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Metamath Proof Explorer

Theorem cardadju

Description: The cardinal sum is equinumerous to an ordinal sum of the cardinals. (Contributed by Mario Carneiro, 6-Feb-2013) (Revised by Mario Carneiro, 28-Apr-2015)

		Ref	Expression
	Assertion	cardadju	\|- ( ( A e. dom card /\ B e. dom card ) -> ( A \|_\| B ) ~~ ( ( card ` A ) +o ( card ` B ) ) )

Proof

Step	Hyp	Ref	Expression
1		cardon	\|- ( card ` A ) e. On
2		cardon	\|- ( card ` B ) e. On
3		onadju	\|- ( ( ( card ` A ) e. On /\ ( card ` B ) e. On ) -> ( ( card ` A ) +o ( card ` B ) ) ~~ ( ( card ` A ) \|_\| ( card ` B ) ) )
4	1 2 3	mp2an	\|- ( ( card ` A ) +o ( card ` B ) ) ~~ ( ( card ` A ) \|_\| ( card ` B ) )
5		cardid2	\|- ( A e. dom card -> ( card ` A ) ~~ A )
6		cardid2	\|- ( B e. dom card -> ( card ` B ) ~~ B )
7		djuen	\|- ( ( ( card ` A ) ~~ A /\ ( card ` B ) ~~ B ) -> ( ( card ` A ) \|_\| ( card ` B ) ) ~~ ( A \|_\| B ) )
8	5 6 7	syl2an	\|- ( ( A e. dom card /\ B e. dom card ) -> ( ( card ` A ) \|_\| ( card ` B ) ) ~~ ( A \|_\| B ) )
9		entr	\|- ( ( ( ( card ` A ) +o ( card ` B ) ) ~~ ( ( card ` A ) \|_\| ( card ` B ) ) /\ ( ( card ` A ) \|_\| ( card ` B ) ) ~~ ( A \|_\| B ) ) -> ( ( card ` A ) +o ( card ` B ) ) ~~ ( A \|_\| B ) )
10	4 8 9	sylancr	\|- ( ( A e. dom card /\ B e. dom card ) -> ( ( card ` A ) +o ( card ` B ) ) ~~ ( A \|_\| B ) )
11	10	ensymd	\|- ( ( A e. dom card /\ B e. dom card ) -> ( A \|_\| B ) ~~ ( ( card ` A ) +o ( card ` B ) ) )