How do you find the antiderivative of cosx/cscxcosxcscx?

2 Answers
Ratnaker Mehta
Sep 27, 2016

-1/4cos2x+C.14cos2x+C.

Explanation:

Since, 1/cscx=sinx, and, 2sinxcosx=sin2x1cscx=sinx,and,2sinxcosx=sin2x, we have,

intcosx/cscxdx=intcosx*sinxdx=1/2int(2sinxcosx)dxcosxcscxdx=cosxsinxdx=12(2sinxcosx)dx

=1/2intsin2xdx=1/2((-cos2x)/2)=-1/4cos2x+C.=12sin2xdx=12(cos2x2)=14cos2x+C.

Jim H
Sep 27, 2016

Ratnaker M. has given the correct answer. Here are two other ways to get (and to write) the answer.

Explanation:

Once we realize that we need to evaluate

int cosx sinx dxcosxsinxdx

we have choices for how to evaluate this. One is shown in Ratnaker's answer.

OR let u=cosxu=cosx, so that du = -sinx dxdu=sinxdx and the integral becomes

- int u du = -u^2/2+C = -cos^2x +Cudu=u22+C=cos2x+C.

OR let u=sinxu=sinx, so that du = cosx dxdu=cosxdx and the integral becomes

int u du = u^2/2+C = sin^2x +Cudu=u22+C=sin2x+C.

Challenge show that all of these answers are "the same". (Hint: find the difference. -- it's in the CC.)

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