General Distributivity Theorem/Examples/Sum of j from m to n by Sum of k from r to s

Example of General Distributivity Theorem

 * $\displaystyle \sum_{j \mathop = m}^n \sum_{k \mathop = r}^s j k = \frac 1 4 \paren {n \paren {n + 1} - \paren {m - 1} m} \paren {s \paren {s + 1} - \paren {r - 1} r}$

for $m \le n, r \le s$.