pm54.43lem

Description: In Theorem *54.43 of WhiteheadRussell p. 360, the number 1 is defined as the collection of all sets with cardinality 1 (i.e. all singletons; see card1 ), so that their A e. 1 means, in our notation, A e. { x | ( cardx ) = 1o } . Here we show that this is equivalent to A ~1o so that we can use the latter more convenient notation in pm54.43 . (Contributed by NM, 4-Nov-2013)

		Ref	Expression
	Assertion	pm54.43lem	$⊢ A \approx 1_{𝑜} \leftrightarrow A \in \{x \| card (x) = 1_{𝑜}\}$

Proof

Step	Hyp	Ref	Expression
1		carden2b	$⊢ A \approx 1_{𝑜} \to card (A) = card (1_{𝑜})$
2		1onn	$⊢ 1_{𝑜} \in ω$
3		cardnn	$⊢ 1_{𝑜} \in ω \to card (1_{𝑜}) = 1_{𝑜}$
4	2 3	ax-mp	$⊢ card (1_{𝑜}) = 1_{𝑜}$
5	1 4	eqtrdi	$⊢ A \approx 1_{𝑜} \to card (A) = 1_{𝑜}$
6	4	eqeq2i	$⊢ card (A) = card (1_{𝑜}) \leftrightarrow card (A) = 1_{𝑜}$
7	6	biimpri	$⊢ card (A) = 1_{𝑜} \to card (A) = card (1_{𝑜})$
8		1n0	$⊢ 1_{𝑜} \neq \emptyset$
9	8	neii	$⊢ \neg 1_{𝑜} = \emptyset$
10		eqeq1	$⊢ card (A) = 1_{𝑜} \to (card (A) = \emptyset \leftrightarrow 1_{𝑜} = \emptyset)$
11	9 10	mtbiri	$⊢ card (A) = 1_{𝑜} \to \neg card (A) = \emptyset$
12		ndmfv	$⊢ \neg A \in dom card \to card (A) = \emptyset$
13	11 12	nsyl2	$⊢ card (A) = 1_{𝑜} \to A \in dom card$
14		1on	$⊢ 1_{𝑜} \in On$
15		onenon	$⊢ 1_{𝑜} \in On \to 1_{𝑜} \in dom card$
16	14 15	ax-mp	$⊢ 1_{𝑜} \in dom card$
17		carden2	$⊢ (A \in dom card \land 1_{𝑜} \in dom card) \to (card (A) = card (1_{𝑜}) \leftrightarrow A \approx 1_{𝑜})$
18	13 16 17	sylancl	$⊢ card (A) = 1_{𝑜} \to (card (A) = card (1_{𝑜}) \leftrightarrow A \approx 1_{𝑜})$
19	7 18	mpbid	$⊢ card (A) = 1_{𝑜} \to A \approx 1_{𝑜}$
20	5 19	impbii	$⊢ A \approx 1_{𝑜} \leftrightarrow card (A) = 1_{𝑜}$
21		fveqeq2	$⊢ x = A \to (card (x) = 1_{𝑜} \leftrightarrow card (A) = 1_{𝑜})$
22	13 21	elab3	$⊢ A \in \{x \| card (x) = 1_{𝑜}\} \leftrightarrow card (A) = 1_{𝑜}$
23	20 22	bitr4i	$⊢ A \approx 1_{𝑜} \leftrightarrow A \in \{x \| card (x) = 1_{𝑜}\}$

Metamath Proof Explorer

Theorem pm54.43lem

Proof