\displaystyle\frac{{2}}{{3}}{x}^{{\frac{{3}}{{2}}}}+\frac{{7}}{{8}}{x}^{{\frac{{8}}{{7}}}}+{C} Explanation: firstly change the roots to power form \displaystyle\int{\left(\sqrt{{x}}+{\sqrt[{7}]{{x}}}\right)}{\left.{d}{x}\right.} ...

Perhaps a little less messy: u^2:=4-\sqrt x\Longrightarrow 2udu=-\frac{dx}{2\sqrt x}\Longrightarrow dx=-4u(4-u^2)du\Longrightarrow \Longrightarrow \int\sqrt{4-\sqrt x}\;dx=-4\int u^2(4-u^2)\,du=-16\int u^2\,du+4\int u^4\,du= ...

We seek the inverse function of f(x)=\sqrt{x+\sqrt{x}}\tag*{} \begin{align}y&=\sqrt{x+\sqrt x}\\y^2&=x+\sqrt x\\y^2-x&=\sqrt x\\x&=y^4-2xy^2+x^2\\x^2-(2y^2+1)x-y^4&=0\\x&=\dfrac12((2y^2+1)\pm\sqrt{(2y^2+1)^2-4y^4}\\x&=\dfrac12(2y^2+1)-\dfrac12\sqrt{4y^2+1}\end{align}\tag*{} ...

You’ll do better with the first one if you correct the algebra: \sqrt{x\sqrt{2x}}=\left(x(2x)^{1/2}\right)^{1/2}=\left(x\cdot2^{1/2}x^{1/2}\right)^{1/2}=\left(2^{1/2}x^{3/2}\right)^{1/2}=2^{1/4}x^{3/4}\;. ...

\displaystyle{f{{\left({x}\right)}}}=\frac{{1}}{{25}}{\left({5}{x}-{2}\right)}^{{\frac{{3}}{{2}}}}{\left({2}{x}+\frac{{8}}{{15}}\right)}+{3}-\frac{{{1274}\sqrt{{{13}}}}}{{375}} Explanation: \displaystyle{f{{\left({x}\right)}}}=\int{\left.{d}{x}\right.}\qquad{x}\sqrt{{{5}{x}-{2}}} ...

\displaystyle{f{{\left({x}\right)}}}=\frac{{2}}{{15}}{\left({x}-{2}\right)}^{{\frac{{3}}{{2}}}}{\left({3}{x}+{4}\right)}+{C}. Explanation: \displaystyle{f{{\left({x}\right)}}}=\int{x}\sqrt{{{x}-{2}}}{\left.{d}{x}\right.}. ...