Question

Question #de96e

Answer 1

Remember the definition of a factorial, and find where the denominator is a factor of the numerator. `= ((n+1)(n))/2`

Explanation:

It will be assumed that the problem is intended to read:

`((n+1)!)/((n-1)!2!`

Recall that `(n+1)! = (n+1)(n)(n-1)(n-2)...(1)`

Recall further that `(n-1)! = (n-1)(n-2)(n-3)...(1)`

Knowing that we can rewrite this:

`= ((n+1)(n)(n-1)!)/((n-1)!2!)`

`(n-1)!` cancels on top and bottom, giving:

`= ((n+1)(n))/(2!)`

2 factorial is simply 2 `(2! = 2*1)`

Thus this gives us:

`= ((n+1)(n))/2`