unhe1

Description: The union of two relations hereditary in a class is also hereditary in a class. (Contributed by RP, 28-Mar-2020)

		Ref	Expression
	Assertion	unhe1	$⊢ (R hereditary A \land S hereditary A) \to (R \cup S) hereditary A$

Step	Hyp	Ref	Expression
1		df-he	$⊢ R hereditary A \leftrightarrow R [A] \subseteq A$
2		df-he	$⊢ S hereditary A \leftrightarrow S [A] \subseteq A$
3		imaundir	$⊢ (R \cup S) [A] = R [A] \cup S [A]$
4		unss	$⊢ (R [A] \subseteq A \land S [A] \subseteq A) \leftrightarrow R [A] \cup S [A] \subseteq A$
5	4	biimpi	$⊢ (R [A] \subseteq A \land S [A] \subseteq A) \to R [A] \cup S [A] \subseteq A$
6	3 5	eqsstrid	$⊢ (R [A] \subseteq A \land S [A] \subseteq A) \to (R \cup S) [A] \subseteq A$
7	1 2 6	syl2anb	$⊢ (R hereditary A \land S hereditary A) \to (R \cup S) [A] \subseteq A$
8		df-he	$⊢ (R \cup S) hereditary A \leftrightarrow (R \cup S) [A] \subseteq A$
9	7 8	sylibr	$⊢ (R hereditary A \land S hereditary A) \to (R \cup S) hereditary A$

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