Question

How do you find the exact functional value csc (-15 degrees) using the cosine sum or difference identity?

Answer 1

`color(red)(csc(-15) = -sqrt2(1+sqrt3))`

Explanation:

`csc(-15) = -csc(15)`, since cosecant is an odd function.

`cscx = 1/sinx`

∴ `csc(-15) = -1/sin(15)`, so we can evaluate `sin(15)`.

`15 = 45-30`

∴ `sin(15) = sin(45-30)`

The sine difference identity is

`sin(A-B) = sinAcosB-cosAsinB`

∴ `sin(15) = sin(45)cos(30) – cos(45)sin(30)`

We can use the Unit Circle to evaluate these functions.

![Unit Circle](
(from www.algebra.com)

`sin(15) = sqrt2/2·sqrt3/2 – sqrt2/2·1/2 = sqrt2/4(sqrt3-1) = (sqrt3-1)/(2sqrt2)`

`csc(-15) = -1/sin(15) = -(2sqrt2)/(sqrt3-1) = -(2sqrt2)/(sqrt3-1)× (sqrt3+1)/(sqrt3+1)`

`csc(-15) = -(2sqrt2(sqrt3+1))/(3-1) = -(2sqrt2(1+sqrt3))/2`

`csc(-15) = -sqrt2(1+sqrt3)`