>"	"<|""Polynomial"" -> 2 +  + 2*^2 + ^20 + ^72, ""CountNormalization"" -> 0.2802945344|>"	"<|""Polynomial"" -> 2 +  + 2*^24 + ^72, ""CountNormalization"" -> 0.2305873772|>"	"<|""Polynomial"" -> 3 +  + 3*^4 + ^72, ""CountNormalization"" -> 0.2153296641|>"	"<|""Polynomial"" -> 1 + ^25 + ^73, ""PolynomialCount"" -> 129085132425950929920, ""CountNormalization"" -> 0.9977216615|>"	"<|""Polynomial"" -> 1 + 2* + ^73, ""CountNormalization"" -> 0.4999307149|>"	"<|""Polynomial"" -> 2 + ^14 + ^73, ""CountNormalization"" -> 0.4999998097|>"	"<|""Polynomial"" -> 2 + 2*^5 + ^73, ""CountNormalization"" -> 0.3325739405|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^7 + ^74, ""PolynomialCount"" -> 169316907563870779392, ""CountNormalization"" -> 0.6633036215|>"	"<|""Polynomial"" -> 2 + ^3 + ^41 + ^74, ""CountNormalization"" -> 0.4999681754|>"	"<|""Polynomial"" -> 2 + 2* + 4*^13 + ^74, ""CountNormalization"" -> 0.3310598132|>"	"<|""Polynomial"" -> 3 + 2*^31 + ^74, ""CountNormalization"" -> 0.3294972896|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^6 + ^75, ""PolynomialCount"" -> 414139557888000000000, ""CountNormalization"" -> 0.8221637116|>"	"<|""Polynomial"" -> 1 +  + ^17 + ^75, ""CountNormalization"" -> 0.4186989704|>"	"<|""Polynomial"" -> 2 +  + 2*^15 + ^75, ""CountNormalization"" -> 0.4210793681|>"	"<|""Polynomial"" -> 2 + 3*^11 + ^75, ""CountNormalization"" -> 0.3053615073|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^5 + ^76, ""PolynomialCount"" -> 526755007970989572096, ""CountNormalization"" -> 0.5298373807|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^76, ""CountNormalization"" -> 0.3996042221|>"	"<|""Polynomial"" -> 3 +  + ^4 + ^76, ""CountNormalization"" -> 0.3056133012|>"	"<|""Polynomial"" -> 3 +  + 6*^2 + ^76, ""CountNormalization"" -> 0.266029473|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^77, ""PolynomialCount"" -> 1841506581813189850944, ""CountNormalization"" -> 0.9383272621|>"	"<|""Polynomial"" -> 1 + 2*^25 + ^77, ""CountNormalization"" -> 0.4776992154|>"	"<|""Polynomial"" -> 2 + ^6 + ^77, ""CountNormalization"" -> 0.4999743578|>"	"<|""Polynomial"" -> 2 + 2* + ^77, ""CountNormalization"" -> 0.3214834574|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^7 + ^78, ""PolynomialCount"" -> 2185037258519160864000, ""CountNormalization"" -> 0.5639151829|>"	"<|""Polynomial"" -> 2 + ^17 + ^78, ""CountNormalization"" -> 0.3865835725|>"	"<|""Polynomial"" -> 2 + ^29 + ^78, ""CountNormalization"" -> 0.272851031|>"	"<|""Polynomial"" -> 5 +  + ^2 + ^78, ""CountNormalization"" -> 0.2987944248|>"	"<|""Polynomial"" -> 1 + ^9 + ^79, ""PolynomialCount"" -> 7648581626983221210888, ""CountNormalization"" -> 0.9996278328|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^79, ""CountNormalization"" -> 0.4999999988|>"	"<|""Polynomial"" -> 2 + 3*^9 + ^79, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 2*^11 + ^79, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^9 + ^80, ""PolynomialCount"" -> 6485183461903564800000, ""CountNormalization"" -> 0.4291534423|>"	"<|""Polynomial"" -> 2 + ^21 + ^80, ""CountNormalization"" -> 0.3264237715|>"	"<|""Polynomial"" -> 3 +  + 2*^27 + ^80, ""CountNormalization"" -> 0.2508295737|>"	"<|""Polynomial"" -> 3 + 2*^11 + ^80, ""CountNormalization"" -> 0.2200765303|>"	"<|""Polynomial"" -> 1 + ^4 + ^81, ""PolynomialCount"" -> 25225059102561477328896, ""CountNormalization"" -> 0.8450600335|>"	"<|""Polynomial"" -> 1 + 2*^40 + ^81, ""CountNormalization"" -> 0.4554722921|>"	"<|""Polynomial"" -> 2 + 4*^5 + ^81, ""CountNormalization"" -> 0.4517604762|>"	"<|""Polynomial"" -> 4 + 3*^14 + ^81, ""CountNormalization"" -> 0.303377603|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^9 + ^82, ""PolynomialCount"" -> 38838084210665112870144, ""CountNormalization"" -> 0.6585852609|>"	"<|""Polynomial"" -> 2 + ^3 + ^13 + ^82, ""CountNormalization"" -> 0.4939610514|>"	"<|""Polynomial"" -> 2 + ^25 + ^82, ""CountNormalization"" -> 0.3293082185|>"	"<|""Polynomial"" -> 3 + 3* + 6*^7 + ^82, ""CountNormalization"" -> 0.3293171483|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^83, ""PolynomialCount"" -> 115825228226551298175440, ""CountNormalization"" -> 0.994011976|>"	"<|""Polynomial"" -> 1 + 2*^27 + ^83, ""CountNormalization"" -> 0.4969649771|>"	"<|""Polynomial"" -> 2 + 4*^17 + ^83, ""CountNormalization"" -> 0.4999999756|>"	"<|""Polynomial"" -> 2 + 5*^7 + ^83, ""CountNormalization"" -> 0.3313323558|>"	"<|""Polynomial"" -> 1 + ^13 + ^84, ""PolynomialCount"" -> 89757882837568623476736, ""CountNormalization"" -> 0.3897913977|>"	"<|""Polynomial"" -> 2 + ^13 + ^41 + ^84, ""CountNormalization"" -> 0.2933177826|>"	"<|""Polynomial"" -> 3 +  + ^4 + ^84, ""CountNormalization"" -> 0.2371076899|>"	"<|""Polynomial"" -> 5 +  + 4*^8 + ^84, ""CountNormalization"" -> 0.2164817246|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^8 + ^85, ""PolynomialCount"" -> 440440202020999664971800, ""CountNormalization"" -> 0.9677345521|>"	"<|""Polynomial"" -> 1 + 2*^16 + ^85, ""CountNormalization"" -> 0.454289348|>"	"<|""Polynomial"" -> 2 + 3*^24 + ^85, ""CountNormalization"" -> 0.4467557026|>"	"<|""Polynomial"" -> 2 + 2*^8 + ^85, ""CountNormalization"" -> 0.3329053866|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^86, ""PolynomialCount"" -> 598323702929870048962320, ""CountNormalization"" -> 0.6650511245|>"	"<|""Polynomial"" -> 2 + ^13 + ^86, ""CountNormalization"" -> 0.4988399072|>"	"<|""Polynomial"" -> 2 +  + 2*^6 + ^86, ""CountNormalization"" -> 0.333083248|>"	"<|""Polynomial"" -> 3 +  + ^2 + ^86, ""CountNormalization"" -> 0.3329450433|>"	"<|""Polynomial"" -> 1 + ^13 + ^87, ""PolynomialCount"" -> 1515548348148703326216192, ""CountNormalization"" -> 0.8520781434|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^87, ""CountNormalization"" -> 0.4536937764|>"	"<|""Polynomial"" -> 2 + 4*^19 + ^87, ""CountNormalization"" -> 0.4755026992|>"	"<|""Polynomial"" -> 2 + 3* + ^87, ""CountNormalization"" -> 0.3104371072|>"	"<|""Polynomial"" -> 1 + ^8 + ^9 + ^11 + ^88, ""PolynomialCount"" -> 1657467306420307406880768, ""CountNormalization"" -> 0.4712897825|>"	"<|""Polynomial"" -> 2 + ^39 + ^88, ""CountNormalization"" -> 0.3628628915|>"	"<|""Polynomial"" -> 3 +  + 4*^13 + ^88, ""CountNormalization"" -> 0.2856940911|>"	"<|""Polynomial"" -> 3 +  + ^11 + ^88, ""CountNormalization"" -> 0.251183063|>"	"<|""Polynomial"" -> 1 + ^38 + ^89, ""PolynomialCount"" -> 6954719321827979072466990, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^13 + ^89, ""CountNormalization"" -> 0.4972067039|>"	"<|""Polynomial"" -> 2 + 4*^3 + ^89, ""CountNormalization"" -> 0.4972066186|>"	"<|""Polynomial"" -> 2 + 2* + ^89, ""CountNormalization"" -> 0.3333331487|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^90, ""PolynomialCount"" -> 6388623019370592000000000, ""CountNormalization"" -> 0.4644619719|>"	"<|""Polynomial"" -> 2 + ^19 + ^90, ""CountNormalization"" -> 0.3119737163|>"	"<|""Polynomial"" -> 2 +  + 3*^89 + ^90, ""CountNormalization"" -> 0.2285335859|>"	"<|""Polynomial"" -> 5 +  + 3*^23 + ^90, ""CountNormalization"" -> 0.2618111975|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^8 + ^91, ""PolynomialCount"" -> 26960318876995587185356800, ""CountNormalization"" -> 0.9909159329|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^91, ""CountNormalization"" -> 0.4995419167|>"	"<|""Polynomial"" -> 2 + ^6 + ^91, ""CountNormalization"" -> 0.499974398|>"	"<|""Polynomial"" -> 2 + 2*^3 + ^91, ""CountNormalization"" -> 0.3217710814|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^92, ""PolynomialCount"" -> 27948064889607776345456640, ""CountNormalization"" -> 0.5192541416|>"	"<|""Polynomial"" -> 2 +  + ^33 + ^92, ""CountNormalization"" -> 0.3914893301|>"	"<|""Polynomial"" -> 2 +  + 2*^20 + ^92, ""CountNormalization"" -> 0.3011120941|>"	"<|""Polynomial"" -> 3 + ^21 + ^92, ""CountNormalization"" -> 0.2608980553|>"	"<|""Polynomial"" -> 1 + ^2 + ^93, ""PolynomialCount"" -> 91276684881763651277287896, ""CountNormalization"" -> 0.8571428567|>"	"<|""Polynomial"" -> 1 + 2*^23 + ^93, ""CountNormalization"" -> 0.4604455309|>"	"<|""Polynomial"" -> 2 + ^26 + ^93, ""CountNormalization"" -> 0.4836071534|>"	"<|""Polynomial"" -> 2 + 3*^29 + ^93, ""CountNormalization"" -> 0.314759128|>"	"<|""Polynomial"" -> 1 + ^21 + ^94, ""PolynomialCount"" -> 139888531269039658954752000, ""CountNormalization"" -> 0.6638812019|>"	"<|""Polynomial"" -> 2 +  + ^81 + ^94, ""CountNormalization"" -> 0.4995368801|>"	"<|""Polynomial"" -> 2 + ^45 + ^94, ""CountNormalization"" -> 0.3331722249|>"	"<|""Polynomial"" -> 3 + 2* + ^94, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^11 + ^95, ""PolynomialCount"" -> 401425491677151869644500000, ""CountNormalization"" -> 0.9626733853|>"	"<|""Polynomial"" -> 1 + 2*^47 + ^95, ""CountNormalization"" -> 0.4518812592|>"	"<|""Polynomial"" -> 2 + 3*^24 + ^95, ""CountNormalization"" -> 0.4455694562|>"	"<|""Polynomial"" -> 2 + 3*^31 + ^95, ""CountNormalization"" -> 0.3324100022|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^10 + ^96, ""PolynomialCount"" -> 319640106112747034042695680, ""CountNormalization"" -> 0.3873048322|>"	"<|""Polynomial"" -> 2 +  + ^2 + 2*^20 + ^96, ""CountNormalization"" -> 0.2812938298|>"	"<|""Polynomial"" -> 3 +  + 2*^43 + ^96, ""CountNormalization"" -> 0.2364724521|>"	"<|""Polynomial"" -> 3 +  + 4*^3 + ^96, ""CountNormalization"" -> 0.2057618697|>"	"<|""Polynomial"" -> 1 + ^6 + ^97, ""PolynomialCount"" -> 1633427653827761306200434256, ""CountNormalization"" -> 0.9999126409|>"	"<|""Polynomial"" -> 1 + 2*^12 + ^97, ""CountNormalization"" -> 0.4999934752|>"	"<|""Polynomial"" -> 2 + 3*^24 + ^97, ""CountNormalization"" -> 0.4987127697|>"	"<|""Polynomial"" -> 2 + 2*^3 + ^97, ""CountNormalization"" -> 0.3321340291|>"	"<|""Polynomial"" -> 1 + ^11 + ^98, ""PolynomialCount"" -> 2089151327970861832393261056, ""CountNormalization"" -> 0.6460355246|>"	"<|""Polynomial"" -> 2 +  + ^39 + ^98, ""CountNormalization"" -> 0.4974160223|>"	"<|""Polynomial"" -> 2 + 2* + 3*^31 + ^98, ""CountNormalization"" -> 0.3211058413|>"	"<|""Polynomial"" -> 3 + 2*^29 + ^98, ""CountNormalization"" -> 0.3164223699|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^7 + ^99, ""PolynomialCount"" -> 5093230087764971349769617408, ""CountNormalization"" -> 0.7955343193|>"	"<|""Polynomial"" -> 1 + 2*^19 + ^99, ""CountNormalization"" -> 0.440773761|>"	"<|""Polynomial"" -> 2 + 4*^7 + ^99, ""CountNormalization"" -> 0.4555468812|>"	"<|""Polynomial"" -> 2 + 3* + 5*^2 + ^99, ""CountNormalization"" -> 0.3050640064|>"	"<|""Polynomial"" -> 1 + ^37 + ^100, ""PolynomialCount"" -> 5707676340000000000000000000, ""CountNormalization"" -> 0.4502562724|>"	"<|""Polynomial"" -> 2 +  + ^17 + ^100, ""CountNormalization"" -> 0.3514495702|>"	"<|""Polynomial"" -> 2 +  + 3*^19 + ^100, ""CountNormalization"" -> 0.263990406|>"	"<|""Polynomial"" -> 3 + 3* + 3*^2 + ^100, ""CountNormalization"" -> 0.2376526555|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^101, ""PolynomialCount"" -> 25101992083723937406238257504, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^31 + ^101, ""CountNormalization"" -> 0.4999999849|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^101, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 2*^13 + ^101, ""CountNormalization"" -> 0.3323197627|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^6 + ^102, ""PolynomialCount"" -> 28008751887666795186398822400, ""CountNormalization"" -> 0.5634227389|>"	"<|""Polynomial"" -> 2 + ^25 + ^102, ""CountNormalization"" -> 0.3892059684|>"	"<|""Polynomial"" -> 2 +  + ^102, ""CountNormalization"" -> 0.273017892|>"	"<|""Polynomial"" -> 3 +  + 6*^7 + ^102, ""CountNormalization"" -> 0.3054279823|>"	"<|""Polynomial"" -> 1 + ^9 + ^103, ""PolynomialCount"" -> 98458299008244454194462493872, ""CountNormalization"" -> 0.9999999996|>"	"<|""Polynomial"" -> 1 + 2*^47 + ^103, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^29 + ^103, ""CountNormalization"" -> 0.4998476098|>"	"<|""Polynomial"" -> 2 + 6*^9 + ^103, ""CountNormalization"" -> 0.3333147353|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^11 + ^104, ""PolynomialCount"" -> 95329321984839747796992000000, ""CountNormalization"" -> 0.488810239|>"	"<|""Polynomial"" -> 2 + ^5 + ^104, ""CountNormalization"" -> 0.3828793688|>"	"<|""Polynomial"" -> 3 +  + ^7 + ^104, ""CountNormalization"" -> 0.3008511168|>"	"<|""Polynomial"" -> 3 + ^43 + ^104, ""CountNormalization"" -> 0.2589224098|>"	"<|""Polynomial"" -> 1 + ^16 + ^105, ""PolynomialCount"" -> 310440148239743177564160000000, ""CountNormalization"" -> 0.8035587537|>"	"<|""Polynomial"" -> 1 + 2* + ^32 + ^105, ""CountNormalization"" -> 0.4121534758|>"	"<|""Polynomial"" -> 2 + 2* + 4*^6 + ^105, ""CountNormalization"" -> 0.4270658839|>"	"<|""Polynomial"" -> 2 + 3*^31 + ^105, ""CountNormalization"" -> 0.2948951846|>"	"<|""Polynomial"" -> 1 + ^15 + ^106, ""PolynomialCount"" -> 505393843619072184786247680000, ""CountNormalization"" -> 0.6603227682|>"	"<|""Polynomial"" -> 2 +  + ^27 + ^106, ""CountNormalization"" -> 0.4953066022|>"	"<|""Polynomial"" -> 2 + 2* + 2*^16 + ^106, ""CountNormalization"" -> 0.3302180684|>"	"<|""Polynomial"" -> 3 + 2*^11 + ^106, ""CountNormalization"" -> 0.3301771|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^9 + ^107, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^3 + ^107, ""CountNormalization"" -> 0.49998784|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^107, ""CountNormalization"" -> 0.4999221305|>"	"<|""Polynomial"" -> 2 + 2*^15 + ^107, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^31 + ^108, ""CountNormalization"" -> 0.3801075128|>"	"<|""Polynomial"" -> 2 + ^49 + ^53 + ^108, ""CountNormalization"" -> 0.2839890376|>"	"<|""Polynomial"" -> 3 +  + ^7 + ^108, ""CountNormalization"" -> 0.2295755059|>"	"<|""Polynomial"" -> 3 +  + 5*^9 + ^108, ""CountNormalization"" -> 0.2177965426|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^5 + ^109, ""CountNormalization"" -> 0.9999999987|>"	"<|""Polynomial"" -> 1 + 2*^9 + ^109, ""CountNormalization"" -> 0.4995417038|>"	"<|""Polynomial"" -> 2 + 3*^20 + ^109, ""CountNormalization"" -> 0.499540882|>"	"<|""Polynomial"" -> 2 + 3*^23 + ^109, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^110, ""CountNormalization"" -> 0.5529031686|>"	"<|""Polynomial"" -> 2 +  + ^105 + ^110, ""CountNormalization"" -> 0.4202065855|>"	"<|""Polynomial"" -> 2 + 2* + ^16 + ^110, ""CountNormalization"" -> 0.2809105278|>"	"<|""Polynomial"" -> 3 + 3* + 2*^12 + ^110, ""CountNormalization"" -> 0.286975083|>"	"<|""Polynomial"" -> 1 + ^10 + ^111, ""CountNormalization"" -> 0.853296478|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^111, ""CountNormalization"" -> 0.4615383977|>"	"<|""Polynomial"" -> 2 + 3*^5 + ^111, ""CountNormalization"" -> 0.4804689205|>"	"<|""Polynomial"" -> 4 + 3*^8 + ^111, ""CountNormalization"" -> 0.314212164|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^11 + ^112, ""CountNormalization"" -> 0.4635959008|>"	"<|""Polynomial"" -> 2 + ^43 + ^112, ""CountNormalization"" -> 0.3486648894|>"	"<|""Polynomial"" -> 3 +  + ^43 + ^112, ""CountNormalization"" -> 0.2747758611|>"	"<|""Polynomial"" -> 3 +  + 6*^12 + ^112, ""CountNormalization"" -> 0.2379560219|>"	"<|""Polynomial"" -> 1 + ^9 + ^113, ""CountNormalization"" -> 0.9996464743|>"	"<|""Polynomial"" -> 1 + 2*^19 + ^113, ""CountNormalization"" -> 0.4974826633|>"	"<|""Polynomial"" -> 2 + 3*^24 + ^113, ""CountNormalization"" -> 0.4997454205|>"	"<|""Polynomial"" -> 2 + 3*^43 + ^113, ""CountNormalization"" -> 0.3318649046|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^11 + ^114, ""CountNormalization"" -> 0.5704053768|>"	"<|""Polynomial"" -> 2 + ^7 + ^114, ""CountNormalization"" -> 0.3933505465|>"	"<|""Polynomial"" -> 2 +  + 2*^18 + ^114, ""CountNormalization"" -> 0.273430209|>"	"<|""Polynomial"" -> 3 +  + 6*^20 + ^114, ""CountNormalization"" -> 0.3070195281|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^8 + ^115, ""CountNormalization"" -> 0.9470827902|>"	"<|""Polynomial"" -> 1 + 2*^32 + ^115, ""CountNormalization"" -> 0.4448740491|>"	"<|""Polynomial"" -> 2 + 4* + ^115, ""CountNormalization"" -> 0.4464735635|>"	"<|""Polynomial"" -> 2 + 5*^48 + ^115, ""CountNormalization"" -> 0.3257336815|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^116, ""CountNormalization"" -> 0.5213204508|>"	"<|""Polynomial"" -> 2 + ^15 + ^116, ""CountNormalization"" -> 0.3923585954|>"	"<|""Polynomial"" -> 3 +  + 4*^25 + ^116, ""CountNormalization"" -> 0.3024686449|>"	"<|""Polynomial"" -> 3 + 3* + 6*^13 + ^116, ""CountNormalization"" -> 0.2610217947|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^117, ""CountNormalization"" -> 0.8335635025|>"	"<|""Polynomial"" -> 1 +  + ^15 + ^117, ""CountNormalization"" -> 0.4593227045|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^117, ""CountNormalization"" -> 0.4520555272|>"	"<|""Polynomial"" -> 4 + 3*^16 + ^117, ""CountNormalization"" -> 0.3067999257|>"	"<|""Polynomial"" -> 1 + ^33 + ^118, ""CountNormalization"" -> 0.6664097124|>"	"<|""Polynomial"" -> 2 + ^3 + ^25 + ^118, ""CountNormalization"" -> 0.4998431126|>"	"<|""Polynomial"" -> 2 + ^13 + ^118, ""CountNormalization"" -> 0.33293027|>"	"<|""Polynomial"" -> 3 + ^47 + ^118, ""CountNormalization"" -> 0.3333298751|>"	"<|""Polynomial"" -> 1 + ^8 + ^119, ""CountNormalization"" -> 0.9879184574|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^119, ""CountNormalization"" -> 0.4971721255|>"	"<|""Polynomial"" -> 2 + 4*^45 + ^119, ""CountNormalization"" -> 0.4962182943|>"	"<|""Polynomial"" -> 2 + 2*^19 + ^119, ""CountNormalization"" -> 0.3217127298|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^9 + ^120, ""CountNormalization"" -> 0.3304333311|>"	"<|""Polynomial"" -> 2 +  + ^2 + 2*^20 + ^120, ""CountNormalization"" -> 0.2611452946|>"	"<|""Polynomial"" -> 2 +  + 4*^29 + ^120, ""CountNormalization"" -> 0.2156598355|>"	"<|""Polynomial"" -> 3 +  + 6*^17 + ^120, ""CountNormalization"" -> 0.1852675686|>"	"<|""Polynomial"" -> 1 + ^18 + ^121, ""CountNormalization"" -> 0.9444733763|>"	"<|""Polynomial"" -> 1 + 2* + ^121, ""CountNormalization"" -> 0.4780955199|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^121, ""CountNormalization"" -> 0.4999576118|>"	"<|""Polynomial"" -> 2 + 6*^37 + ^121, ""CountNormalization"" -> 0.3328010568|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^6 + ^122, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 2 + ^3 + ^11 + ^122, ""CountNormalization"" -> 0.4986367765|>"	"<|""Polynomial"" -> 2 + 2* + ^6 + ^122, ""CountNormalization"" -> 0.3323487699|>"	"<|""Polynomial"" -> 3 + 2*^29 + ^122, ""CountNormalization"" -> 0.3323552144|>"	"<|""Polynomial"" -> 1 + ^2 + ^123, ""CountNormalization"" -> 0.8570785076|>"	"<|""Polynomial"" -> 1 + 2* + ^50 + ^123, ""CountNormalization"" -> 0.4559686655|>"	"<|""Polynomial"" -> 2 + 4* + ^11 + ^123, ""CountNormalization"" -> 0.4832154291|>"	"<|""Polynomial"" -> 4 +  + 3*^6 + ^123, ""CountNormalization"" -> 0.3119835993|>"	"<|""Polynomial"" -> 1 + ^37 + ^124, ""CountNormalization"" -> 0.5331641823|>"	"<|""Polynomial"" -> 2 + ^25 + ^124, ""CountNormalization"" -> 0.3993523386|>"	"<|""Polynomial"" -> 3 +  + 3*^26 + ^124, ""CountNormalization"" -> 0.3072909416|>"	"<|""Polynomial"" -> 3 + 2* + 3*^7 + ^124, ""CountNormalization"" -> 0.2650840269|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^7 + ^125, ""CountNormalization"" -> 0.9655952741|>"	"<|""Polynomial"" -> 1 + 2*^52 + ^125, ""CountNormalization"" -> 0.4526827787|>"	"<|""Polynomial"" -> 2 + 4* + ^16 + ^125, ""CountNormalization"" -> 0.440836312|>"	"<|""Polynomial"" -> 2 + 3*^22 + ^125, ""CountNormalization"" -> 0.3317566804|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^126, ""CountNormalization"" -> 0.5157770636|>"	"<|""Polynomial"" -> 2 + ^53 + ^126, ""CountNormalization"" -> 0.3512409211|>"	"<|""Polynomial"" -> 2 + 2* + 3*^6 + ^126, ""CountNormalization"" -> 0.2432310262|>"	"<|""Polynomial"" -> 3 +  + 5*^5 + ^126, ""CountNormalization"" -> 0.2842564737|>"	"<|""Polynomial"" -> 1 +  + ^127, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^8 + ^127, ""CountNormalization"" -> 0.4999136639|>"	"<|""Polynomial"" -> 2 + ^26 + ^127, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^2 + ^127, ""CountNormalization"" -> 0.3333333321|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^7 + ^128, ""CountNormalization"" -> 0.4992180736|>"	"<|""Polynomial"" -> 2 +  + 2*^2 + 2*^21 + ^128, ""CountNormalization"" -> 0.3653853132|>"	"<|""Polynomial"" -> 3 +  + ^3 + ^128, ""CountNormalization"" -> 0.2877063443|>"	"<|""Polynomial"" -> 3 +  + ^20 + ^128, ""CountNormalization"" -> 0.2500525541|>"	"<|""Polynomial"" -> 1 + ^5 + ^129, ""CountNormalization"" -> 0.8550657315|>"	"<|""Polynomial"" -> 1 +  + 2*^8 + ^129, ""CountNormalization"" -> 0.4603560861|>"	"<|""Polynomial"" -> 2 + 3*^20 + ^129, ""CountNormalization"" -> 0.4838709413|>"	"<|""Polynomial"" -> 2 +  + 5*^3 + ^129, ""CountNormalization"" -> 0.3157603337|>"	"<|""Polynomial"" -> 1 + ^3 + ^130, ""CountNormalization"" -> 0.5817474383|>"	"<|""Polynomial"" -> 2 +  + ^15 + ^130, ""CountNormalization"" -> 0.4436791697|>"	"<|""Polynomial"" -> 2 + 2* + 3*^63 + ^130, ""CountNormalization"" -> 0.29583234|>"	"<|""Polynomial"" -> 3 + ^33 + ^130, ""CountNormalization"" -> 0.2933911937|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^8 + ^131, ""CountNormalization"" -> 0.9961977186|>"	"<|""Polynomial"" -> 1 + 2*^27 + ^131, ""CountNormalization"" -> 0.4980988593|>"	"<|""Polynomial"" -> 2 + 3*^25 + ^131, ""CountNormalization"" -> 0.4998091978|>"	"<|""Polynomial"" -> 2 + 3* + ^131, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^29 + ^132, ""CountNormalization"" -> 0.3913688044|>"	"<|""Polynomial"" -> 2 +  + 2*^2 + ^12 + ^132, ""CountNormalization"" -> 0.2935317789|>"	"<|""Polynomial"" -> 2 +  + 3*^19 + ^132, ""CountNormalization"" -> 0.2359896386|>"	"<|""Polynomial"" -> 5 +  + 6*^17 + ^132, ""CountNormalization"" -> 0.2127037782|>"	"<|""Polynomial"" -> 1 + ^2 + ^8 + ^9 + ^133, ""CountNormalization"" -> 0.9921240919|>"	"<|""Polynomial"" -> 1 + 2*^15 + ^133, ""CountNormalization"" -> 0.4992283709|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^133, ""CountNormalization"" -> 0.4972144932|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^133, ""CountNormalization"" -> 0.3210031305|>"	"<|""Polynomial"" -> 1 + ^57 + ^134, ""CountNormalization"" -> 0.6666665722|>"	"<|""Polynomial"" -> 2 + ^61 + ^134, ""CountNormalization"" -> 0.4999976458|>"	"<|""Polynomial"" -> 2 + 2* + 2*^32 + ^134, ""CountNormalization"" -> 0.3318752061|>"	"<|""Polynomial"" -> 3 + 2* + 4*^4 + ^134, ""CountNormalization"" -> 0.3333158217|>"	"<|""Polynomial"" -> 1 + ^11 + ^135, ""CountNormalization"" -> 0.8083898476|>"	"<|""Polynomial"" -> 1 + 2*^44 + ^135, ""CountNormalization"" -> 0.4107788243|>"	"<|""Polynomial"" -> 2 + 3*^26 + ^135, ""CountNormalization"" -> 0.4013956584|>"	"<|""Polynomial"" -> 2 + 3* + 4*^8 + ^135, ""CountNormalization"" -> 0.2926591333|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^8 + ^136, ""CountNormalization"" -> 0.4977384572|>"	"<|""Polynomial"" -> 2 + ^63 + ^136, ""CountNormalization"" -> 0.3817945064|>"	"<|""Polynomial"" -> 2 +  + 4*^15 + ^136, ""CountNormalization"" -> 0.3034506974|>"	"<|""Polynomial"" -> 3 + 2* + 3*^7 + ^136, ""CountNormalization"" -> 0.2644649637|>"	"<|""Polynomial"" -> 1 + ^21 + ^137, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2* + ^137, ""CountNormalization"" -> 0.4998986395|>"	"<|""Polynomial"" -> 2 + 4*^41 + ^137, ""CountNormalization"" -> 0.4999748312|>"	"<|""Polynomial"" -> 2 + 3*^8 + ^137, ""CountNormalization"" -> 0.3332088394|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^8 + ^138, ""CountNormalization"" -> 0.5552436783|>"	"<|""Polynomial"" -> 2 +  + ^51 + ^138, ""CountNormalization"" -> 0.3828938444|>"	"<|""Polynomial"" -> 2 + ^65 + ^138, ""CountNormalization"" -> 0.2685946918|>"	"<|""Polynomial"" -> 3 +  + ^14 + ^138, ""CountNormalization"" -> 0.2985321899|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^8 + ^139, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^139, ""CountNormalization"" -> 0.4997003274|>"	"<|""Polynomial"" -> 2 + 4*^27 + ^139, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 6*^27 + ^139, ""CountNormalization"" -> 0.333315951|>"	"<|""Polynomial"" -> 1 + ^29 + ^140, ""CountNormalization"" -> 0.4170342959|>"	"<|""Polynomial"" -> 2 + ^59 + ^140, ""CountNormalization"" -> 0.3392360383|>"	"<|""Polynomial"" -> 2 +  + 2*^26 + ^140, ""CountNormalization"" -> 0.2560494072|>"	"<|""Polynomial"" -> 3 + 3* + 2*^10 + ^140, ""CountNormalization"" -> 0.22574732|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^13 + ^141, ""CountNormalization"" -> 0.8565883591|>"	"<|""Polynomial"" -> 1 + 2*^64 + ^141, ""CountNormalization"" -> 0.4611400196|>"	"<|""Polynomial"" -> 2 + 4*^37 + ^141, ""CountNormalization"" -> 0.4838709677|>"	"<|""Polynomial"" -> 2 + 3*^11 + ^141, ""CountNormalization"" -> 0.314673557|>"	"<|""Polynomial"" -> 1 + ^21 + ^142, ""CountNormalization"" -> 0.6666637201|>"	"<|""Polynomial"" -> 2 + ^65 + ^142, ""CountNormalization"" -> 0.4991734055|>"	"<|""Polynomial"" -> 2 + ^65 + ^142, ""CountNormalization"" -> 0.3326694188|>"	"<|""Polynomial"" -> 3 + 2* + 4*^4 + ^142, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^143, ""CountNormalization"" -> 0.9456575329|>"	"<|""Polynomial"" -> 1 + 2*^35 + ^143, ""CountNormalization"" -> 0.4781360784|>"	"<|""Polynomial"" -> 2 + 3*^21 + ^143, ""CountNormalization"" -> 0.4999999574|>"	"<|""Polynomial"" -> 2 + 5*^19 + ^143, ""CountNormalization"" -> 0.3330353745|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^144, ""CountNormalization"" -> 0.3492798453|>"	"<|""Polynomial"" -> 2 +  + ^2 + 2*^140 + ^144, ""CountNormalization"" -> 0.258946866|>"	"<|""Polynomial"" -> 3 +  + 4*^77 + ^144, ""CountNormalization"" -> 0.2168372115|>"	"<|""Polynomial"" -> 5 +  + 4*^5 + ^144, ""CountNormalization"" -> 0.2026604369|>"	"<|""Polynomial"" -> 1 + ^52 + ^145, ""CountNormalization"" -> 0.9622540799|>"	"<|""Polynomial"" -> 1 + 2*^24 + ^145, ""CountNormalization"" -> 0.4468256141|>"	"<|""Polynomial"" -> 2 + 3*^44 + ^145, ""CountNormalization"" -> 0.4405351032|>"	"<|""Polynomial"" -> 2 + 2*^17 + ^145, ""CountNormalization"" -> 0.3275665583|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^146, ""CountNormalization"" -> 0.6647683404|>"	"<|""Polynomial"" -> 2 + ^3 + ^53 + ^146, ""CountNormalization"" -> 0.4987919206|>"	"<|""Polynomial"" -> 2 + ^35 + ^146, ""CountNormalization"" -> 0.3333332065|>"	"<|""Polynomial"" -> 3 + 3* + 3*^24 + ^146, ""CountNormalization"" -> 0.3324643164|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^11 + ^147, ""CountNormalization"" -> 0.8478702773|>"	"<|""Polynomial"" -> 1 + 2*^8 + ^147, ""CountNormalization"" -> 0.4599831637|>"	"<|""Polynomial"" -> 2 + 3*^58 + ^147, ""CountNormalization"" -> 0.4825686055|>"	"<|""Polynomial"" -> 2 + 3*^43 + ^147, ""CountNormalization"" -> 0.3047490749|>"	"<|""Polynomial"" -> 1 + ^27 + ^148, ""CountNormalization"" -> 0.5261926913|>"	"<|""Polynomial"" -> 2 + ^3 + ^148, ""CountNormalization"" -> 0.3972897309|>"	"<|""Polynomial"" -> 2 +  + 3*^55 + ^148, ""CountNormalization"" -> 0.3055549115|>"	"<|""Polynomial"" -> 3 + ^39 + ^148, ""CountNormalization"" -> 0.2635978317|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^10 + ^149, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 +  + 2*^44 + ^149, ""CountNormalization"" -> 0.4999328921|>"	"<|""Polynomial"" -> 2 + ^30 + ^149, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 6*^27 + ^149, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^53 + ^150, ""CountNormalization"" -> 0.4946743289|>"	"<|""Polynomial"" -> 2 + ^73 + ^150, ""CountNormalization"" -> 0.337951278|>"	"<|""Polynomial"" -> 2 + 2* + 3*^13 + ^150, ""CountNormalization"" -> 0.2360607302|>"	"<|""Polynomial"" -> 5 +  + 4*^5 + ^150, ""CountNormalization"" -> 0.2679396093|>"	"<|""Polynomial"" -> 1 + ^3 + ^151, ""CountNormalization"" -> 0.9999204585|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^151, ""CountNormalization"" -> 0.4996690135|>"	"<|""Polynomial"" -> 2 + ^2 + ^151, ""CountNormalization"" -> 0.4999993514|>"	"<|""Polynomial"" -> 2 + 2*^2 + ^151, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^6 + ^152, ""CountNormalization"" -> 0.4982573771|>"	"<|""Polynomial"" -> 2 + ^39 + ^152, ""CountNormalization"" -> 0.3893331076|>"	"<|""Polynomial"" -> 3 +  + ^19 + ^152, ""CountNormalization"" -> 0.3039702994|>"	"<|""Polynomial"" -> 3 + ^49 + ^152, ""CountNormalization"" -> 0.2658079599|>"	"<|""Polynomial"" -> 1 +  + ^153, ""CountNormalization"" -> 0.8358106199|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^153, ""CountNormalization"" -> 0.4606332229|>"	"<|""Polynomial"" -> 2 + ^14 + ^153, ""CountNormalization"" -> 0.4566256761|>"	"<|""Polynomial"" -> 2 +  + 5*^9 + ^153, ""CountNormalization"" -> 0.302405746|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^9 + ^154, ""CountNormalization"" -> 0.6091125925|>"	"<|""Polynomial"" -> 2 +  + ^119 + ^154, ""CountNormalization"" -> 0.4689984995|>"	"<|""Polynomial"" -> 2 + 2* + 2*^20 + ^154, ""CountNormalization"" -> 0.3025031569|>"	"<|""Polynomial"" -> 3 + 2*^25 + ^154, ""CountNormalization"" -> 0.303791563|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^7 + ^155, ""CountNormalization"" -> 0.9645330032|>"	"<|""Polynomial"" -> 1 + 2*^12 + ^155, ""CountNormalization"" -> 0.4524160111|>"	"<|""Polynomial"" -> 2 + 3*^54 + ^155, ""CountNormalization"" -> 0.4464205824|>"	"<|""Polynomial"" -> 2 + 6*^11 + ^155, ""CountNormalization"" -> 0.3320963594|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^9 + ^156, ""CountNormalization"" -> 0.4039504558|>"	"<|""Polynomial"" -> 2 + ^11 + ^55 + ^156, ""CountNormalization"" -> 0.2992741177|>"	"<|""Polynomial"" -> 3 +  + 4*^6 + ^156, ""CountNormalization"" -> 0.2451278416|>"	"<|""Polynomial"" -> 3 +  + ^26 + ^156, ""CountNormalization"" -> 0.218031502|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^157, ""CountNormalization"" -> 0.9999999988|>"	"<|""Polynomial"" -> 1 + 2*^22 + ^157, ""CountNormalization"" -> 0.4999469271|>"	"<|""Polynomial"" -> 2 + 3*^76 + ^157, ""CountNormalization"" -> 0.4999842914|>"	"<|""Polynomial"" -> 2 + 2*^41 + ^157, ""CountNormalization"" -> 0.3331985717|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^8 + ^158, ""CountNormalization"" -> 0.6664185552|>"	"<|""Polynomial"" -> 2 + ^61 + ^158, ""CountNormalization"" -> 0.4999924643|>"	"<|""Polynomial"" -> 2 + ^9 + ^158, ""CountNormalization"" -> 0.333333315|>"	"<|""Polynomial"" -> 3 + 2*^37 + ^158, ""CountNormalization"" -> 0.332281693|>"	"<|""Polynomial"" -> 1 + ^31 + ^159, ""CountNormalization"" -> 0.8568673472|>"	"<|""Polynomial"" -> 1 + 2*^32 + ^159, ""CountNormalization"" -> 0.4572061001|>"	"<|""Polynomial"" -> 2 + 4*^5 + ^159, ""CountNormalization"" -> 0.4838709676|>"	"<|""Polynomial"" -> 4 + 3*^34 + ^159, ""CountNormalization"" -> 0.3157402793|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^160, ""CountNormalization"" -> 0.4291458592|>"	"<|""Polynomial"" -> 2 + ^27 + ^160, ""CountNormalization"" -> 0.326423716|>"	"<|""Polynomial"" -> 2 +  + 2*^4 + ^160, ""CountNormalization"" -> 0.2507328299|>"	"<|""Polynomial"" -> 3 + ^27 + ^160, ""CountNormalization"" -> 0.2194530784|>"	"<|""Polynomial"" -> 1 + ^18 + ^161, ""CountNormalization"" -> 0.97025787|>"	"<|""Polynomial"" -> 1 +  + 2*^16 + ^161, ""CountNormalization"" -> 0.4889139782|>"	"<|""Polynomial"" -> 2 + 4*^11 + ^161, ""CountNormalization"" -> 0.4999186674|>"	"<|""Polynomial"" -> 2 + 5*^13 + ^161, ""CountNormalization"" -> 0.3148227394|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^8 + ^162, ""CountNormalization"" -> 0.5304377566|>"	"<|""Polynomial"" -> 2 + ^19 + ^162, ""CountNormalization"" -> 0.3573379457|>"	"<|""Polynomial"" -> 2 +  + 4*^4 + ^162, ""CountNormalization"" -> 0.2557942054|>"	"<|""Polynomial"" -> 5 +  + 6*^35 + ^162, ""CountNormalization"" -> 0.2938786336|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^7 + ^163, ""CountNormalization"" -> 0.9999919168|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^163, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^163, ""CountNormalization"" -> 0.4999998781|>"	"<|""Polynomial"" -> 2 + 2* + 3*^2 + ^163, ""CountNormalization"" -> 0.3327885773|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^12 + ^164, ""CountNormalization"" -> 0.52681344|>"	"<|""Polynomial"" -> 2 + ^15 + ^164, ""CountNormalization"" -> 0.3951686484|>"	"<|""Polynomial"" -> 2 +  + 4*^23 + ^164, ""CountNormalization"" -> 0.3039751971|>"	"<|""Polynomial"" -> 3 + ^13 + ^164, ""CountNormalization"" -> 0.2634537109|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^9 + ^165, ""CountNormalization"" -> 0.7781841145|>"	"<|""Polynomial"" -> 1 + 2*^52 + ^165, ""CountNormalization"" -> 0.40083405|>"	"<|""Polynomial"" -> 2 + ^2 + ^165, ""CountNormalization"" -> 0.4273916022|>"	"<|""Polynomial"" -> 2 +  + 4*^6 + ^165, ""CountNormalization"" -> 0.3050941491|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^10 + ^166, ""CountNormalization"" -> 0.6605250452|>"	"<|""Polynomial"" -> 2 +  + ^17 + ^166, ""CountNormalization"" -> 0.4954713929|>"	"<|""Polynomial"" -> 2 + 2* + ^44 + ^166, ""CountNormalization"" -> 0.3313373092|>"	"<|""Polynomial"" -> 3 + ^45 + ^166, ""CountNormalization"" -> 0.3313323558|>"	"<|""Polynomial"" -> 1 + ^6 + ^167, ""CountNormalization"" -> 0.9999995743|>"	"<|""Polynomial"" -> 1 + 2*^71 + ^167, ""CountNormalization"" -> 0.4999854927|>"	"<|""Polynomial"" -> 2 + 4*^59 + ^167, ""CountNormalization"" -> 0.4999634276|>"	"<|""Polynomial"" -> 2 + 6*^39 + ^167, ""CountNormalization"" -> 0.3333333332|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^16 + ^168, ""CountNormalization"" -> 0.3652315179|>"	"<|""Polynomial"" -> 2 + ^7 + ^47 + ^168, ""CountNormalization"" -> 0.2845615311|>"	"<|""Polynomial"" -> 2 +  + 4*^61 + ^168, ""CountNormalization"" -> 0.2363108645|>"	"<|""Polynomial"" -> 5 +  + 3*^8 + ^168, ""CountNormalization"" -> 0.2109235889|>"	"<|""Polynomial"" -> 1 + ^34 + ^169, ""CountNormalization"" -> 0.9996314573|>"	"<|""Polynomial"" -> 1 + 2*^24 + ^169, ""CountNormalization"" -> 0.4997529463|>"	"<|""Polynomial"" -> 2 + 4*^67 + ^169, ""CountNormalization"" -> 0.4999639207|>"	"<|""Polynomial"" -> 2 + 2*^8 + ^169, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^23 + ^170, ""CountNormalization"" -> 0.5864923652|>"	"<|""Polynomial"" -> 2 + ^43 + ^170, ""CountNormalization"" -> 0.4403405714|>"	"<|""Polynomial"" -> 2 +  + 3*^9 + ^170, ""CountNormalization"" -> 0.297168344|>"	"<|""Polynomial"" -> 3 + 2* + 5*^5 + ^170, ""CountNormalization"" -> 0.3010567513|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^171, ""CountNormalization"" -> 0.8453727445|>"	"<|""Polynomial"" -> 1 + 2*^20 + ^171, ""CountNormalization"" -> 0.458621681|>"	"<|""Polynomial"" -> 2 + 3* + ^171, ""CountNormalization"" -> 0.4553812452|>"	"<|""Polynomial"" -> 4 + 3* + 3*^4 + ^171, ""CountNormalization"" -> 0.3062173298|>"	"<|""Polynomial"" -> 1 + ^7 + ^172, ""CountNormalization"" -> 0.5289592575|>"	"<|""Polynomial"" -> 2 + ^75 + ^172, ""CountNormalization"" -> 0.3967643083|>"	"<|""Polynomial"" -> 3 +  + 2*^3 + ^172, ""CountNormalization"" -> 0.3056842259|>"	"<|""Polynomial"" -> 3 + ^35 + ^172, ""CountNormalization"" -> 0.2645600477|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^8 + ^173, ""CountNormalization"" -> 0.9999979673|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^173, ""CountNormalization"" -> 0.4985584237|>"	"<|""Polynomial"" -> 2 + 3*^47 + ^173, ""CountNormalization"" -> 0.4993744402|>"	"<|""Polynomial"" -> 2 + 3*^8 + ^173, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^13 + ^174, ""CountNormalization"" -> 0.5584239099|>"	"<|""Polynomial"" -> 2 + ^73 + ^174, ""CountNormalization"" -> 0.3869565797|>"	"<|""Polynomial"" -> 2 + 2* + 4*^13 + ^174, ""CountNormalization"" -> 0.2709372196|>"	"<|""Polynomial"" -> 5 +  + ^39 + ^174, ""CountNormalization"" -> 0.3032176395|>"	"<|""Polynomial"" -> 1 + ^6 + ^175, ""CountNormalization"" -> 0.9444677347|>"	"<|""Polynomial"" -> 1 + 2* + ^14 + ^175, ""CountNormalization"" -> 0.4476781288|>"	"<|""Polynomial"" -> 2 + ^58 + ^175, ""CountNormalization"" -> 0.4378637595|>"	"<|""Polynomial"" -> 2 + 6*^39 + ^175, ""CountNormalization"" -> 0.3210714404|>"	"<|""Polynomial"" -> 1 + ^9 + ^11 + ^12 + ^176, ""CountNormalization"" -> 0.4694539175|>"	"<|""Polynomial"" -> 2 + ^15 + ^176, ""CountNormalization"" -> 0.3397484431|>"	"<|""Polynomial"" -> 2 +  + 2*^38 + ^176, ""CountNormalization"" -> 0.2688452793|>"	"<|""Polynomial"" -> 3 + 2* + 4*^4 + ^176, ""CountNormalization"" -> 0.2364061944|>"	"<|""Polynomial"" -> 1 + ^8 + ^177, ""CountNormalization"" -> 0.8571334376|>"	"<|""Polynomial"" -> 1 + 2*^52 + ^177, ""CountNormalization"" -> 0.4608874905|>"	"<|""Polynomial"" -> 2 + 3*^76 + ^177, ""CountNormalization"" -> 0.4838685269|>"	"<|""Polynomial"" -> 2 + 3*^65 + ^177, ""CountNormalization"" -> 0.315339848|>"	"<|""Polynomial"" -> 1 + ^87 + ^178, ""CountNormalization"" -> 0.6629422612|>"	"<|""Polynomial"" -> 2 + ^11 + ^178, ""CountNormalization"" -> 0.4972048225|>"	"<|""Polynomial"" -> 2 + ^13 + ^178, ""CountNormalization"" -> 0.331471079|>"	"<|""Polynomial"" -> 3 + ^5 + ^178, ""CountNormalization"" -> 0.331368599|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^4 + ^179, ""CountNormalization"" -> 0.9965185918|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^179, ""CountNormalization"" -> 0.4985934072|>"	"<|""Polynomial"" -> 2 + 3*^12 + ^179, ""CountNormalization"" -> 0.4984613779|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^179, ""CountNormalization"" -> 0.3333253754|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^12 + ^180, ""CountNormalization"" -> 0.3153048225|>"	"<|""Polynomial"" -> 2 + ^25 + ^29 + ^180, ""CountNormalization"" -> 0.2459497865|>"	"<|""Polynomial"" -> 3 +  + ^24 + ^180, ""CountNormalization"" -> 0.1998037691|>"	"<|""Polynomial"" -> 3 +  + 6*^20 + ^180, ""CountNormalization"" -> 0.1883784716|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^181, ""CountNormalization"" -> 0.9999759906|>"	"<|""Polynomial"" -> 1 + 2*^37 + ^181, ""CountNormalization"" -> 0.4999939355|>"	"<|""Polynomial"" -> 2 + 2* + 2*^9 + ^181, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 2*^5 + ^181, ""CountNormalization"" -> 0.3331492729|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^8 + ^182, ""CountNormalization"" -> 0.6450079138|>"	"<|""Polynomial"" -> 2 + ^25 + ^182, ""CountNormalization"" -> 0.4985695178|>"	"<|""Polynomial"" -> 2 +  + 4*^124 + ^182, ""CountNormalization"" -> 0.3210361666|>"	"<|""Polynomial"" -> 3 + 3* + 4*^8 + ^182, ""CountNormalization"" -> 0.3125626468|>"	"<|""Polynomial"" -> 1 + ^56 + ^183, ""CountNormalization"" -> 0.8547919529|>"	"<|""Polynomial"" -> 1 + 2* + ^54 + ^183, ""CountNormalization"" -> 0.4609080368|>"	"<|""Polynomial"" -> 2 + ^22 + ^183, ""CountNormalization"" -> 0.4838009049|>"	"<|""Polynomial"" -> 2 + 3* + 4*^4 + ^183, ""CountNormalization"" -> 0.3148628346|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^9 + ^184, ""CountNormalization"" -> 0.4887097803|>"	"<|""Polynomial"" -> 2 + ^79 + ^184, ""CountNormalization"" -> 0.381644502|>"	"<|""Polynomial"" -> 3 +  + 4*^81 + ^184, ""CountNormalization"" -> 0.3001500746|>"	"<|""Polynomial"" -> 3 + ^63 + ^184, ""CountNormalization"" -> 0.2605235003|>"	"<|""Polynomial"" -> 1 + ^24 + ^185, ""CountNormalization"" -> 0.963402284|>"	"<|""Polynomial"" -> 1 + 2* + ^64 + ^185, ""CountNormalization"" -> 0.4542992962|>"	"<|""Polynomial"" -> 2 + 3*^6 + ^185, ""CountNormalization"" -> 0.4449639168|>"	"<|""Polynomial"" -> 2 + 6*^47 + ^185, ""CountNormalization"" -> 0.3313300238|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^9 + ^186, ""CountNormalization"" -> 0.5714285691|>"	"<|""Polynomial"" -> 2 +  + ^3 + ^186, ""CountNormalization"" -> 0.3935514665|>"	"<|""Polynomial"" -> 2 + 2* + 4*^13 + ^186, ""CountNormalization"" -> 0.2761348455|>"	"<|""Polynomial"" -> 5 +  + 3*^20 + ^186, ""CountNormalization"" -> 0.3066128354|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^7 + ^187, ""CountNormalization"" -> 0.9457657523|>"	"<|""Polynomial"" -> 1 + 2*^8 + ^187, ""CountNormalization"" -> 0.4777921314|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^187, ""CountNormalization"" -> 0.4987773454|>"	"<|""Polynomial"" -> 2 + ^16 + ^187, ""CountNormalization"" -> 0.3329786267|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^188, ""CountNormalization"" -> 0.5309637477|>"	"<|""Polynomial"" -> 2 + ^11 + ^188, ""CountNormalization"" -> 0.3996295041|>"	"<|""Polynomial"" -> 3 +  + 2*^55 + ^188, ""CountNormalization"" -> 0.3074582373|>"	"<|""Polynomial"" -> 3 +  + ^188, ""CountNormalization"" -> 0.2666638854|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^189, ""CountNormalization"" -> 0.8362415915|>"	"<|""Polynomial"" -> 1 +  + 2*^30 + ^189, ""CountNormalization"" -> 0.4551717613|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^189, ""CountNormalization"" -> 0.4506354503|>"	"<|""Polynomial"" -> 2 + 3*^13 + ^189, ""CountNormalization"" -> 0.292726721|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^13 + ^190, ""CountNormalization"" -> 0.5831792965|>"	"<|""Polynomial"" -> 2 + ^5 + ^29 + ^190, ""CountNormalization"" -> 0.4443019738|>"	"<|""Polynomial"" -> 2 + 2* + 3*^46 + ^190, ""CountNormalization"" -> 0.2960051673|>"	"<|""Polynomial"" -> 3 + ^11 + ^190, ""CountNormalization"" -> 0.3000814449|>"	"<|""Polynomial"" -> 1 + ^9 + ^191, ""CountNormalization"" -> 0.9973890338|>"	"<|""Polynomial"" -> 1 + 2*^71 + ^191, ""CountNormalization"" -> 0.4986929171|>"	"<|""Polynomial"" -> 2 + 2* + 3*^10 + ^191, ""CountNormalization"" -> 0.4999955548|>"	"<|""Polynomial"" -> 2 + 5*^31 + ^191, ""CountNormalization"" -> 0.3324630113|>"	"<|""Polynomial"" -> 1 + ^5 + ^11 + ^15 + ^192, ""CountNormalization"" -> 0.3867005548|>"	"<|""Polynomial"" -> 2 +  + 2*^2 + 2*^15 + ^192, ""CountNormalization"" -> 0.2812511859|>"	"<|""Polynomial"" -> 2 +  + 2*^40 + ^192, ""CountNormalization"" -> 0.2348802027|>"	"<|""Polynomial"" -> 3 +  + 5*^15 + ^192, ""CountNormalization"" -> 0.2056644413|>"	"<|""Polynomial"" -> 1 + ^15 + ^193, ""CountNormalization"" -> 0.9999999276|>"	"<|""Polynomial"" -> 1 + 2*^12 + ^193, ""CountNormalization"" -> 0.4999069959|>"	"<|""Polynomial"" -> 2 + ^14 + ^193, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 5*^42 + ^193, ""CountNormalization"" -> 0.3333106097|>"	"<|""Polynomial"" -> 1 + ^87 + ^194, ""CountNormalization"" -> 0.6654721964|>"	"<|""Polynomial"" -> 2 + ^55 + ^194, ""CountNormalization"" -> 0.4999934741|>"	"<|""Polynomial"" -> 2 + 2* + 3*^79 + ^194, ""CountNormalization"" -> 0.3324621015|>"	"<|""Polynomial"" -> 3 + 2* + 4*^13 + ^194, ""CountNormalization"" -> 0.3321340285|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^8 + ^195, ""CountNormalization"" -> 0.8134633519|>"	"<|""Polynomial"" -> 1 + 2*^49 + ^195, ""CountNormalization"" -> 0.4146584875|>"	"<|""Polynomial"" -> 2 + 4*^71 + ^195, ""CountNormalization"" -> 0.4223098794|>"	"<|""Polynomial"" -> 2 +  + 6*^20 + ^195, ""CountNormalization"" -> 0.3031567279|>"	"<|""Polynomial"" -> 1 + ^2 + ^9 + ^11 + ^196, ""CountNormalization"" -> 0.4920801481|>"	"<|""Polynomial"" -> 2 + ^79 + ^196, ""CountNormalization"" -> 0.3822145662|>"	"<|""Polynomial"" -> 3 +  + 3*^26 + ^196, ""CountNormalization"" -> 0.2949007948|>"	"<|""Polynomial"" -> 3 + 3* + 6*^13 + ^196, ""CountNormalization"" -> 0.2531221466|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^9 + ^197, ""CountNormalization"" -> 0.9998664352|>"	"<|""Polynomial"" -> 1 +  + ^19 + ^197, ""CountNormalization"" -> 0.4999492437|>"	"<|""Polynomial"" -> 2 + 3*^24 + ^197, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 6*^3 + ^197, ""CountNormalization"" -> 0.3332393571|>"	"<|""Polynomial"" -> 1 + ^65 + ^198, ""CountNormalization"" -> 0.4941028013|>"	"<|""Polynomial"" -> 2 + ^29 + ^198, ""CountNormalization"" -> 0.3398582239|>"	"<|""Polynomial"" -> 2 + 2* + 2*^12 + ^198, ""CountNormalization"" -> 0.2451839119|>"	"<|""Polynomial"" -> 5 +  + ^36 + ^198, ""CountNormalization"" -> 0.2807579349|>"	"<|""Polynomial"" -> 1 + ^34 + ^199, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^35 + ^199, ""CountNormalization"" -> 0.4999999996|>"	"<|""Polynomial"" -> 2 + 3* + ^199, ""CountNormalization"" -> 0.4999906944|>"	"<|""Polynomial"" -> 2 + 2*^8 + ^199, ""CountNormalization"" -> 0.3332403014|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^200, ""CountNormalization"" -> 0.4227055795|>"	"<|""Polynomial"" -> 2 + ^3 + ^200, ""CountNormalization"" -> 0.3428750472|>"	"<|""Polynomial"" -> 3 +  + 4*^174 + ^200, ""CountNormalization"" -> 0.2619872699|>"	"<|""Polynomial"" -> 3 +  + ^2 + ^200, ""CountNormalization"" -> 0.2310854829|>"	"<|""Polynomial"" -> 1 + ^14 + ^201, ""CountNormalization"" -> 0.8565713936|>"	"<|""Polynomial"" -> 1 + 2*^88 + ^201, ""CountNormalization"" -> 0.4615359504|>"	"<|""Polynomial"" -> 2 + 3*^44 + ^201, ""CountNormalization"" -> 0.4817543314|>"	"<|""Polynomial"" -> 2 + 3*^43 + ^201, ""CountNormalization"" -> 0.3157843991|>"	"<|""Polynomial"" -> 1 + ^55 + ^202, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 2 +  + ^159 + ^202, ""CountNormalization"" -> 0.4999986689|>"	"<|""Polynomial"" -> 2 + 2* + 4*^37 + ^202, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 3 + ^75 + ^202, ""CountNormalization"" -> 0.3323182332|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^8 + ^203, ""CountNormalization"" -> 0.9864926124|>"	"<|""Polynomial"" -> 1 + 2*^3 + ^203, ""CountNormalization"" -> 0.4908850955|>"	"<|""Polynomial"" -> 2 + 4*^17 + ^203, ""CountNormalization"" -> 0.4914854823|>"	"<|""Polynomial"" -> 2 + 2*^4 + ^203, ""CountNormalization"" -> 0.3163120677|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^10 + ^204, ""CountNormalization"" -> 0.4114066579|>"	"<|""Polynomial"" -> 2 + ^5 + ^97 + ^204, ""CountNormalization"" -> 0.3063483226|>"	"<|""Polynomial"" -> 2 +  + 3*^15 + ^204, ""CountNormalization"" -> 0.251414201|>"	"<|""Polynomial"" -> 5 +  + 4*^23 + ^204, ""CountNormalization"" -> 0.2225855288|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^205, ""CountNormalization"" -> 0.9676692027|>"	"<|""Polynomial"" -> 1 + 2*^9 + ^205, ""CountNormalization"" -> 0.4489903663|>"	"<|""Polynomial"" -> 2 + 3*^23 + ^205, ""CountNormalization"" -> 0.448115381|>"	"<|""Polynomial"" -> 2 + 6*^39 + ^205, ""CountNormalization"" -> 0.3291996817|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^10 + ^206, ""CountNormalization"" -> 0.6666666664|>"	"<|""Polynomial"" -> 2 + ^61 + ^206, ""CountNormalization"" -> 0.4991922454|>"	"<|""Polynomial"" -> 2 + ^53 + ^206, ""CountNormalization"" -> 0.3332317399|>"	"<|""Polynomial"" -> 3 + 3* + 4*^14 + ^206, ""CountNormalization"" -> 0.3329914419|>"	"<|""Polynomial"" -> 1 + ^43 + ^207, ""CountNormalization"" -> 0.8273989228|>"	"<|""Polynomial"" -> 1 +  + 2*^26 + ^207, ""CountNormalization"" -> 0.4485897243|>"	"<|""Polynomial"" -> 2 + ^26 + ^207, ""CountNormalization"" -> 0.4544333742|>"	"<|""Polynomial"" -> 4 +  + 2*^12 + ^207, ""CountNormalization"" -> 0.2981762495|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^9 + ^208, ""CountNormalization"" -> 0.4869082537|>"	"<|""Polynomial"" -> 2 + ^51 + ^208, ""CountNormalization"" -> 0.3581768047|>"	"<|""Polynomial"" -> 3 +  + 4*^42 + ^208, ""CountNormalization"" -> 0.283129345|>"	"<|""Polynomial"" -> 3 + 2*^11 + ^208, ""CountNormalization"" -> 0.2436902425|>"	"<|""Polynomial"" -> 1 + ^6 + ^209, ""CountNormalization"" -> 0.9457724999|>"	"<|""Polynomial"" -> 1 + 2*^40 + ^209, ""CountNormalization"" -> 0.4765326868|>"	"<|""Polynomial"" -> 2 +  + 3*^8 + ^209, ""CountNormalization"" -> 0.4961070471|>"	"<|""Polynomial"" -> 2 + 3*^40 + ^209, ""CountNormalization"" -> 0.3322405407|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^12 + ^210, ""CountNormalization"" -> 0.4702219549|>"	"<|""Polynomial"" -> 2 + ^43 + ^210, ""CountNormalization"" -> 0.3246291519|>"	"<|""Polynomial"" -> 2 +  + 4*^53 + ^210, ""CountNormalization"" -> 0.2230674482|>"	"<|""Polynomial"" -> 5 +  + 3*^15 + ^210, ""CountNormalization"" -> 0.2524482508|>"	"<|""Polynomial"" -> 1 + ^8 + ^10 + ^11 + ^211, ""CountNormalization"" -> 0.9999341802|>"	"<|""Polynomial"" -> 1 + 2*^89 + ^211, ""CountNormalization"" -> 0.4997631454|>"	"<|""Polynomial"" -> 2 + ^42 + ^211, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^10 + ^211, ""CountNormalization"" -> 0.3333309825|>"	"<|""Polynomial"" -> 1 + ^105 + ^212, ""CountNormalization"" -> 0.5282581793|>"	"<|""Polynomial"" -> 2 +  + ^149 + ^212, ""CountNormalization"" -> 0.3962408934|>"	"<|""Polynomial"" -> 3 +  + ^60 + ^212, ""CountNormalization"" -> 0.3048166786|>"	"<|""Polynomial"" -> 3 + 3* + 5*^16 + ^212, ""CountNormalization"" -> 0.2641240979|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^213, ""CountNormalization"" -> 0.8571261863|>"	"<|""Polynomial"" -> 1 +  + 2*^12 + ^213, ""CountNormalization"" -> 0.4614481939|>"	"<|""Polynomial"" -> 2 + 4* + 2*^8 + ^213, ""CountNormalization"" -> 0.4830205794|>"	"<|""Polynomial"" -> 2 +  + 5*^10 + ^213, ""CountNormalization"" -> 0.3157891476|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^5 + ^214, ""CountNormalization"" -> 0.66562986|>"	"<|""Polynomial"" -> 2 + ^65 + ^214, ""CountNormalization"" -> 0.4992052694|>"	"<|""Polynomial"" -> 2 + ^105 + ^214, ""CountNormalization"" -> 0.3327630978|>"	"<|""Polynomial"" -> 3 + 2*^97 + ^214, ""CountNormalization"" -> 0.3331109629|>"	"<|""Polynomial"" -> 1 + ^23 + ^215, ""CountNormalization"" -> 0.9648358413|>"	"<|""Polynomial"" -> 1 + 2*^36 + ^215, ""CountNormalization"" -> 0.4534907712|>"	"<|""Polynomial"" -> 2 + 3*^104 + ^215, ""CountNormalization"" -> 0.4467573032|>"	"<|""Polynomial"" -> 2 + 3*^22 + ^215, ""CountNormalization"" -> 0.333203308|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^7 + ^216, ""CountNormalization"" -> 0.3554318484|>"	"<|""Polynomial"" -> 2 +  + ^41 + ^216, ""CountNormalization"" -> 0.2768731804|>"	"<|""Polynomial"" -> 3 +  + ^28 + ^216, ""CountNormalization"" -> 0.2257029396|>"	"<|""Polynomial"" -> 5 +  + 4*^2 + ^216, ""CountNormalization"" -> 0.2129881359|>"	"<|""Polynomial"" -> 1 + ^45 + ^217, ""CountNormalization"" -> 0.9919196483|>"	"<|""Polynomial"" -> 1 + 2*^85 + ^217, ""CountNormalization"" -> 0.4987817248|>"	"<|""Polynomial"" -> 2 + 3*^44 + ^217, ""CountNormalization"" -> 0.4996481775|>"	"<|""Polynomial"" -> 2 + 2*^29 + ^217, ""CountNormalization"" -> 0.3207207478|>"	"<|""Polynomial"" -> 1 + ^11 + ^218, ""CountNormalization"" -> 0.6666666594|>"	"<|""Polynomial"" -> 2 +  + ^13 + ^218, ""CountNormalization"" -> 0.4995417035|>"	"<|""Polynomial"" -> 2 + ^3 + ^218, ""CountNormalization"" -> 0.333010091|>"	"<|""Polynomial"" -> 3 + 2*^107 + ^218, ""CountNormalization"" -> 0.333269635|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^8 + ^219, ""CountNormalization"" -> 0.8549731074|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^219, ""CountNormalization"" -> 0.4614711074|>"	"<|""Polynomial"" -> 2 + 3* + 2*^3 + ^219, ""CountNormalization"" -> 0.4827672264|>"	"<|""Polynomial"" -> 2 + 3*^53 + ^219, ""CountNormalization"" -> 0.31471079|>"	"<|""Polynomial"" -> 1 + ^9 + ^10 + ^12 + ^220, ""CountNormalization"" -> 0.4302434787|>"	"<|""Polynomial"" -> 2 + ^5 + ^73 + ^220, ""CountNormalization"" -> 0.3358170808|>"	"<|""Polynomial"" -> 2 +  + 4*^6 + ^220, ""CountNormalization"" -> 0.2501066468|>"	"<|""Polynomial"" -> 3 +  + 4*^21 + ^220, ""CountNormalization"" -> 0.2281109037|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^8 + ^221, ""CountNormalization"" -> 0.9991168045|>"	"<|""Polynomial"" -> 1 + 2* + ^48 + ^221, ""CountNormalization"" -> 0.4985896251|>"	"<|""Polynomial"" -> 2 + 4*^47 + ^221, ""CountNormalization"" -> 0.498776084|>"	"<|""Polynomial"" -> 2 + 3*^20 + ^221, ""CountNormalization"" -> 0.3332947535|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^8 + ^222, ""CountNormalization"" -> 0.5683410814|>"	"<|""Polynomial"" -> 2 + ^89 + ^222, ""CountNormalization"" -> 0.3938052732|>"	"<|""Polynomial"" -> 2 + ^107 + ^222, ""CountNormalization"" -> 0.2732385071|>"	"<|""Polynomial"" -> 3 +  + 6*^17 + ^222, ""CountNormalization"" -> 0.3048451399|>"	"<|""Polynomial"" -> 1 + ^33 + ^223, ""CountNormalization"" -> 0.9999392077|>"	"<|""Polynomial"" -> 1 +  + ^131 + ^223, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^36 + ^223, ""CountNormalization"" -> 0.4999985951|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^223, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^12 + ^224, ""CountNormalization"" -> 0.4623843147|>"	"<|""Polynomial"" -> 2 + ^23 + ^224, ""CountNormalization"" -> 0.3486293302|>"	"<|""Polynomial"" -> 3 +  + ^20 + ^224, ""CountNormalization"" -> 0.2746686077|>"	"<|""Polynomial"" -> 3 + 2* + 4*^40 + ^224, ""CountNormalization"" -> 0.2372819255|>"	"<|""Polynomial"" -> 1 + ^32 + ^225, ""CountNormalization"" -> 0.8095730196|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^225, ""CountNormalization"" -> 0.4155746366|>"	"<|""Polynomial"" -> 2 + 3*^23 + ^225, ""CountNormalization"" -> 0.3980931822|>"	"<|""Polynomial"" -> 2 + 3*^103 + ^225, ""CountNormalization"" -> 0.2967923522|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^10 + ^226, ""CountNormalization"" -> 0.663481571|>"	"<|""Polynomial"" -> 2 +  + ^23 + ^226, ""CountNormalization"" -> 0.4974812861|>"	"<|""Polynomial"" -> 2 + 2* + 2*^31 + ^226, ""CountNormalization"" -> 0.3316956934|>"	"<|""Polynomial"" -> 3 + 3* + 2*^71 + ^226, ""CountNormalization"" -> 0.3316552615|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^10 + ^227, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^11 + ^227, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 4*^53 + ^227, ""CountNormalization"" -> 0.4999999994|>"	"<|""Polynomial"" -> 2 + 5*^48 + ^227, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^11 + ^12 + ^228, ""CountNormalization"" -> 0.4184587575|>"	"<|""Polynomial"" -> 2 + ^17 + ^157 + ^228, ""CountNormalization"" -> 0.3095148451|>"	"<|""Polynomial"" -> 2 +  + 3*^103 + ^228, ""CountNormalization"" -> 0.2519659866|>"	"<|""Polynomial"" -> 5 +  + 4*^38 + ^228, ""CountNormalization"" -> 0.2244849217|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^10 + ^229, ""CountNormalization"" -> 0.9999992863|>"	"<|""Polynomial"" -> 1 + 2*^72 + ^229, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^6 + ^229, ""CountNormalization"" -> 0.499808708|>"	"<|""Polynomial"" -> 2 + 5*^18 + ^229, ""CountNormalization"" -> 0.3333267767|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^8 + ^230, ""CountNormalization"" -> 0.5731586994|>"	"<|""Polynomial"" -> 2 + ^73 + ^230, ""CountNormalization"" -> 0.4375016488|>"	"<|""Polynomial"" -> 2 + 2* + 3*^119 + ^230, ""CountNormalization"" -> 0.2907529608|>"	"<|""Polynomial"" -> 3 + 2*^47 + ^230, ""CountNormalization"" -> 0.2945709073|>"	"<|""Polynomial"" -> 1 + ^26 + ^231, ""CountNormalization"" -> 0.8001606342|>"	"<|""Polynomial"" -> 1 + 2* + ^74 + ^231, ""CountNormalization"" -> 0.4408326508|>"	"<|""Polynomial"" -> 2 + 4*^23 + ^231, ""CountNormalization"" -> 0.480143617|>"	"<|""Polynomial"" -> 4 + 3*^38 + ^231, ""CountNormalization"" -> 0.3044791733|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^11 + ^232, ""CountNormalization"" -> 0.4906462808|>"	"<|""Polynomial"" -> 2 +  + ^113 + ^232, ""CountNormalization"" -> 0.3810547542|>"	"<|""Polynomial"" -> 2 +  + 4*^5 + ^232, ""CountNormalization"" -> 0.2998761618|>"	"<|""Polynomial"" -> 3 + 2*^5 + ^232, ""CountNormalization"" -> 0.2607860299|>"	"<|""Polynomial"" -> 1 + ^74 + ^233, ""CountNormalization"" -> 0.9992762297|>"	"<|""Polynomial"" -> 1 +  + 2*^68 + ^233, ""CountNormalization"" -> 0.4989293362|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^233, ""CountNormalization"" -> 0.4999996196|>"	"<|""Polynomial"" -> 2 + 2*^112 + ^233, ""CountNormalization"" -> 0.3326195575|>"	"<|""Polynomial"" -> 1 + ^31 + ^234, ""CountNormalization"" -> 0.5262683637|>"	"<|""Polynomial"" -> 2 +  + ^67 + ^234, ""CountNormalization"" -> 0.3551749282|>"	"<|""Polynomial"" -> 2 + 2* + ^54 + ^234, ""CountNormalization"" -> 0.2581222963|>"	"<|""Polynomial"" -> 5 +  + 6*^52 + ^234, ""CountNormalization"" -> 0.2900386967|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^9 + ^235, ""CountNormalization"" -> 0.9671158892|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^235, ""CountNormalization"" -> 0.4540651822|>"	"<|""Polynomial"" -> 2 + 4*^91 + ^235, ""CountNormalization"" -> 0.4475613298|>"	"<|""Polynomial"" -> 2 + 2*^8 + ^235, ""CountNormalization"" -> 0.3332143282|>"	"<|""Polynomial"" -> 1 + ^5 + ^236, ""CountNormalization"" -> 0.5325193987|>"	"<|""Polynomial"" -> 2 + ^47 + ^236, ""CountNormalization"" -> 0.3998744901|>"	"<|""Polynomial"" -> 3 +  + ^20 + ^236, ""CountNormalization"" -> 0.3073202492|>"	"<|""Polynomial"" -> 3 + 3* + 5*^19 + ^236, ""CountNormalization"" -> 0.26666024|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^7 + ^237, ""CountNormalization"" -> 0.8562043631|>"	"<|""Polynomial"" -> 1 + 2*^70 + ^237, ""CountNormalization"" -> 0.4615384482|>"	"<|""Polynomial"" -> 2 + 2* + ^19 + ^237, ""CountNormalization"" -> 0.4838324264|>"	"<|""Polynomial"" -> 2 + 3*^47 + ^237, ""CountNormalization"" -> 0.3156562854|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^238, ""CountNormalization"" -> 0.6432810152|>"	"<|""Polynomial"" -> 2 + ^5 + ^238, ""CountNormalization"" -> 0.489364498|>"	"<|""Polynomial"" -> 2 + 2* + 3*^5 + ^238, ""CountNormalization"" -> 0.318442884|>"	"<|""Polynomial"" -> 3 + 3* + 3*^5 + ^238, ""CountNormalization"" -> 0.3167159148|>"	"<|""Polynomial"" -> 1 + ^36 + ^239, ""CountNormalization"" -> 0.997211156|>"	"<|""Polynomial"" -> 1 + 2*^5 + ^239, ""CountNormalization"" -> 0.4989271648|>"	"<|""Polynomial"" -> 2 + 4*^115 + ^239, ""CountNormalization"" -> 0.4989561587|>"	"<|""Polynomial"" -> 2 + 5*^73 + ^239, ""CountNormalization"" -> 0.3326374387|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^8 + ^240, ""CountNormalization"" -> 0.32527029|>"	"<|""Polynomial"" -> 2 + ^19 + ^35 + ^240, ""CountNormalization"" -> 0.2411717363|>"	"<|""Polynomial"" -> 3 +  + ^4 + ^240, ""CountNormalization"" -> 0.2029483682|>"	"<|""Polynomial"" -> 5 +  + 3*^8 + ^240, ""CountNormalization"" -> 0.1734475076|>"	"<|""Polynomial"" -> 1 + ^70 + ^241, ""CountNormalization"" -> 0.9999999545|>"	"<|""Polynomial"" -> 1 + 2*^88 + ^241, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 4*^37 + ^241, ""CountNormalization"" -> 0.4999922808|>"	"<|""Polynomial"" -> 2 + 5*^44 + ^241, ""CountNormalization"" -> 0.3330912588|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^242, ""CountNormalization"" -> 0.6287216737|>"	"<|""Polynomial"" -> 2 + ^115 + ^242, ""CountNormalization"" -> 0.4693786485|>"	"<|""Polynomial"" -> 2 + 2* + 3*^69 + ^242, ""CountNormalization"" -> 0.3139956687|>"	"<|""Polynomial"" -> 3 + 2*^113 + ^242, ""CountNormalization"" -> 0.3183195659|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^8 + ^243, ""CountNormalization"" -> 0.8433247973|>"	"<|""Polynomial"" -> 1 + 2*^121 + ^243, ""CountNormalization"" -> 0.4554658044|>"	"<|""Polynomial"" -> 2 + 3*^26 + ^243, ""CountNormalization"" -> 0.4514508069|>"	"<|""Polynomial"" -> 4 + 3*^2 + ^243, ""CountNormalization"" -> 0.3031676559|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^9 + ^244, ""CountNormalization"" -> 0.5322939283|>"	"<|""Polynomial"" -> 2 + ^31 + ^244, ""CountNormalization"" -> 0.3989072074|>"	"<|""Polynomial"" -> 3 +  + 3*^30 + ^244, ""CountNormalization"" -> 0.3063599263|>"	"<|""Polynomial"" -> 3 + ^27 + ^244, ""CountNormalization"" -> 0.2658841104|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^245, ""CountNormalization"" -> 0.9459478735|>"	"<|""Polynomial"" -> 1 + 2*^97 + ^245, ""CountNormalization"" -> 0.4466301444|>"	"<|""Polynomial"" -> 2 + 4*^89 + ^245, ""CountNormalization"" -> 0.4441855978|>"	"<|""Polynomial"" -> 2 + 6*^111 + ^245, ""CountNormalization"" -> 0.3215647343|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^11 + ^246, ""CountNormalization"" -> 0.5637342247|>"	"<|""Polynomial"" -> 2 + ^13 + ^246, ""CountNormalization"" -> 0.3908185114|>"	"<|""Polynomial"" -> 2 + 2* + 3*^3 + ^246, ""CountNormalization"" -> 0.2727888209|>"	"<|""Polynomial"" -> 3 +  + 6*^11 + ^246, ""CountNormalization"" -> 0.3047280691|>"	"<|""Polynomial"" -> 1 + ^82 + ^247, ""CountNormalization"" -> 0.9998127604|>"	"<|""Polynomial"" -> 1 + 2*^122 + ^247, ""CountNormalization"" -> 0.4996500358|>"	"<|""Polynomial"" -> 2 + ^6 + ^247, ""CountNormalization"" -> 0.4972859802|>"	"<|""Polynomial"" -> 2 + 2*^27 + ^247, ""CountNormalization"" -> 0.3324897129|>"	"<|""Polynomial"" -> 1 + ^10 + ^14 + ^15 + ^248, ""CountNormalization"" -> 0.5017998567|>"	"<|""Polynomial"" -> 2 + ^119 + ^248, ""CountNormalization"" -> 0.3896120377|>"	"<|""Polynomial"" -> 2 +  + 2*^170 + ^248, ""CountNormalization"" -> 0.3063091814|>"	"<|""Polynomial"" -> 3 + 2*^37 + ^248, ""CountNormalization"" -> 0.264800499|>"	"<|""Polynomial"" -> 1 + ^86 + ^249, ""CountNormalization"" -> 0.8520102647|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^249, ""CountNormalization"" -> 0.4587369019|>"	"<|""Polynomial"" -> 2 + 3* + 3*^4 + ^249, ""CountNormalization"" -> 0.482859627|>"	"<|""Polynomial"" -> 4 +  + 3*^27 + ^249, ""CountNormalization"" -> 0.3138937837|>"	"<|""Polynomial"" -> 1 + ^103 + ^250, ""CountNormalization"" -> 0.5827338586|>"	"<|""Polynomial"" -> 2 + ^3 + ^149 + ^250, ""CountNormalization"" -> 0.4421120816|>"	"<|""Polynomial"" -> 2 +  + 4*^4 + ^250, ""CountNormalization"" -> 0.2930747918|>"	"<|""Polynomial"" -> 3 +  + 6*^9 + ^250, ""CountNormalization"" -> 0.2996181937|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^251, ""CountNormalization"" -> 0.9979935207|>"	"<|""Polynomial"" -> 1 + 2*^9 + ^251, ""CountNormalization"" -> 0.4990059642|>"	"<|""Polynomial"" -> 2 + 4*^15 + ^251, ""CountNormalization"" -> 0.4999999238|>"	"<|""Polynomial"" -> 2 + 3*^14 + ^251, ""CountNormalization"" -> 0.3326585943|>"	"<|""Polynomial"" -> 1 + ^67 + ^252, ""CountNormalization"" -> 0.3511183068|>"	"<|""Polynomial"" -> 2 + ^13 + ^77 + ^252, ""CountNormalization"" -> 0.2674762365|>"	"<|""Polynomial"" -> 3 +  + 4*^10 + ^252, ""CountNormalization"" -> 0.2180027883|>"	"<|""Polynomial"" -> 5 +  + ^33 + ^252, ""CountNormalization"" -> 0.2085449233|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^7 + ^253, ""CountNormalization"" -> 0.9256462598|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^253, ""CountNormalization"" -> 0.4679635569|>"	"<|""Polynomial"" -> 2 + 4* + 4*^32 + ^253, ""CountNormalization"" -> 0.4999442239|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^253, ""CountNormalization"" -> 0.3258437904|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^7 + ^254, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 2 + ^73 + ^254, ""CountNormalization"" -> 0.499883883|>"	"<|""Polynomial"" -> 2 + 2* + 2*^9 + ^254, ""CountNormalization"" -> 0.3325328679|>"	"<|""Polynomial"" -> 3 + ^27 + ^254, ""CountNormalization"" -> 0.3333333228|>"	"<|""Polynomial"" -> 1 + ^52 + ^255, ""CountNormalization"" -> 0.8155308976|>"	"<|""Polynomial"" -> 1 + 2* + ^12 + ^255, ""CountNormalization"" -> 0.4192194533|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^255, ""CountNormalization"" -> 0.4292798361|>"	"<|""Polynomial"" -> 4 + 3*^32 + ^255, ""CountNormalization"" -> 0.3022439261|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^10 + ^256, ""CountNormalization"" -> 0.4992180736|>"	"<|""Polynomial"" -> 2 + ^49 + ^256, ""CountNormalization"" -> 0.3639622579|>"	"<|""Polynomial"" -> 2 +  + 4*^10 + ^256, ""CountNormalization"" -> 0.2865868644|>"	"<|""Polynomial"" -> 3 + 2*^11 + ^256, ""CountNormalization"" -> 0.2487556851|>"	"<|""Polynomial"" -> 1 + ^12 + ^257, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^22 + ^257, ""CountNormalization"" -> 0.4999958429|>"	"<|""Polynomial"" -> 2 + 3*^116 + ^257, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 5*^25 + ^257, ""CountNormalization"" -> 0.333117304|>"	"<|""Polynomial"" -> 1 + ^83 + ^258, ""CountNormalization"" -> 0.5694919873|>"	"<|""Polynomial"" -> 2 + ^83 + ^258, ""CountNormalization"" -> 0.3943216355|>"	"<|""Polynomial"" -> 2 +  + 2*^34 + ^258, ""CountNormalization"" -> 0.2762902353|>"	"<|""Polynomial"" -> 3 +  + 3*^34 + ^258, ""CountNormalization"" -> 0.3080578043|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^10 + ^259, ""CountNormalization"" -> 0.9876769868|>"	"<|""Polynomial"" -> 1 + 2*^65 + ^259, ""CountNormalization"" -> 0.499322165|>"	"<|""Polynomial"" -> 2 + 4*^109 + ^259, ""CountNormalization"" -> 0.4966188668|>"	"<|""Polynomial"" -> 2 + 6*^9 + ^259, ""CountNormalization"" -> 0.3201093051|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^10 + ^260, ""CountNormalization"" -> 0.4415103234|>"	"<|""Polynomial"" -> 2 + ^59 + ^260, ""CountNormalization"" -> 0.3479514175|>"	"<|""Polynomial"" -> 2 +  + 4*^13 + ^260, ""CountNormalization"" -> 0.2613573811|>"	"<|""Polynomial"" -> 3 + 2*^113 + ^260, ""CountNormalization"" -> 0.2323302155|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^7 + ^261, ""CountNormalization"" -> 0.8404058401|>"	"<|""Polynomial"" -> 1 +  + 2*^90 + ^261, ""CountNormalization"" -> 0.4530944451|>"	"<|""Polynomial"" -> 2 + 4*^41 + ^261, ""CountNormalization"" -> 0.4499327716|>"	"<|""Polynomial"" -> 2 + 3*^5 + ^261, ""CountNormalization"" -> 0.3011333411|>"	"<|""Polynomial"" -> 1 + ^4 + ^8 + ^9 + ^262, ""CountNormalization"" -> 0.6634985631|>"	"<|""Polynomial"" -> 2 +  + ^171 + ^262, ""CountNormalization"" -> 0.497465951|>"	"<|""Polynomial"" -> 2 + 2* + ^78 + ^262, ""CountNormalization"" -> 0.3319391884|>"	"<|""Polynomial"" -> 3 + ^23 + ^262, ""CountNormalization"" -> 0.3320620654|>"	"<|""Polynomial"" -> 1 + ^93 + ^263, ""CountNormalization"" -> 0.9999577542|>"	"<|""Polynomial"" -> 1 + 2*^69 + ^263, ""CountNormalization"" -> 0.4999843439|>"	"<|""Polynomial"" -> 2 + 4*^67 + ^263, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 5*^55 + ^263, ""CountNormalization"" -> 0.3333333303|>"	"<|""Polynomial"" -> 1 +  + ^9 + ^10 + ^264, ""CountNormalization"" -> 0.3657300755|>"	"<|""Polynomial"" -> 2 + ^19 + ^203 + ^264, ""CountNormalization"" -> 0.2831105613|>"	"<|""Polynomial"" -> 2 +  + 4*^18 + ^264, ""CountNormalization"" -> 0.2352350742|>"	"<|""Polynomial"" -> 3 +  + ^88 + ^264, ""CountNormalization"" -> 0.205502434|>"	"<|""Polynomial"" -> 1 + ^42 + ^265, ""CountNormalization"" -> 0.9675758153|>"	"<|""Polynomial"" -> 1 + 2*^61 + ^265, ""CountNormalization"" -> 0.4501371824|>"	"<|""Polynomial"" -> 2 +  + 4*^10 + ^265, ""CountNormalization"" -> 0.4477210275|>"	"<|""Polynomial"" -> 2 + 2*^17 + ^265, ""CountNormalization"" -> 0.3328588441|>"	"<|""Polynomial"" -> 1 + ^47 + ^266, ""CountNormalization"" -> 0.6458877635|>"	"<|""Polynomial"" -> 2 + ^3 + ^131 + ^266, ""CountNormalization"" -> 0.4980909872|>"	"<|""Polynomial"" -> 2 +  + 2*^46 + ^266, ""CountNormalization"" -> 0.3187452421|>"	"<|""Polynomial"" -> 3 + 2*^43 + ^266, ""CountNormalization"" -> 0.3177749118|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^8 + ^267, ""CountNormalization"" -> 0.8571428463|>"	"<|""Polynomial"" -> 1 + 2* + ^98 + ^267, ""CountNormalization"" -> 0.4589600338|>"	"<|""Polynomial"" -> 2 + ^98 + ^267, ""CountNormalization"" -> 0.4807168702|>"	"<|""Polynomial"" -> 4 + 3*^34 + ^267, ""CountNormalization"" -> 0.3157892988|>"	"<|""Polynomial"" -> 1 + ^25 + ^268, ""CountNormalization"" -> 0.5313505586|>"	"<|""Polynomial"" -> 2 + ^15 + ^268, ""CountNormalization"" -> 0.3980159174|>"	"<|""Polynomial"" -> 3 +  + 4*^2 + ^268, ""CountNormalization"" -> 0.3063313043|>"	"<|""Polynomial"" -> 3 + 2* + 4*^27 + ^268, ""CountNormalization"" -> 0.2655787452|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^269, ""CountNormalization"" -> 0.9999999277|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^269, ""CountNormalization"" -> 0.4999491782|>"	"<|""Polynomial"" -> 2 + ^30 + ^269, ""CountNormalization"" -> 0.4998450288|>"	"<|""Polynomial"" -> 2 + 2*^22 + ^269, ""CountNormalization"" -> 0.3331785106|>"	"<|""Polynomial"" -> 1 + ^53 + ^270, ""CountNormalization"" -> 0.4621385488|>"	"<|""Polynomial"" -> 2 +  + ^177 + ^270, ""CountNormalization"" -> 0.3076028644|>"	"<|""Polynomial"" -> 2 +  + 4*^84 + ^270, ""CountNormalization"" -> 0.2232608953|>"	"<|""Polynomial"" -> 5 +  + 4*^40 + ^270, ""CountNormalization"" -> 0.2580232514|>"	"<|""Polynomial"" -> 1 + ^58 + ^271, ""CountNormalization"" -> 0.9999999999|>"	"<|""Polynomial"" -> 1 + 2*^50 + ^271, ""CountNormalization"" -> 0.4998462397|>"	"<|""Polynomial"" -> 2 + 4*^103 + ^271, ""CountNormalization"" -> 0.4999999923|>"	"<|""Polynomial"" -> 2 + 2*^11 + ^271, ""CountNormalization"" -> 0.3333332821|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^9 + ^272, ""CountNormalization"" -> 0.4958004389|>"	"<|""Polynomial"" -> 2 + ^7 + ^199 + ^272, ""CountNormalization"" -> 0.3574740827|>"	"<|""Polynomial"" -> 2 +  + 2*^4 + ^272, ""CountNormalization"" -> 0.285575512|>"	"<|""Polynomial"" -> 3 + ^129 + ^272, ""CountNormalization"" -> 0.2489067331|>"	"<|""Polynomial"" -> 1 + ^23 + ^273, ""CountNormalization"" -> 0.8361098263|>"	"<|""Polynomial"" -> 1 + 2*^46 + ^273, ""CountNormalization"" -> 0.4594933122|>"	"<|""Polynomial"" -> 2 +  + 3*^8 + ^273, ""CountNormalization"" -> 0.4764601601|>"	"<|""Polynomial"" -> 4 + 3*^46 + ^273, ""CountNormalization"" -> 0.30455619|>"	"<|""Polynomial"" -> 1 + ^67 + ^274, ""CountNormalization"" -> 0.6660163045|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^274, ""CountNormalization"" -> 0.4998986395|>"	"<|""Polynomial"" -> 2 + ^57 + ^274, ""CountNormalization"" -> 0.3327752849|>"	"<|""Polynomial"" -> 3 + ^125 + ^274, ""CountNormalization"" -> 0.3331972576|>"	"<|""Polynomial"" -> 1 + ^9 + ^10 + ^11 + ^275, ""CountNormalization"" -> 0.9119082275|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^275, ""CountNormalization"" -> 0.434291027|>"	"<|""Polynomial"" -> 2 + 3*^113 + ^275, ""CountNormalization"" -> 0.4408293943|>"	"<|""Polynomial"" -> 2 + ^92 + ^275, ""CountNormalization"" -> 0.3327859714|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^6 + ^276, ""CountNormalization"" -> 0.4078827695|>"	"<|""Polynomial"" -> 2 + ^23 + ^67 + ^276, ""CountNormalization"" -> 0.3021189545|>"	"<|""Polynomial"" -> 2 +  + 4*^149 + ^276, ""CountNormalization"" -> 0.2466274454|>"	"<|""Polynomial"" -> 5 +  + ^147 + ^276, ""CountNormalization"" -> 0.2189451083|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^12 + ^277, ""CountNormalization"" -> 0.9999991082|>"	"<|""Polynomial"" -> 1 + 2*^24 + ^277, ""CountNormalization"" -> 0.4999999684|>"	"<|""Polynomial"" -> 2 + 4*^33 + ^277, ""CountNormalization"" -> 0.4999999865|>"	"<|""Polynomial"" -> 2 + 2*^14 + ^277, ""CountNormalization"" -> 0.3333308797|>"	"<|""Polynomial"" -> 1 + ^5 + ^278, ""CountNormalization"" -> 0.6666665187|>"	"<|""Polynomial"" -> 2 +  + ^153 + ^278, ""CountNormalization"" -> 0.4997003274|>"	"<|""Polynomial"" -> 2 + ^63 + ^278, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 3 + 2*^97 + ^278, ""CountNormalization"" -> 0.3327175382|>"	"<|""Polynomial"" -> 1 + ^5 + ^279, ""CountNormalization"" -> 0.8453235111|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^279, ""CountNormalization"" -> 0.4598372805|>"	"<|""Polynomial"" -> 2 + 4*^19 + ^279, ""CountNormalization"" -> 0.4576014865|>"	"<|""Polynomial"" -> 4 + 3*^50 + ^279, ""CountNormalization"" -> 0.3059640228|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^280, ""CountNormalization"" -> 0.3924964785|>"	"<|""Polynomial"" -> 2 + ^79 + ^280, ""CountNormalization"" -> 0.3297650609|>"	"<|""Polynomial"" -> 3 +  + 3*^62 + ^280, ""CountNormalization"" -> 0.2541723063|>"	"<|""Polynomial"" -> 3 + 3* + 2*^46 + ^280, ""CountNormalization"" -> 0.2193014359|>"	"<|""Polynomial"" -> 1 + ^93 + ^281, ""CountNormalization"" -> 0.9999876435|>"	"<|""Polynomial"" -> 1 +  + 2*^86 + ^281, ""CountNormalization"" -> 0.4989615981|>"	"<|""Polynomial"" -> 2 + 4*^3 + ^281, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 6*^41 + ^281, ""CountNormalization"" -> 0.3327018006|>"	"<|""Polynomial"" -> 1 + ^35 + ^282, ""CountNormalization"" -> 0.5690406916|>"	"<|""Polynomial"" -> 2 +  + ^151 + ^282, ""CountNormalization"" -> 0.3938413705|>"	"<|""Polynomial"" -> 2 + ^95 + ^282, ""CountNormalization"" -> 0.2751435844|>"	"<|""Polynomial"" -> 5 +  + 3*^8 + ^282, ""CountNormalization"" -> 0.3073136533|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^12 + ^283, ""CountNormalization"" -> 0.9998960823|>"	"<|""Polynomial"" -> 1 + 2*^23 + ^283, ""CountNormalization"" -> 0.499999996|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^283, ""CountNormalization"" -> 0.4997045985|>"	"<|""Polynomial"" -> 2 + 3*^14 + ^283, ""CountNormalization"" -> 0.3333333328|>"	"<|""Polynomial"" -> 1 + ^119 + ^284, ""CountNormalization"" -> 0.5323936595|>"	"<|""Polynomial"" -> 2 + ^5 + ^284, ""CountNormalization"" -> 0.3993387244|>"	"<|""Polynomial"" -> 2 +  + 2*^16 + ^284, ""CountNormalization"" -> 0.3067194599|>"	"<|""Polynomial"" -> 3 + 3* + 3*^5 + ^284, ""CountNormalization"" -> 0.2658766056|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^10 + ^285, ""CountNormalization"" -> 0.8196580629|>"	"<|""Polynomial"" -> 1 + 2*^89 + ^285, ""CountNormalization"" -> 0.4152069485|>"	"<|""Polynomial"" -> 2 +  + 2*^11 + ^285, ""CountNormalization"" -> 0.4278029277|>"	"<|""Polynomial"" -> 4 +  + 4*^21 + ^285, ""CountNormalization"" -> 0.3047381684|>"	"<|""Polynomial"" -> 1 + ^69 + ^286, ""CountNormalization"" -> 0.6289706337|>"	"<|""Polynomial"" -> 2 +  + ^15 + ^286, ""CountNormalization"" -> 0.4702771424|>"	"<|""Polynomial"" -> 2 + ^45 + ^286, ""CountNormalization"" -> 0.3139539651|>"	"<|""Polynomial"" -> 3 + 3* + ^4 + ^286, ""CountNormalization"" -> 0.3125400288|>"	"<|""Polynomial"" -> 1 + ^71 + ^287, ""CountNormalization"" -> 0.9920517561|>"	"<|""Polynomial"" -> 1 + 2*^101 + ^287, ""CountNormalization"" -> 0.4935237633|>"	"<|""Polynomial"" -> 2 + ^78 + ^287, ""CountNormalization"" -> 0.4999743502|>"	"<|""Polynomial"" -> 2 + ^2 + ^287, ""CountNormalization"" -> 0.3178942804|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^11 + ^288, ""CountNormalization"" -> 0.3471086469|>"	"<|""Polynomial"" -> 2 + ^17 + ^145 + ^288, ""CountNormalization"" -> 0.2589434823|>"	"<|""Polynomial"" -> 3 +  + 3*^38 + ^288, ""CountNormalization"" -> 0.2145190071|>"	"<|""Polynomial"" -> 3 +  + 3*^46 + ^288, ""CountNormalization"" -> 0.2000029619|>"	"<|""Polynomial"" -> 1 + ^21 + ^289, ""CountNormalization"" -> 0.9999922922|>"	"<|""Polynomial"" -> 1 + 2*^73 + ^289, ""CountNormalization"" -> 0.4997065961|>"	"<|""Polynomial"" -> 2 + ^54 + ^289, ""CountNormalization"" -> 0.498748736|>"	"<|""Polynomial"" -> 2 + 3*^23 + ^289, ""CountNormalization"" -> 0.3333093567|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^290, ""CountNormalization"" -> 0.5732995465|>"	"<|""Polynomial"" -> 2 + ^43 + ^290, ""CountNormalization"" -> 0.438588152|>"	"<|""Polynomial"" -> 2 + 2* + 3*^173 + ^290, ""CountNormalization"" -> 0.2931263067|>"	"<|""Polynomial"" -> 3 + ^51 + ^290, ""CountNormalization"" -> 0.2962286807|>"	"<|""Polynomial"" -> 1 + ^5 + ^11 + ^12 + ^291, ""CountNormalization"" -> 0.8570648374|>"	"<|""Polynomial"" -> 1 + 2*^25 + ^291, ""CountNormalization"" -> 0.4615297279|>"	"<|""Polynomial"" -> 2 + 3*^49 + ^291, ""CountNormalization"" -> 0.4825699521|>"	"<|""Polynomial"" -> 2 + 3*^79 + ^291, ""CountNormalization"" -> 0.3145857224|>"	"<|""Polynomial"" -> 1 + ^97 + ^292, ""CountNormalization"" -> 0.5299462262|>"	"<|""Polynomial"" -> 2 + ^3 + ^159 + ^292, ""CountNormalization"" -> 0.3976716473|>"	"<|""Polynomial"" -> 3 +  + 2*^107 + ^292, ""CountNormalization"" -> 0.3066420316|>"	"<|""Polynomial"" -> 3 +  + 5*^21 + ^292, ""CountNormalization"" -> 0.2650433417|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^293, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^293, ""CountNormalization"" -> 0.4991482112|>"	"<|""Polynomial"" -> 2 + ^126 + ^293, ""CountNormalization"" -> 0.4997147873|>"	"<|""Polynomial"" -> 2 + 2*^4 + ^293, ""CountNormalization"" -> 0.3327444437|>"	"<|""Polynomial"" -> 1 + ^61 + ^294, ""CountNormalization"" -> 0.5519989562|>"	"<|""Polynomial"" -> 2 +  + ^51 + ^294, ""CountNormalization"" -> 0.3838340999|>"	"<|""Polynomial"" -> 2 + ^115 + ^294, ""CountNormalization"" -> 0.2573968614|>"	"<|""Polynomial"" -> 5 +  + ^15 + ^294, ""CountNormalization"" -> 0.292790458|>"	"<|""Polynomial"" -> 1 + ^48 + ^295, ""CountNormalization"" -> 0.9675241091|>"	"<|""Polynomial"" -> 1 + 2*^83 + ^295, ""CountNormalization"" -> 0.4545448401|>"	"<|""Polynomial"" -> 2 + 3*^64 + ^295, ""CountNormalization"" -> 0.448142874|>"	"<|""Polynomial"" -> 2 + 5*^17 + ^295, ""CountNormalization"" -> 0.3332108974|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^11 + ^296, ""CountNormalization"" -> 0.49524018|>"	"<|""Polynomial"" -> 2 + ^123 + ^296, ""CountNormalization"" -> 0.3875987927|>"	"<|""Polynomial"" -> 2 +  + 4*^10 + ^296, ""CountNormalization"" -> 0.3044850966|>"	"<|""Polynomial"" -> 3 + ^51 + ^296, ""CountNormalization"" -> 0.2633783497|>"	"<|""Polynomial"" -> 1 + ^5 + ^297, ""CountNormalization"" -> 0.7955312016|>"	"<|""Polynomial"" -> 1 +  + 2*^44 + ^297, ""CountNormalization"" -> 0.4356682718|>"	"<|""Polynomial"" -> 2 + 3*^76 + ^297, ""CountNormalization"" -> 0.4495789541|>"	"<|""Polynomial"" -> 4 + 3*^8 + ^297, ""CountNormalization"" -> 0.3017089771|>"	"<|""Polynomial"" -> 1 + ^4 + ^8 + ^11 + ^298, ""CountNormalization"" -> 0.6661068105|>"	"<|""Polynomial"" -> 2 +  + ^75 + ^298, ""CountNormalization"" -> 0.4999328921|>"	"<|""Polynomial"" -> 2 +  + 3*^65 + ^298, ""CountNormalization"" -> 0.3333293464|>"	"<|""Polynomial"" -> 3 + ^75 + ^298, ""CountNormalization"" -> 0.3333004375|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^11 + ^299, ""CountNormalization"" -> 0.9769646087|>"	"<|""Polynomial"" -> 1 + 2*^51 + ^299, ""CountNormalization"" -> 0.4885440799|>"	"<|""Polynomial"" -> 2 + 4*^7 + ^299, ""CountNormalization"" -> 0.4991022129|>"	"<|""Polynomial"" -> 2 + 2*^40 + ^299, ""CountNormalization"" -> 0.3261350035|>"	"<|""Polynomial"" -> 1 + ^7 + ^300, ""CountNormalization"" -> 0.3464740577|>"	"<|""Polynomial"" -> 2 + ^5 + ^133 + ^300, ""CountNormalization"" -> 0.263568626|>"	"<|""Polynomial"" -> 2 +  + 3*^19 + ^300, ""CountNormalization"" -> 0.2121019806|>"	"<|""Polynomial"" -> 3 +  + ^58 + ^300, ""CountNormalization"" -> 0.1908762144|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^301, ""CountNormalization"" -> 0.989719735|>"	"<|""Polynomial"" -> 1 + 2*^30 + ^301, ""CountNormalization"" -> 0.4983834507|>"	"<|""Polynomial"" -> 2 + 3*^31 + ^301, ""CountNormalization"" -> 0.4999668493|>"	"<|""Polynomial"" -> 2 + 4* + 6*^2 + ^301, ""CountNormalization"" -> 0.3217042824|>"	"<|""Polynomial"" -> 1 + ^41 + ^302, ""CountNormalization"" -> 0.666613639|>"	"<|""Polynomial"" -> 2 + ^61 + ^302, ""CountNormalization"" -> 0.4996671778|>"	"<|""Polynomial"" -> 2 + 2* + 3*^29 + ^302, ""CountNormalization"" -> 0.3333328932|>"	"<|""Polynomial"" -> 3 + 2*^37 + ^302, ""CountNormalization"" -> 0.333333333|>"	"<|""Polynomial"" -> 1 + ^6 + ^12 + ^13 + ^303, ""CountNormalization"" -> 0.8557307602|>"	"<|""Polynomial"" -> 1 +  + 2*^62 + ^303, ""CountNormalization"" -> 0.4611579542|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^303, ""CountNormalization"" -> 0.4838709639|>"	"<|""Polynomial"" -> 4 + 3*^82 + ^303, ""CountNormalization"" -> 0.3144832114|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^11 + ^304, ""CountNormalization"" -> 0.4963004928|>"	"<|""Polynomial"" -> 2 + ^5 + ^277 + ^304, ""CountNormalization"" -> 0.364532553|>"	"<|""Polynomial"" -> 3 +  + 4*^70 + ^304, ""CountNormalization"" -> 0.2860455212|>"	"<|""Polynomial"" -> 3 + 2*^125 + ^304, ""CountNormalization"" -> 0.2501395382|>"	"<|""Polynomial"" -> 1 + ^102 + ^305, ""CountNormalization"" -> 0.9665872303|>"	"<|""Polynomial"" -> 1 + 2*^46 + ^305, ""CountNormalization"" -> 0.4545378024|>"	"<|""Polynomial"" -> 2 + 4*^71 + ^305, ""CountNormalization"" -> 0.4476617461|>"	"<|""Polynomial"" -> 2 + 3*^2 + ^305, ""CountNormalization"" -> 0.3322365584|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^7 + ^306, ""CountNormalization"" -> 0.5258799057|>"	"<|""Polynomial"" -> 2 +  + ^37 + ^306, ""CountNormalization"" -> 0.3578914002|>"	"<|""Polynomial"" -> 2 + 2* + 4*^9 + ^306, ""CountNormalization"" -> 0.2573490323|>"	"<|""Polynomial"" -> 3 +  + 3*^10 + ^306, ""CountNormalization"" -> 0.2953646324|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^8 + ^307, ""CountNormalization"" -> 0.9999999198|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^307, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 2* + 2*^9 + ^307, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 5*^62 + ^307, ""CountNormalization"" -> 0.3332858798|>"	"<|""Polynomial"" -> 1 + ^2 + ^9 + ^15 + ^308, ""CountNormalization"" -> 0.4648727101|>"	"<|""Polynomial"" -> 2 + ^75 + ^308, ""CountNormalization"" -> 0.3621724609|>"	"<|""Polynomial"" -> 3 +  + 3*^10 + ^308, ""CountNormalization"" -> 0.276061745|>"	"<|""Polynomial"" -> 3 + 3* + 3*^9 + ^308, ""CountNormalization"" -> 0.2421002842|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^10 + ^309, ""CountNormalization"" -> 0.8571428568|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^309, ""CountNormalization"" -> 0.4611366513|>"	"<|""Polynomial"" -> 2 + 3*^4 + ^309, ""CountNormalization"" -> 0.4829420337|>"	"<|""Polynomial"" -> 4 + 3*^106 + ^309, ""CountNormalization"" -> 0.3152617208|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^8 + ^310, ""CountNormalization"" -> 0.58451308|>"	"<|""Polynomial"" -> 2 + ^3 + ^161 + ^310, ""CountNormalization"" -> 0.4446956196|>"	"<|""Polynomial"" -> 2 +  + 4*^37 + ^310, ""CountNormalization"" -> 0.2968008265|>"	"<|""Polynomial"" -> 3 + 2* + 3*^3 + ^310, ""CountNormalization"" -> 0.2994612897|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^7 + ^311, ""CountNormalization"" -> 0.9999998129|>"	"<|""Polynomial"" -> 1 +  + ^53 + ^311, ""CountNormalization"" -> 0.4998660594|>"	"<|""Polynomial"" -> 2 + 3*^80 + ^311, ""CountNormalization"" -> 0.4999981041|>"	"<|""Polynomial"" -> 2 + 6*^33 + ^311, ""CountNormalization"" -> 0.3332398329|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^11 + ^312, ""CountNormalization"" -> 0.3786106754|>"	"<|""Polynomial"" -> 2 + ^19 + ^155 + ^312, ""CountNormalization"" -> 0.291929697|>"	"<|""Polynomial"" -> 2 +  + 2*^36 + ^312, ""CountNormalization"" -> 0.2443392838|>"	"<|""Polynomial"" -> 5 +  + 3*^68 + ^312, ""CountNormalization"" -> 0.2125195577|>"	"<|""Polynomial"" -> 1 + ^79 + ^313, ""CountNormalization"" -> 0.9999999088|>"	"<|""Polynomial"" -> 1 + 2*^93 + ^313, ""CountNormalization"" -> 0.499999789|>"	"<|""Polynomial"" -> 2 + 3*^59 + ^313, ""CountNormalization"" -> 0.4999999978|>"	"<|""Polynomial"" -> 2 + 2*^101 + ^313, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^15 + ^314, ""CountNormalization"" -> 0.666622153|>"	"<|""Polynomial"" -> 2 + ^3 + ^155 + ^314, ""CountNormalization"" -> 0.4999449468|>"	"<|""Polynomial"" -> 2 + ^105 + ^314, ""CountNormalization"" -> 0.3333226507|>"	"<|""Polynomial"" -> 3 + 3* + 4*^14 + ^314, ""CountNormalization"" -> 0.3331921227|>"	"<|""Polynomial"" -> 1 +  + ^9 + ^10 + ^315, ""CountNormalization"" -> 0.7912496661|>"	"<|""Polynomial"" -> 1 + 2*^127 + ^315, ""CountNormalization"" -> 0.4090817148|>"	"<|""Polynomial"" -> 2 + 3*^74 + ^315, ""CountNormalization"" -> 0.403688664|>"	"<|""Polynomial"" -> 4 +  + 3*^50 + ^315, ""CountNormalization"" -> 0.2866551242|>"	"<|""Polynomial"" -> 1 + ^135 + ^316, ""CountNormalization"" -> 0.5314530308|>"	"<|""Polynomial"" -> 2 + ^87 + ^316, ""CountNormalization"" -> 0.3987321608|>"	"<|""Polynomial"" -> 3 +  + 3*^26 + ^316, ""CountNormalization"" -> 0.3067099847|>"	"<|""Polynomial"" -> 3 + 2* + 2*^6 + ^316, ""CountNormalization"" -> 0.2658253544|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^317, ""CountNormalization"" -> 0.9998948586|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^317, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^24 + ^317, ""CountNormalization"" -> 0.4999856614|>"	"<|""Polynomial"" -> 2 + 3*^32 + ^317, ""CountNormalization"" -> 0.3333317148|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^8 + ^318, ""CountNormalization"" -> 0.5658125142|>"	"<|""Polynomial"" -> 2 +  + ^207 + ^318, ""CountNormalization"" -> 0.3918829358|>"	"<|""Polynomial"" -> 2 + 2* + 3*^5 + ^318, ""CountNormalization"" -> 0.2738627874|>"	"<|""Polynomial"" -> 3 +  + 5*^14 + ^318, ""CountNormalization"" -> 0.3055152617|>"	"<|""Polynomial"" -> 1 + ^36 + ^319, ""CountNormalization"" -> 0.9403456042|>"	"<|""Polynomial"" -> 1 +  + ^27 + ^319, ""CountNormalization"" -> 0.4698688783|>"	"<|""Polynomial"" -> 2 + 3* + 3*^20 + ^319, ""CountNormalization"" -> 0.4915064672|>"	"<|""Polynomial"" -> 2 + 3*^124 + ^319, ""CountNormalization"" -> 0.3273815414|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^320, ""CountNormalization"" -> 0.428476182|>"	"<|""Polynomial"" -> 2 + ^23 + ^320, ""CountNormalization"" -> 0.326423716|>"	"<|""Polynomial"" -> 2 +  + 2*^12 + ^320, ""CountNormalization"" -> 0.2503416677|>"	"<|""Polynomial"" -> 3 + ^19 + ^320, ""CountNormalization"" -> 0.2191106878|>"	"<|""Polynomial"" -> 1 + ^31 + ^321, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + 2*^83 + ^321, ""CountNormalization"" -> 0.4613355939|>"	"<|""Polynomial"" -> 2 + 3*^104 + ^321, ""CountNormalization"" -> 0.4837757419|>"	"<|""Polynomial"" -> 2 + 3*^151 + ^321, ""CountNormalization"" -> 0.3152983548|>"	"<|""Polynomial"" -> 1 + ^67 + ^322, ""CountNormalization"" -> 0.6317955964|>"	"<|""Polynomial"" -> 2 + ^71 + ^322, ""CountNormalization"" -> 0.4872632873|>"	"<|""Polynomial"" -> 2 + 2* + 2*^104 + ^322, ""CountNormalization"" -> 0.3142360732|>"	"<|""Polynomial"" -> 3 + ^33 + ^322, ""CountNormalization"" -> 0.3114523592|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^10 + ^323, ""CountNormalization"" -> 0.9983161011|>"	"<|""Polynomial"" -> 1 + 2*^9 + ^323, ""CountNormalization"" -> 0.4986317992|>"	"<|""Polynomial"" -> 2 + 4*^31 + ^323, ""CountNormalization"" -> 0.4960868592|>"	"<|""Polynomial"" -> 2 + ^74 + ^323, ""CountNormalization"" -> 0.3320001188|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^6 + ^324, ""CountNormalization"" -> 0.3776216608|>"	"<|""Polynomial"" -> 2 + ^13 + ^245 + ^324, ""CountNormalization"" -> 0.281953793|>"	"<|""Polynomial"" -> 3 +  + 2*^47 + ^324, ""CountNormalization"" -> 0.2293538765|>"	"<|""Polynomial"" -> 5 +  + 3*^3 + ^324, ""CountNormalization"" -> 0.2158004317|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^10 + ^325, ""CountNormalization"" -> 0.9653423763|>"	"<|""Polynomial"" -> 1 + 2*^157 + ^325, ""CountNormalization"" -> 0.4510234073|>"	"<|""Polynomial"" -> 2 + 3*^3 + ^325, ""CountNormalization"" -> 0.4374710211|>"	"<|""Polynomial"" -> 2 + 2*^41 + ^325, ""CountNormalization"" -> 0.3305385707|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^10 + ^326, ""CountNormalization"" -> 0.6666612778|>"	"<|""Polynomial"" -> 2 + ^3 + ^199 + ^326, ""CountNormalization"" -> 0.4999999999|>"	"<|""Polynomial"" -> 2 + 2* + ^36 + ^326, ""CountNormalization"" -> 0.3333332521|>"	"<|""Polynomial"" -> 3 + ^129 + ^326, ""CountNormalization"" -> 0.3327885773|>"	"<|""Polynomial"" -> 1 + ^34 + ^327, ""CountNormalization"" -> 0.857142856|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^327, ""CountNormalization"" -> 0.4611113246|>"	"<|""Polynomial"" -> 2 + 4*^119 + ^327, ""CountNormalization"" -> 0.4834266599|>"	"<|""Polynomial"" -> 4 + 3*^22 + ^327, ""CountNormalization"" -> 0.3157894737|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^9 + ^328, ""CountNormalization"" -> 0.4957866255|>"	"<|""Polynomial"" -> 2 + ^19 + ^328, ""CountNormalization"" -> 0.3853625359|>"	"<|""Polynomial"" -> 2 +  + 3*^11 + ^328, ""CountNormalization"" -> 0.3029014215|>"	"<|""Polynomial"" -> 3 + 2*^53 + ^328, ""CountNormalization"" -> 0.2632343489|>"	"<|""Polynomial"" -> 1 + ^50 + ^329, ""CountNormalization"" -> 0.9913997955|>"	"<|""Polynomial"" -> 1 + 2*^52 + ^329, ""CountNormalization"" -> 0.498323623|>"	"<|""Polynomial"" -> 2 + 3*^6 + ^329, ""CountNormalization"" -> 0.4991398561|>"	"<|""Polynomial"" -> 2 + 5*^58 + ^329, ""CountNormalization"" -> 0.3216488745|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^8 + ^330, ""CountNormalization"" -> 0.4623279308|>"	"<|""Polynomial"" -> 2 +  + ^123 + ^330, ""CountNormalization"" -> 0.3191126977|>"	"<|""Polynomial"" -> 2 + 2* + 2*^56 + ^330, ""CountNormalization"" -> 0.2254973346|>"	"<|""Polynomial"" -> 5 +  + ^116 + ^330, ""CountNormalization"" -> 0.2530420412|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^10 + ^331, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^331, ""CountNormalization"" -> 0.4999999997|>"	"<|""Polynomial"" -> 2 + 3*^45 + ^331, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^89 + ^331, ""CountNormalization"" -> 0.3332875646|>"	"<|""Polynomial"" -> 1 + ^123 + ^332, ""CountNormalization"" -> 0.5278899857|>"	"<|""Polynomial"" -> 2 + ^3 + ^15 + ^332, ""CountNormalization"" -> 0.3963769614|>"	"<|""Polynomial"" -> 2 +  + 4*^13 + ^332, ""CountNormalization"" -> 0.3054773314|>"	"<|""Polynomial"" -> 3 + 2* + 3*^2 + ^332, ""CountNormalization"" -> 0.2650658846|>"	"<|""Polynomial"" -> 1 + ^2 + ^333, ""CountNormalization"" -> 0.8411018791|>"	"<|""Polynomial"" -> 1 + 2*^94 + ^333, ""CountNormalization"" -> 0.4609287033|>"	"<|""Polynomial"" -> 2 + 3*^71 + ^333, ""CountNormalization"" -> 0.4546023311|>"	"<|""Polynomial"" -> 2 + 3*^161 + ^333, ""CountNormalization"" -> 0.3054231704|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^7 + ^334, ""CountNormalization"" -> 0.6666663829|>"	"<|""Polynomial"" -> 2 + ^3 + ^41 + ^334, ""CountNormalization"" -> 0.4999854927|>"	"<|""Polynomial"" -> 2 + 2* + 3*^31 + ^334, ""CountNormalization"" -> 0.3333089517|>"	"<|""Polynomial"" -> 3 + ^83 + ^334, ""CountNormalization"" -> 0.3333333292|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^10 + ^335, ""CountNormalization"" -> 0.9677398456|>"	"<|""Polynomial"" -> 1 + 2*^8 + ^335, ""CountNormalization"" -> 0.4545433987|>"	"<|""Polynomial"" -> 2 + 4*^131 + ^335, ""CountNormalization"" -> 0.4461795321|>"	"<|""Polynomial"" -> 2 + 5*^7 + ^335, ""CountNormalization"" -> 0.3332070142|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^7 + ^336, ""CountNormalization"" -> 0.3592767713|>"	"<|""Polynomial"" -> 2 + ^19 + ^179 + ^336, ""CountNormalization"" -> 0.2605296772|>"	"<|""Polynomial"" -> 3 +  + 2*^19 + ^336, ""CountNormalization"" -> 0.2197510562|>"	"<|""Polynomial"" -> 5 +  + 6*^17 + ^336, ""CountNormalization"" -> 0.1977770763|>"	"<|""Polynomial"" -> 1 + ^55 + ^337, ""CountNormalization"" -> 0.9999446956|>"	"<|""Polynomial"" -> 1 + 2*^3 + ^337, ""CountNormalization"" -> 0.4999381877|>"	"<|""Polynomial"" -> 2 + ^118 + ^337, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + ^160 + ^337, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^6 + ^338, ""CountNormalization"" -> 0.6661769507|>"	"<|""Polynomial"" -> 2 +  + ^3 + ^338, ""CountNormalization"" -> 0.4996270899|>"	"<|""Polynomial"" -> 2 + ^155 + ^338, ""CountNormalization"" -> 0.3332362767|>"	"<|""Polynomial"" -> 3 + 2*^137 + ^338, ""CountNormalization"" -> 0.3270369612|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^16 + ^339, ""CountNormalization"" -> 0.8568397503|>"	"<|""Polynomial"" -> 1 + 2*^49 + ^339, ""CountNormalization"" -> 0.4592147661|>"	"<|""Polynomial"" -> 2 + 3*^61 + ^339, ""CountNormalization"" -> 0.4835597607|>"	"<|""Polynomial"" -> 4 + 3* + 4*^8 + ^339, ""CountNormalization"" -> 0.3143981611|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^11 + ^340, ""CountNormalization"" -> 0.453366836|>"	"<|""Polynomial"" -> 2 +  + ^109 + ^340, ""CountNormalization"" -> 0.3519737598|>"	"<|""Polynomial"" -> 3 +  + 4*^158 + ^340, ""CountNormalization"" -> 0.2672195072|>"	"<|""Polynomial"" -> 3 + 3* + 3*^2 + ^340, ""CountNormalization"" -> 0.23794403|>"	"<|""Polynomial"" -> 1 + ^5 + ^11 + ^14 + ^341, ""CountNormalization"" -> 0.9457743034|>"	"<|""Polynomial"" -> 1 + 2*^25 + ^341, ""CountNormalization"" -> 0.4773152201|>"	"<|""Polynomial"" -> 2 + 4* + ^341, ""CountNormalization"" -> 0.4997266575|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^341, ""CountNormalization"" -> 0.3319484876|>"	"<|""Polynomial"" -> 1 + ^125 + ^342, ""CountNormalization"" -> 0.5329815144|>"	"<|""Polynomial"" -> 2 + ^77 + ^342, ""CountNormalization"" -> 0.362080025|>"	"<|""Polynomial"" -> 2 +  + 2*^74 + ^342, ""CountNormalization"" -> 0.2586766006|>"	"<|""Polynomial"" -> 3 +  + 5*^11 + ^342, ""CountNormalization"" -> 0.2982486008|>"	"<|""Polynomial"" -> 1 + ^75 + ^343, ""CountNormalization"" -> 0.9921258202|>"	"<|""Polynomial"" -> 1 +  + 2*^26 + ^343, ""CountNormalization"" -> 0.4983068622|>"	"<|""Polynomial"" -> 2 + 3*^109 + ^343, ""CountNormalization"" -> 0.4999743997|>"	"<|""Polynomial"" -> 2 + ^4 + ^343, ""CountNormalization"" -> 0.3213993011|>"	"<|""Polynomial"" -> 1 + ^6 + ^10 + ^11 + ^344, ""CountNormalization"" -> 0.4978440069|>"	"<|""Polynomial"" -> 2 + ^3 + ^339 + ^344, ""CountNormalization"" -> 0.3870871284|>"	"<|""Polynomial"" -> 2 +  + 2*^16 + ^344, ""CountNormalization"" -> 0.3046908871|>"	"<|""Polynomial"" -> 3 + 2*^41 + ^344, ""CountNormalization"" -> 0.2643397645|>"	"<|""Polynomial"" -> 1 + ^22 + ^345, ""CountNormalization"" -> 0.8064091875|>"	"<|""Polynomial"" -> 1 + 2*^101 + ^345, ""CountNormalization"" -> 0.4087292795|>"	"<|""Polynomial"" -> 2 + 3* + ^18 + ^345, ""CountNormalization"" -> 0.4262342959|>"	"<|""Polynomial"" -> 2 + 3*^163 + ^345, ""CountNormalization"" -> 0.2958415394|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^11 + ^346, ""CountNormalization"" -> 0.6645840222|>"	"<|""Polynomial"" -> 2 +  + ^21 + ^346, ""CountNormalization"" -> 0.4985578873|>"	"<|""Polynomial"" -> 2 + 2* + ^56 + ^346, ""CountNormalization"" -> 0.3319568805|>"	"<|""Polynomial"" -> 3 +  + 6*^8 + ^346, ""CountNormalization"" -> 0.3322355372|>"	"<|""Polynomial"" -> 1 + ^3 + ^10 + ^11 + ^347, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^18 + ^347, ""CountNormalization"" -> 0.4999982846|>"	"<|""Polynomial"" -> 2 + 4*^9 + ^347, ""CountNormalization"" -> 0.4999999857|>"	"<|""Polynomial"" -> 2 + 2* + ^347, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^8 + ^348, ""CountNormalization"" -> 0.4111790854|>"	"<|""Polynomial"" -> 2 + ^7 + ^191 + ^348, ""CountNormalization"" -> 0.3053000309|>"	"<|""Polynomial"" -> 2 +  + 4*^10 + ^348, ""CountNormalization"" -> 0.2496791093|>"	"<|""Polynomial"" -> 5 +  + 4*^95 + ^348, ""CountNormalization"" -> 0.2210864627|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^349, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^54 + ^349, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 4*^13 + ^349, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 6*^37 + ^349, ""CountNormalization"" -> 0.3333265821|>"	"<|""Polynomial"" -> 1 + ^53 + ^350, ""CountNormalization"" -> 0.5542075006|>"	"<|""Polynomial"" -> 2 + ^157 + ^350, ""CountNormalization"" -> 0.4366232944|>"	"<|""Polynomial"" -> 2 +  + 3*^33 + ^350, ""CountNormalization"" -> 0.2800280069|>"	"<|""Polynomial"" -> 3 + 2*^17 + ^350, ""CountNormalization"" -> 0.2826740099|>"	"<|""Polynomial"" -> 1 + ^34 + ^351, ""CountNormalization"" -> 0.8335584333|>"	"<|""Polynomial"" -> 1 + 2*^122 + ^351, ""CountNormalization"" -> 0.4540005047|>"	"<|""Polynomial"" -> 2 + 2* + 3*^30 + ^351, ""CountNormalization"" -> 0.4461337056|>"	"<|""Polynomial"" -> 4 + 3*^34 + ^351, ""CountNormalization"" -> 0.3034676669|>"	"<|""Polynomial"" -> 1 + ^6 + ^11 + ^13 + ^352, ""CountNormalization"" -> 0.4694466658|>"	"<|""Polynomial"" -> 2 + ^15 + ^143 + ^352, ""CountNormalization"" -> 0.3387681448|>"	"<|""Polynomial"" -> 3 +  + 4*^174 + ^352, ""CountNormalization"" -> 0.2679800357|>"	"<|""Polynomial"" -> 3 + 2*^89 + ^352, ""CountNormalization"" -> 0.2357364885|>"	"<|""Polynomial"" -> 1 + ^69 + ^353, ""CountNormalization"" -> 0.9999989269|>"	"<|""Polynomial"" -> 1 + 2*^142 + ^353, ""CountNormalization"" -> 0.4999990177|>"	"<|""Polynomial"" -> 2 + ^42 + ^353, ""CountNormalization"" -> 0.4999978731|>"	"<|""Polynomial"" -> 2 + ^68 + ^353, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^5 + ^13 + ^14 + ^354, ""CountNormalization"" -> 0.5711616151|>"	"<|""Polynomial"" -> 2 +  + ^99 + ^354, ""CountNormalization"" -> 0.3949173238|>"	"<|""Polynomial"" -> 2 + ^77 + ^354, ""CountNormalization"" -> 0.2755122344|>"	"<|""Polynomial"" -> 5 +  + ^14 + ^354, ""CountNormalization"" -> 0.3080000969|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^6 + ^355, ""CountNormalization"" -> 0.9677376754|>"	"<|""Polynomial"" -> 1 + 2*^41 + ^355, ""CountNormalization"" -> 0.4545454539|>"	"<|""Polynomial"" -> 2 + 4*^79 + ^355, ""CountNormalization"" -> 0.4473294961|>"	"<|""Polynomial"" -> 2 + 3*^56 + ^355, ""CountNormalization"" -> 0.333044933|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^10 + ^356, ""CountNormalization"" -> 0.5298576875|>"	"<|""Polynomial"" -> 2 + ^15 + ^356, ""CountNormalization"" -> 0.397763858|>"	"<|""Polynomial"" -> 3 +  + 4*^61 + ^356, ""CountNormalization"" -> 0.3059733037|>"	"<|""Polynomial"" -> 3 + 2*^161 + ^356, ""CountNormalization"" -> 0.2649708292|>"	"<|""Polynomial"" -> 1 + ^2 + ^10 + ^11 + ^357, ""CountNormalization"" -> 0.8354452294|>"	"<|""Polynomial"" -> 1 + 2*^71 + ^357, ""CountNormalization"" -> 0.4588911633|>"	"<|""Polynomial"" -> 2 + 3*^176 + ^357, ""CountNormalization"" -> 0.4789364695|>"	"<|""Polynomial"" -> 4 + 3* + 4*^25 + ^357, ""CountNormalization"" -> 0.3016094104|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^14 + ^358, ""CountNormalization"" -> 0.6643457279|>"	"<|""Polynomial"" -> 2 + ^77 + ^358, ""CountNormalization"" -> 0.4985932744|>"	"<|""Polynomial"" -> 2 + 2* + 4*^53 + ^358, ""CountNormalization"" -> 0.3323075852|>"	"<|""Polynomial"" -> 3 + ^3 + ^358, ""CountNormalization"" -> 0.3323968925|>"	"<|""Polynomial"" -> 1 + ^68 + ^359, ""CountNormalization"" -> 0.9986080113|>"	"<|""Polynomial"" -> 1 + 2*^15 + ^359, ""CountNormalization"" -> 0.4993045897|>"	"<|""Polynomial"" -> 2 + 3*^21 + ^359, ""CountNormalization"" -> 0.4993045897|>"	"<|""Polynomial"" -> 1 +  + ^25 + ^26 + ^360, ""CountNormalization"" -> 0.2948312213|>"	"<|""Polynomial"" -> 2 + ^13 + ^149 + ^360, ""CountNormalization"" -> 0.2389176773|>"	"<|""Polynomial"" -> 2 +  + 3*^219 + ^360, ""CountNormalization"" -> 0.1955980884|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^7 + ^361, ""CountNormalization"" -> 0.9999980926|>"	"<|""Polynomial"" -> 1 + 2*^157 + ^361, ""CountNormalization"" -> 0.4996807331|>"	"<|""Polynomial"" -> 2 + 3*^175 + ^361, ""CountNormalization"" -> 0.4973027594|>"	"<|""Polynomial"" -> 1 + ^63 + ^362, ""CountNormalization"" -> 0.6662825274|>"	"<|""Polynomial"" -> 2 + ^175 + ^362, ""CountNormalization"" -> 0.49998414|>"	"<|""Polynomial"" -> 2 + 2* + 2*^67 + ^362, ""CountNormalization"" -> 0.333011906|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^8 + ^363, ""CountNormalization"" -> 0.8094542387|>"	"<|""Polynomial"" -> 1 + 2*^115 + ^363, ""CountNormalization"" -> 0.4410062787|>"	"<|""Polynomial"" -> 2 + 4*^41 + ^363, ""CountNormalization"" -> 0.4812660605|>"	"<|""Polynomial"" -> 1 + ^67 + ^364, ""CountNormalization"" -> 0.4805609094|>"	"<|""Polynomial"" -> 2 +  + ^364, ""CountNormalization"" -> 0.3778129885|>"	"<|""Polynomial"" -> 3 +  + ^4 + ^364, ""CountNormalization"" -> 0.2907497344|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^9 + ^365, ""CountNormalization"" -> 0.9654268832|>"	"<|""Polynomial"" -> 1 + 2*^88 + ^365, ""CountNormalization"" -> 0.4544820269|>"	"<|""Polynomial"" -> 2 + 4* + ^365, ""CountNormalization"" -> 0.4480750348|>"	"<|""Polynomial"" -> 1 + ^29 + ^366, ""CountNormalization"" -> 0.5698613019|>"	"<|""Polynomial"" -> 2 +  + ^123 + ^366, ""CountNormalization"" -> 0.3939854792|>"	"<|""Polynomial"" -> 2 + 2* + 3*^154 + ^366, ""CountNormalization"" -> 0.2756577857|>"	"<|""Polynomial"" -> 1 + ^21 + ^367, ""CountNormalization"" -> 0.9999198461|>"	"<|""Polynomial"" -> 1 + 2*^107 + ^367, ""CountNormalization"" -> 0.4999999564|>"	"<|""Polynomial"" -> 2 + 4*^139 + ^367, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^17 + ^368, ""CountNormalization"" -> 0.4868081858|>"	"<|""Polynomial"" -> 2 + ^27 + ^368, ""CountNormalization"" -> 0.3573301919|>"	"<|""Polynomial"" -> 2 +  + 4*^19 + ^368, ""CountNormalization"" -> 0.2824695807|>"	"<|""Polynomial"" -> 1 + ^91 + ^369, ""CountNormalization"" -> 0.8453377062|>"	"<|""Polynomial"" -> 1 + 2*^11 + ^369, ""CountNormalization"" -> 0.4553663291|>"	"<|""Polynomial"" -> 2 + 3*^119 + ^369, ""CountNormalization"" -> 0.457230827|>"	"<|""Polynomial"" -> 1 + ^139 + ^370, ""CountNormalization"" -> 0.583157527|>"	"<|""Polynomial"" -> 2 + ^11 + ^370, ""CountNormalization"" -> 0.446823359|>"	"<|""Polynomial"" -> 2 + 2* + 4*^89 + ^370, ""CountNormalization"" -> 0.2958274596|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^8 + ^371, ""CountNormalization"" -> 0.9902869555|>"	"<|""Polynomial"" -> 1 + 2*^27 + ^371, ""CountNormalization"" -> 0.4941874252|>"	"<|""Polynomial"" -> 2 + 3*^5 + ^371, ""CountNormalization"" -> 0.4997610991|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^15 + ^372, ""CountNormalization"" -> 0.4207132377|>"	"<|""Polynomial"" -> 2 + ^5 + ^109 + ^372, ""CountNormalization"" -> 0.31052828|>"	"<|""Polynomial"" -> 2 +  + 4*^170 + ^372, ""CountNormalization"" -> 0.2533898701|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^8 + ^373, ""CountNormalization"" -> 0.9999999609|>"	"<|""Polynomial"" -> 1 + 2*^25 + ^373, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^16 + ^373, ""CountNormalization"" -> 0.4997766859|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^8 + ^374, ""CountNormalization"" -> 0.6295729429|>"	"<|""Polynomial"" -> 2 +  + ^261 + ^374, ""CountNormalization"" -> 0.463416006|>"	"<|""Polynomial"" -> 2 + 2* + 3*^62 + ^374, ""CountNormalization"" -> 0.3128478634|>"	"<|""Polynomial"" -> 1 + ^16 + ^375, ""CountNormalization"" -> 0.821068953|>"	"<|""Polynomial"" -> 1 + 2*^67 + ^375, ""CountNormalization"" -> 0.4170308458|>"	"<|""Polynomial"" -> 2 + 2* + ^13 + ^375, ""CountNormalization"" -> 0.4205185436|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^8 + ^376, ""CountNormalization"" -> 0.4997305856|>"	"<|""Polynomial"" -> 2 + ^9 + ^376, ""CountNormalization"" -> 0.3897959|>"	"<|""Polynomial"" -> 2 +  + 4*^11 + ^376, ""CountNormalization"" -> 0.3064718324|>"	"<|""Polynomial"" -> 1 + ^41 + ^377, ""CountNormalization"" -> 0.994019481|>"	"<|""Polynomial"" -> 1 + 2*^160 + ^377, ""CountNormalization"" -> 0.4915075589|>"	"<|""Polynomial"" -> 2 + ^14 + ^377, ""CountNormalization"" -> 0.4915116427|>"	"<|""Polynomial"" -> 1 + ^43 + ^378, ""CountNormalization"" -> 0.5144036946|>"	"<|""Polynomial"" -> 2 +  + ^79 + ^378, ""CountNormalization"" -> 0.3462171838|>"	"<|""Polynomial"" -> 2 + 2* + 2*^7 + ^378, ""CountNormalization"" -> 0.2380821425|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^10 + ^379, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^44 + ^379, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 3*^30 + ^379, ""CountNormalization"" -> 0.4999432235|>"	"<|""Polynomial"" -> 1 + ^47 + ^380, ""CountNormalization"" -> 0.4515817671|>"	"<|""Polynomial"" -> 2 + ^33 + ^380, ""CountNormalization"" -> 0.3551405454|>"	"<|""Polynomial"" -> 3 +  + ^336 + ^380, ""CountNormalization"" -> 0.2665394404|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^381, ""CountNormalization"" -> 0.8567094038|>"	"<|""Polynomial"" -> 1 + 2*^143 + ^381, ""CountNormalization"" -> 0.4614579942|>"	"<|""Polynomial"" -> 2 + 3*^116 + ^381, ""CountNormalization"" -> 0.4838709677|>"	"<|""Polynomial"" -> 1 + ^81 + ^382, ""CountNormalization"" -> 0.6649260225|>"	"<|""Polynomial"" -> 2 + ^137 + ^382, ""CountNormalization"" -> 0.4986929137|>"	"<|""Polynomial"" -> 2 + 2* + 2*^100 + ^382, ""CountNormalization"" -> 0.3324600556|>"	"<|""Polynomial"" -> 1 + ^90 + ^383, ""CountNormalization"" -> 0.9999993058|>"	"<|""Polynomial"" -> 1 + 2*^80 + ^383, ""CountNormalization"" -> 0.4999787684|>"	"<|""Polynomial"" -> 2 + ^42 + ^383, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^6 + ^15 + ^16 + ^384, ""CountNormalization"" -> 0.3861962846|>"	"<|""Polynomial"" -> 2 + ^71 + ^199 + ^384, ""CountNormalization"" -> 0.2812501638|>"	"<|""Polynomial"" -> 2 +  + 4*^57 + ^384, ""CountNormalization"" -> 0.2345747668|>"	"<|""Polynomial"" -> 1 + ^6 + ^385, ""CountNormalization"" -> 0.89394482|>"	"<|""Polynomial"" -> 1 + 2*^94 + ^385, ""CountNormalization"" -> 0.427829003|>"	"<|""Polynomial"" -> 2 + 3*^96 + ^385, ""CountNormalization"" -> 0.4451784592|>"	"<|""Polynomial"" -> 1 + ^83 + ^386, ""CountNormalization"" -> 0.6665650198|>"	"<|""Polynomial"" -> 2 + ^115 + ^386, ""CountNormalization"" -> 0.4999032205|>"	"<|""Polynomial"" -> 2 + 2* + 2*^119 + ^386, ""CountNormalization"" -> 0.3333282173|>"	"<|""Polynomial"" -> 1 + ^2 + ^8 + ^9 + ^387, ""CountNormalization"" -> 0.843352429|>"	"<|""Polynomial"" -> 1 + 2*^152 + ^387, ""CountNormalization"" -> 0.4597479538|>"	"<|""Polynomial"" -> 2 + ^98 + ^387, ""CountNormalization"" -> 0.4578215076|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^14 + ^388, ""CountNormalization"" -> 0.5306671793|>"	"<|""Polynomial"" -> 2 + ^87 + ^388, ""CountNormalization"" -> 0.3989665151|>"	"<|""Polynomial"" -> 3 +  + ^40 + ^388, ""CountNormalization"" -> 0.3068704735|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^10 + ^389, ""CountNormalization"" -> 0.9999999821|>"	"<|""Polynomial"" -> 1 + 2*^76 + ^389, ""CountNormalization"" -> 0.4999902627|>"	"<|""Polynomial"" -> 2 + 3*^155 + ^389, ""CountNormalization"" -> 0.4999972143|>"	"<|""Polynomial"" -> 1 + ^89 + ^390, ""CountNormalization"" -> 0.4875821658|>"	"<|""Polynomial"" -> 2 +  + ^55 + ^390, ""CountNormalization"" -> 0.3305348841|>"	"<|""Polynomial"" -> 2 + 2* + ^2 + ^390, ""CountNormalization"" -> 0.2367370792|>"	"<|""Polynomial"" -> 1 + ^28 + ^391, ""CountNormalization"" -> 0.9786843803|>"	"<|""Polynomial"" -> 1 + ^2 + ^158 + ^391, ""CountNormalization"" -> 0.4890587822|>"	"<|""Polynomial"" -> 2 + 3*^21 + ^391, ""CountNormalization"" -> 0.4987217053|>"	"<|""Polynomial"" -> 1 + ^6 + ^10 + ^13 + ^392, ""CountNormalization"" -> 0.4630664468|>"	"<|""Polynomial"" -> 2 + ^173 + ^392, ""CountNormalization"" -> 0.3728908183|>"	"<|""Polynomial"" -> 2 +  + 4*^169 + ^392, ""CountNormalization"" -> 0.2939439165|>"	"<|""Polynomial"" -> 1 + ^7 + ^393, ""CountNormalization"" -> 0.8538837038|>"	"<|""Polynomial"" -> 1 + 2*^185 + ^393, ""CountNormalization"" -> 0.4597835624|>"	"<|""Polynomial"" -> 2 + 3*^107 + ^393, ""CountNormalization"" -> 0.4836863191|>"	"<|""Polynomial"" -> 1 + ^135 + ^394, ""CountNormalization"" -> 0.6665776234|>"	"<|""Polynomial"" -> 2 + ^3 + ^103 + ^394, ""CountNormalization"" -> 0.4999492437|>"	"<|""Polynomial"" -> 2 +  + 2*^118 + ^394, ""CountNormalization"" -> 0.333333317|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^11 + ^395, ""CountNormalization"" -> 0.9673052461|>"	"<|""Polynomial"" -> 1 + 2*^23 + ^395, ""CountNormalization"" -> 0.4544632721|>"	"<|""Polynomial"" -> 2 + 4*^29 + ^395, ""CountNormalization"" -> 0.4481410455|>"	"<|""Polynomial"" -> 1 + ^25 + ^396, ""CountNormalization"" -> 0.3506943307|>"	"<|""Polynomial"" -> 2 + ^5 + ^349 + ^396, ""CountNormalization"" -> 0.2681123823|>"	"<|""Polynomial"" -> 2 +  + 4*^50 + ^396, ""CountNormalization"" -> 0.2166734506|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^12 + ^397, ""CountNormalization"" -> 0.9993794259|>"	"<|""Polynomial"" -> 1 +  + ^53 + ^397, ""CountNormalization"" -> 0.4999984131|>"	"<|""Polynomial"" -> 2 + 3*^64 + ^397, ""CountNormalization"" -> 0.4999999995|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^14 + ^398, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 2 + ^169 + ^398, ""CountNormalization"" -> 0.4997906159|>"	"<|""Polynomial"" -> 2 + ^3 + ^398, ""CountNormalization"" -> 0.3331831745|>"	"<|""Polynomial"" -> 1 + ^86 + ^399, ""CountNormalization"" -> 0.847820107|>"	"<|""Polynomial"" -> 1 + 2*^181 + ^399, ""CountNormalization"" -> 0.4588107462|>"	"<|""Polynomial"" -> 2 + 3*^52 + ^399, ""CountNormalization"" -> 0.4799047952|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^400, ""CountNormalization"" -> 0.4207813701|>"	"<|""Polynomial"" -> 2 + ^43 + ^400, ""CountNormalization"" -> 0.3202110552|>"	"<|""Polynomial"" -> 2 +  + 4*^39 + ^400, ""CountNormalization"" -> 0.246391167|>"	"<|""Polynomial"" -> 1 + ^152 + ^401, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 +  + 2*^156 + ^401, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 2 + 4*^47 + ^401, ""CountNormalization"" -> 0.4999999914|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^9 + ^402, ""CountNormalization"" -> 0.570704313|>"	"<|""Polynomial"" -> 2 +  + ^21 + ^402, ""CountNormalization"" -> 0.3955882917|>"	"<|""Polynomial"" -> 2 + ^35 + ^402, ""CountNormalization"" -> 0.2752881894|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^9 + ^403, ""CountNormalization"" -> 0.9998557621|>"	"<|""Polynomial"" -> 1 + 2*^161 + ^403, ""CountNormalization"" -> 0.4992623332|>"	"<|""Polynomial"" -> 2 + 3*^42 + ^403, ""CountNormalization"" -> 0.4997310615|>"	"<|""Polynomial"" -> 1 + ^189 + ^404, ""CountNormalization"" -> 0.5326740832|>"	"<|""Polynomial"" -> 2 + ^3 + ^123 + ^404, ""CountNormalization"" -> 0.3999989348|>"	"<|""Polynomial"" -> 2 +  + 4*^43 + ^404, ""CountNormalization"" -> 0.3072274215|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^17 + ^405, ""CountNormalization"" -> 0.808065216|>"	"<|""Polynomial"" -> 1 +  + ^45 + ^405, ""CountNormalization"" -> 0.4106687726|>"	"<|""Polynomial"" -> 2 + ^118 + ^405, ""CountNormalization"" -> 0.4005091729|>"	"<|""Polynomial"" -> 1 + ^157 + ^406, ""CountNormalization"" -> 0.631479492|>"	"<|""Polynomial"" -> 2 + ^113 + ^406, ""CountNormalization"" -> 0.4889704217|>"	"<|""Polynomial"" -> 2 + ^33 + ^406, ""CountNormalization"" -> 0.3156538248|>"	"<|""Polynomial"" -> 1 + ^71 + ^407, ""CountNormalization"" -> 0.9412440818|>"	"<|""Polynomial"" -> 1 + 2*^48 + ^407, ""CountNormalization"" -> 0.4781366156|>"	"<|""Polynomial"" -> 2 + 4* + 4*^17 + ^407, ""CountNormalization"" -> 0.4966239178|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^7 + ^408, ""CountNormalization"" -> 0.3855512557|>"	"<|""Polynomial"" -> 2 + ^5 + ^157 + ^408, ""CountNormalization"" -> 0.2966490535|>"	"<|""Polynomial"" -> 2 +  + 2*^4 + ^408, ""CountNormalization"" -> 0.2486935689|>"	"<|""Polynomial"" -> 1 + ^87 + ^409, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^99 + ^409, ""CountNormalization"" -> 0.4999999759|>"	"<|""Polynomial"" -> 2 + ^30 + ^409, ""CountNormalization"" -> 0.4998981463|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^10 + ^410, ""CountNormalization"" -> 0.5794003257|>"	"<|""Polynomial"" -> 2 +  + ^61 + ^410, ""CountNormalization"" -> 0.4416163858|>"	"<|""Polynomial"" -> 2 + 2* + 2*^28 + ^410, ""CountNormalization"" -> 0.2942107466|>"	"<|""Polynomial"" -> 1 + ^3 + ^10 + ^12 + ^411, ""CountNormalization"" -> 0.8561013713|>"	"<|""Polynomial"" -> 1 +  + ^29 + ^411, ""CountNormalization"" -> 0.4614446785|>"	"<|""Polynomial"" -> 2 + 4*^35 + ^411, ""CountNormalization"" -> 0.4838466105|>"	"<|""Polynomial"" -> 1 + ^147 + ^412, ""CountNormalization"" -> 0.5333203566|>"	"<|""Polynomial"" -> 2 + ^79 + ^412, ""CountNormalization"" -> 0.3993537963|>"	"<|""Polynomial"" -> 3 +  + 4*^237 + ^412, ""CountNormalization"" -> 0.3075985291|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^10 + ^413, ""CountNormalization"" -> 0.9921204704|>"	"<|""Polynomial"" -> 1 + 2*^22 + ^413, ""CountNormalization"" -> 0.498837838|>"	"<|""Polynomial"" -> 2 + 3* + ^13 + ^413, ""CountNormalization"" -> 0.4999743997|>"	"<|""Polynomial"" -> 1 + ^9 + ^13 + ^16 + ^414, ""CountNormalization"" -> 0.518808075|>"	"<|""Polynomial"" -> 2 + ^37 + ^414, ""CountNormalization"" -> 0.3517629754|>"	"<|""Polynomial"" -> 2 + ^145 + ^414, ""CountNormalization"" -> 0.2540183997|>"	"<|""Polynomial"" -> 1 + ^102 + ^415, ""CountNormalization"" -> 0.9619470736|>"	"<|""Polynomial"" -> 1 +  + ^21 + ^415, ""CountNormalization"" -> 0.4517847613|>"	"<|""Polynomial"" -> 2 + 3* + 2*^27 + ^415, ""CountNormalization"" -> 0.4481391519|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^416, ""CountNormalization"" -> 0.4869002997|>"	"<|""Polynomial"" -> 2 + ^177 + ^416, ""CountNormalization"" -> 0.3581765489|>"	"<|""Polynomial"" -> 3 +  + ^40 + ^416, ""CountNormalization"" -> 0.2830201455|>"	"<|""Polynomial"" -> 1 + ^107 + ^417, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + 2*^40 + ^417, ""CountNormalization"" -> 0.4612618298|>"	"<|""Polynomial"" -> 2 + ^74 + ^417, ""CountNormalization"" -> 0.4837880989|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^15 + ^418, ""CountNormalization"" -> 0.628085645|>"	"<|""Polynomial"" -> 2 +  + ^339 + ^418, ""CountNormalization"" -> 0.4684845288|>"	"<|""Polynomial"" -> 2 +  + 3*^169 + ^418, ""CountNormalization"" -> 0.3111505518|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^15 + ^419, ""CountNormalization"" -> 0.9988081049|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^419, ""CountNormalization"" -> 0.4994040524|>"	"<|""Polynomial"" -> 2 + 3* + ^419, ""CountNormalization"" -> 0.4994040524|>"	"<|""Polynomial"" -> 1 + ^8 + ^10 + ^13 + ^420, ""CountNormalization"" -> 0.3176377471|>"	"<|""Polynomial"" -> 2 + ^5 + ^49 + ^420, ""CountNormalization"" -> 0.24694343|>"	"<|""Polynomial"" -> 3 +  + 4*^157 + ^420, ""CountNormalization"" -> 0.1996496516|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^5 + ^421, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^13 + ^421, ""CountNormalization"" -> 0.4999995855|>"	"<|""Polynomial"" -> 2 + 3* + ^22 + ^421, ""CountNormalization"" -> 0.4999999664|>"	"<|""Polynomial"" -> 1 + ^149 + ^422, ""CountNormalization"" -> 0.6664791433|>"	"<|""Polynomial"" -> 2 + ^3 + ^287 + ^422, ""CountNormalization"" -> 0.4997625828|>"	"<|""Polynomial"" -> 2 + ^145 + ^422, ""CountNormalization"" -> 0.3333333333|>"	"<|""Polynomial"" -> 1 + ^25 + ^423, ""CountNormalization"" -> 0.844854272|>"	"<|""Polynomial"" -> 1 + 2*^98 + ^423, ""CountNormalization"" -> 0.4605145691|>"	"<|""Polynomial"" -> 2 + 2* + 2*^10 + ^423, ""CountNormalization"" -> 0.4578510361|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^9 + ^424, ""CountNormalization"" -> 0.4971841684|>"	"<|""Polynomial"" -> 2 + ^45 + ^424, ""CountNormalization"" -> 0.386576481|>"	"<|""Polynomial"" -> 3 +  + ^39 + ^424, ""CountNormalization"" -> 0.3038428109|>"	"<|""Polynomial"" -> 1 + ^12 + ^425, ""CountNormalization"" -> 0.9655879072|>"	"<|""Polynomial"" -> 1 + 2*^61 + ^425, ""CountNormalization"" -> 0.4542374338|>"	"<|""Polynomial"" -> 2 + 3*^36 + ^425, ""CountNormalization"" -> 0.4393850973|>"	"<|""Polynomial"" -> 1 + ^11 + ^12 + ^14 + ^426, ""CountNormalization"" -> 0.5712673944|>"	"<|""Polynomial"" -> 2 +  + ^37 + ^426, ""CountNormalization"" -> 0.3948712471|>"	"<|""Polynomial"" -> 2 + ^101 + ^426, ""CountNormalization"" -> 0.2759469834|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^11 + ^427, ""CountNormalization"" -> 0.9921259544|>"	"<|""Polynomial"" -> 1 + 2*^167 + ^427, ""CountNormalization"" -> 0.4995417163|>"	"<|""Polynomial"" -> 2 + 3*^186 + ^427, ""CountNormalization"" -> 0.4997979645|>"	"<|""Polynomial"" -> 1 + ^105 + ^428, ""CountNormalization"" -> 0.5318818994|>"	"<|""Polynomial"" -> 2 + ^71 + ^428, ""CountNormalization"" -> 0.3993633891|>"	"<|""Polynomial"" -> 2 +  + 4*^187 + ^428, ""CountNormalization"" -> 0.3071537728|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^10 + ^429, ""CountNormalization"" -> 0.8002953719|>"	"<|""Polynomial"" -> 1 + 2* + ^4 + ^429, ""CountNormalization"" -> 0.4398189706|>"	"<|""Polynomial"" -> 2 + 2* + 2*^6 + ^429, ""CountNormalization"" -> 0.4747918459|>"	"<|""Polynomial"" -> 1 + ^11 + ^13 + ^15 + ^430, ""CountNormalization"" -> 0.5847489304|>"	"<|""Polynomial"" -> 2 +  + ^59 + ^430, ""CountNormalization"" -> 0.4460564963|>"	"<|""Polynomial"" -> 2 + 2* + 3*^7 + ^430, ""CountNormalization"" -> 0.2968709105|>"	"<|""Polynomial"" -> 1 + ^120 + ^431, ""CountNormalization"" -> 0.9985516058|>"	"<|""Polynomial"" -> 1 + 2*^66 + ^431, ""CountNormalization"" -> 0.4994045325|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^13 + ^432, ""CountNormalization"" -> 0.3492718285|>"	"<|""Polynomial"" -> 2 + ^59 + ^235 + ^432, ""CountNormalization"" -> 0.2557858663|>"	"<|""Polynomial"" -> 1 + ^33 + ^433, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^120 + ^433, ""CountNormalization"" -> 0.4999977089|>"	"<|""Polynomial"" -> 1 + ^5 + ^11 + ^12 + ^434, ""CountNormalization"" -> 0.6459011256|>"	"<|""Polynomial"" -> 2 + ^67 + ^434, ""CountNormalization"" -> 0.4974071005|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^12 + ^435, ""CountNormalization"" -> 0.8191308791|>"	"<|""Polynomial"" -> 1 + 2* + ^276 + ^435, ""CountNormalization"" -> 0.4123584581|>"	"<|""Polynomial"" -> 1 + ^165 + ^436, ""CountNormalization"" -> 0.5332392478|>"	"<|""Polynomial"" -> 2 + ^3 + ^47 + ^436, ""CountNormalization"" -> 0.3994043174|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^6 + ^437, ""CountNormalization"" -> 0.9787155725|>"	"<|""Polynomial"" -> 1 +  + 2*^116 + ^437, ""CountNormalization"" -> 0.4890539321|>"	"<|""Polynomial"" -> 1 + ^65 + ^438, ""CountNormalization"" -> 0.569656925|>"	"<|""Polynomial"" -> 2 + ^17 + ^438, ""CountNormalization"" -> 0.3941951197|>"	"<|""Polynomial"" -> 1 + ^49 + ^439, ""CountNormalization"" -> 0.9999999904|>"	"<|""Polynomial"" -> 1 +  + ^27 + ^439, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^440, ""CountNormalization"" -> 0.4037749521|>"	"<|""Polynomial"" -> 2 + ^3 + ^243 + ^440, ""CountNormalization"" -> 0.3238782856|>"	"<|""Polynomial"" -> 1 + ^31 + ^441, ""CountNormalization"" -> 0.8362358365|>"	"<|""Polynomial"" -> 1 +  + ^9 + ^441, ""CountNormalization"" -> 0.4593755241|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^7 + ^442, ""CountNormalization"" -> 0.664315758|>"	"<|""Polynomial"" -> 2 + ^3 + ^11 + ^442, ""CountNormalization"" -> 0.4916564222|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^10 + ^443, ""CountNormalization"" -> 0.9988726043|>"	"<|""Polynomial"" -> 1 + 2*^188 + ^443, ""CountNormalization"" -> 0.4994346159|>"	"<|""Polynomial"" -> 1 + ^9 + ^12 + ^13 + ^444, ""CountNormalization"" -> 0.4160443934|>"	"<|""Polynomial"" -> 2 + ^13 + ^317 + ^444, ""CountNormalization"" -> 0.3086112002|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^7 + ^445, ""CountNormalization"" -> 0.967379621|>"	"<|""Polynomial"" -> 1 + 2*^141 + ^445, ""CountNormalization"" -> 0.4520060945|>"	"<|""Polynomial"" -> 1 + ^105 + ^446, ""CountNormalization"" -> 0.6666261385|>"	"<|""Polynomial"" -> 2 +  + ^446, ""CountNormalization"" -> 0.4999999748|>"	"<|""Polynomial"" -> 1 + ^73 + ^447, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + 2*^157 + ^447, ""CountNormalization"" -> 0.4614507076|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^11 + ^448, ""CountNormalization"" -> 0.4616628974|>"	"<|""Polynomial"" -> 2 + ^181 + ^448, ""CountNormalization"" -> 0.3478120115|>"	"<|""Polynomial"" -> 1 + ^134 + ^449, ""CountNormalization"" -> 0.999999204|>"	"<|""Polynomial"" -> 1 + 2*^52 + ^449, ""CountNormalization"" -> 0.4999999646|>"	"<|""Polynomial"" -> 1 + ^79 + ^450, ""CountNormalization"" -> 0.4614620343|>"	"<|""Polynomial"" -> 2 + ^223 + ^450, ""CountNormalization"" -> 0.3090138789|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^16 + ^451, ""CountNormalization"" -> 0.9456467557|>"	"<|""Polynomial"" -> 1 + 2*^17 + ^451, ""CountNormalization"" -> 0.4723658571|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^6 + ^452, ""CountNormalization"" -> 0.5307759291|>"	"<|""Polynomial"" -> 2 + ^17 + ^452, ""CountNormalization"" -> 0.3978383333|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^15 + ^453, ""CountNormalization"" -> 0.8570746787|>"	"<|""Polynomial"" -> 1 + 2* + ^16 + ^453, ""CountNormalization"" -> 0.4612329354|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^10 + ^454, ""CountNormalization"" -> 0.6666644248|>"	"<|""Polynomial"" -> 2 + ^7 + ^177 + ^454, ""CountNormalization"" -> 0.4999665589|>"	"<|""Polynomial"" -> 1 + ^38 + ^455, ""CountNormalization"" -> 0.9454321381|>"	"<|""Polynomial"" -> 1 + 2*^32 + ^455, ""CountNormalization"" -> 0.4438271816|>"	"<|""Polynomial"" -> 1 + ^2 + ^11 + ^23 + ^456, ""CountNormalization"" -> 0.3918800842|>"	"<|""Polynomial"" -> 2 +  + ^209 + ^456, ""CountNormalization"" -> 0.3015127876|>"	"<|""Polynomial"" -> 1 + ^16 + ^457, ""CountNormalization"" -> 0.9999999933|>"	"<|""Polynomial"" -> 1 + 2*^67 + ^457, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^203 + ^458, ""CountNormalization"" -> 0.6666661553|>"	"<|""Polynomial"" -> 2 + ^163 + ^458, ""CountNormalization"" -> 0.4999970415|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^12 + ^459, ""CountNormalization"" -> 0.8358074378|>"	"<|""Polynomial"" -> 1 +  + 2*^86 + ^459, ""CountNormalization"" -> 0.4551737437|>"	"<|""Polynomial"" -> 1 + ^61 + ^460, ""CountNormalization"" -> 0.4439653997|>"	"<|""Polynomial"" -> 2 + ^57 + ^460, ""CountNormalization"" -> 0.3488831486|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^461, ""CountNormalization"" -> 0.9996385978|>"	"<|""Polynomial"" -> 1 + 2*^13 + ^461, ""CountNormalization"" -> 0.4999582881|>"	"<|""Polynomial"" -> 1 + ^73 + ^462, ""CountNormalization"" -> 0.5115148683|>"	"<|""Polynomial"" -> 2 + ^73 + ^462, ""CountNormalization"" -> 0.3613548105|>"	"<|""Polynomial"" -> 1 + ^93 + ^463, ""CountNormalization"" -> 0.9999097219|>"	"<|""Polynomial"" -> 1 + 2* + ^50 + ^463, ""CountNormalization"" -> 0.4999457951|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^23 + ^464, ""CountNormalization"" -> 0.4880649467|>"	"<|""Polynomial"" -> 2 + ^75 + ^464, ""CountNormalization"" -> 0.3567815315|>"	"<|""Polynomial"" -> 1 + ^59 + ^465, ""CountNormalization"" -> 0.8209652494|>"	"<|""Polynomial"" -> 1 + 2*^41 + ^465, ""CountNormalization"" -> 0.4171464919|>"	"<|""Polynomial"" -> 1 + ^6 + ^11 + ^14 + ^466, ""CountNormalization"" -> 0.6647338601|>"	"<|""Polynomial"" -> 2 + ^167 + ^466, ""CountNormalization"" -> 0.498501387|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^467, ""CountNormalization"" -> 0.9999999918|>"	"<|""Polynomial"" -> 1 + 2*^48 + ^467, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^15 + ^468, ""CountNormalization"" -> 0.3633622036|>"	"<|""Polynomial"" -> 2 + ^5 + ^445 + ^468, ""CountNormalization"" -> 0.2749585615|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^469, ""CountNormalization"" -> 0.9921259791|>"	"<|""Polynomial"" -> 1 + 2*^166 + ^469, ""CountNormalization"" -> 0.4995402841|>"	"<|""Polynomial"" -> 1 + ^149 + ^470, ""CountNormalization"" -> 0.5840597082|>"	"<|""Polynomial"" -> 2 +  + ^339 + ^470, ""CountNormalization"" -> 0.4465933521|>"	"<|""Polynomial"" -> 1 +  + ^471, ""CountNormalization"" -> 0.8571428561|>"	"<|""Polynomial"" -> 1 + 2*^8 + ^471, ""CountNormalization"" -> 0.4614894711|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^11 + ^472, ""CountNormalization"" -> 0.5008792928|>"	"<|""Polynomial"" -> 2 + ^5 + ^389 + ^472, ""CountNormalization"" -> 0.3901170101|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^8 + ^473, ""CountNormalization"" -> 0.9434823231|>"	"<|""Polynomial"" -> 1 + 2*^136 + ^473, ""CountNormalization"" -> 0.4765235877|>"	"<|""Polynomial"" -> 1 + ^191 + ^474, ""CountNormalization"" -> 0.5708019847|>"	"<|""Polynomial"" -> 2 + ^83 + ^474, ""CountNormalization"" -> 0.395570431|>"	"<|""Polynomial"" -> 1 + ^4 + ^8 + ^9 + ^475, ""CountNormalization"" -> 0.9603357378|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^475, ""CountNormalization"" -> 0.4518294006|>"	"<|""Polynomial"" -> 1 + ^15 + ^476, ""CountNormalization"" -> 0.488087292|>"	"<|""Polynomial"" -> 2 +  + ^405 + ^476, ""CountNormalization"" -> 0.3779685744|>"	"<|""Polynomial"" -> 1 + ^7 + ^15 + ^16 + ^477, ""CountNormalization"" -> 0.8451203134|>"	"<|""Polynomial"" -> 1 + 2*^101 + ^477, ""CountNormalization"" -> 0.4566021291|>"	"<|""Polynomial"" -> 1 + ^121 + ^478, ""CountNormalization"" -> 0.664805484|>"	"<|""Polynomial"" -> 2 + ^137 + ^478, ""CountNormalization"" -> 0.498889451|>"	"<|""Polynomial"" -> 1 + ^104 + ^479, ""CountNormalization"" -> 0.9999999699|>"	"<|""Polynomial"" -> 1 + 2*^221 + ^479, ""CountNormalization"" -> 0.4999997522|>"	"<|""Polynomial"" -> 1 + ^7 + ^13 + ^16 + ^480, ""CountNormalization"" -> 0.3235651759|>"	"<|""Polynomial"" -> 2 + ^35 + ^163 + ^480, ""CountNormalization"" -> 0.2411685551|>"	"<|""Polynomial"" -> 1 + ^138 + ^481, ""CountNormalization"" -> 0.9953941557|>"	"<|""Polynomial"" -> 1 + 2*^22 + ^481, ""CountNormalization"" -> 0.4999986303|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^9 + ^482, ""CountNormalization"" -> 0.6663901259|>"	"<|""Polynomial"" -> 2 + ^127 + ^482, ""CountNormalization"" -> 0.4998827213|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^9 + ^483, ""CountNormalization"" -> 0.8283242715|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^483, ""CountNormalization"" -> 0.4496747283|>"	"<|""Polynomial"" -> 1 + ^105 + ^484, ""CountNormalization"" -> 0.5013195314|>"	"<|""Polynomial"" -> 2 + ^39 + ^484, ""CountNormalization"" -> 0.3754232267|>"	"<|""Polynomial"" -> 1 + ^6 + ^16 + ^17 + ^485, ""CountNormalization"" -> 0.9676573944|>"	"<|""Polynomial"" -> 1 + 2* + ^485, ""CountNormalization"" -> 0.4540682873|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^14 + ^486, ""CountNormalization"" -> 0.5289819536|>"	"<|""Polynomial"" -> 2 + ^125 + ^486, ""CountNormalization"" -> 0.3565922792|>"	"<|""Polynomial"" -> 1 + ^94 + ^487, ""CountNormalization"" -> 0.9997947033|>"	"<|""Polynomial"" -> 1 + 2*^29 + ^487, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^488, ""CountNormalization"" -> 0.5004697444|>"	"<|""Polynomial"" -> 2 + ^123 + ^488, ""CountNormalization"" -> 0.3890183264|>"	"<|""Polynomial"" -> 1 + ^83 + ^489, ""CountNormalization"" -> 0.8571349013|>"	"<|""Polynomial"" -> 1 +  + ^443 + ^489, ""CountNormalization"" -> 0.4615341714|>"	"<|""Polynomial"" -> 1 + ^219 + ^490, ""CountNormalization"" -> 0.5568335|>"	"<|""Polynomial"" -> 2 +  + ^339 + ^490, ""CountNormalization"" -> 0.4385027084|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^11 + ^491, ""CountNormalization"" -> 0.9989825764|>"	"<|""Polynomial"" -> 1 + 2*^11 + ^491, ""CountNormalization"" -> 0.4994710079|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^8 + ^492, ""CountNormalization"" -> 0.4161118085|>"	"<|""Polynomial"" -> 2 + ^5 + ^241 + ^492, ""CountNormalization"" -> 0.3083692203|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^10 + ^493, ""CountNormalization"" -> 0.9943212588|>"	"<|""Polynomial"" -> 1 + 2*^4 + ^493, ""CountNormalization"" -> 0.4912312429|>"	"<|""Polynomial"" -> 1 + ^137 + ^494, ""CountNormalization"" -> 0.666290683|>"	"<|""Polynomial"" -> 2 +  + ^429 + ^494, ""CountNormalization"" -> 0.4994124633|>"	"<|""Polynomial"" -> 1 + ^76 + ^495, ""CountNormalization"" -> 0.7616498908|>"	"<|""Polynomial"" -> 1 + 2*^7 + ^495, ""CountNormalization"" -> 0.3978467693|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^16 + ^496, ""CountNormalization"" -> 0.4997913479|>"	"<|""Polynomial"" -> 2 + ^85 + ^496, ""CountNormalization"" -> 0.3647936241|>"	"<|""Polynomial"" -> 1 + ^78 + ^497, ""CountNormalization"" -> 0.9919790502|>"	"<|""Polynomial"" -> 1 + 2* + ^64 + ^497, ""CountNormalization"" -> 0.4995425433|>"	"<|""Polynomial"" -> 1 + ^3 + ^9 + ^11 + ^498, ""CountNormalization"" -> 0.5661643241|>"	"<|""Polynomial"" -> 2 +  + ^495 + ^498, ""CountNormalization"" -> 0.391824616|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^11 + ^499, ""CountNormalization"" -> 0.9999522878|>"	"<|""Polynomial"" -> 1 + 2*^20 + ^499, ""CountNormalization"" -> 0.4999999997|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^10 + ^500, ""CountNormalization"" -> 0.4501710711|>"	"<|""Polynomial"" -> 2 + ^39 + ^500, ""CountNormalization"" -> 0.3497326455|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^5 + ^501, ""CountNormalization"" -> 0.8571424922|>"	"<|""Polynomial"" -> 1 + 2*^88 + ^501, ""CountNormalization"" -> 0.4615228606|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^8 + ^502, ""CountNormalization"" -> 0.6653262236|>"	"<|""Polynomial"" -> 2 + ^197 + ^502, ""CountNormalization"" -> 0.4990059642|>"	"<|""Polynomial"" -> 1 + ^3 + ^503, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^35 + ^503, ""CountNormalization"" -> 0.4998875987|>"	"<|""Polynomial"" -> 1 + ^2 + ^14 + ^21 + ^504, ""CountNormalization"" -> 0.3278859393|>"	"<|""Polynomial"" -> 2 + ^23 + ^223 + ^504, ""CountNormalization"" -> 0.2594698468|>"	"<|""Polynomial"" -> 1 + ^156 + ^505, ""CountNormalization"" -> 0.9677419355|>"	"<|""Polynomial"" -> 1 + 2*^61 + ^505, ""CountNormalization"" -> 0.4545432238|>"	"<|""Polynomial"" -> 1 + ^95 + ^506, ""CountNormalization"" -> 0.6160343256|>"	"<|""Polynomial"" -> 2 +  + ^277 + ^506, ""CountNormalization"" -> 0.4602209946|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^13 + ^507, ""CountNormalization"" -> 0.8459740822|>"	"<|""Polynomial"" -> 1 + 2*^80 + ^507, ""CountNormalization"" -> 0.4597035314|>"	"<|""Polynomial"" -> 1 + ^109 + ^508, ""CountNormalization"" -> 0.5322370501|>"	"<|""Polynomial"" -> 2 +  + ^389 + ^508, ""CountNormalization"" -> 0.3989904943|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^8 + ^509, ""CountNormalization"" -> 0.9999999208|>"	"<|""Polynomial"" -> 1 + 2*^151 + ^509, ""CountNormalization"" -> 0.4994250044|>"	"<|""Polynomial"" -> 1 + ^9 + ^10 + ^12 + ^510, ""CountNormalization"" -> 0.4908643502|>"	"<|""Polynomial"" -> 2 + ^121 + ^510, ""CountNormalization"" -> 0.3352589266|>"	"<|""Polynomial"" -> 1 + ^10 + ^511, ""CountNormalization"" -> 0.9898655204|>"	"<|""Polynomial"" -> 1 + 2*^215 + ^511, ""CountNormalization"" -> 0.499473291|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^8 + ^512, ""CountNormalization"" -> 0.4992180736|>"	"<|""Polynomial"" -> 2 + ^29 + ^512, ""CountNormalization"" -> 0.3639326004|>"	"<|""Polynomial"" -> 1 + ^85 + ^513, ""CountNormalization"" -> 0.8453548129|>"	"<|""Polynomial"" -> 1 +  + ^99 + ^513, ""CountNormalization"" -> 0.4533094596|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^7 + ^514, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 2 + ^71 + ^514, ""CountNormalization"" -> 0.4996718016|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^14 + ^515, ""CountNormalization"" -> 0.9668023144|>"	"<|""Polynomial"" -> 1 + 2*^8 + ^515, ""CountNormalization"" -> 0.4541045763|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^7 + ^516, ""CountNormalization"" -> 0.4180786106|>"	"<|""Polynomial"" -> 2 + ^23 + ^355 + ^516, ""CountNormalization"" -> 0.3090373893|>"	"<|""Polynomial"" -> 1 + ^2 + ^10 + ^12 + ^517, ""CountNormalization"" -> 0.9451510408|>"	"<|""Polynomial"" -> 1 + 2*^46 + ^517, ""CountNormalization"" -> 0.4777239072|>"	"<|""Polynomial"" -> 1 + ^33 + ^518, ""CountNormalization"" -> 0.6427765544|>"	"<|""Polynomial"" -> 2 + ^193 + ^518, ""CountNormalization"" -> 0.4982173405|>"	"<|""Polynomial"" -> 1 + ^79 + ^519, ""CountNormalization"" -> 0.8563161474|>"	"<|""Polynomial"" -> 1 + 2*^56 + ^519, ""CountNormalization"" -> 0.4600969566|>"	"<|""Polynomial"" -> 1 + ^11 + ^13 + ^17 + ^520, ""CountNormalization"" -> 0.415522088|>"	"<|""Polynomial"" -> 2 + ^49 + ^520, ""CountNormalization"" -> 0.3388132255|>"	"<|""Polynomial"" -> 1 + ^32 + ^521, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 +  + ^43 + ^521, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^4 + ^13 + ^15 + ^522, ""CountNormalization"" -> 0.5207884688|>"	"<|""Polynomial"" -> 2 + ^3 + ^169 + ^522, ""CountNormalization"" -> 0.3561420505|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^13 + ^523, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^260 + ^523, ""CountNormalization"" -> 0.4999999398|>"	"<|""Polynomial"" -> 1 + ^167 + ^524, ""CountNormalization"" -> 0.5307988475|>"	"<|""Polynomial"" -> 2 +  + ^185 + ^524, ""CountNormalization"" -> 0.3978209207|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^525, ""CountNormalization"" -> 0.8014480794|>"	"<|""Polynomial"" -> 1 + 2*^113 + ^525, ""CountNormalization"" -> 0.4113690337|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^9 + ^526, ""CountNormalization"" -> 0.666209075|>"	"<|""Polynomial"" -> 2 +  + ^405 + ^526, ""CountNormalization"" -> 0.4999823881|>"	"<|""Polynomial"" -> 1 + ^47 + ^527, ""CountNormalization"" -> 0.9999923701|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^527, ""CountNormalization"" -> 0.4989816568|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^11 + ^528, ""CountNormalization"" -> 0.3600139475|>"	"<|""Polynomial"" -> 2 + ^103 + ^119 + ^528, ""CountNormalization"" -> 0.2615483823|>"	"<|""Polynomial"" -> 1 + ^42 + ^529, ""CountNormalization"" -> 0.9787179206|>"	"<|""Polynomial"" -> 1 + 2*^54 + ^529, ""CountNormalization"" -> 0.4893598137|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^10 + ^530, ""CountNormalization"" -> 0.5809291216|>"	"<|""Polynomial"" -> 2 + ^127 + ^530, ""CountNormalization"" -> 0.4427578787|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^12 + ^531, ""CountNormalization"" -> 0.844596592|>"	"<|""Polynomial"" -> 1 + 2*^164 + ^531, ""CountNormalization"" -> 0.4602785044|>"	"<|""Polynomial"" -> 1 +  + ^532, ""CountNormalization"" -> 0.4907019344|>"	"<|""Polynomial"" -> 2 +  + ^113 + ^532, ""CountNormalization"" -> 0.3847062592|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^4 + ^533, ""CountNormalization"" -> 0.9997970946|>"	"<|""Polynomial"" -> 1 + 2*^103 + ^533, ""CountNormalization"" -> 0.4939727923|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^7 + ^534, ""CountNormalization"" -> 0.5679512938|>"	"<|""Polynomial"" -> 2 +  + ^65 + ^534, ""CountNormalization"" -> 0.3928343428|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^8 + ^535, ""CountNormalization"" -> 0.9676564097|>"	"<|""Polynomial"" -> 1 + 2*^242 + ^535, ""CountNormalization"" -> 0.4544235022|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^7 + ^536, ""CountNormalization"" -> 0.5000879791|>"	"<|""Polynomial"" -> 2 + ^87 + ^536, ""CountNormalization"" -> 0.388187507|>"	"<|""Polynomial"" -> 1 + ^94 + ^537, ""CountNormalization"" -> 0.8539026633|>"	"<|""Polynomial"" -> 1 + 2*^184 + ^537, ""CountNormalization"" -> 0.4601329608|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^538, ""CountNormalization"" -> 0.6666666184|>"	"<|""Polynomial"" -> 2 + ^23 + ^538, ""CountNormalization"" -> 0.4999410268|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^10 + ^539, ""CountNormalization"" -> 0.9383272621|>"	"<|""Polynomial"" -> 1 + 2* + ^230 + ^539, ""CountNormalization"" -> 0.476513598|>"	"<|""Polynomial"" -> 1 + ^179 + ^540, ""CountNormalization"" -> 0.3131285879|>"	"<|""Polynomial"" -> 2 + ^7 + ^11 + ^540, ""CountNormalization"" -> 0.2425039495|>"	"<|""Polynomial"" -> 1 + ^4 + ^10 + ^13 + ^541, ""CountNormalization"" -> 0.9999999998|>"	"<|""Polynomial"" -> 1 + 2*^145 + ^541, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^9 + ^542, ""CountNormalization"" -> 0.6662569145|>"	"<|""Polynomial"" -> 2 + ^217 + ^542, ""CountNormalization"" -> 0.4998462397|>"	"<|""Polynomial"" -> 1 + ^16 + ^543, ""CountNormalization"" -> 0.8563337567|>"	"<|""Polynomial"" -> 1 +  + ^67 + ^543, ""CountNormalization"" -> 0.4615328636|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^13 + ^544, ""CountNormalization"" -> 0.4957017521|>"	"<|""Polynomial"" -> 2 + ^15 + ^544, ""CountNormalization"" -> 0.3574740661|>"	"<|""Polynomial"" -> 1 + ^122 + ^545, ""CountNormalization"" -> 0.9674415507|>"	"<|""Polynomial"" -> 1 +  + ^363 + ^545, ""CountNormalization"" -> 0.4541287131|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^8 + ^546, ""CountNormalization"" -> 0.5431461504|>"	"<|""Polynomial"" -> 2 +  + ^7 + ^546, ""CountNormalization"" -> 0.3763218427|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^13 + ^547, ""CountNormalization"" -> 0.9998172181|>"	"<|""Polynomial"" -> 1 + 2*^80 + ^547, ""CountNormalization"" -> 0.4999999837|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^10 + ^548, ""CountNormalization"" -> 0.5328102254|>"	"<|""Polynomial"" -> 2 + ^3 + ^91 + ^548, ""CountNormalization"" -> 0.3999177514|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^16 + ^549, ""CountNormalization"" -> 0.8430605365|>"	"<|""Polynomial"" -> 1 + 2*^77 + ^549, ""CountNormalization"" -> 0.4602991108|>"	"<|""Polynomial"" -> 1 + ^193 + ^550, ""CountNormalization"" -> 0.5493431541|>"	"<|""Polynomial"" -> 2 + ^3 + ^61 + ^550, ""CountNormalization"" -> 0.4173754178|>"	"<|""Polynomial"" -> 1 + ^135 + ^551, ""CountNormalization"" -> 0.9939963309|>"	"<|""Polynomial"" -> 1 + 2* + ^242 + ^551, ""CountNormalization"" -> 0.4907537259|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^20 + ^552, ""CountNormalization"" -> 0.3822967622|>"	"<|""Polynomial"" -> 2 + ^85 + ^245 + ^552, ""CountNormalization"" -> 0.2944760899|>"	"<|""Polynomial"" -> 1 + ^39 + ^553, ""CountNormalization"" -> 0.9917567475|>"	"<|""Polynomial"" -> 1 + 2*^270 + ^553, ""CountNormalization"" -> 0.4995425407|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^11 + ^554, ""CountNormalization"" -> 0.6666660721|>"	"<|""Polynomial"" -> 2 + ^55 + ^554, ""CountNormalization"" -> 0.4999623659|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^10 + ^555, ""CountNormalization"" -> 0.8202725451|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^555, ""CountNormalization"" -> 0.4192612273|>"	"<|""Polynomial"" -> 1 + ^153 + ^556, ""CountNormalization"" -> 0.5323753267|>"	"<|""Polynomial"" -> 2 +  + ^185 + ^556, ""CountNormalization"" -> 0.3990421992|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^7 + ^557, ""CountNormalization"" -> 0.999700822|>"	"<|""Polynomial"" -> 1 + 2*^175 + ^557, ""CountNormalization"" -> 0.4999994297|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^14 + ^558, ""CountNormalization"" -> 0.5338681749|>"	"<|""Polynomial"" -> 2 + ^41 + ^558, ""CountNormalization"" -> 0.3621392906|>"	"<|""Polynomial"" -> 1 + ^34 + ^559, ""CountNormalization"" -> 0.9974548971|>"	"<|""Polynomial"" -> 1 +  + ^45 + ^559, ""CountNormalization"" -> 0.4987500582|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^11 + ^560, ""CountNormalization"" -> 0.3908049181|>"	"<|""Polynomial"" -> 2 + ^153 + ^560, ""CountNormalization"" -> 0.305985493|>"	"<|""Polynomial"" -> 1 + ^71 + ^561, ""CountNormalization"" -> 0.8023323377|>"	"<|""Polynomial"" -> 1 +  + ^131 + ^561, ""CountNormalization"" -> 0.4410045763|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^11 + ^562, ""CountNormalization"" -> 0.6654743109|>"	"<|""Polynomial"" -> 2 + ^47 + ^562, ""CountNormalization"" -> 0.4989615981|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^14 + ^563, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^59 + ^563, ""CountNormalization"" -> 0.4999658439|>"	"<|""Polynomial"" -> 1 + ^163 + ^564, ""CountNormalization"" -> 0.419656181|>"	"<|""Polynomial"" -> 2 + ^17 + ^85 + ^564, ""CountNormalization"" -> 0.3104817713|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^565, ""CountNormalization"" -> 0.9673998138|>"	"<|""Polynomial"" -> 1 + 2*^166 + ^565, ""CountNormalization"" -> 0.4522569666|>"	"<|""Polynomial"" -> 1 + ^153 + ^566, ""CountNormalization"" -> 0.6661944372|>"	"<|""Polynomial"" -> 2 +  + ^441 + ^566, ""CountNormalization"" -> 0.499999996|>"	"<|""Polynomial"" -> 1 + ^143 + ^567, ""CountNormalization"" -> 0.8359073294|>"	"<|""Polynomial"" -> 1 + 2*^212 + ^567, ""CountNormalization"" -> 0.4550543383|>"	"<|""Polynomial"" -> 1 + ^10 + ^11 + ^17 + ^568, ""CountNormalization"" -> 0.5008555889|>"	"<|""Polynomial"" -> 2 + ^273 + ^568, ""CountNormalization"" -> 0.3889140475|>"	"<|""Polynomial"" -> 1 + ^77 + ^569, ""CountNormalization"" -> 0.9999999189|>"	"<|""Polynomial"" -> 1 + 2*^16 + ^569, ""CountNormalization"" -> 0.4999992616|>"	"<|""Polynomial"" -> 1 + ^67 + ^570, ""CountNormalization"" -> 0.4941742872|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^570, ""CountNormalization"" -> 0.3366461613|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^10 + ^571, ""CountNormalization"" -> 0.9997884213|>"	"<|""Polynomial"" -> 1 + 2* + ^122 + ^571, ""CountNormalization"" -> 0.4999994387|>"	"<|""Polynomial"" -> 1 +  + ^8 + ^12 + ^572, ""CountNormalization"" -> 0.4887480575|>"	"<|""Polynomial"" -> 2 +  + ^57 + ^572, ""CountNormalization"" -> 0.3690554428|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^10 + ^573, ""CountNormalization"" -> 0.85490486|>"	"<|""Polynomial"" -> 1 + 2*^5 + ^573, ""CountNormalization"" -> 0.4603315634|>"	"<|""Polynomial"" -> 1 + ^13 + ^574, ""CountNormalization"" -> 0.6378338089|>"	"<|""Polynomial"" -> 2 +  + ^279 + ^574, ""CountNormalization"" -> 0.4926066893|>"	"<|""Polynomial"" -> 1 + ^146 + ^575, ""CountNormalization"" -> 0.9441609458|>"	"<|""Polynomial"" -> 1 + 2*^231 + ^575, ""CountNormalization"" -> 0.4444367441|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^13 + ^576, ""CountNormalization"" -> 0.346466409|>"	"<|""Polynomial"" -> 2 +  + ^2 + 2*^26 + ^576, ""CountNormalization"" -> 0.2586756682|>"	"<|""Polynomial"" -> 1 + ^25 + ^577, ""CountNormalization"" -> 0.999711233|>"	"<|""Polynomial"" -> 1 + 2*^37 + ^577, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^16 + ^22 + ^23 + ^578, ""CountNormalization"" -> 0.6666280058|>"	"<|""Polynomial"" -> 2 + ^3 + ^143 + ^578, ""CountNormalization"" -> 0.492759941|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^12 + ^579, ""CountNormalization"" -> 0.8571427951|>"	"<|""Polynomial"" -> 1 + 2* + ^174 + ^579, ""CountNormalization"" -> 0.4614526116|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^6 + ^580, ""CountNormalization"" -> 0.4474249344|>"	"<|""Polynomial"" -> 2 +  + ^161 + ^580, ""CountNormalization"" -> 0.3505450611|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^13 + ^581, ""CountNormalization"" -> 0.9861851089|>"	"<|""Polynomial"" -> 1 + 2*^193 + ^581, ""CountNormalization"" -> 0.4960833753|>"	"<|""Polynomial"" -> 1 + ^85 + ^582, ""CountNormalization"" -> 0.5703803762|>"	"<|""Polynomial"" -> 2 +  + ^49 + ^582, ""CountNormalization"" -> 0.3955969088|>"	"<|""Polynomial"" -> 1 + ^130 + ^583, ""CountNormalization"" -> 0.945610703|>"	"<|""Polynomial"" -> 1 + 2*^80 + ^583, ""CountNormalization"" -> 0.4736436188|>"	"<|""Polynomial"" -> 1 + ^3 + ^13 + ^14 + ^584, ""CountNormalization"" -> 0.4987729188|>"	"<|""Polynomial"" -> 2 + ^23 + ^584, ""CountNormalization"" -> 0.3879723388|>"	"<|""Polynomial"" -> 1 + ^121 + ^585, ""CountNormalization"" -> 0.8000278814|>"	"<|""Polynomial"" -> 1 + 2*^46 + ^585, ""CountNormalization"" -> 0.4115676254|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^7 + ^586, ""CountNormalization"" -> 0.6654857876|>"	"<|""Polynomial"" -> 2 +  + ^21 + ^586, ""CountNormalization"" -> 0.4987225993|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^587, ""CountNormalization"" -> 0.9999978537|>"	"<|""Polynomial"" -> 1 + 2*^186 + ^587, ""CountNormalization"" -> 0.4999988892|>"	"<|""Polynomial"" -> 1 + ^151 + ^588, ""CountNormalization"" -> 0.3878115263|>"	"<|""Polynomial"" -> 2 + ^5 + ^517 + ^588, ""CountNormalization"" -> 0.2907960448|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^10 + ^589, ""CountNormalization"" -> 0.9999980092|>"	"<|""Polynomial"" -> 1 + 2*^166 + ^589, ""CountNormalization"" -> 0.4988783762|>"	"<|""Polynomial"" -> 1 + ^93 + ^590, ""CountNormalization"" -> 0.5861554967|>"	"<|""Polynomial"" -> 2 + ^3 + ^41 + ^590, ""CountNormalization"" -> 0.4469529988|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^9 + ^591, ""CountNormalization"" -> 0.8570262542|>"	"<|""Polynomial"" -> 1 +  + 2*^22 + ^591, ""CountNormalization"" -> 0.4614915949|>"	"<|""Polynomial"" -> 1 +  + ^19 + ^24 + ^592, ""CountNormalization"" -> 0.4933070483|>"	"<|""Polynomial"" -> 2 + ^15 + ^592, ""CountNormalization"" -> 0.3622961552|>"	"<|""Polynomial"" -> 1 + ^86 + ^593, ""CountNormalization"" -> 0.9999904186|>"	"<|""Polynomial"" -> 1 + 2*^112 + ^593, ""CountNormalization"" -> 0.4995787689|>"	"<|""Polynomial"" -> 1 + ^19 + ^594, ""CountNormalization"" -> 0.4940736934|>"	"<|""Polynomial"" -> 2 + ^23 + ^594, ""CountNormalization"" -> 0.3356553787|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^9 + ^595, ""CountNormalization"" -> 0.9425449303|>"	"<|""Polynomial"" -> 1 + 2*^143 + ^595, ""CountNormalization"" -> 0.4456088135|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^6 + ^596, ""CountNormalization"" -> 0.5325875806|>"	"<|""Polynomial"" -> 2 + ^275 + ^596, ""CountNormalization"" -> 0.3999463137|>"	"<|""Polynomial"" -> 1 + ^9 + ^12 + ^14 + ^597, ""CountNormalization"" -> 0.8571426879|>"	"<|""Polynomial"" -> 1 +  + ^105 + ^597, ""CountNormalization"" -> 0.4615384612|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^598, ""CountNormalization"" -> 0.6507989455|>"	"<|""Polynomial"" -> 2 + ^53 + ^598, ""CountNormalization"" -> 0.4884747836|>"	"<|""Polynomial"" -> 1 + ^30 + ^599, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^117 + ^599, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^11 + ^600, ""CountNormalization"" -> 0.3239240025|>"	"<|""Polynomial"" -> 2 + ^5 + ^589 + ^600, ""CountNormalization"" -> 0.2560308452|>"	"<|""Polynomial"" -> 1 + ^201 + ^601, ""CountNormalization"" -> 0.9997227459|>"	"<|""Polynomial"" -> 1 + 2*^6 + ^601, ""CountNormalization"" -> 0.4999168192|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^11 + ^602, ""CountNormalization"" -> 0.6444686647|>"	"<|""Polynomial"" -> 2 +  + ^255 + ^602, ""CountNormalization"" -> 0.4974723292|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^6 + ^603, ""CountNormalization"" -> 0.8448375389|>"	"<|""Polynomial"" -> 1 + 2*^91 + ^603, ""CountNormalization"" -> 0.4608979111|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^15 + ^604, ""CountNormalization"" -> 0.5332909112|>"	"<|""Polynomial"" -> 2 +  + ^53 + ^604, ""CountNormalization"" -> 0.3996828402|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^10 + ^605, ""CountNormalization"" -> 0.9124270445|>"	"<|""Polynomial"" -> 1 +  + 2*^150 + ^605, ""CountNormalization"" -> 0.4342979158|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^15 + ^606, ""CountNormalization"" -> 0.5704871684|>"	"<|""Polynomial"" -> 2 + ^185 + ^606, ""CountNormalization"" -> 0.3946260081|>"	"<|""Polynomial"" -> 1 + ^105 + ^607, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^607, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^23 + ^608, ""CountNormalization"" -> 0.4962929199|>"	"<|""Polynomial"" -> 2 + ^113 + ^608, ""CountNormalization"" -> 0.3645325352|>"	"<|""Polynomial"" -> 1 + ^31 + ^609, ""CountNormalization"" -> 0.8428541682|>"	"<|""Polynomial"" -> 1 + 2*^11 + ^609, ""CountNormalization"" -> 0.4531172486|>"	"<|""Polynomial"" -> 1 + ^127 + ^610, ""CountNormalization"" -> 0.5858086773|>"	"<|""Polynomial"" -> 2 + ^131 + ^610, ""CountNormalization"" -> 0.445868144|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^10 + ^611, ""CountNormalization"" -> 0.9984140469|>"	"<|""Polynomial"" -> 1 + 2*^60 + ^611, ""CountNormalization"" -> 0.4995362828|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^14 + ^612, ""CountNormalization"" -> 0.369583209|>"	"<|""Polynomial"" -> 2 + ^35 + ^259 + ^612, ""CountNormalization"" -> 0.2816997486|>"	"<|""Polynomial"" -> 1 + ^4 + ^10 + ^19 + ^613, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2* + ^20 + ^613, ""CountNormalization"" -> 0.4999999861|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^7 + ^614, ""CountNormalization"" -> 0.6666666127|>"	"<|""Polynomial"" -> 2 +  + ^297 + ^614, ""CountNormalization"" -> 0.4999292913|>"	"<|""Polynomial"" -> 1 + ^211 + ^615, ""CountNormalization"" -> 0.8232515578|>"	"<|""Polynomial"" -> 1 + 2*^242 + ^615, ""CountNormalization"" -> 0.4143533325|>"	"<|""Polynomial"" -> 1 + ^3 + ^10 + ^19 + ^616, ""CountNormalization"" -> 0.4362555836|>"	"<|""Polynomial"" -> 2 + ^211 + ^616, ""CountNormalization"" -> 0.3487539171|>"	"<|""Polynomial"" -> 1 + ^200 + ^617, ""CountNormalization"" -> 0.9999831175|>"	"<|""Polynomial"" -> 1 + 2*^88 + ^617, ""CountNormalization"" -> 0.4999766755|>"	"<|""Polynomial"" -> 1 + ^5 + ^13 + ^20 + ^618, ""CountNormalization"" -> 0.5702378146|>"	"<|""Polynomial"" -> 2 + ^247 + ^618, ""CountNormalization"" -> 0.3944530039|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^9 + ^619, ""CountNormalization"" -> 0.9999909242|>"	"<|""Polynomial"" -> 1 +  + ^129 + ^619, ""CountNormalization"" -> 0.4999632866|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^9 + ^620, ""CountNormalization"" -> 0.4560431575|>"	"<|""Polynomial"" -> 2 + ^167 + ^620, ""CountNormalization"" -> 0.3554548655|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^12 + ^621, ""CountNormalization"" -> 0.8273957714|>"	"<|""Polynomial"" -> 1 + 2*^41 + ^621, ""CountNormalization"" -> 0.4433936531|>"	"<|""Polynomial"" -> 1 + ^297 + ^622, ""CountNormalization"" -> 0.6666561362|>"	"<|""Polynomial"" -> 2 +  + ^465 + ^622, ""CountNormalization"" -> 0.4995648555|>"	"<|""Polynomial"" -> 1 + ^68 + ^623, ""CountNormalization"" -> 0.9921259843|>"	"<|""Polynomial"" -> 1 + 2*^26 + ^623, ""CountNormalization"" -> 0.4967442725|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^12 + ^624, ""CountNormalization"" -> 0.3726162894|>"	"<|""Polynomial"" -> 2 +  + ^65 + ^624, ""CountNormalization"" -> 0.2694603102|>"	"<|""Polynomial"" -> 1 + ^133 + ^625, ""CountNormalization"" -> 0.9655952741|>"	"<|""Polynomial"" -> 1 + 2*^73 + ^625, ""CountNormalization"" -> 0.4526821005|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^13 + ^626, ""CountNormalization"" -> 0.6666666058|>"	"<|""Polynomial"" -> 2 +  + ^15 + ^626, ""CountNormalization"" -> 0.4997335428|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^14 + ^627, ""CountNormalization"" -> 0.8105631987|>"	"<|""Polynomial"" -> 1 + 2* + ^44 + ^627, ""CountNormalization"" -> 0.4379532373|>"	"<|""Polynomial"" -> 1 + ^223 + ^628, ""CountNormalization"" -> 0.5332977222|>"	"<|""Polynomial"" -> 2 +  + ^157 + ^628, ""CountNormalization"" -> 0.3999219711|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^629, ""CountNormalization"" -> 0.9955080982|>"	"<|""Polynomial"" -> 1 + 2*^70 + ^629, ""CountNormalization"" -> 0.499319133|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^7 + ^630, ""CountNormalization"" -> 0.4386493005|>"	"<|""Polynomial"" -> 2 +  + ^131 + ^630, ""CountNormalization"" -> 0.2937448004|>"	"<|""Polynomial"" -> 1 + ^307 + ^631, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^2 + ^631, ""CountNormalization"" -> 0.4998327561|>"	"<|""Polynomial"" -> 1 + ^3 + ^13 + ^19 + ^632, ""CountNormalization"" -> 0.5001895932|>"	"<|""Polynomial"" -> 2 + ^29 + ^632, ""CountNormalization"" -> 0.3890069851|>"	"<|""Polynomial"" -> 1 + ^101 + ^633, ""CountNormalization"" -> 0.8570864398|>"	"<|""Polynomial"" -> 1 +  + ^69 + ^633, ""CountNormalization"" -> 0.461319826|>"	"<|""Polynomial"" -> 1 + ^315 + ^634, ""CountNormalization"" -> 0.6665965703|>"	"<|""Polynomial"" -> 2 + ^3 + ^457 + ^634, ""CountNormalization"" -> 0.5|>"	"<|""Polynomial"" -> 1 + ^4 + ^10 + ^14 + ^635, ""CountNormalization"" -> 0.9675514726|>"	"<|""Polynomial"" -> 1 + 2*^113 + ^635, ""CountNormalization"" -> 0.4544620556|>"	"<|""Polynomial"" -> 1 + ^4 + ^8 + ^13 + ^636, ""CountNormalization"" -> 0.4177876865|>"	"<|""Polynomial"" -> 2 +  + ^209 + ^636, ""CountNormalization"" -> 0.3092083166|>"	"<|""Polynomial"" -> 1 +  + ^9 + ^14 + ^637, ""CountNormalization"" -> 0.990591939|>"	"<|""Polynomial"" -> 1 + 2*^289 + ^637, ""CountNormalization"" -> 0.4983264156|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^6 + ^638, ""CountNormalization"" -> 0.6153691914|>"	"<|""Polynomial"" -> 2 +  + ^321 + ^638, ""CountNormalization"" -> 0.4611961897|>"	"<|""Polynomial"" -> 1 + ^16 + ^639, ""CountNormalization"" -> 0.8447237585|>"	"<|""Polynomial"" -> 1 + 2*^205 + ^639, ""CountNormalization"" -> 0.4605983251|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^14 + ^640, ""CountNormalization"" -> 0.4284731239|>"	"<|""Polynomial"" -> 2 + ^159 + ^640, ""CountNormalization"" -> 0.3258508292|>"	"<|""Polynomial"" -> 1 + ^11 + ^641, ""CountNormalization"" -> 0.9999521418|>"	"<|""Polynomial"" -> 1 +  + 2*^44 + ^641, ""CountNormalization"" -> 0.4995897781|>"	"<|""Polynomial"" -> 1 + ^119 + ^642, ""CountNormalization"" -> 0.5705361925|>"	"<|""Polynomial"" -> 2 + ^179 + ^642, ""CountNormalization"" -> 0.3948115892|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^11 + ^643, ""CountNormalization"" -> 0.9999996864|>"	"<|""Polynomial"" -> 1 + 2*^128 + ^643, ""CountNormalization"" -> 0.499935208|>"	"<|""Polynomial"" -> 1 + ^10 + ^11 + ^12 + ^644, ""CountNormalization"" -> 0.4807579178|>"	"<|""Polynomial"" -> 2 + ^99 + ^644, ""CountNormalization"" -> 0.376202394|>"	"<|""Polynomial"" -> 1 + ^4 + ^8 + ^11 + ^645, ""CountNormalization"" -> 0.8215076244|>"	"<|""Polynomial"" -> 1 + 2*^281 + ^645, ""CountNormalization"" -> 0.418406675|>"	"<|""Polynomial"" -> 1 + ^249 + ^646, ""CountNormalization"" -> 0.6655250263|>"	"<|""Polynomial"" -> 2 + ^3 + ^535 + ^646, ""CountNormalization"" -> 0.4915229209|>"	"<|""Polynomial"" -> 1 + ^5 + ^647, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + 2*^216 + ^647, ""CountNormalization"" -> 0.4999448006|>"	"<|""Polynomial"" -> 1 +  + ^22 + ^23 + ^648, ""CountNormalization"" -> 0.3527443843|>"	"<|""Polynomial"" -> 2 + ^11 + ^523 + ^648, ""CountNormalization"" -> 0.2747829207|>"	"<|""Polynomial"" -> 1 + ^37 + ^649, ""CountNormalization"" -> 0.9457675908|>"	"<|""Polynomial"" -> 1 + 2*^30 + ^649, ""CountNormalization"" -> 0.4781366777|>"	"<|""Polynomial"" -> 1 + ^3 + ^650, ""CountNormalization"" -> 0.5777430081|>"	"<|""Polynomial"" -> 2 +  + ^151 + ^650, ""CountNormalization"" -> 0.4406905119|>"	"<|""Polynomial"" -> 1 + ^5 + ^13 + ^14 + ^651, ""CountNormalization"" -> 0.8470433718|>"	"<|""Polynomial"" -> 1 + 2*^25 + ^651, ""CountNormalization"" -> 0.4599970866|>"	"<|""Polynomial"" -> 1 + ^93 + ^652, ""CountNormalization"" -> 0.5324577738|>"	"<|""Polynomial"" -> 2 +  + ^529 + ^652, ""CountNormalization"" -> 0.3993874377|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^10 + ^653, ""CountNormalization"" -> 0.9999999838|>"	"<|""Polynomial"" -> 1 +  + ^103 + ^653, ""CountNormalization"" -> 0.4996166574|>"	"<|""Polynomial"" -> 1 + ^5 + ^11 + ^14 + ^654, ""CountNormalization"" -> 0.5714277076|>"	"<|""Polynomial"" -> 2 +  + ^501 + ^654, ""CountNormalization"" -> 0.3952314613|>"	"<|""Polynomial"" -> 1 + ^88 + ^655, ""CountNormalization"" -> 0.9640606945|>"	"<|""Polynomial"" -> 1 + 2*^44 + ^655, ""CountNormalization"" -> 0.4528171417|>"	"<|""Polynomial"" -> 1 + ^10 + ^18 + ^19 + ^656, ""CountNormalization"" -> 0.4938574947|>"	"<|""Polynomial"" -> 2 + ^311 + ^656, ""CountNormalization"" -> 0.3608146428|>"	"<|""Polynomial"" -> 1 + ^38 + ^657, ""CountNormalization"" -> 0.8432611469|>"	"<|""Polynomial"" -> 1 + 2* + ^112 + ^657, ""CountNormalization"" -> 0.4608615023|>"	"<|""Polynomial"" -> 1 + ^55 + ^658, ""CountNormalization"" -> 0.6423053694|>"	"<|""Polynomial"" -> 2 +  + ^5 + ^658, ""CountNormalization"" -> 0.4973812559|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^15 + ^659, ""CountNormalization"" -> 0.9992418499|>"	"<|""Polynomial"" -> 1 + 2*^155 + ^659, ""CountNormalization"" -> 0.4996209249|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^12 + ^660, ""CountNormalization"" -> 0.3257651034|>"	"<|""Polynomial"" -> 2 + ^37 + ^329 + ^660, ""CountNormalization"" -> 0.2515322295|>"	"<|""Polynomial"" -> 1 + ^4 + ^11 + ^12 + ^661, ""CountNormalization"" -> 0.9999999992|>"	"<|""Polynomial"" -> 1 + ^297 + ^662, ""CountNormalization"" -> 0.666540809|>"	"<|""Polynomial"" -> 1 + ^257 + ^663, ""CountNormalization"" -> 0.8368458973|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^15 + ^664, ""CountNormalization"" -> 0.4967960676|>"	"<|""Polynomial"" -> 1 + ^33 + ^665, ""CountNormalization"" -> 0.9416336013|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^10 + ^666, ""CountNormalization"" -> 0.5307318813|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^18 + ^667, ""CountNormalization"" -> 0.9730846411|>"	"<|""Polynomial"" -> 1 + ^10 + ^12 + ^17 + ^668, ""CountNormalization"" -> 0.5333330992|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^5 + ^669, ""CountNormalization"" -> 0.8570907495|>"	"<|""Polynomial"" -> 1 + ^153 + ^670, ""CountNormalization"" -> 0.5865026196|>"	"<|""Polynomial"" -> 1 + ^15 + ^671, ""CountNormalization"" -> 0.9457742957|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^11 + ^672, ""CountNormalization"" -> 0.3564811223|>"	"<|""Polynomial"" -> 1 + ^28 + ^673, ""CountNormalization"" -> 0.9999999983|>"	"<|""Polynomial"" -> 1 + ^3 + ^9 + ^14 + ^674, ""CountNormalization"" -> 0.6665988901|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^6 + ^675, ""CountNormalization"" -> 0.8065797744|>"	"<|""Polynomial"" -> 1 + ^241 + ^676, ""CountNormalization"" -> 0.5184665047|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^8 + ^677, ""CountNormalization"" -> 0.9999999995|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^15 + ^678, ""CountNormalization"" -> 0.5686947821|>"	"<|""Polynomial"" -> 1 + ^66 + ^679, ""CountNormalization"" -> 0.9918660463|>"	"<|""Polynomial"" -> 1 +  + ^30 + ^35 + ^680, ""CountNormalization"" -> 0.426376532|>"	"<|""Polynomial"" -> 1 + ^3 + ^9 + ^11 + ^681, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^7 + ^682, ""CountNormalization"" -> 0.6295916329|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^683, ""CountNormalization"" -> 0.9992684711|>"	"<|""Polynomial"" -> 1 + ^3 + ^13 + ^18 + ^684, ""CountNormalization"" -> 0.3769310283|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^685, ""CountNormalization"" -> 0.9677336796|>"	"<|""Polynomial"" -> 1 + ^197 + ^686, ""CountNormalization"" -> 0.6460354175|>"	"<|""Polynomial"" -> 1 + ^13 + ^687, ""CountNormalization"" -> 0.8570174972|>"	"<|""Polynomial"" -> 1 + ^6 + ^14 + ^19 + ^688, ""CountNormalization"" -> 0.4957867673|>"	"<|""Polynomial"" -> 1 + ^14 + ^689, ""CountNormalization"" -> 0.9997062782|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^10 + ^690, ""CountNormalization"" -> 0.4830506189|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^13 + ^691, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^299 + ^692, ""CountNormalization"" -> 0.5316672177|>"	"<|""Polynomial"" -> 1 + ^2 + ^8 + ^15 + ^693, ""CountNormalization"" -> 0.7852189136|>"	"<|""Polynomial"" -> 1 + ^3 + ^13 + ^17 + ^694, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 1 + ^212 + ^695, ""CountNormalization"" -> 0.9677419349|>"	"<|""Polynomial"" -> 1 + ^2 + ^10 + ^23 + ^696, ""CountNormalization"" -> 0.3853751229|>"	"<|""Polynomial"" -> 1 + ^267 + ^697, ""CountNormalization"" -> 0.9998577824|>"	"<|""Polynomial"" -> 1 + ^215 + ^698, ""CountNormalization"" -> 0.6666666616|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^15 + ^699, ""CountNormalization"" -> 0.8565224826|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^6 + ^700, ""CountNormalization"" -> 0.4092055197|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^16 + ^701, ""CountNormalization"" -> 0.9999983744|>"	"<|""Polynomial"" -> 1 + ^37 + ^702, ""CountNormalization"" -> 0.5262591289|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^12 + ^703, ""CountNormalization"" -> 0.9955137947|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^12 + ^704, ""CountNormalization"" -> 0.4683812003|>"	"<|""Polynomial"" -> 1 + ^19 + ^705, ""CountNormalization"" -> 0.8234666982|>"	"<|""Polynomial"" -> 1 + ^9 + ^11 + ^14 + ^706, ""CountNormalization"" -> 0.6666659513|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^15 + ^707, ""CountNormalization"" -> 0.9921259764|>"	"<|""Polynomial"" -> 1 + ^287 + ^708, ""CountNormalization"" -> 0.4206568224|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^709, ""CountNormalization"" -> 0.9999999954|>"	"<|""Polynomial"" -> 1 +  + ^14 + ^15 + ^710, ""CountNormalization"" -> 0.5865076717|>"	"<|""Polynomial"" -> 1 + ^92 + ^711, ""CountNormalization"" -> 0.8443270961|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^5 + ^712, ""CountNormalization"" -> 0.4986895883|>"	"<|""Polynomial"" -> 1 + ^41 + ^713, ""CountNormalization"" -> 0.9787036217|>"	"<|""Polynomial"" -> 1 + ^23 + ^714, ""CountNormalization"" -> 0.54185233|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^7 + ^715, ""CountNormalization"" -> 0.9138226947|>"	"<|""Polynomial"" -> 1 + ^183 + ^716, ""CountNormalization"" -> 0.5314765652|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^16 + ^717, ""CountNormalization"" -> 0.8547310632|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^718, ""CountNormalization"" -> 0.665738674|>"	"<|""Polynomial"" -> 1 + ^150 + ^719, ""CountNormalization"" -> 0.9993037789|>"	"<|""Polynomial"" -> 1 + ^2 + ^8 + ^11 + ^720, ""CountNormalization"" -> 0.289721442|>"	"<|""Polynomial"" -> 1 + ^9 + ^721, ""CountNormalization"" -> 0.9921259839|>"	"<|""Polynomial"" -> 1 + ^231 + ^722, ""CountNormalization"" -> 0.6666615804|>"	"<|""Polynomial"" -> 1 + ^6 + ^13 + ^16 + ^723, ""CountNormalization"" -> 0.8565503451|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^13 + ^724, ""CountNormalization"" -> 0.5329693954|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^9 + ^725, ""CountNormalization"" -> 0.9601195897|>"	"<|""Polynomial"" -> 1 + ^5 + ^726, ""CountNormalization"" -> 0.530530026|>"	"<|""Polynomial"" -> 1 + ^180 + ^727, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^4 + ^728, ""CountNormalization"" -> 0.4522920633|>"	"<|""Polynomial"" -> 1 + ^58 + ^729, ""CountNormalization"" -> 0.8433034234|>"	"<|""Polynomial"" -> 1 + ^147 + ^730, ""CountNormalization"" -> 0.5847734262|>"	"<|""Polynomial"" -> 1 + ^2 + ^6 + ^8 + ^731, ""CountNormalization"" -> 0.9975690758|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^7 + ^732, ""CountNormalization"" -> 0.4200004402|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^8 + ^733, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^10 + ^13 + ^14 + ^734, ""CountNormalization"" -> 0.6662770175|>"	"<|""Polynomial"" -> 1 + ^44 + ^735, ""CountNormalization"" -> 0.8029927847|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^13 + ^736, ""CountNormalization"" -> 0.4868007579|>"	"<|""Polynomial"" -> 1 + ^5 + ^737, ""CountNormalization"" -> 0.9455604679|>"	"<|""Polynomial"" -> 1 + ^347 + ^738, ""CountNormalization"" -> 0.5267164972|>"	"<|""Polynomial"" -> 1 + ^8 + ^16 + ^18 + ^739, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^153 + ^740, ""CountNormalization"" -> 0.4513302549|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^9 + ^741, ""CountNormalization"" -> 0.8461006751|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^12 + ^742, ""CountNormalization"" -> 0.638811494|>"	"<|""Polynomial"" -> 1 + ^90 + ^743, ""CountNormalization"" -> 0.9993275042|>"	"<|""Polynomial"" -> 1 +  + ^11 + ^13 + ^744, ""CountNormalization"" -> 0.39404297|>"	"<|""Polynomial"" -> 1 + ^258 + ^745, ""CountNormalization"" -> 0.9677419355|>"	"<|""Polynomial"" -> 1 + ^351 + ^746, ""CountNormalization"" -> 0.666655608|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^10 + ^747, ""CountNormalization"" -> 0.8403388912|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^15 + ^748, ""CountNormalization"" -> 0.497849514|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^749, ""CountNormalization"" -> 0.9921046202|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^16 + ^750, ""CountNormalization"" -> 0.4937961742|>"	"<|""Polynomial"" -> 1 + ^18 + ^751, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^3 + ^20 + ^21 + ^752, ""CountNormalization"" -> 0.497785829|>"	"<|""Polynomial"" -> 1 + ^158 + ^753, ""CountNormalization"" -> 0.8551627433|>"	"<|""Polynomial"" -> 1 + ^19 + ^754, ""CountNormalization"" -> 0.6512089942|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^12 + ^755, ""CountNormalization"" -> 0.9670245461|>"	"<|""Polynomial"" -> 1 + ^349 + ^756, ""CountNormalization"" -> 0.3497181106|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^757, ""CountNormalization"" -> 0.9999998963|>"	"<|""Polynomial"" -> 1 +  + ^12 + ^17 + ^758, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 1 + ^98 + ^759, ""CountNormalization"" -> 0.7934092534|>"	"<|""Polynomial"" -> 1 + ^3 + ^13 + ^26 + ^760, ""CountNormalization"" -> 0.4246591637|>"	"<|""Polynomial"" -> 1 + ^3 + ^761, ""CountNormalization"" -> 0.9996168433|>"	"<|""Polynomial"" -> 1 + ^83 + ^762, ""CountNormalization"" -> 0.5709522823|>"	"<|""Polynomial"" -> 1 + ^9 + ^14 + ^16 + ^763, ""CountNormalization"" -> 0.9921259829|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^6 + ^764, ""CountNormalization"" -> 0.5318015818|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^11 + ^765, ""CountNormalization"" -> 0.8021283453|>"	"<|""Polynomial"" -> 1 + ^9 + ^19 + ^22 + ^766, ""CountNormalization"" -> 0.6666662039|>"	"<|""Polynomial"" -> 1 + ^168 + ^767, ""CountNormalization"" -> 0.9998462868|>"	"<|""Polynomial"" -> 1 + ^4 + ^17 + ^19 + ^768, ""CountNormalization"" -> 0.3861962846|>"	"<|""Polynomial"" -> 1 + ^120 + ^769, ""CountNormalization"" -> 0.9999999994|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^14 + ^770, ""CountNormalization"" -> 0.5254867002|>"	"<|""Polynomial"" -> 1 + ^6 + ^15 + ^17 + ^771, ""CountNormalization"" -> 0.856587353|>"	"<|""Polynomial"" -> 1 + ^7 + ^772, ""CountNormalization"" -> 0.5323861893|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^10 + ^773, ""CountNormalization"" -> 0.9999997486|>"	"<|""Polynomial"" -> 1 + ^185 + ^774, ""CountNormalization"" -> 0.5321280111|>"	"<|""Polynomial"" -> 1 + ^367 + ^775, ""CountNormalization"" -> 0.9623931455|>"	"<|""Polynomial"" -> 1 + ^3 + ^12 + ^17 + ^776, ""CountNormalization"" -> 0.4994514433|>"	"<|""Polynomial"" -> 1 + ^29 + ^777, ""CountNormalization"" -> 0.8438843635|>"	"<|""Polynomial"" -> 1 + ^375 + ^778, ""CountNormalization"" -> 0.6666666547|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^10 + ^779, ""CountNormalization"" -> 0.999281524|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^16 + ^780, ""CountNormalization"" -> 0.3341192352|>"	"<|""Polynomial"" -> 1 + ^2 + ^16 + ^17 + ^781, ""CountNormalization"" -> 0.9457701405|>"	"<|""Polynomial"" -> 1 + ^329 + ^782, ""CountNormalization"" -> 0.652162681|>"	"<|""Polynomial"" -> 1 + ^68 + ^783, ""CountNormalization"" -> 0.8398663273|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^13 + ^784, ""CountNormalization"" -> 0.4610126133|>"	"<|""Polynomial"" -> 1 + ^92 + ^785, ""CountNormalization"" -> 0.9677419342|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^15 + ^786, ""CountNormalization"" -> 0.5679903834|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^7 + ^787, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^3 + ^10 + ^17 + ^788, ""CountNormalization"" -> 0.5331390829|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^789, ""CountNormalization"" -> 0.8571066465|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^9 + ^790, ""CountNormalization"" -> 0.586139197|>"	"<|""Polynomial"" -> 1 + ^30 + ^791, ""CountNormalization"" -> 0.9911487258|>"	"<|""Polynomial"" -> 1 + ^13 + ^17 + ^23 + ^792, ""CountNormalization"" -> 0.3269549029|>"	"<|""Polynomial"" -> 1 + ^253 + ^793, ""CountNormalization"" -> 0.9996362979|>"	"<|""Polynomial"" -> 1 + ^143 + ^794, ""CountNormalization"" -> 0.6662000865|>"	"<|""Polynomial"" -> 1 + ^14 + ^15 + ^20 + ^795, ""CountNormalization"" -> 0.823734899|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^9 + ^796, ""CountNormalization"" -> 0.5326641573|>"	"<|""Polynomial"" -> 1 + ^4 + ^10 + ^12 + ^797, ""CountNormalization"" -> 0.9999999995|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^7 + ^798, ""CountNormalization"" -> 0.5508667567|>"	"<|""Polynomial"" -> 1 + ^25 + ^799, ""CountNormalization"" -> 0.9993454614|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^14 + ^800, ""CountNormalization"" -> 0.4207739349|>"	"<|""Polynomial"" -> 1 + ^217 + ^801, ""CountNormalization"" -> 0.8454009107|>"	"<|""Polynomial"" -> 1 + ^12 + ^13 + ^15 + ^802, ""CountNormalization"" -> 0.6666666666|>"	"<|""Polynomial"" -> 1 + ^2 + ^9 + ^14 + ^803, ""CountNormalization"" -> 0.9430323039|>"	"<|""Polynomial"" -> 1 + ^295 + ^804, ""CountNormalization"" -> 0.4197004297|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^8 + ^805, ""CountNormalization"" -> 0.9256647732|>"	"<|""Polynomial"" -> 1 + ^141 + ^806, ""CountNormalization"" -> 0.6661871716|>"	"<|""Polynomial"" -> 1 + ^7 + ^807, ""CountNormalization"" -> 0.8571424841|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^22 + ^808, ""CountNormalization"" -> 0.5013403136|>"	"<|""Polynomial"" -> 1 + ^15 + ^809, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^299 + ^810, ""CountNormalization"" -> 0.4589974366|>"	"<|""Polynomial"" -> 1 + ^8 + ^10 + ^12 + ^811, ""CountNormalization"" -> 0.9999969327|>"	"<|""Polynomial"" -> 1 + ^167 + ^812, ""CountNormalization"" -> 0.4834469734|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^10 + ^813, ""CountNormalization"" -> 0.857107311|>"	"<|""Polynomial"" -> 1 + ^145 + ^814, ""CountNormalization"" -> 0.6261842031|>"	"<|""Polynomial"" -> 1 + ^333 + ^815, ""CountNormalization"" -> 0.9677341131|>"	"<|""Polynomial"" -> 1 + ^5 + ^15 + ^23 + ^816, ""CountNormalization"" -> 0.3795260051|>"	"<|""Polynomial"" -> 1 + ^52 + ^817, ""CountNormalization"" -> 0.9975747841|>"	"<|""Polynomial"" -> 1 + ^119 + ^818, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^16 + ^819, ""CountNormalization"" -> 0.8236307404|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^12 + ^820, ""CountNormalization"" -> 0.4516171258|>"	"<|""Polynomial"" -> 1 + ^2 + ^11 + ^15 + ^821, ""CountNormalization"" -> 0.9999999976|>"	"<|""Polynomial"" -> 1 + ^5 + ^16 + ^22 + ^822, ""CountNormalization"" -> 0.5701773967|>"	"<|""Polynomial"" -> 1 + ^9 + ^823, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^3 + ^11 + ^14 + ^824, ""CountNormalization"" -> 0.5019467029|>"	"<|""Polynomial"" -> 1 + ^38 + ^825, ""CountNormalization"" -> 0.7764501572|>"	"<|""Polynomial"" -> 1 + ^255 + ^826, ""CountNormalization"" -> 0.6450056434|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^12 + ^827, ""CountNormalization"" -> 0.9999848847|>"	"<|""Polynomial"" -> 1 + ^205 + ^828, ""CountNormalization"" -> 0.3668389303|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^4 + ^829, ""CountNormalization"" -> 0.9999862925|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^17 + ^830, ""CountNormalization"" -> 0.5811020727|>"	"<|""Polynomial"" -> 1 + ^49 + ^831, ""CountNormalization"" -> 0.8566266733|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^13 + ^832, ""CountNormalization"" -> 0.4861405339|>"	"<|""Polynomial"" -> 1 + ^149 + ^833, ""CountNormalization"" -> 0.9879184574|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^12 + ^834, ""CountNormalization"" -> 0.5714268122|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^14 + ^835, ""CountNormalization"" -> 0.9677414702|>"	"<|""Polynomial"" -> 1 + ^2 + ^9 + ^10 + ^836, ""CountNormalization"" -> 0.4976112604|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^8 + ^837, ""CountNormalization"" -> 0.8453202928|>"	"<|""Polynomial"" -> 1 + ^61 + ^838, ""CountNormalization"" -> 0.6657585755|>"	"<|""Polynomial"" -> 1 + ^54 + ^839, ""CountNormalization"" -> 0.9999627547|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^11 + ^840, ""CountNormalization"" -> 0.2976166868|>"	"<|""Polynomial"" -> 1 + ^144 + ^841, ""CountNormalization"" -> 0.9943292159|>"	"<|""Polynomial"" -> 1 + ^47 + ^842, ""CountNormalization"" -> 0.6665083511|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^11 + ^843, ""CountNormalization"" -> 0.8571322649|>"	"<|""Polynomial"" -> 1 + ^11 + ^16 + ^18 + ^844, ""CountNormalization"" -> 0.5331833091|>"	"<|""Polynomial"" -> 1 + ^2 + ^845, ""CountNormalization"" -> 0.9673852811|>"	"<|""Polynomial"" -> 1 + ^10 + ^12 + ^13 + ^846, ""CountNormalization"" -> 0.5317063646|>"	"<|""Polynomial"" -> 1 + ^136 + ^847, ""CountNormalization"" -> 0.9370365781|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^11 + ^848, ""CountNormalization"" -> 0.4949577614|>"	"<|""Polynomial"" -> 1 + ^253 + ^849, ""CountNormalization"" -> 0.8570021002|>"	"<|""Polynomial"" -> 1 + ^111 + ^850, ""CountNormalization"" -> 0.5827160713|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^13 + ^851, ""CountNormalization"" -> 0.9743290494|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^8 + ^852, ""CountNormalization"" -> 0.4206197865|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^10 + ^853, ""CountNormalization"" -> 0.9999999995|>"	"<|""Polynomial"" -> 1 + ^3 + ^5 + ^7 + ^854, ""CountNormalization"" -> 0.6460355052|>"	"<|""Polynomial"" -> 1 + ^29 + ^855, ""CountNormalization"" -> 0.807114048|>"	"<|""Polynomial"" -> 1 + ^3 + ^10 + ^19 + ^856, ""CountNormalization"" -> 0.5005945715|>"	"<|""Polynomial"" -> 1 + ^119 + ^857, ""CountNormalization"" -> 0.9998541636|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^16 + ^858, ""CountNormalization"" -> 0.5237079931|>"	"<|""Polynomial"" -> 1 + ^4 + ^15 + ^17 + ^859, ""CountNormalization"" -> 0.9999998614|>"	"<|""Polynomial"" -> 1 + ^2 + ^11 + ^14 + ^860, ""CountNormalization"" -> 0.453740975|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^861, ""CountNormalization"" -> 0.8476425429|>"	"<|""Polynomial"" -> 1 + ^349 + ^862, ""CountNormalization"" -> 0.6657010705|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^6 + ^863, ""CountNormalization"" -> 0.999999873|>"	"<|""Polynomial"" -> 1 + ^6 + ^10 + ^21 + ^864, ""CountNormalization"" -> 0.34710068|>"	"<|""Polynomial"" -> 1 +  + ^865, ""CountNormalization"" -> 0.9677399665|>"	"<|""Polynomial"" -> 1 + ^75 + ^866, ""CountNormalization"" -> 0.6666664317|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^9 + ^867, ""CountNormalization"" -> 0.8483419877|>"	"<|""Polynomial"" -> 1 + ^145 + ^868, ""CountNormalization"" -> 0.4943152191|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^11 + ^869, ""CountNormalization"" -> 0.9454223151|>"	"<|""Polynomial"" -> 1 + ^11 + ^16 + ^17 + ^870, ""CountNormalization"" -> 0.4865539285|>"	"<|""Polynomial"" -> 1 + ^378 + ^871, ""CountNormalization"" -> 0.9998141274|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^16 + ^872, ""CountNormalization"" -> 0.5018713942|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^7 + ^873, ""CountNormalization"" -> 0.8453177633|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^12 + ^874, ""CountNormalization"" -> 0.6523901435|>"	"<|""Polynomial"" -> 1 +  + ^8 + ^12 + ^875, ""CountNormalization"" -> 0.9444677347|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^14 + ^876, ""CountNormalization"" -> 0.4187133763|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^6 + ^877, ""CountNormalization"" -> 0.9999707984|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^20 + ^878, ""CountNormalization"" -> 0.6666664819|>"	"<|""Polynomial"" -> 1 + ^11 + ^879, ""CountNormalization"" -> 0.8566525897|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^15 + ^880, ""CountNormalization"" -> 0.4021936165|>"	"<|""Polynomial"" -> 1 + ^78 + ^881, ""CountNormalization"" -> 0.9999621656|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^11 + ^882, ""CountNormalization"" -> 0.5150154219|>"	"<|""Polynomial"" -> 1 + ^12 + ^16 + ^17 + ^883, ""CountNormalization"" -> 0.9998710354|>"	"<|""Polynomial"" -> 1 + ^173 + ^884, ""CountNormalization"" -> 0.5134445132|>"	"<|""Polynomial"" -> 1 +  + ^7 + ^8 + ^885, ""CountNormalization"" -> 0.8238098087|>"	"<|""Polynomial"" -> 1 + ^8 + ^9 + ^13 + ^886, ""CountNormalization"" -> 0.665901403|>"	"<|""Polynomial"" -> 1 + ^147 + ^887, ""CountNormalization"" -> 0.9999999382|>"	"<|""Polynomial"" -> 1 + ^10 + ^18 + ^19 + ^888, ""CountNormalization"" -> 0.389937914|>"	"<|""Polynomial"" -> 1 + ^169 + ^889, ""CountNormalization"" -> 0.9921259843|>"	"<|""Polynomial"" -> 1 + ^5 + ^13 + ^18 + ^890, ""CountNormalization"" -> 0.5829334304|>"	"<|""Polynomial"" -> 1 + ^3 + ^10 + ^12 + ^891, ""CountNormalization"" -> 0.794767215|>"	"<|""Polynomial"" -> 1 + ^31 + ^892, ""CountNormalization"" -> 0.5332548374|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^11 + ^893, ""CountNormalization"" -> 0.9993511798|>"	"<|""Polynomial"" -> 1 + ^173 + ^894, ""CountNormalization"" -> 0.5709486947|>"	"<|""Polynomial"" -> 1 + ^12 + ^895, ""CountNormalization"" -> 0.9643279366|>"	"<|""Polynomial"" -> 1 + ^16 + ^21 + ^23 + ^896, ""CountNormalization"" -> 0.4616609035|>"	"<|""Polynomial"" -> 1 + ^113 + ^897, ""CountNormalization"" -> 0.8267914461|>"	"<|""Polynomial"" -> 1 + ^207 + ^898, ""CountNormalization"" -> 0.666662561|>"	"<|""Polynomial"" -> 1 + ^5 + ^15 + ^18 + ^899, ""CountNormalization"" -> 0.9943270553|>"	"<|""Polynomial"" -> 1 +  + ^900, ""CountNormalization"" -> 0.3098636329|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^13 + ^901, ""CountNormalization"" -> 0.9998207143|>"	"<|""Polynomial"" -> 1 + ^9 + ^16 + ^20 + ^902, ""CountNormalization"" -> 0.6218936974|>"	"<|""Polynomial"" -> 1 + ^160 + ^903, ""CountNormalization"" -> 0.8458122549|>"	"<|""Polynomial"" -> 1 +  + ^11 + ^15 + ^904, ""CountNormalization"" -> 0.4994985614|>"	"<|""Polynomial"" -> 1 + ^117 + ^905, ""CountNormalization"" -> 0.9677107199|>"	"<|""Polynomial"" -> 1 + ^187 + ^906, ""CountNormalization"" -> 0.5707531406|>"	"<|""Polynomial"" -> 1 + ^2 + ^10 + ^12 + ^907, ""CountNormalization"" -> 0.999999145|>"	"<|""Polynomial"" -> 1 + ^143 + ^908, ""CountNormalization"" -> 0.5332336556|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^14 + ^909, ""CountNormalization"" -> 0.844008421|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^15 + ^910, ""CountNormalization"" -> 0.553197495|>"	"<|""Polynomial"" -> 1 + ^204 + ^911, ""CountNormalization"" -> 0.9994514154|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^20 + ^912, ""CountNormalization"" -> 0.3857428361|>"	"<|""Polynomial"" -> 1 + ^91 + ^913, ""CountNormalization"" -> 0.9401109847|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^4 + ^914, ""CountNormalization"" -> 0.6666666622|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^8 + ^915, ""CountNormalization"" -> 0.8207569812|>"	"<|""Polynomial"" -> 1 + ^8 + ^12 + ^17 + ^916, ""CountNormalization"" -> 0.5331388171|>"	"<|""Polynomial"" -> 1 + ^7 + ^10 + ^12 + ^917, ""CountNormalization"" -> 0.9881740394|>"	"<|""Polynomial"" -> 1 + ^77 + ^918, ""CountNormalization"" -> 0.5257233491|>"	"<|""Polynomial"" -> 1 + ^36 + ^919, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^21 + ^920, ""CountNormalization"" -> 0.4178430136|>"	"<|""Polynomial"" -> 1 + ^221 + ^921, ""CountNormalization"" -> 0.8571427784|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^7 + ^922, ""CountNormalization"" -> 0.666413016|>"	"<|""Polynomial"" -> 1 + ^13 + ^14 + ^16 + ^923, ""CountNormalization"" -> 0.999332163|>"	"<|""Polynomial"" -> 1 + ^8 + ^10 + ^13 + ^924, ""CountNormalization"" -> 0.3600783926|>"	"<|""Polynomial"" -> 1 + ^7 + ^15 + ^16 + ^925, ""CountNormalization"" -> 0.9612652137|>"	"<|""Polynomial"" -> 1 + ^365 + ^926, ""CountNormalization"" -> 0.6666064812|>"	"<|""Polynomial"" -> 1 + ^403 + ^927, ""CountNormalization"" -> 0.845382519|>"	"<|""Polynomial"" -> 1 + ^3 + ^11 + ^17 + ^928, ""CountNormalization"" -> 0.4880574987|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^11 + ^929, ""CountNormalization"" -> 0.9999231183|>"	"<|""Polynomial"" -> 1 + ^11 + ^14 + ^18 + ^930, ""CountNormalization"" -> 0.4959864462|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^10 + ^931, ""CountNormalization"" -> 0.9920426935|>"	"<|""Polynomial"" -> 1 + ^275 + ^932, ""CountNormalization"" -> 0.5317696271|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^16 + ^933, ""CountNormalization"" -> 0.8571197299|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^22 + ^934, ""CountNormalization"" -> 0.6666666414|>"	"<|""Polynomial"" -> 1 + ^417 + ^935, ""CountNormalization"" -> 0.9134388007|>"	"<|""Polynomial"" -> 1 + ^7 + ^13 + ^16 + ^936, ""CountNormalization"" -> 0.3395918114|>"	"<|""Polynomial"" -> 1 + ^217 + ^937, ""CountNormalization"" -> 0.9999644263|>"	"<|""Polynomial"" -> 1 + ^207 + ^938, ""CountNormalization"" -> 0.6460354331|>"	"<|""Polynomial"" -> 1 + ^4 + ^5 + ^7 + ^939, ""CountNormalization"" -> 0.8566866084|>"	"<|""Polynomial"" -> 1 + ^3 + ^16 + ^17 + ^940, ""CountNormalization"" -> 0.4552459699|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^11 + ^941, ""CountNormalization"" -> 0.9998671802|>"	"<|""Polynomial"" -> 1 + ^13 + ^14 + ^19 + ^942, ""CountNormalization"" -> 0.5713884475|>"	"<|""Polynomial"" -> 1 + ^24 + ^943, ""CountNormalization"" -> 0.9785161597|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^14 + ^944, ""CountNormalization"" -> 0.4989303461|>"	"<|""Polynomial"" -> 1 + ^79 + ^945, ""CountNormalization"" -> 0.7883241539|>"	"<|""Polynomial"" -> 1 + ^10 + ^11 + ^23 + ^946, ""CountNormalization"" -> 0.6274040005|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^9 + ^947, ""CountNormalization"" -> 0.9999999966|>"	"<|""Polynomial"" -> 1 + ^15 + ^16 + ^18 + ^948, ""CountNormalization"" -> 0.4201828403|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^8 + ^949, ""CountNormalization"" -> 0.9975560432|>"	"<|""Polynomial"" -> 1 + ^9 + ^14 + ^16 + ^950, ""CountNormalization"" -> 0.5793023505|>"	"<|""Polynomial"" -> 1 + ^260 + ^951, ""CountNormalization"" -> 0.8570527359|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^16 + ^952, ""CountNormalization"" -> 0.4593749457|>"	"<|""Polynomial"" -> 1 + ^168 + ^953, ""CountNormalization"" -> 0.9999970852|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^11 + ^954, ""CountNormalization"" -> 0.5286842834|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^7 + ^955, ""CountNormalization"" -> 0.9651590363|>"	"<|""Polynomial"" -> 1 + ^305 + ^956, ""CountNormalization"" -> 0.5318443872|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^10 + ^957, ""CountNormalization"" -> 0.8058162097|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^14 + ^958, ""CountNormalization"" -> 0.6664753261|>"	"<|""Polynomial"" -> 1 + ^143 + ^959, ""CountNormalization"" -> 0.9920809363|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^13 + ^960, ""CountNormalization"" -> 0.3230481709|>"	"<|""Polynomial"" -> 1 + ^18 + ^961, ""CountNormalization"" -> 0.9999999995|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^15 + ^962, ""CountNormalization"" -> 0.6629797917|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^20 + ^963, ""CountNormalization"" -> 0.8454011165|>"	"<|""Polynomial"" -> 1 + ^103 + ^964, ""CountNormalization"" -> 0.5331118646|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^15 + ^965, ""CountNormalization"" -> 0.9677414178|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^12 + ^966, ""CountNormalization"" -> 0.5353945469|>"	"<|""Polynomial"" -> 1 + ^36 + ^967, ""CountNormalization"" -> 0.9999550927|>"	"<|""Polynomial"" -> 1 + ^13 + ^18 + ^19 + ^968, ""CountNormalization"" -> 0.470491253|>"	"<|""Polynomial"" -> 1 + ^74 + ^969, ""CountNormalization"" -> 0.8468932979|>"	"<|""Polynomial"" -> 1 + ^2 + ^5 + ^12 + ^970, ""CountNormalization"" -> 0.5854594103|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^6 + ^971, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^115 + ^972, ""CountNormalization"" -> 0.3763787219|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^13 + ^973, ""CountNormalization"" -> 0.9921259843|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^21 + ^974, ""CountNormalization"" -> 0.6665298022|>"	"<|""Polynomial"" -> 1 + ^19 + ^975, ""CountNormalization"" -> 0.8111213237|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^21 + ^976, ""CountNormalization"" -> 0.4985223913|>"	"<|""Polynomial"" -> 1 + ^15 + ^977, ""CountNormalization"" -> 0.9999982959|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^11 + ^978, ""CountNormalization"" -> 0.5714230663|>"	"<|""Polynomial"" -> 1 + ^14 + ^16 + ^18 + ^979, ""CountNormalization"" -> 0.9457742354|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^8 + ^980, ""CountNormalization"" -> 0.4137908346|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^12 + ^981, ""CountNormalization"" -> 0.8454010895|>"	"<|""Polynomial"" -> 1 + ^277 + ^982, ""CountNormalization"" -> 0.6659883843|>"	"<|""Polynomial"" -> 1 + ^230 + ^983, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^10 + ^23 + ^41 + ^984, ""CountNormalization"" -> 0.389979873|>"	"<|""Polynomial"" -> 1 + ^222 + ^985, ""CountNormalization"" -> 0.9675989024|>"	"<|""Polynomial"" -> 1 + ^10 + ^12 + ^19 + ^986, ""CountNormalization"" -> 0.651495627|>"	"<|""Polynomial"" -> 1 + ^12 + ^13 + ^16 + ^987, ""CountNormalization"" -> 0.8472496767|>"	"<|""Polynomial"" -> 1 + ^121 + ^988, ""CountNormalization"" -> 0.5159158191|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^10 + ^989, ""CountNormalization"" -> 0.9763153314|>"	"<|""Polynomial"" -> 1 + ^11 + ^16 + ^17 + ^990, ""CountNormalization"" -> 0.428608526|>"	"<|""Polynomial"" -> 1 + ^39 + ^991, ""CountNormalization"" -> 0.9999999999|>"	"<|""Polynomial"" -> 1 + ^7 + ^14 + ^27 + ^992, ""CountNormalization"" -> 0.4996977837|>"	"<|""Polynomial"" -> 1 + ^62 + ^993, ""CountNormalization"" -> 0.8570914795|>"	"<|""Polynomial"" -> 1 + ^223 + ^994, ""CountNormalization"" -> 0.6459398352|>"	"<|""Polynomial"" -> 1 +  + ^11 + ^16 + ^995, ""CountNormalization"" -> 0.9677418681|>"	"<|""Polynomial"" -> 1 +  + ^8 + ^11 + ^996, ""CountNormalization"" -> 0.4174585668|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^12 + ^997, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^101 + ^998, ""CountNormalization"" -> 0.666629967|>"	"<|""Polynomial"" -> 1 + ^59 + ^999, ""CountNormalization"" -> 0.8409934456|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^16 + ^1000, ""CountNormalization"" -> 0.4225193403|>"	"<|""Polynomial"" -> 1 + ^17 + ^1001, ""CountNormalization"" -> 0.9370255175|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^1002, ""CountNormalization"" -> 0.5714264497|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^13 + ^1003, ""CountNormalization"" -> 0.9999868135|>"	"<|""Polynomial"" -> 1 + ^12 + ^14 + ^17 + ^1004, ""CountNormalization"" -> 0.5321546937|>"	"<|""Polynomial"" -> 1 + ^7 + ^16 + ^18 + ^1005, ""CountNormalization"" -> 0.823448615|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^5 + ^1006, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 1 + ^75 + ^1007, ""CountNormalization"" -> 0.9998264087|>"	"<|""Polynomial"" -> 1 + ^10 + ^13 + ^27 + ^1008, ""CountNormalization"" -> 0.3219716867|>"	"<|""Polynomial"" -> 1 + ^55 + ^1009, ""CountNormalization"" -> 0.9999997105|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^10 + ^1010, ""CountNormalization"" -> 0.5864350577|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^10 + ^1011, ""CountNormalization"" -> 0.8570954315|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^9 + ^1012, ""CountNormalization"" -> 0.4887611873|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^9 + ^1013, ""CountNormalization"" -> 0.9998354993|>"	"<|""Polynomial"" -> 1 + ^385 + ^1014, ""CountNormalization"" -> 0.5637761848|>"	"<|""Polynomial"" -> 1 + ^186 + ^1015, ""CountNormalization"" -> 0.9412165524|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^15 + ^1016, ""CountNormalization"" -> 0.5009288272|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^9 + ^1017, ""CountNormalization"" -> 0.8450868314|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^12 + ^1018, ""CountNormalization"" -> 0.6660123777|>"	"<|""Polynomial"" -> 1 +  + ^8 + ^10 + ^1019, ""CountNormalization"" -> 0.9994963086|>"	"<|""Polynomial"" -> 1 + ^461 + ^1020, ""CountNormalization"" -> 0.3432684859|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^1021, ""CountNormalization"" -> 0.9999755135|>"	"<|""Polynomial"" -> 1 + ^317 + ^1022, ""CountNormalization"" -> 0.6441956394|>"	"<|""Polynomial"" -> 1 + ^7 + ^1023, ""CountNormalization"" -> 0.8106623364|>"	"<|""Polynomial"" -> 1 + ^9 + ^22 + ^23 + ^1024, ""CountNormalization"" -> 0.4992178677|>"	"<|""Polynomial"" -> 1 + ^294 + ^1025, ""CountNormalization"" -> 0.9653653038|>"	"<|""Polynomial"" -> 1 + ^35 + ^1026, ""CountNormalization"" -> 0.5329600499|>"	"<|""Polynomial"" -> 1 + ^6 + ^12 + ^13 + ^1027, ""CountNormalization"" -> 0.999505793|>"	"<|""Polynomial"" -> 1 + ^203 + ^1028, ""CountNormalization"" -> 0.5333333132|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^9 + ^1029, ""CountNormalization"" -> 0.8478701371|>"	"<|""Polynomial"" -> 1 + ^93 + ^1030, ""CountNormalization"" -> 0.5859407966|>"	"<|""Polynomial"" -> 1 + ^68 + ^1031, ""CountNormalization"" -> 0.9995152667|>"	"<|""Polynomial"" -> 1 + ^10 + ^18 + ^25 + ^1032, ""CountNormalization"" -> 0.3918507449|>"	"<|""Polynomial"" -> 1 + ^108 + ^1033, ""CountNormalization"" -> 0.9999948779|>"	"<|""Polynomial"" -> 1 + ^75 + ^1034, ""CountNormalization"" -> 0.6269520543|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^12 + ^1035, ""CountNormalization"" -> 0.7940580022|>"	"<|""Polynomial"" -> 1 + ^411 + ^1036, ""CountNormalization"" -> 0.4878903423|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^12 + ^1037, ""CountNormalization"" -> 0.9999923705|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^15 + ^1038, ""CountNormalization"" -> 0.5690951864|>"	"<|""Polynomial"" -> 1 + ^21 + ^1039, ""CountNormalization"" -> 0.9999998032|>"	"<|""Polynomial"" -> 1 +  + ^19 + ^26 + ^1040, ""CountNormalization"" -> 0.4137063731|>"	"<|""Polynomial"" -> 1 + ^412 + ^1041, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + ^439 + ^1042, ""CountNormalization"" -> 0.6666653365|>"	"<|""Polynomial"" -> 1 + ^6 + ^7 + ^10 + ^1043, ""CountNormalization"" -> 0.9916403921|>"	"<|""Polynomial"" -> 1 + ^41 + ^1044, ""CountNormalization"" -> 0.3696298038|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^13 + ^1045, ""CountNormalization"" -> 0.9090038189|>"	"<|""Polynomial"" -> 1 + ^13 + ^14 + ^16 + ^1046, ""CountNormalization"" -> 0.6666666352|>"	"<|""Polynomial"" -> 1 + ^10 + ^1047, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + ^3 + ^21 + ^24 + ^1048, ""CountNormalization"" -> 0.4995753859|>"	"<|""Polynomial"" -> 1 + ^141 + ^1049, ""CountNormalization"" -> 0.9999680342|>"	"<|""Polynomial"" -> 1 + ^2 + ^9 + ^17 + ^1050, ""CountNormalization"" -> 0.4665543407|>"	"<|""Polynomial"" -> 1 + ^10 + ^12 + ^13 + ^1051, ""CountNormalization"" -> 0.9999997203|>"	"<|""Polynomial"" -> 1 + ^291 + ^1052, ""CountNormalization"" -> 0.532962087|>"	"<|""Polynomial"" -> 1 +  + ^9 + ^10 + ^1053, ""CountNormalization"" -> 0.833225225|>"	"<|""Polynomial"" -> 1 + ^105 + ^1054, ""CountNormalization"" -> 0.6662775212|>"	"<|""Polynomial"" -> 1 + ^24 + ^1055, ""CountNormalization"" -> 0.9672198409|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^14 + ^1056, ""CountNormalization"" -> 0.3581430416|>"	"<|""Polynomial"" -> 1 + ^198 + ^1057, ""CountNormalization"" -> 0.9920470688|>"	"<|""Polynomial"" -> 1 + ^27 + ^1058, ""CountNormalization"" -> 0.6524421053|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^6 + ^1059, ""CountNormalization"" -> 0.8571419373|>"	"<|""Polynomial"" -> 1 + ^8 + ^13 + ^17 + ^1060, ""CountNormalization"" -> 0.4528295852|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^10 + ^1061, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^5 + ^1062, ""CountNormalization"" -> 0.5331860818|>"	"<|""Polynomial"" -> 1 + ^168 + ^1063, ""CountNormalization"" -> 0.9999999993|>"	"<|""Polynomial"" -> 1 + ^6 + ^9 + ^18 + ^1064, ""CountNormalization"" -> 0.4614544994|>"	"<|""Polynomial"" -> 1 + ^463 + ^1065, ""CountNormalization"" -> 0.8239837296|>"	"<|""Polynomial"" -> 1 + ^3 + ^9 + ^10 + ^1066, ""CountNormalization"" -> 0.6582579224|>"	"<|""Polynomial"" -> 1 + ^8 + ^9 + ^13 + ^1067, ""CountNormalization"" -> 0.9456914882|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^15 + ^1068, ""CountNormalization"" -> 0.4188217692|>"	"<|""Polynomial"" -> 1 + ^8 + ^16 + ^18 + ^1069, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^11 + ^14 + ^15 + ^1070, ""CountNormalization"" -> 0.5855435139|>"	"<|""Polynomial"" -> 1 + ^50 + ^1071, ""CountNormalization"" -> 0.8230171572|>"	"<|""Polynomial"" -> 1 + ^8 + ^9 + ^19 + ^1072, ""CountNormalization"" -> 0.4980259674|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^12 + ^1073, ""CountNormalization"" -> 0.9898703389|>"	"<|""Polynomial"" -> 1 + ^10 + ^14 + ^17 + ^1074, ""CountNormalization"" -> 0.5692276619|>"	"<|""Polynomial"" -> 1 + ^5 + ^14 + ^15 + ^1075, ""CountNormalization"" -> 0.9626956261|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^17 + ^1076, ""CountNormalization"" -> 0.532759432|>"	"<|""Polynomial"" -> 1 + ^7 + ^9 + ^10 + ^1077, ""CountNormalization"" -> 0.8559462685|>"	"<|""Polynomial"" -> 1 + ^445 + ^1078, ""CountNormalization"" -> 0.6091125436|>"	"<|""Polynomial"" -> 1 + ^230 + ^1079, ""CountNormalization"" -> 0.9938906219|>"	"<|""Polynomial"" -> 1 + ^3 + ^12 + ^29 + ^1080, ""CountNormalization"" -> 0.2926472473|>"	"<|""Polynomial"" -> 1 + ^24 + ^1081, ""CountNormalization"" -> 0.9780844624|>"	"<|""Polynomial"" -> 1 + ^407 + ^1082, ""CountNormalization"" -> 0.6666589519|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^16 + ^1083, ""CountNormalization"" -> 0.8571140417|>"	"<|""Polynomial"" -> 1 + ^189 + ^1084, ""CountNormalization"" -> 0.5330000174|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^10 + ^1085, ""CountNormalization"" -> 0.943250312|>"	"<|""Polynomial"" -> 1 + ^4 + ^9 + ^10 + ^1086, ""CountNormalization"" -> 0.5703988425|>"	"<|""Polynomial"" -> 1 + ^112 + ^1087, ""CountNormalization"" -> 0.9999999067|>"	"<|""Polynomial"" -> 1 + ^10 + ^21 + ^22 + ^1088, ""CountNormalization"" -> 0.494892416|>"	"<|""Polynomial"" -> 1 + ^91 + ^1089, ""CountNormalization"" -> 0.7943487659|>"	"<|""Polynomial"" -> 1 + ^79 + ^1090, ""CountNormalization"" -> 0.5857907842|>"	"<|""Polynomial"" -> 1 + ^5 + ^10 + ^12 + ^1091, ""CountNormalization"" -> 0.9999885409|>"	"<|""Polynomial"" -> 1 + ^23 + ^1092, ""CountNormalization"" -> 0.3716260729|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^7 + ^1093, ""CountNormalization"" -> 0.9999681582|>"	"<|""Polynomial"" -> 1 + ^261 + ^1094, ""CountNormalization"" -> 0.666544812|>"	"<|""Polynomial"" -> 1 + ^139 + ^1095, ""CountNormalization"" -> 0.8218200875|>"	"<|""Polynomial"" -> 1 + ^6 + ^15 + ^24 + ^1096, ""CountNormalization"" -> 0.5014684343|>"	"<|""Polynomial"" -> 1 + ^14 + ^1097, ""CountNormalization"" -> 0.9999987661|>"	"<|""Polynomial"" -> 1 + ^83 + ^1098, ""CountNormalization"" -> 0.532459286|>"	"<|""Polynomial"" -> 1 +  + ^9 + ^16 + ^1099, ""CountNormalization"" -> 0.992125983|>"	"<|""Polynomial"" -> 1 + ^14 + ^16 + ^19 + ^1100, ""CountNormalization"" -> 0.4231400191|>"	"<|""Polynomial"" -> 1 + ^4 + ^7 + ^9 + ^1101, ""CountNormalization"" -> 0.8570633421|>"	"<|""Polynomial"" -> 1 + ^117 + ^1102, ""CountNormalization"" -> 0.6514265379|>"	"<|""Polynomial"" -> 1 + ^65 + ^1103, ""CountNormalization"" -> 0.9995468962|>"	"<|""Polynomial"" -> 1 + ^7 + ^12 + ^21 + ^1104, ""CountNormalization"" -> 0.3763233514|>"	"<|""Polynomial"" -> 1 + ^21 + ^1105, ""CountNormalization"" -> 0.9668871022|>"	"<|""Polynomial"" -> 1 + ^195 + ^1106, ""CountNormalization"" -> 0.6457950914|>"	"<|""Polynomial"" -> 1 + ^10 + ^11 + ^23 + ^1107, ""CountNormalization"" -> 0.8453344878|>"	"<|""Polynomial"" -> 1 + ^327 + ^1108, ""CountNormalization"" -> 0.5328496484|>"	"<|""Polynomial"" -> 1 + ^3 + ^14 + ^17 + ^1109, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^16 + ^1110, ""CountNormalization"" -> 0.4948427074|>"	"<|""Polynomial"" -> 1 + ^13 + ^1111, ""CountNormalization"" -> 0.9457743039|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^15 + ^1112, ""CountNormalization"" -> 0.5009840435|>"	"<|""Polynomial"" -> 1 + ^107 + ^1113, ""CountNormalization"" -> 0.8461010449|>"	"<|""Polynomial"" -> 1 + ^6 + ^10 + ^19 + ^1114, ""CountNormalization"" -> 0.6663123416|>"	"<|""Polynomial"" -> 1 + ^3 + ^15 + ^18 + ^1115, ""CountNormalization"" -> 0.9676831042|>"	"<|""Polynomial"" -> 1 + ^479 + ^1116, ""CountNormalization"" -> 0.3785857188|>"	"<|""Polynomial"" -> 1 + ^4 + ^10 + ^12 + ^1117, ""CountNormalization"" -> 0.9999813492|>"	"<|""Polynomial"" -> 1 + ^5 + ^7 + ^9 + ^1118, ""CountNormalization"" -> 0.6647264419|>"	"<|""Polynomial"" -> 1 + ^283 + ^1119, ""CountNormalization"" -> 0.8567174595|>"	"<|""Polynomial"" -> 1 + ^5 + ^11 + ^13 + ^1120, ""CountNormalization"" -> 0.3897826002|>"	"<|""Polynomial"" -> 1 + ^62 + ^1121, ""CountNormalization"" -> 0.9998810413|>"	"<|""Polynomial"" -> 1 +  + ^13 + ^16 + ^1122, ""CountNormalization"" -> 0.5236502163|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^14 + ^1123, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^5 + ^12 + ^22 + ^1124, ""CountNormalization"" -> 0.5322214682|>"	"<|""Polynomial"" -> 1 + ^3 + ^8 + ^15 + ^1125, ""CountNormalization"" -> 0.8084912438|>"	"<|""Polynomial"" -> 1 + ^309 + ^1126, ""CountNormalization"" -> 0.6666666667|>"	"<|""Polynomial"" -> 1 + ^27 + ^1127, ""CountNormalization"" -> 0.97025787|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^7 + ^1128, ""CountNormalization"" -> 0.3933316411|>"	"<|""Polynomial"" -> 1 + ^103 + ^1129, ""CountNormalization"" -> 0.999970475|>"	"<|""Polynomial"" -> 1 + ^551 + ^1130, ""CountNormalization"" -> 0.5836777429|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^10 + ^1131, ""CountNormalization"" -> 0.8410233508|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^20 + ^1132, ""CountNormalization"" -> 0.5329555498|>"	"<|""Polynomial"" -> 1 + ^4 + ^6 + ^11 + ^1133, ""CountNormalization"" -> 0.9457743035|>"	"<|""Polynomial"" -> 1 + ^4 + ^13 + ^16 + ^1134, ""CountNormalization"" -> 0.5110397127|>"	"<|""Polynomial"" -> 1 + ^9 + ^1135, ""CountNormalization"" -> 0.9677419355|>"	"<|""Polynomial"" -> 1 + ^2 + ^4 + ^9 + ^1136, ""CountNormalization"" -> 0.4989067345|>"	"<|""Polynomial"" -> 1 + ^277 + ^1137, ""CountNormalization"" -> 0.8571428571|>"	"<|""Polynomial"" -> 1 + ^31 + ^1138, ""CountNormalization"" -> 0.6666015245|>"	"<|""Polynomial"" -> 1 + ^5 + ^12 + ^13 + ^1139, ""CountNormalization"" -> 0.9999851691|>"	"<|""Polynomial"" -> 1 + ^539 + ^1140, ""CountNormalization"" -> 0.3471640648|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^12 + ^1141, ""CountNormalization"" -> 0.9921179614|>"	"<|""Polynomial"" -> 1 + ^357 + ^1142, ""CountNormalization"" -> 0.6664526662|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^7 + ^1143, ""CountNormalization"" -> 0.844973657|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^15 + ^1144, ""CountNormalization"" -> 0.4586945214|>"	"<|""Polynomial"" -> 1 + ^227 + ^1145, ""CountNormalization"" -> 0.9677410492|>"	"<|""Polynomial"" -> 1 + ^131 + ^1146, ""CountNormalization"" -> 0.5699365733|>"	"<|""Polynomial"" -> 1 + ^3 + ^6 + ^7 + ^1147, ""CountNormalization"" -> 0.9955058302|>"	"<|""Polynomial"" -> 1 + ^23 + ^1148, ""CountNormalization"" -> 0.4879707869|>"	"<|""Polynomial"" -> 1 + ^3 + ^17 + ^20 + ^1149, ""CountNormalization"" -> 0.8571422621|>"	"<|""Polynomial"" -> 1 +  + ^4 + ^13 + ^1150, ""CountNormalization"" -> 0.5689474632|>"	"<|""Polynomial"" -> 1 + ^90 + ^1151, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^10 + ^11 + ^17 + ^1152, ""CountNormalization"" -> 0.3460145852|>"	"<|""Polynomial"" -> 1 + ^241 + ^1153, ""CountNormalization"" -> 0.9999962616|>"	"<|""Polynomial"" -> 1 + ^75 + ^1154, ""CountNormalization"" -> 0.6664652701|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^13 + ^1155, ""CountNormalization"" -> 0.7568992936|>"	"<|""Polynomial"" -> 1 + ^307 + ^1156, ""CountNormalization"" -> 0.5288334141|>"	"<|""Polynomial"" -> 1 + ^3 + ^7 + ^8 + ^1157, ""CountNormalization"" -> 0.9998779148|>"	"<|""Polynomial"" -> 1 + ^245 + ^1158, ""CountNormalization"" -> 0.571325075|>"	"<|""Polynomial"" -> 1 + ^66 + ^1159, ""CountNormalization"" -> 0.9999927001|>"	"<|""Polynomial"" -> 1 + ^6 + ^15 + ^30 + ^1160, ""CountNormalization"" -> 0.4209860455|>"	"<|""Polynomial"" -> 1 + ^365 + ^1161, ""CountNormalization"" -> 0.843228028|>"	"<|""Polynomial"" -> 1 + ^11 + ^16 + ^18 + ^1162, ""CountNormalization"" -> 0.6400466249|>"	"<|""Polynomial"" -> 1 +  + ^10 + ^11 + ^1163, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^19 + ^1164, ""CountNormalization"" -> 0.4198498804|>"	"<|""Polynomial"" -> 1 +  + ^6 + ^8 + ^1165, ""CountNormalization"" -> 0.9670415126|>"	"<|""Polynomial"" -> 1 + ^189 + ^1166, ""CountNormalization"" -> 0.6235633796|>"	"<|""Polynomial"" -> 1 + ^133 + ^1167, ""CountNormalization"" -> 0.8571428418|>"	"<|""Polynomial"" -> 1 + ^2 + ^7 + ^12 + ^1168, ""CountNormalization"" -> 0.4968321681|>"	"<|""Polynomial"" -> 1 + ^114 + ^1169, ""CountNormalization"" -> 0.9921233328|>"	"<|""Polynomial"" -> 1 + ^9 + ^11 + ^12 + ^1170, ""CountNormalization"" -> 0.453895798|>"	"<|""Polynomial"" -> 1 +  + ^5 + ^6 + ^1171, ""CountNormalization"" -> 1.|>"	"<|""Polynomial"" -> 1 + ^5 + ^13 + ^15 + ^1172, ""CountNormalization"" -> 0.5322564758|>"	"<|""Polynomial"" -> 1 + ^5 + ^14 + ^17 + ^1173, ""CountNormalization"" -> 0.8302656077|>"	"<|""Polynomial"" -> 1 + ^133 + ^1174, ""CountNormalization"" -> 0.6666649951|>"	"<|""Polynomial"" -> 1 + ^476 + ^1175, ""CountNormalization"" -> 0.9649706165|>"	"<|""Polynomial"" -> 1 +  + ^2 + ^19 + ^1176, ""CountNormalization"" -> 0.3633189218|>"	"<|""Polynomial"" -> 1 + ^16 + ^1177, ""CountNormalization"" -> 0.9457738947|>"	"<|""Polynomial"" -> 1 + ^375 + ^1178, ""CountNormalization"" -> 0.6666545259|>"	"<|""Polynomial"" -> 1 + ^6 + ^8 + ^15 + ^1179, ""CountNormalization"" -> 0.8421569044|>"	"<|""Polynomial"" -> 1 + ^3 + ^4 + ^6 + ^1180, ""CountNormalization"" -> 0.4569639323|>"	"<|""Polynomial"" -> 1 + ^6 + ^11 + ^17 + ^1181, ""CountNormalization"" -> 0.9999997892|>"	"<|""Polynomial"" -> 1 + ^3 + ^11 + ^15 + ^1182, ""CountNormalization"" -> 0.5713508362|>"	"<|""Polynomial"" -> 1 + ^87 + ^1183, ""CountNormalization"" -> 0.9906367931|>"	"<|""Polynomial"" -> 1 + ^2 + ^3 + ^5 + ^1184, ""CountNormalization"" -> 0.4932995212|>"	"<|""Polynomial"" -> 1 + ^134 + ^1185, ""CountNormalization"" -> 0.8230324369|>"	"<|""Polynomial"" -> 1 + ^171 + ^1186, ""CountNormalization"" -> 0.6660986445|>"	"<|""Polynomial"" -> 1 + ^4 + ^8 + ^13 + ^1187, ""CountNormalization"" -> 0.9999960909|>"	"<|""Polynomial"" -> 1 + ^413 + ^1188, ""CountNormalization"" -> 0.3505079353|>"	"<|""Polynomial"" -> 1 +  + ^3 + ^8 + ^1189, ""CountNormalization"" -> 0.994254823|>"	"<|""Polynomial"" -> 1 + ^233 + ^1190, ""CountNormalization"" -> 0.5559499341|>"	"<|""Polynomial"" -> 1 + ^196 + ^1191, ""CountNormalization"" -> 0.8566109365|>"	"<|""Polynomial"" -> 1 + ^7 + ^8 + ^9 + ^1192, ""CountNormalization"" -> 0.5012588994|>"	"<|""Polynomial"" -> 1 + ^173 + ^1193, ""CountNormalization"" -> 0.9999917822|>"	"<|""Polynomial"" -> 1 + ^12 + ^14 + ^15 + ^1194, ""CountNormalization"" -> 0.5714284586|>"	"<|""Polynomial"" -> 1 + ^5 + ^6 + ^13 + ^1195, ""CountNormalization"" -> 0.9650393835|>"	"<|""Polynomial"" -> 1 + ^519 + ^1196, ""CountNormalization"" -> 0.504570589|>"	"<|""Polynomial"" -> 1 + ^2 + ^8 + ^9 + ^1197, ""CountNormalization"" -> 0.8361958199|>"	"<|""Polynomial"" -> 1 + ^5 + ^9 + ^10 + ^1198, ""CountNormalization"" -> 0.6666666649|>"	"<|""Polynomial"" -> 1 + ^114 + ^1199, ""CountNormalization"" -> 0.9453800603|>"	"<|""Polynomial"" -> 1 + ^5 + ^8 + ^23 + ^1200, ""CountNormalization"" -> 0.318578911|>"