Evaluate the following integrals. \int\sin^2x\cos^4xdx

tabita57i

tabita57i

Answered question

2021-10-05

Evaluate the following integrals.
sin2xcos4xdx

Answer & Explanation

2k1enyvp

2k1enyvp

Skilled2021-10-06Added 94 answers

To Determine: find the integral sin2xcos4xdx
Given: we have an integral sin2xcos4xdx
Explanation: we will solve the integral as follows
Put u=cosx then du=sinxdx also dusinx=dx
Also du1cos2x=dx
The integral will also be written as
sinxcos4xdx=(1cos2x)cos4xdx
=(1cos2x)1cos2xcos4xdx
Now putting the values we have
=u41u2du
Again putting u=sint then du=costdt
Integral becomes
=sin4(t)cos(t)costdt
=sin4(t)cos2(t)dt
=sin4(t)sin6(t)dt
=(sin4tdtsin6tdt)
We know that sinnxdx=cosxsinn1xn+n1nsinn2xdx
sin4tdv=14sin3tcost+38(t12sin(2t))

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