Database
REAL AND COMPLEX NUMBERS
Elementary limits and convergence
Falling and Rising Factorial
zrisefaccl
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zfallfaccl
Metamath Proof Explorer
Ascii
Unicode
Theorem
zrisefaccl
Description:
Closure law for rising factorial.
(Contributed by
Scott Fenton
, 5-Jan-2018)
Ref
Expression
Assertion
zrisefaccl
⊢
A
∈
ℤ
∧
N
∈
ℕ
0
→
A
N
‾
∈
ℤ
Proof
Step
Hyp
Ref
Expression
1
zsscn
⊢
ℤ
⊆
ℂ
2
1z
⊢
1
∈
ℤ
3
zmulcl
⊢
x
∈
ℤ
∧
y
∈
ℤ
→
x
y
∈
ℤ
4
nn0z
⊢
k
∈
ℕ
0
→
k
∈
ℤ
5
zaddcl
⊢
A
∈
ℤ
∧
k
∈
ℤ
→
A
+
k
∈
ℤ
6
4
5
sylan2
⊢
A
∈
ℤ
∧
k
∈
ℕ
0
→
A
+
k
∈
ℤ
7
1
2
3
6
risefaccllem
⊢
A
∈
ℤ
∧
N
∈
ℕ
0
→
A
N
‾
∈
ℤ