As suggested in RecklessReckoner's comment, let us first change variable x=u^3 then dx=3u^2du. So, I=\int \frac{\sqrt{1-x^{2/3}}}{x^{4/3}}dx=3\int\frac{ \sqrt{1-u^2}}{u^2}du Now, u=\sin(t), ...

As the comments have mentioned, use partial fractions. Also, note that the denominator x^3-3x^2+9x-27 factorises to (x-3)(x^2+9) which helps, so you want to find A, B and C such that \frac{A}{x-3}+\frac{Bx+c}{x^2+9}=\frac{\color{red}{+}3x^2\color{red}{-}9x\color{red}{+}27}{(x-3)(x^2+9)} ...

\displaystyle\int\frac{{-{2}{x}^{{3}}-{x}}}{{-{4}{x}^{{2}}+{2}{x}+{3}}}{\left.{d}{x}\right.}=\frac{{1}}{{4}}{x}^{{2}}+\frac{{1}}{{4}}{x}+\frac{{3}}{{8}}{\ln}{\left|{4}{x}^{{2}}-{2}{x}-{3}\right|}+\frac{{{3}\sqrt{{13}}}}{{52}}{\ln}{\left|-{4}{x}+\sqrt{{13}}+{1}\right|}-\frac{{{3}\sqrt{{13}}}}{{52}}{\ln}{\left|{4}{x}+\sqrt{{13}}-{1}\right|}+{C} ...

HINT: Enforce the substitution x=y^3 SPOILER ALERT: Scroll over the highlighted area to reveal the solution Enforcing the substitution x=y^3 yields\begin{align}\int \frac{1}{x^{1/3}(x^{1/3}-1)}\,dx&=3\int \frac{y}{y-1}\,dy\\\\&=3\left(x^{1/3}+\log\left(\left|x^{1/3}-1\right|\right)\right)+C\end{align}

One can be brought to the form \int u^a (1-u)^b \mathrm{d}u which is discussed in this answer of mine: \begin{eqnarray} J &=& \int \sqrt{x} \sqrt{1+x^2} \mathrm{d}x \stackrel{u=x^2}{=} \frac{1}{2} \int u^{-1/4} (1+u)^{1/2} \mathrm{d} u \\ &=& \frac{2}{3} u^{3/4} \cdot {}_2F_1\left(-\frac{1}{2}, \frac{3}{4}; \frac{7}{4}; -u\right) +\text{const.} = \frac{2}{3} x^{3/2} \cdot {}_2F_1\left(-\frac{1}{2}, \frac{3}{4}; \frac{7}{4}; -x^2\right) +\text{const.} \end{eqnarray} ...

Notice that \frac{d}{dx}(x^2+1) = 2x This suggests that we should split off an x from the numerator so that it cancels (after applying the substitution) \int_0^1\frac{x^3}{(x^2+1)^{\frac{3}{2}}}dx = \int_0^1\frac{(x^2+1-1)x}{(x^2+1)^{\frac{3}{2}}}dx ...