Metamath Proof Explorer

Theorem elplngid

Description: The point R is itself an element of a plane defined by a line A and the point R . (Contributed by Thierry Arnoux, 17-Jun-2026)

Ref Expression
Hypotheses plngval.p P = Base G
plngval.i I = Itv G
plngval.1 L = Line 𝒢 G
plngval.e No typesetting found for |- E = ( PlnG ` G ) with typecode |-
plngval.g φ G 𝒢 Tarski
elplng.a φ A ran L
elplng.r φ R P A
Assertion elplngid φ R A E R

Proof

Step Hyp Ref Expression
1 plngval.p P = Base G
2 plngval.i I = Itv G
3 plngval.1 L = Line 𝒢 G
4 plngval.e Could not format E = ( PlnG ` G ) : No typesetting found for |- E = ( PlnG ` G ) with typecode |-
5 plngval.g φ G 𝒢 Tarski
6 elplng.a φ A ran L
7 elplng.r φ R P A
8 7 eldifad φ R P
9 eleq1w a = c a P A c P A
10 eleq1w b = d b P A d P A
11 9 10 bi2anan9 a = c b = d a P A b P A c P A d P A
12 eleq1w t = s t a I b s a I b
13 12 cbvrexvw t A t a I b s A s a I b
14 oveq12 a = c b = d a I b = c I d
15 14 eleq2d a = c b = d s a I b s c I d
16 15 rexbidv a = c b = d s A s a I b s A s c I d
17 13 16 bitrid a = c b = d t A t a I b s A s c I d
18 11 17 anbi12d a = c b = d a P A b P A t A t a I b c P A d P A s A s c I d
19 18 cbvopabv a b | a P A b P A t A t a I b = c d | c P A d P A s A s c I d
20 7 eldifbd φ ¬ R A
21 1 2 3 5 6 8 19 20 hpgid φ R hp 𝒢 G A R
22 21 3mix2d φ R A R hp 𝒢 G A R R a b | a P A b P A t A t a I b R
23 eqid a b | a P A b P A t A t a I b = a b | a P A b P A t A t a I b
24 1 2 3 4 5 6 7 23 8 elplng φ R A E R R A R hp 𝒢 G A R R a b | a P A b P A t A t a I b R
25 22 24 mpbird φ R A E R