Find $(x, a, b, c)$ if $x! = a! + b! + c!$
I want to know if there are more solutions to this apart from $(x, a, b, c) = (3, 2, 2, 2)$.
Find $(x, a, b, c)$ if $x! = a! + b! + c!$
I want to know if there are more solutions to this apart from $(x, a, b, c) = (3, 2, 2, 2)$.
First note that $a,b,c < x$, since $1 \leq n!$. This means that $a,b,c \leq x-1$. This implies that $x! = a! + b! + c! \leq 3 (x-1)! \implies x \leq 3$ Further, $x! = a! + b! + c! \geq 3 \implies x >2$. Hence, $x=3$ is the only possibility left.
If $x\ge 4$ then $a \le x-1$, and we have $a!\le x!/4$, and similarly for $b$ and $c$. Then $a!+b!+c!\le \frac{3}{4}x!$, so there are no solutions with $x\ge 4$, and the other cases can be eliminated quickly.