Triangular Numbers which are Product of 3 Consecutive Integers/Mistake

Source Work

 * The Dictionary
 * $258,474,216$
 * $258,474,216$

Mistake

 * The largest triangular number to be the product of consecutive integers. The others are $6$, $120$, $210$, $990$ and $185 \, 136$.

This should read:
 * The largest triangular number to be the product of $3$ consecutive integers. The others are $6$, $120$, $210$, $990$ and $185 \, 136$.

This is the gist of the result quoted in the citation.

It remains to be investigated whether there exist triangular numbers which are the product of a different number of consecutive integers. If there are not, then this erratum is no erratum after all.