Metamath Proof Explorer


Theorem oppmir

Description: The mirror point with regard to a point X on a line A lies on the other side of A . (Contributed by Thierry Arnoux, 5-Jul-2026)

Ref Expression
Hypotheses oppmir.p P = Base G
oppmir.i I = Itv G
oppmir.s S = pInv 𝒢 G
oppmir.m M = S X
oppmir.o O = a b | a P A b P A t A t a I b
oppmir.g φ G 𝒢 Tarski
oppmir.a φ A ran L
oppmir.x φ X A
oppmir.y φ Y P A
oppmir.1 L = Line 𝒢 G
Assertion oppmir φ Y O M Y

Proof

Step Hyp Ref Expression
1 oppmir.p P = Base G
2 oppmir.i I = Itv G
3 oppmir.s S = pInv 𝒢 G
4 oppmir.m M = S X
5 oppmir.o O = a b | a P A b P A t A t a I b
6 oppmir.g φ G 𝒢 Tarski
7 oppmir.a φ A ran L
8 oppmir.x φ X A
9 oppmir.y φ Y P A
10 oppmir.1 L = Line 𝒢 G
11 eqid dist G = dist G
12 9 eldifad φ Y P
13 1 10 2 6 7 8 tglnpt φ X P
14 1 11 2 10 3 6 13 4 12 mircl φ M Y P
15 9 eldifbd φ ¬ Y A
16 1 11 2 10 3 6 13 4 12 mirmir φ M M Y = Y
17 16 adantr φ M Y A M M Y = Y
18 6 adantr φ M Y A G 𝒢 Tarski
19 7 adantr φ M Y A A ran L
20 8 adantr φ M Y A X A
21 simpr φ M Y A M Y A
22 1 11 2 10 3 18 4 19 20 21 mirln φ M Y A M M Y A
23 17 22 eqeltrrd φ M Y A Y A
24 15 23 mtand φ ¬ M Y A
25 1 11 2 10 3 6 13 4 12 mirbtwn φ X M Y I Y
26 1 11 2 6 14 13 12 25 tgbtwncom φ X Y I M Y
27 1 11 2 5 12 14 8 15 24 26 islnoppd φ Y O M Y