Metamath Proof Explorer


Theorem elkarden

Description: Any member of the kard cardinal number of a set is equinumerous to the set. Contrast with cardne for card cardinals. (Contributed by BTernaryTau, 3-Jul-2026)

Ref Expression
Assertion elkarden Could not format assertion : No typesetting found for |- ( A e. ( kard ` B ) -> A ~~ B ) with typecode |-

Proof

Step Hyp Ref Expression
1 breq1 x = A x B A B
2 fveq2 x = A rank x = rank A
3 2 sseq1d x = A rank x rank y rank A rank y
4 3 imbi2d x = A y B rank x rank y y B rank A rank y
5 4 albidv x = A y y B rank x rank y y y B rank A rank y
6 1 5 anbi12d x = A x B y y B rank x rank y A B y y B rank A rank y
7 kardval2 Could not format ( kard ` B ) = { x | ( x ~~ B /\ A. y ( y ~~ B -> ( rank ` x ) C_ ( rank ` y ) ) ) } : No typesetting found for |- ( kard ` B ) = { x | ( x ~~ B /\ A. y ( y ~~ B -> ( rank ` x ) C_ ( rank ` y ) ) ) } with typecode |-
8 6 7 elab2g Could not format ( A e. ( kard ` B ) -> ( A e. ( kard ` B ) <-> ( A ~~ B /\ A. y ( y ~~ B -> ( rank ` A ) C_ ( rank ` y ) ) ) ) ) : No typesetting found for |- ( A e. ( kard ` B ) -> ( A e. ( kard ` B ) <-> ( A ~~ B /\ A. y ( y ~~ B -> ( rank ` A ) C_ ( rank ` y ) ) ) ) ) with typecode |-
9 8 ibi Could not format ( A e. ( kard ` B ) -> ( A ~~ B /\ A. y ( y ~~ B -> ( rank ` A ) C_ ( rank ` y ) ) ) ) : No typesetting found for |- ( A e. ( kard ` B ) -> ( A ~~ B /\ A. y ( y ~~ B -> ( rank ` A ) C_ ( rank ` y ) ) ) ) with typecode |-
10 9 simpld Could not format ( A e. ( kard ` B ) -> A ~~ B ) : No typesetting found for |- ( A e. ( kard ` B ) -> A ~~ B ) with typecode |-