Question 1

How to solve this indefinite integral?

Question 2

$\displaystyle\int(3x)/(\cos^2(2x^2))\,\mathrm dx$

Substitute
y=2x^2 , so that
$\mathrm dy=4x\,\mathrm dx$ :

$\displaystyle\int(3x)/(\cos^2(2x^2))\,\mathrm dx=\frac34\int(4x)/(\cos^2(2x^2))\,\mathrm dx=\frac34\int(\mathrm dy)/(\cos^2y)$

Then

$\frac1{\cos^2y}=\sec^2y=(\mathrm d)/(\mathrm dy)[\tan y]$

so that the integral wrt
comes out to be

$\displaystyle\frac34\int\sec^2y\,\mathrm dy=\frac34\tan y+C$

Replace
to solve for the integral wrt
:

$\displaystyle\int(3x)/(\cos^2(2x^2))\,\mathrm dx=\boxed{\frac34\tan(2x^2)+C}$

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