Asked by APpreciate student
Hi! Thank you very much!
My question is:
how do you find the antiderivative of 1 / (square root[1-(x^2)])
aka
antideriv( [1/(x^2)] ^ -1)
THank you!!
My question is:
how do you find the antiderivative of 1 / (square root[1-(x^2)])
aka
antideriv( [1/(x^2)] ^ -1)
THank you!!
Answers
Answered by
bobpursley
aka?
think of a right triangle, hypotenuse 1, opposite side x, adjacent side sqrt(1-x^2)
so cosineTheta=sqrt(1-x^2)
takeing derivative
- sinTheta dTheta/dx=1/sqrt(1-x^2) * -x
but x= sinTheta
-sinTheta dTheta=-sinTheta *dx/sqrt(1-x^2)
or dTheta= dx/sqrt( )
so the integral is now INT dTheta which is Theta. But Theta is arcsin x
so the answer is arcsinx
think of a right triangle, hypotenuse 1, opposite side x, adjacent side sqrt(1-x^2)
so cosineTheta=sqrt(1-x^2)
takeing derivative
- sinTheta dTheta/dx=1/sqrt(1-x^2) * -x
but x= sinTheta
-sinTheta dTheta=-sinTheta *dx/sqrt(1-x^2)
or dTheta= dx/sqrt( )
so the integral is now INT dTheta which is Theta. But Theta is arcsin x
so the answer is arcsinx
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