Metamath Proof Explorer

Theorem swrdlsw

Description: Extract the last single symbol from a word. (Contributed by Alexander van der Vekens, 23-Sep-2018)

Ref Expression
Assertion swrdlsw W Word V W W substr W 1 W = ⟨“ lastS W ”⟩

Proof

Step Hyp Ref Expression
1 hashneq0 W Word V 0 < W W
2 lencl W Word V W 0
3 nn0z W 0 W
4 elnnz W W 0 < W
5 fzo0end W W 1 0 ..^ W
6 4 5 sylbir W 0 < W W 1 0 ..^ W
7 6 ex W 0 < W W 1 0 ..^ W
8 2 3 7 3syl W Word V 0 < W W 1 0 ..^ W
9 1 8 sylbird W Word V W W 1 0 ..^ W
10 9 imp W Word V W W 1 0 ..^ W
11 swrds1 W Word V W 1 0 ..^ W W substr W 1 W - 1 + 1 = ⟨“ W W 1 ”⟩
12 10 11 syldan W Word V W W substr W 1 W - 1 + 1 = ⟨“ W W 1 ”⟩
13 nn0cn W 0 W
14 ax-1cn 1
15 13 14 jctir W 0 W 1
16 npcan W 1 W - 1 + 1 = W
17 16 eqcomd W 1 W = W - 1 + 1
18 2 15 17 3syl W Word V W = W - 1 + 1
19 18 adantr W Word V W W = W - 1 + 1
20 19 opeq2d W Word V W W 1 W = W 1 W - 1 + 1
21 20 oveq2d W Word V W W substr W 1 W = W substr W 1 W - 1 + 1
22 lsw W Word V lastS W = W W 1
23 22 adantr W Word V W lastS W = W W 1
24 23 s1eqd W Word V W ⟨“ lastS W ”⟩ = ⟨“ W W 1 ”⟩
25 12 21 24 3eqtr4d W Word V W W substr W 1 W = ⟨“ lastS W ”⟩