How the Trigonometry Functions Are Related

θ = 0.79 (≈

π

4

) radians, 45.°

The relationships between the six major trigonometric functions (sine, cosine, tangent, secant, cosecant, and cotangent) can all be seen on a single right-angled triangle inside a circle. As you drag the red point around the edge of the circle, you can see how the six functions increase or decrease in value. Only sine and cosine stay inside the circle; at some angles, the others escape to infinity.

Mouseover the function name to see its current value.

Details

The three less well-known functions in the family (cotangent, cosecant, secant) are the reciprocals of their better-known siblings:

csc(θ)=1/sin(θ)

,

sec(θ)=1/cos(θ)

,

cot(θ)=1/tan(θ)

. The diagram clearly shows why cotangent becomes very large as the tangent gets smaller, and why sine and its reciprocal cosecant are both 1 when the red point reaches the top of the circle. The secant goes to infinity as cosine gets close to 0.

External Links

Sine, Cosine, Tangent, and the Unit Circle

SOHCAHTOA Triangle

Trigonometric Functions (Wolfram MathWorld)

Trigonometric Functions for a Right Triangle

Permanent Citation

C. Ormullion

"How the Trigonometry Functions Are Related"
http://demonstrations.wolfram.com/HowTheTrigonometryFunctionsAreRelated/
Wolfram Demonstrations Project
Published: August 27, 2013