How do you simplify #tan(sin^-1(x))#?

1 Answer
Konstantinos Michailidis
May 27, 2016

Let #sin^-1x=theta# hence #x=sintheta#

For #0<x<1# we draw a right triangle with hypotenuse equal to 1 and the other side equals to #x# like the one in the Figure below.
From pythagorean theorem the other side is #sqrt(1-x^2)#

Now we know that

#tantheta=(sintheta)/(costheta)=(sintheta)/(sqrt(1-sin^2theta))#

Because #x=sintheta#

We have that

#tantheta=x/(sqrt(1-x^2))#

But from #sin^-1x=theta# we get

#tan(sin^-1x)=x/(sqrt(1-x^2)#

Figure

enter image source here

Related questions
See all questions in Basic Inverse Trigonometric Functions
Impact of this question
180857 views around the world
You can reuse this answer
Creative Commons License