Metamath Proof Explorer

Theorem tgsas3

Description: First congruence theorem: SAS. Theorem 11.49 of Schwabhauser p. 107. (Contributed by Thierry Arnoux, 1-Aug-2020)

Ref Expression
Hypotheses tgsas.p P=BaseG
tgsas.m -˙=distG
tgsas.i I=ItvG
tgsas.g φG𝒢Tarski
tgsas.a φAP
tgsas.b φBP
tgsas.c φCP
tgsas.d φDP
tgsas.e φEP
tgsas.f φFP
tgsas.1 φA-˙B=D-˙E
tgsas.2 φ⟨“ABC”⟩𝒢G⟨“DEF”⟩
tgsas.3 φB-˙C=E-˙F
tgsas2.4 φAC
Assertion tgsas3 φ⟨“BCA”⟩𝒢G⟨“EFD”⟩

Proof

Step Hyp Ref Expression
1 tgsas.p P=BaseG
2 tgsas.m -˙=distG
3 tgsas.i I=ItvG
4 tgsas.g φG𝒢Tarski
5 tgsas.a φAP
6 tgsas.b φBP
7 tgsas.c φCP
8 tgsas.d φDP
9 tgsas.e φEP
10 tgsas.f φFP
11 tgsas.1 φA-˙B=D-˙E
12 tgsas.2 φ⟨“ABC”⟩𝒢G⟨“DEF”⟩
13 tgsas.3 φB-˙C=E-˙F
14 tgsas2.4 φAC
15 eqid hl𝒢G=hl𝒢G
16 eqid 𝒢G=𝒢G
17 1 2 3 4 5 6 7 8 9 10 11 12 13 tgsas φ⟨“ABC”⟩𝒢G⟨“DEF”⟩
18 1 2 3 16 4 5 6 7 8 9 10 17 cgr3rotl φ⟨“BCA”⟩𝒢G⟨“EFD”⟩
19 1 3 15 4 5 6 7 8 9 10 12 cgrane4 φEF
20 1 3 15 9 5 10 4 19 hlid φEhl𝒢GFE
21 1 2 3 4 5 6 7 8 9 10 11 12 13 tgsas1 φC-˙A=F-˙D
22 1 2 3 4 7 5 10 8 21 tgcgrcomlr φA-˙C=D-˙F
23 1 2 3 4 5 7 8 10 22 14 tgcgrneq φDF
24 1 3 15 8 5 10 4 23 hlid φDhl𝒢GFD
25 1 3 15 4 6 7 5 9 10 8 9 8 18 20 24 iscgrad φ⟨“BCA”⟩𝒢G⟨“EFD”⟩