Answer:
The simplified form of given factorial expression is (N+3)!.
Step-by-step explanation:
The given expression is
[tex]\frac{(N+4)!}{N+4}[/tex]
The n! is defined as
[tex]n!=n(n-1)(n-2)...3(2)(1)[/tex]
[tex]n!=n(n-1)![/tex]
The given expression can be written as
[tex]\frac{(N+4)!}{N+4}=\frac{(N+4)(N+4-1)!}{N+4}[/tex]
[tex]\frac{(N+4)!}{N+4}=\frac{(N+4)(N+3)!}{N+4}[/tex]
Cancel out the common factors.
[tex]\frac{(N+4)!}{N+4}=(N+3)![/tex]
Therefore the simplified form of given factorial expression is (N+3)!.
