How do you find the exact value of #arcsin(sin(2))#?

1 Answer
Apr 29, 2018

The exact value of #arcsin(sin(2))# is simply #2#.

Explanation:

Whenever we take the arcsin of sin, or the arccos of cos, or the inverse of any trig function, they always cancel each other out. So #arctan(tan(3))=3#, #arcsin(sin(1))=1#, and so on.

The reason for this is because to find the arcsin of a given number, for instance, #arcsinx#, we are basically asking "When will the sin of some number equal #x#?"

So with this problem, instead of #x# we have the arcsin of sin. Thus we are basically asking "When will the sin of some number equal #sin(2)#?"

As an equation with our desired answer being n, that looks like

#sin(n)=sin(2)#

So #n# is clearly #2#.

This also works no matter order we're taking #sin# and #arcsin# in. So for example,

#sin(arcsin(0))=0#