expeq1d

Description: A nonnegative real number is one if and only if it is one when raised to a positive integer. (Contributed by SN, 3-Jul-2025)

	Ref	Expression
Hypotheses	expeq1d.a	\|- ( ph -> A e. RR )
	expeq1d.n	\|- ( ph -> N e. NN )
	expeq1d.0	\|- ( ph -> 0 <_ A )
Assertion	expeq1d	\|- ( ph -> ( ( A ^ N ) = 1 <-> A = 1 ) )

Proof

Step	Hyp	Ref	Expression
1		expeq1d.a	\|- ( ph -> A e. RR )
2		expeq1d.n	\|- ( ph -> N e. NN )
3		expeq1d.0	\|- ( ph -> 0 <_ A )
4	2	nnzd	\|- ( ph -> N e. ZZ )
5		1exp	\|- ( N e. ZZ -> ( 1 ^ N ) = 1 )
6	4 5	syl	\|- ( ph -> ( 1 ^ N ) = 1 )
7	6	eqeq2d	\|- ( ph -> ( ( A ^ N ) = ( 1 ^ N ) <-> ( A ^ N ) = 1 ) )
8	1	adantr	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> A e. RR )
9	3	adantr	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> 0 <_ A )
10		0ne1	\|- 0 =/= 1
11	10	a1i	\|- ( ph -> 0 =/= 1 )
12	2	0expd	\|- ( ph -> ( 0 ^ N ) = 0 )
13	11 12 6	3netr4d	\|- ( ph -> ( 0 ^ N ) =/= ( 1 ^ N ) )
14	13	adantr	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> ( 0 ^ N ) =/= ( 1 ^ N ) )
15		oveq1	\|- ( A = 0 -> ( A ^ N ) = ( 0 ^ N ) )
16	15	eqeq1d	\|- ( A = 0 -> ( ( A ^ N ) = ( 1 ^ N ) <-> ( 0 ^ N ) = ( 1 ^ N ) ) )
17	16	biimpac	\|- ( ( ( A ^ N ) = ( 1 ^ N ) /\ A = 0 ) -> ( 0 ^ N ) = ( 1 ^ N ) )
18	17	adantll	\|- ( ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) /\ A = 0 ) -> ( 0 ^ N ) = ( 1 ^ N ) )
19	14 18	mteqand	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> A =/= 0 )
20	8 9 19	ne0gt0d	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> 0 < A )
21	8 20	elrpd	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> A e. RR+ )
22		1rp	\|- 1 e. RR+
23	22	a1i	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> 1 e. RR+ )
24	2	adantr	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> N e. NN )
25		simpr	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> ( A ^ N ) = ( 1 ^ N ) )
26	21 23 24 25	exp11nnd	\|- ( ( ph /\ ( A ^ N ) = ( 1 ^ N ) ) -> A = 1 )
27	26	ex	\|- ( ph -> ( ( A ^ N ) = ( 1 ^ N ) -> A = 1 ) )
28	7 27	sylbird	\|- ( ph -> ( ( A ^ N ) = 1 -> A = 1 ) )
29		oveq1	\|- ( A = 1 -> ( A ^ N ) = ( 1 ^ N ) )
30	29	eqeq1d	\|- ( A = 1 -> ( ( A ^ N ) = 1 <-> ( 1 ^ N ) = 1 ) )
31	6 30	syl5ibrcom	\|- ( ph -> ( A = 1 -> ( A ^ N ) = 1 ) )
32	28 31	impbid	\|- ( ph -> ( ( A ^ N ) = 1 <-> A = 1 ) )

Metamath Proof Explorer

Theorem expeq1d

Proof