Metamath Proof Explorer

Theorem latjjdir

Description: Lattice join distributes over itself. (Contributed by NM, 2-Aug-2012)

Ref Expression
Hypotheses latjass.b B=BaseK
latjass.j ˙=joinK
Assertion latjjdir KLatXBYBZBX˙Y˙Z=X˙Z˙Y˙Z

Proof

Step Hyp Ref Expression
1 latjass.b B=BaseK
2 latjass.j ˙=joinK
3 1 2 latjidm KLatZBZ˙Z=Z
4 3 3ad2antr3 KLatXBYBZBZ˙Z=Z
5 4 oveq2d KLatXBYBZBX˙Y˙Z˙Z=X˙Y˙Z
6 simpl KLatXBYBZBKLat
7 simpr1 KLatXBYBZBXB
8 simpr2 KLatXBYBZBYB
9 simpr3 KLatXBYBZBZB
10 1 2 latj4 KLatXBYBZBZBX˙Y˙Z˙Z=X˙Z˙Y˙Z
11 6 7 8 9 9 10 syl122anc KLatXBYBZBX˙Y˙Z˙Z=X˙Z˙Y˙Z
12 5 11 eqtr3d KLatXBYBZBX˙Y˙Z=X˙Z˙Y˙Z