Consecutive Integers whose Product is Primorial/Mistake/Second Edition

Source Work

 * The Dictionary
 * $714$
 * $714$

Mistake

 * They discovered on computer that only primorial $1$, $2$, $3$, $5$ and $7$ can be represented as the product of consecutive numbers, up to primorial $3049$.

There are two problems here:
 * $(1): \quad$ The primorial of $17$, which the section discusses, is omitted from this sentence. It perhaps ought to start:
 * Apart from primorial $17$, ...


 * $(2): \quad$ The primorial of $1$ is generally accepted as being $1$. There are no two consecutive numbers whose product is $1$: $0 \times 1 = 0$, $1 \times 2 = 2$.