Metamath Proof Explorer

Theorem srng1

Description: The conjugate of the ring identity is the identity. (This is sometimes taken as an axiom, and indeed the proof here follows because we defined *r to be a ring homomorphism, which preserves 1; nevertheless, it is redundant, as can be seen from the proof of issrngd .) (Contributed by Mario Carneiro, 6-Oct-2015)

Ref Expression
Hypotheses srng1.i ˙ = * R
srng1.t 1 ˙ = 1 R
Assertion srng1 R *-Ring ˙ 1 ˙ = 1 ˙

Proof

Step Hyp Ref Expression
1 srng1.i ˙ = * R
2 srng1.t 1 ˙ = 1 R
3 srngring R *-Ring R Ring
4 eqid Base R = Base R
5 4 2 ringidcl R Ring 1 ˙ Base R
6 eqid 𝑟𝑓 R = 𝑟𝑓 R
7 4 1 6 stafval 1 ˙ Base R 𝑟𝑓 R 1 ˙ = ˙ 1 ˙
8 3 5 7 3syl R *-Ring 𝑟𝑓 R 1 ˙ = ˙ 1 ˙
9 eqid opp r R = opp r R
10 9 6 srngrhm R *-Ring 𝑟𝑓 R R RingHom opp r R
11 9 2 oppr1 1 ˙ = 1 opp r R
12 2 11 rhm1 𝑟𝑓 R R RingHom opp r R 𝑟𝑓 R 1 ˙ = 1 ˙
13 10 12 syl R *-Ring 𝑟𝑓 R 1 ˙ = 1 ˙
14 8 13 eqtr3d R *-Ring ˙ 1 ˙ = 1 ˙