Metamath Proof Explorer


Theorem risefacval

Description: The value of the rising factorial function. (Contributed by Scott Fenton, 5-Jan-2018)

Ref Expression
Assertion risefacval A N 0 A N = k = 0 N 1 A + k

Proof

Step Hyp Ref Expression
1 oveq1 x = A x + k = A + k
2 1 prodeq2sdv x = A k = 0 n 1 x + k = k = 0 n 1 A + k
3 oveq1 n = N n 1 = N 1
4 3 oveq2d n = N 0 n 1 = 0 N 1
5 4 prodeq1d n = N k = 0 n 1 A + k = k = 0 N 1 A + k
6 df-risefac RiseFac = x , n 0 k = 0 n 1 x + k
7 prodex k = 0 N 1 A + k V
8 2 5 6 7 ovmpo A N 0 A N = k = 0 N 1 A + k