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Metamath Proof Explorer

Theorem 2llnma1

Description: Two different intersecting lines (expressed in terms of atoms) meet at their common point (atom). (Contributed by NM, 11-Oct-2012)

		Ref	Expression
	Hypotheses	2llnm.l	\|- .<_ = ( le ` K )
		2llnm.j	\|- .\/ = ( join ` K )
		2llnm.m	\|- ./\ = ( meet ` K )
		2llnm.a	\|- A = ( Atoms ` K )
	Assertion	2llnma1	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> ( ( Q .\/ P ) ./\ ( Q .\/ R ) ) = Q )

Proof

Step	Hyp	Ref	Expression
1		2llnm.l	\|- .<_ = ( le ` K )
2		2llnm.j	\|- .\/ = ( join ` K )
3		2llnm.m	\|- ./\ = ( meet ` K )
4		2llnm.a	\|- A = ( Atoms ` K )
5		simp1	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> K e. HL )
6		simp21	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> P e. A )
7		eqid	\|- ( Base ` K ) = ( Base ` K )
8	7 4	atbase	\|- ( P e. A -> P e. ( Base ` K ) )
9	6 8	syl	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> P e. ( Base ` K ) )
10		simp22	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> Q e. A )
11		simp23	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> R e. A )
12		simp3	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> -. R .<_ ( P .\/ Q ) )
13	2 4	hlatjcom	\|- ( ( K e. HL /\ P e. A /\ Q e. A ) -> ( P .\/ Q ) = ( Q .\/ P ) )
14	5 6 10 13	syl3anc	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> ( P .\/ Q ) = ( Q .\/ P ) )
15	14	breq2d	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> ( R .<_ ( P .\/ Q ) <-> R .<_ ( Q .\/ P ) ) )
16	12 15	mtbid	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> -. R .<_ ( Q .\/ P ) )
17	7 1 2 3 4	2llnma1b	\|- ( ( K e. HL /\ ( P e. ( Base ` K ) /\ Q e. A /\ R e. A ) /\ -. R .<_ ( Q .\/ P ) ) -> ( ( Q .\/ P ) ./\ ( Q .\/ R ) ) = Q )
18	5 9 10 11 16 17	syl131anc	\|- ( ( K e. HL /\ ( P e. A /\ Q e. A /\ R e. A ) /\ -. R .<_ ( P .\/ Q ) ) -> ( ( Q .\/ P ) ./\ ( Q .\/ R ) ) = Q )