What's the integral of $int tanx * sec^3x * dx$ ?

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Answer 1 · 2015-11-13T23:49:36

I found: $1/(3cos(x))+c$

I would write it as:
$intsin(x)/cos(x)*1/cos^3(x)dx=intsin(x)/cos^4(x)dx=$
we can set $cos(x)=t$
so that:

$d[cos(x)]=dt=sin(x)dx$

and our integral becomes:
$=-int1/t^4dt=$
$=-intt^-4dt=$
$=-t^(-4+1)/(-4+1)+c=$
$=1/3t^-3+c=1/(3t^3)+c=$
but $t=cos(x)$ so:
$=1/(3cos^3(x))+c$

What's the integral of int tanx * sec^3x * dxint tanx * sec^3x * dx?