Question

How do you evaluate `sin^-1(sin((13pi)/10))`?

Answer 1

`-(3pi)/10`

Explanation:

The inverse sine function has domain `[-1,1]` which means it will have range `-pi/2<=y<=pi/2`

This means that any solutions we obtain must lie in this interval.

As a consequence of double angle formulae, `sin(x) = sin(pi-x)` so

`sin((13pi)/(10)) = sin(-(3pi)/10)`

Sine is `2pi` periodic so we can say that

`sin^(-1)(sin(x)) = x + 2npi, n in ZZ`

However any solutions must lie in the interval `-pi/2 <= y <= pi/2`.

There is no integer multiple of `2pi` we can add to `(13pi)/10` to get it within this interval so the only solution is `-(3pi)/10`.