divide num and denom be cos^4x
u'll get
[ 0]
[ 
/4] sec
4x/(tan
4x+1) dx
=
[ 0][ /4] (tan
2x+1)sec
2x/(tan
4x+1) dx
Now put, tanx=t. therefore, sec2xdx=dt
Limits change frm t=0 to t=1
[0 ]
[ 1] (t^2+1)/(t^4+1) dt
Again divide the num and denom by t^2
[0 ][ 1] (1+1/t
2)/(t
2+1/t
2)dt
Now write t-1/t = u
t2+1/t2=(t-1/t)2 + 2 = u2+2
therefore, (1+1/t2)dt = du
Limits change frm u=-
to u = 0
[- ][ 0] du/(u
2+2)
= 1/
[ ]
2 * tan
-1(u/
[ ]2) |
-0............(its limit - infinity to zero)= 1/
[ ]
2 * (tan
-10 - tan
-1(-
))
=
/2
2
Moderation Team
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