Database ELEMENTARY GEOMETRY Tarskian Geometry Congruence of angles oacgr
Description: Vertical angle theorem. Vertical, or opposite angles are the facing
pair of angles formed when two lines intersect. Eudemus of Rhodes
attributed the proof to Thales of Miletus. The proposition showed
that since both of a pair of vertical angles are supplementary to both
of the adjacent angles, the vertical angles are equal in measure. We
follow the same path. Theorem 11.14 of Schwabhauser p. 98.
(Contributed by Thierry Arnoux , 27-Sep-2020)
Ref
Expression
Hypotheses
dfcgra2.p ⊢ P = Base G
dfcgra2.i ⊢ I = Itv G
dfcgra2.m ⊢ - ˙ = dist G
dfcgra2.g ⊢ φ → G ∈ 𝒢 Tarski
dfcgra2.a ⊢ φ → A ∈ P
dfcgra2.b ⊢ φ → B ∈ P
dfcgra2.c ⊢ φ → C ∈ P
dfcgra2.d ⊢ φ → D ∈ P
dfcgra2.e ⊢ φ → E ∈ P
dfcgra2.f ⊢ φ → F ∈ P
oacgr.1 ⊢ φ → B ∈ A I D
oacgr.2 ⊢ φ → B ∈ C I F
oacgr.3 ⊢ φ → B ≠ A
oacgr.4 ⊢ φ → B ≠ C
oacgr.5 ⊢ φ → B ≠ D
oacgr.6 ⊢ φ → B ≠ F
Assertion
oacgr ⊢ φ → ⟨“ A B C ”⟩ ∼ 𝒢 ∠ G ⟨“ D B F ”⟩
Proof
Step
Hyp
Ref
Expression
1
dfcgra2.p ⊢ P = Base G
2
dfcgra2.i ⊢ I = Itv G
3
dfcgra2.m ⊢ - ˙ = dist G
4
dfcgra2.g ⊢ φ → G ∈ 𝒢 Tarski
5
dfcgra2.a ⊢ φ → A ∈ P
6
dfcgra2.b ⊢ φ → B ∈ P
7
dfcgra2.c ⊢ φ → C ∈ P
8
dfcgra2.d ⊢ φ → D ∈ P
9
dfcgra2.e ⊢ φ → E ∈ P
10
dfcgra2.f ⊢ φ → F ∈ P
11
oacgr.1 ⊢ φ → B ∈ A I D
12
oacgr.2 ⊢ φ → B ∈ C I F
13
oacgr.3 ⊢ φ → B ≠ A
14
oacgr.4 ⊢ φ → B ≠ C
15
oacgr.5 ⊢ φ → B ≠ D
16
oacgr.6 ⊢ φ → B ≠ F
17
eqid ⊢ hl 𝒢 G = hl 𝒢 G
18
13
necomd ⊢ φ → A ≠ B
19
1 2 4 17 5 6 7 18 14
cgraswap ⊢ φ → ⟨“ A B C ”⟩ ∼ 𝒢 ∠ G ⟨“ C B A ”⟩
20
16
necomd ⊢ φ → F ≠ B
21
1 2 4 17 10 6 5 20 13
cgraswap ⊢ φ → ⟨“ F B A ”⟩ ∼ 𝒢 ∠ G ⟨“ A B F ”⟩
22
1 3 2 4 7 6 10 12
tgbtwncom ⊢ φ → B ∈ F I C
23
1 2 3 4 10 6 5 5 6 10 7 8 21 22 11 14 15
sacgr ⊢ φ → ⟨“ C B A ”⟩ ∼ 𝒢 ∠ G ⟨“ D B F ”⟩
24
1 2 4 17 5 6 7 7 6 5 19 8 6 10 23
cgratr ⊢ φ → ⟨“ A B C ”⟩ ∼ 𝒢 ∠ G ⟨“ D B F ”⟩