prmdvdsexp

Description: A prime divides a positive power of an integer iff it divides the integer. (Contributed by Mario Carneiro, 24-Feb-2014) (Revised by Mario Carneiro, 17-Jul-2014)

		Ref	Expression
	Assertion	prmdvdsexp	$⊢ (P \in ℙ \land A \in ℤ \land N \in ℕ) \to (P ∥ A^{N} \leftrightarrow P ∥ A)$

Proof

Step	Hyp	Ref	Expression
1		oveq2	$⊢ m = 1 \to A^{m} = A^{1}$
2	1	breq2d	$⊢ m = 1 \to (P ∥ A^{m} \leftrightarrow P ∥ A^{1})$
3	2	bibi1d	$⊢ m = 1 \to ((P ∥ A^{m} \leftrightarrow P ∥ A) \leftrightarrow (P ∥ A^{1} \leftrightarrow P ∥ A))$
4	3	imbi2d	$⊢ m = 1 \to (((P \in ℙ \land A \in ℤ) \to (P ∥ A^{m} \leftrightarrow P ∥ A)) \leftrightarrow ((P \in ℙ \land A \in ℤ) \to (P ∥ A^{1} \leftrightarrow P ∥ A)))$
5		oveq2	$⊢ m = k \to A^{m} = A^{k}$
6	5	breq2d	$⊢ m = k \to (P ∥ A^{m} \leftrightarrow P ∥ A^{k})$
7	6	bibi1d	$⊢ m = k \to ((P ∥ A^{m} \leftrightarrow P ∥ A) \leftrightarrow (P ∥ A^{k} \leftrightarrow P ∥ A))$
8	7	imbi2d	$⊢ m = k \to (((P \in ℙ \land A \in ℤ) \to (P ∥ A^{m} \leftrightarrow P ∥ A)) \leftrightarrow ((P \in ℙ \land A \in ℤ) \to (P ∥ A^{k} \leftrightarrow P ∥ A)))$
9		oveq2	$⊢ m = k + 1 \to A^{m} = A^{k + 1}$
10	9	breq2d	$⊢ m = k + 1 \to (P ∥ A^{m} \leftrightarrow P ∥ A^{k + 1})$
11	10	bibi1d	$⊢ m = k + 1 \to ((P ∥ A^{m} \leftrightarrow P ∥ A) \leftrightarrow (P ∥ A^{k + 1} \leftrightarrow P ∥ A))$
12	11	imbi2d	$⊢ m = k + 1 \to (((P \in ℙ \land A \in ℤ) \to (P ∥ A^{m} \leftrightarrow P ∥ A)) \leftrightarrow ((P \in ℙ \land A \in ℤ) \to (P ∥ A^{k + 1} \leftrightarrow P ∥ A)))$
13		oveq2	$⊢ m = N \to A^{m} = A^{N}$
14	13	breq2d	$⊢ m = N \to (P ∥ A^{m} \leftrightarrow P ∥ A^{N})$
15	14	bibi1d	$⊢ m = N \to ((P ∥ A^{m} \leftrightarrow P ∥ A) \leftrightarrow (P ∥ A^{N} \leftrightarrow P ∥ A))$
16	15	imbi2d	$⊢ m = N \to (((P \in ℙ \land A \in ℤ) \to (P ∥ A^{m} \leftrightarrow P ∥ A)) \leftrightarrow ((P \in ℙ \land A \in ℤ) \to (P ∥ A^{N} \leftrightarrow P ∥ A)))$
17		zcn	$⊢ A \in ℤ \to A \in ℂ$
18	17	adantl	$⊢ (P \in ℙ \land A \in ℤ) \to A \in ℂ$
19	18	exp1d	$⊢ (P \in ℙ \land A \in ℤ) \to A^{1} = A$
20	19	breq2d	$⊢ (P \in ℙ \land A \in ℤ) \to (P ∥ A^{1} \leftrightarrow P ∥ A)$
21		nnnn0	$⊢ k \in ℕ \to k \in ℕ_{0}$
22		expp1	$⊢ (A \in ℂ \land k \in ℕ_{0}) \to A^{k + 1} = A^{k} A$
23	18 21 22	syl2an	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to A^{k + 1} = A^{k} A$
24	23	breq2d	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to (P ∥ A^{k + 1} \leftrightarrow P ∥ A^{k} A)$
25		simpll	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to P \in ℙ$
26		simpr	$⊢ (P \in ℙ \land A \in ℤ) \to A \in ℤ$
27		zexpcl	$⊢ (A \in ℤ \land k \in ℕ_{0}) \to A^{k} \in ℤ$
28	26 21 27	syl2an	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to A^{k} \in ℤ$
29		simplr	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to A \in ℤ$
30		euclemma	$⊢ (P \in ℙ \land A^{k} \in ℤ \land A \in ℤ) \to (P ∥ A^{k} A \leftrightarrow (P ∥ A^{k} \lor P ∥ A))$
31	25 28 29 30	syl3anc	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to (P ∥ A^{k} A \leftrightarrow (P ∥ A^{k} \lor P ∥ A))$
32	24 31	bitrd	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to (P ∥ A^{k + 1} \leftrightarrow (P ∥ A^{k} \lor P ∥ A))$
33		orbi1	$⊢ (P ∥ A^{k} \leftrightarrow P ∥ A) \to ((P ∥ A^{k} \lor P ∥ A) \leftrightarrow (P ∥ A \lor P ∥ A))$
34		oridm	$⊢ (P ∥ A \lor P ∥ A) \leftrightarrow P ∥ A$
35	33 34	bitrdi	$⊢ (P ∥ A^{k} \leftrightarrow P ∥ A) \to ((P ∥ A^{k} \lor P ∥ A) \leftrightarrow P ∥ A)$
36	35	bibi2d	$⊢ (P ∥ A^{k} \leftrightarrow P ∥ A) \to ((P ∥ A^{k + 1} \leftrightarrow (P ∥ A^{k} \lor P ∥ A)) \leftrightarrow (P ∥ A^{k + 1} \leftrightarrow P ∥ A))$
37	32 36	syl5ibcom	$⊢ ((P \in ℙ \land A \in ℤ) \land k \in ℕ) \to ((P ∥ A^{k} \leftrightarrow P ∥ A) \to (P ∥ A^{k + 1} \leftrightarrow P ∥ A))$
38	37	expcom	$⊢ k \in ℕ \to ((P \in ℙ \land A \in ℤ) \to ((P ∥ A^{k} \leftrightarrow P ∥ A) \to (P ∥ A^{k + 1} \leftrightarrow P ∥ A)))$
39	38	a2d	$⊢ k \in ℕ \to (((P \in ℙ \land A \in ℤ) \to (P ∥ A^{k} \leftrightarrow P ∥ A)) \to ((P \in ℙ \land A \in ℤ) \to (P ∥ A^{k + 1} \leftrightarrow P ∥ A)))$
40	4 8 12 16 20 39	nnind	$⊢ N \in ℕ \to ((P \in ℙ \land A \in ℤ) \to (P ∥ A^{N} \leftrightarrow P ∥ A))$
41	40	impcom	$⊢ ((P \in ℙ \land A \in ℤ) \land N \in ℕ) \to (P ∥ A^{N} \leftrightarrow P ∥ A)$
42	41	3impa	$⊢ (P \in ℙ \land A \in ℤ \land N \in ℕ) \to (P ∥ A^{N} \leftrightarrow P ∥ A)$

Metamath Proof Explorer

Theorem prmdvdsexp

Proof