Metamath Proof Explorer


Theorem prlngrcl2

Description: Reverse closure for parallelism. (Contributed by Thierry Arnoux, 5-Jul-2026)

Ref Expression
Hypotheses prlngin0.l
|- L = ( LineG ` G )
prlngin0.p
|- .|| = ( parlnG ` G )
prlngin0.g
|- ( ph -> G e. V )
prlngin0.1
|- ( ph -> A .|| B )
Assertion prlngrcl2
|- ( ph -> B e. ran L )

Proof

Step Hyp Ref Expression
1 prlngin0.l
 |-  L = ( LineG ` G )
2 prlngin0.p
 |-  .|| = ( parlnG ` G )
3 prlngin0.g
 |-  ( ph -> G e. V )
4 prlngin0.1
 |-  ( ph -> A .|| B )
5 eqid
 |-  ( PlnG ` G ) = ( PlnG ` G )
6 1 5 2 3 brprlng
 |-  ( ph -> ( A .|| B <-> ( ( A e. ran L /\ B e. ran L ) /\ ( A = B \/ ( E. h e. ran ( PlnG ` G ) ( A C_ h /\ B C_ h ) /\ ( A i^i B ) = (/) ) ) ) ) )
7 4 6 mpbid
 |-  ( ph -> ( ( A e. ran L /\ B e. ran L ) /\ ( A = B \/ ( E. h e. ran ( PlnG ` G ) ( A C_ h /\ B C_ h ) /\ ( A i^i B ) = (/) ) ) ) )
8 7 simplrd
 |-  ( ph -> B e. ran L )