Question

How do you find the exact functional value sin 11/12 pi using the cosine sum or difference identity?

Answer 1

`color(red)(sin((11π)/12) = (sqrt3-1)/(2sqrt2))`

Explanation:

There are several different ways to answer this question.

I will arbitrarily use

`(11π)/12 = (8π)/12 + (3π)/12 = (2π)/3+π/4`

∴ `sin((11π)/12)= sin((2π)/3+π/4)`

The sine sum identity is:

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

∴ `sin((11π)/12) = sin((2π)/3)cos(π/4) + cos((2π)/3)sin(π/4)`

We can use the unit circle to work out the values.

(from www.algebra.com)

`sin((11π)/12) = sqrt3/2× sqrt2/2 + (-1/2) sqrt 2/2`

`sin((11π)/12) = sqrt2/4(sqrt 3-1)`

`sin((11π)/12) = (sqrt3-1)/(2sqrt2)`