Metamath Proof Explorer


Theorem discsntermlem

Description: A singlegon is an element of the class of singlegons. The converse ( basrestermcfolem ) also holds. This is trivial if B is b ( abid ). (Contributed by Zhi Wang, 20-Oct-2025)

Ref Expression
Assertion discsntermlem x B = x B b | x b = x

Proof

Step Hyp Ref Expression
1 vsnex x V
2 eleq1 B = x B V x V
3 1 2 mpbiri B = x B V
4 3 exlimiv x B = x B V
5 eqeq1 b = B b = x B = x
6 5 exbidv b = B x b = x x B = x
7 6 elabg B V B b | x b = x x B = x
8 4 7 syl x B = x B b | x b = x x B = x
9 8 ibir x B = x B b | x b = x