Metamath Proof Explorer


Theorem lnperpexs

Description: Existence of a perpendicular to a line L at a given point A . Theorem 10.15 of Schwabhauser p. 92. (Contributed by Thierry Arnoux, 2-Aug-2020)

Ref Expression
Hypotheses lnperpexs.p P = Base G
lnperpexs.l L = Line 𝒢 G
lnperpexs.g φ G 𝒢 Tarski
lnperpexs.h φ G Dim 𝒢 2
lnperpexs.d φ D ran L
lnperpexs.a φ A D
lnperpexs.q φ Q P
lnperpexs.1 φ ¬ Q D
Assertion lnperpexs φ p P D 𝒢 G p L A p hp 𝒢 G D Q

Proof

Step Hyp Ref Expression
1 lnperpexs.p P = Base G
2 lnperpexs.l L = Line 𝒢 G
3 lnperpexs.g φ G 𝒢 Tarski
4 lnperpexs.h φ G Dim 𝒢 2
5 lnperpexs.d φ D ran L
6 lnperpexs.a φ A D
7 lnperpexs.q φ Q P
8 lnperpexs.1 φ ¬ Q D
9 eqid dist G = dist G
10 eqid Itv G = Itv G
11 eleq1w a = c a P D c P D
12 eleq1w b = d b P D d P D
13 11 12 bi2anan9 a = c b = d a P D b P D c P D d P D
14 oveq12 a = c b = d a Itv G b = c Itv G d
15 14 eleq2d a = c b = d s a Itv G b s c Itv G d
16 15 rexbidv a = c b = d s D s a Itv G b s D s c Itv G d
17 eleq1w s = t s c Itv G d t c Itv G d
18 17 cbvrexvw s D s c Itv G d t D t c Itv G d
19 16 18 bitrdi a = c b = d s D s a Itv G b t D t c Itv G d
20 13 19 anbi12d a = c b = d a P D b P D s D s a Itv G b c P D d P D t D t c Itv G d
21 20 cbvopabv a b | a P D b P D s D s a Itv G b = c d | c P D d P D t D t c Itv G d
22 1 9 10 2 3 4 5 21 6 7 8 lnperpex φ p P D 𝒢 G p L A p hp 𝒢 G D Q