$\lim_{n \to \infty}\left({^n\mathrm{C}_0}{^n\mathrm{C}_1}\dots{^n\mathrm{C}_n}\right)^{\frac{1}{n(n+1)}}$ is equal to:
a) $e$
b) $2e$
c) $\sqrt e$
d) $e^2$
Though it looks really innocent at first sight, it certainly isn't.
Attempt: It's $\infty^{\infty}$ form.
I had tried taking the product raised to the power $\frac{1}{n(n+1)}$ as function $f(n)$. Then I took logarithm of both sides to see if things simplifying. Even after factoring out the extra factorials it wasn't easy.
Note that ${^n\mathrm{C}_x} = \binom{n}{x}$.