Given:
I=∫−2π2π1+ex96x2cos2xdx=π(aπ2+β)
Find: (a+β)2
Use the standard symmetry property
∫−mmf(x)dx=∫0m[f(x)+f(−x)]dx
with
f(x)=1+ex96x2cos2x.Then
f(−x)=1+e−x96x2cos2x
and therefore
f(x)+f(−x)=96x2cos2x(1+ex1+1+e−x1)=96x2cos2x.So the integral becomes
I=∫02π96x2cos2xdx.
Now use
cos2x=21+cos2x.
Hence
I=48∫02πx2dx+48∫02πx2cos2xdx.Evaluate the first term:
48∫02πx2dx=48[3x3]02π=48⋅24π3=2π3.For the second term, use integration by parts twice:
∫x2cos2xdx=2x2sin2x−∫xsin2xdx
and
∫xsin2xdx=−2xcos2x+4sin2x.
So
∫x2cos2xdx=2x2sin2x+2xcos2x−4sin2x.Now substitute the limits 0 to 2π:
∫02πx2cos2xdx=[2x2sin2x+2xcos2x−4sin2x]02π=−4π.
Thus
48∫02πx2cos2xdx=48(−4π)=−12π.Therefore
I=2π3−12π=π(2π2−12).
Comparing with
I=π(aπ2+β),
we get
a=2,β=−12.Hence
a+β=−10
and
(a+β)2=100.
Therefore, the correct option is A.