lswco

Description: Mapping of (nonempty) words commutes with the "last symbol" operation. This theorem would not hold if W = (/) , ( F(/) ) =/= (/) and (/) e. A , because then ( lastS( F o. W ) ) = ( lastS(/) ) = (/) =/= ( F(/) ) = ( F ( lastSW ) ) . (Contributed by AV, 11-Nov-2018)

		Ref	Expression
	Assertion	lswco	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to lastS (F \circ W) = F (lastS (W))$

Proof

Step	Hyp	Ref	Expression
1		ffun	$⊢ F : A ⟶ B \to Fun F$
2	1	anim1i	$⊢ (F : A ⟶ B \land W \in Word A) \to (Fun F \land W \in Word A)$
3	2	ancoms	$⊢ (W \in Word A \land F : A ⟶ B) \to (Fun F \land W \in Word A)$
4	3	3adant2	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to (Fun F \land W \in Word A)$
5		cofunexg	$⊢ (Fun F \land W \in Word A) \to F \circ W \in V$
6		lsw	$⊢ F \circ W \in V \to lastS (F \circ W) = (F \circ W) (\|F \circ W\| - 1)$
7	4 5 6	3syl	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to lastS (F \circ W) = (F \circ W) (\|F \circ W\| - 1)$
8		lenco	$⊢ (W \in Word A \land F : A ⟶ B) \to \|F \circ W\| = \|W\|$
9	8	3adant2	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to \|F \circ W\| = \|W\|$
10	9	fvoveq1d	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to (F \circ W) (\|F \circ W\| - 1) = (F \circ W) (\|W\| - 1)$
11		wrdf	$⊢ W \in Word A \to W : (0 ..^\|W\|) ⟶ A$
12	11	adantr	$⊢ (W \in Word A \land W \neq \emptyset) \to W : (0 ..^\|W\|) ⟶ A$
13		lennncl	$⊢ (W \in Word A \land W \neq \emptyset) \to \|W\| \in ℕ$
14		fzo0end	$⊢ \|W\| \in ℕ \to \|W\| - 1 \in (0 ..^\|W\|)$
15	13 14	syl	$⊢ (W \in Word A \land W \neq \emptyset) \to \|W\| - 1 \in (0 ..^\|W\|)$
16	12 15	jca	$⊢ (W \in Word A \land W \neq \emptyset) \to (W : (0 ..^\|W\|) ⟶ A \land \|W\| - 1 \in (0 ..^\|W\|))$
17	16	3adant3	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to (W : (0 ..^\|W\|) ⟶ A \land \|W\| - 1 \in (0 ..^\|W\|))$
18		fvco3	$⊢ (W : (0 ..^\|W\|) ⟶ A \land \|W\| - 1 \in (0 ..^\|W\|)) \to (F \circ W) (\|W\| - 1) = F (W (\|W\| - 1))$
19	17 18	syl	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to (F \circ W) (\|W\| - 1) = F (W (\|W\| - 1))$
20		lsw	$⊢ W \in Word A \to lastS (W) = W (\|W\| - 1)$
21	20	3ad2ant1	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to lastS (W) = W (\|W\| - 1)$
22	21	eqcomd	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to W (\|W\| - 1) = lastS (W)$
23	22	fveq2d	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to F (W (\|W\| - 1)) = F (lastS (W))$
24	19 23	eqtrd	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to (F \circ W) (\|W\| - 1) = F (lastS (W))$
25	7 10 24	3eqtrd	$⊢ (W \in Word A \land W \neq \emptyset \land F : A ⟶ B) \to lastS (F \circ W) = F (lastS (W))$

Metamath Proof Explorer

Theorem lswco

Proof