Sums of Powers by L'Hopital's Rule

For a positive integer $d$, let $p_d(n) := 0^d + 1^d + 2^d + \cdots + n^d$, i.e., $p_d(n)$ is the sum of the first $d^{\text{th}}$-powers up to $n$. It is well known that $p_d(n)$ is a polynomial of degree $d+1$ in $n$. While this is usually proved by induction, once $d$ is not small it is a challenge as one needs to know the polynomial for the inductive step. We show how this difficulty can be bypassed by giving a simple proof that $p_d(n)$ is a polynomial of degree $d+1$ in $n$ by using L'Hopital's rule, and show how we can then determine the coefficients by Cramer's rule.