Interesting question. Let us denote the integral as follows; Now, there isn’t an any obvious manner in which we can approach this integral. The way that we will try to handle it is by messing around ...

\displaystyle\int\frac{{\left.{d}{x}\right.}}{{\sqrt{{x}}\cdot{\left(\sqrt{{x}}+{1}\right)}}}={2}{\ln{{\left(\sqrt{{x}}+{1}\right)}}}+{C} Explanation: \displaystyle{I}=\int\frac{{\left.{d}{x}\right.}}{{\sqrt{{x}}\cdot{\left(\sqrt{{x}}+{1}\right)}}} ...

since ...

HINT: As the Integrand involves \displaystyle \sqrt x=x^{\frac12},\sqrt[3]x=x^{\frac13} and \displaystyle\mathrm{gcd}\left(\frac12,\frac13\right)=\frac1{\mathrm{lcm}(2,3)}=\frac16 put \displaystyle y=x^{\frac16}\implies \sqrt x=y^3,\sqrt[3]x=y^2 ...

Hint: if we take the substitution u=x^{1/6} we get \int\frac{dx}{\sqrt[3]{x}+\sqrt{x}}=6\int\frac{u^{3}}{u+1}du then, use the identity \frac{u^{3}}{u+1}=u^{2}-u-\frac{1}{u+1}+1.

Hint: Instead of the substitution you used, start by letting x=t^6. The problem collapses. Remark: Your calculation was correct. After that, if you put t=u^3, the calculation can be ...