Metamath Proof Explorer


Theorem 0ring01eqbi2

Description: In a ring, 0 = 1 iff the ring contains only 0 . (Contributed by Jeff Madsen, 6-Jan-2011) (Revised by AV, 27-Jun-2026)

Ref Expression
Hypotheses 0ring.b B = Base R
0ring.0 0 ˙ = 0 R
0ring01eq.1 1 ˙ = 1 R
Assertion 0ring01eqbi2 R Ring B = 0 ˙ 1 ˙ = 0 ˙

Proof

Step Hyp Ref Expression
1 0ring.b B = Base R
2 0ring.0 0 ˙ = 0 R
3 0ring01eq.1 1 ˙ = 1 R
4 fveq2 B = 0 ˙ B = 0 ˙
5 2 fvexi 0 ˙ V
6 hashsng 0 ˙ V 0 ˙ = 1
7 5 6 ax-mp 0 ˙ = 1
8 4 7 eqtrdi B = 0 ˙ B = 1
9 1 2 3 0ring01eq R Ring B = 1 0 ˙ = 1 ˙
10 8 9 sylan2 R Ring B = 0 ˙ 0 ˙ = 1 ˙
11 10 eqcomd R Ring B = 0 ˙ 1 ˙ = 0 ˙
12 11 ex R Ring B = 0 ˙ 1 ˙ = 0 ˙
13 eqcom 1 ˙ = 0 ˙ 0 ˙ = 1 ˙
14 1 2 3 01eq0ring R Ring 0 ˙ = 1 ˙ B = 0 ˙
15 14 ex R Ring 0 ˙ = 1 ˙ B = 0 ˙
16 13 15 biimtrid R Ring 1 ˙ = 0 ˙ B = 0 ˙
17 12 16 impbid R Ring B = 0 ˙ 1 ˙ = 0 ˙