Yes, t = \sqrt{2x+3} is a good option. { t = \sqrt{2x+3} \Rightarrow t^2 = 2x+3 \Rightarrow x = {t^2-3\over2} \\ dx = t dt \\ \int{(1-t)t\over1+t}dt = - \int{{t^2-t}\over{t+1}}dt = -\int(t-2) dt - 2\int{dt\over t+1}} ...

You draw a triangle, rectangle. Be the hipot=  1 call  x  the side of  sin, the other is cos   And the angle is alfa = a.  From the triangle we gather the following relationships X = sin a   =>  dX = ...

Using \operatorname{sgn}(x) is just a (half-dirty) trick to put the two cases into one. Put in -1 vs. +1 for \operatorname{sgn}(x) and your eyes will be open.

The power rule says that the derivative of x^r with respect to x is rx^{r-1} Knowing that \frac{1}{\sqrt{x}}=x^{-\frac{1}{2}} The derivative of \sqrt{x}+C is, by the power rule \frac{1}{2}x^{-\frac{1}{2}} ...

Hints : Use \frac{1}{\sqrt{x}}=x^{\frac{-1}{2}} The second integrand is equal to x^{\frac{-1}{3}} The antiderivate of x^n is \frac{x^{n+1}}{n+1} for every real n\ne -1

substitute x+1=t^6 or x=t^6-1 then we get dx=6t^5dt and out integral will be \int\frac{1+t^3}{1-t^2}\cdot 6t^5dt note that \frac{1+t^3}{1-t^2}=\frac{1-t+t^2}{t-1} and write yout ...