Evaluating \int _{-\frac{\pi}{2}}^{\frac{\pi}{2}} \frac{\sin(x)+\cos(x)}{\sin^4(x)-4}dx

Gerald Ritter

Gerald Ritter

Answered question

2022-01-28

Evaluating π2π2sin(x)+cos(x)sin4(x)4dx

Answer & Explanation

Brynn Ortiz

Brynn Ortiz

Beginner2022-01-29Added 12 answers

Following a suggestion from the comments, you can reduce your integral to
π2π2cosxsin4(x)4dx
Now, do the substitution sinx=t and cosxdx=dt
votaren10

votaren10

Beginner2022-01-30Added 11 answers

sinxsin4x4dx=1(1u2)24du
cosxsin4x4dx=duu44=0.25duu220.25duu2+2
the first one is zero over a symmetric interval and for the second we have
I=0.2511duu220.2511duu2+2=142ln212+124tan112

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