axlowdimlem8

Description: Lemma for axlowdim . Calculate the value of P at three. (Contributed by Scott Fenton, 21-Apr-2013)

		Ref	Expression
	Hypothesis	axlowdimlem7.1	$⊢ P = \{⟨3, - 1⟩\} \cup (((1 \dots N) ∖ \{3\}) \times \{0\})$
	Assertion	axlowdimlem8	$⊢ P (3) = - 1$

Step	Hyp	Ref	Expression
1		axlowdimlem7.1	$⊢ P = \{⟨3, - 1⟩\} \cup (((1 \dots N) ∖ \{3\}) \times \{0\})$
2	1	fveq1i	$⊢ P (3) = (\{⟨3, - 1⟩\} \cup (((1 \dots N) ∖ \{3\}) \times \{0\})) (3)$
3		3ex	$⊢ 3 \in V$
4		negex	$⊢ - 1 \in V$
5	3 4	fnsn	$⊢ \{⟨3, - 1⟩\} Fn \{3\}$
6		c0ex	$⊢ 0 \in V$
7	6	fconst	$⊢ (((1 \dots N) ∖ \{3\}) \times \{0\}) : (1 \dots N) ∖ \{3\} ⟶ \{0\}$
8		ffn	$⊢ (((1 \dots N) ∖ \{3\}) \times \{0\}) : (1 \dots N) ∖ \{3\} ⟶ \{0\} \to (((1 \dots N) ∖ \{3\}) \times \{0\}) Fn ((1 \dots N) ∖ \{3\})$
9	7 8	ax-mp	$⊢ (((1 \dots N) ∖ \{3\}) \times \{0\}) Fn ((1 \dots N) ∖ \{3\})$
10		disjdif	$⊢ \{3\} \cap ((1 \dots N) ∖ \{3\}) = \emptyset$
11	3	snid	$⊢ 3 \in \{3\}$
12	10 11	pm3.2i	$⊢ (\{3\} \cap ((1 \dots N) ∖ \{3\}) = \emptyset \land 3 \in \{3\})$
13		fvun1	$⊢ (\{⟨3, - 1⟩\} Fn \{3\} \land (((1 \dots N) ∖ \{3\}) \times \{0\}) Fn ((1 \dots N) ∖ \{3\}) \land (\{3\} \cap ((1 \dots N) ∖ \{3\}) = \emptyset \land 3 \in \{3\})) \to (\{⟨3, - 1⟩\} \cup (((1 \dots N) ∖ \{3\}) \times \{0\})) (3) = \{⟨3, - 1⟩\} (3)$
14	5 9 12 13	mp3an	$⊢ (\{⟨3, - 1⟩\} \cup (((1 \dots N) ∖ \{3\}) \times \{0\})) (3) = \{⟨3, - 1⟩\} (3)$
15	3 4	fvsn	$⊢ \{⟨3, - 1⟩\} (3) = - 1$
16	2 14 15	3eqtri	$⊢ P (3) = - 1$

Metamath Proof Explorer