Answer
$\dfrac{y^{4}\sqrt[]{y^3}}{6}$
Work Step by Step
$\bf{\text{Solution Outline:}}$
To simplify the given expression, $
\sqrt[]{\dfrac{y^{11}}{36}}
,$ find a factor of the radicand that is a perfect power of the index. Then extract the root of that factor. Note that all variables are assumed to represent positive real numbers.
$\bf{\text{Solution Details:}}$
Expressing the radicand of the expression above with a factor that is a perfect power of the index and then extracting the root of that factor results to
\begin{array}{l}\require{cancel}
\sqrt[]{\dfrac{y^{8}}{36}\cdot y^3}
\\\\=
\sqrt[]{\left( \dfrac{y^{4}}{6} \right)^2\cdot y^3}
\\\\=
\dfrac{y^{4}}{6}\sqrt[]{y^3}
\\\\=
\dfrac{y^{4}\sqrt[]{y^3}}{6}
.\end{array}