Metamath Proof Explorer

Theorem cotrclrtrcl

Description: Composition with the reflexive-transitive closure absorbs the transitive closure. (Contributed by RP, 13-Jun-2020)

Ref Expression
Assertion cotrclrtrcl t+ t* = t*

Proof

Step Hyp Ref Expression
1 cotrclrcl t+ r* = t*
2 1 eqcomi t* = t+ r*
3 2 coeq2i t+ t* = t+ t+ r*
4 coass t+ t+ r* = t+ t+ r*
5 4 eqcomi t+ t+ r* = t+ t+ r*
6 cotrcltrcl t+ t+ = t+
7 6 coeq1i t+ t+ r* = t+ r*
8 7 1 eqtri t+ t+ r* = t*
9 5 8 eqtri t+ t+ r* = t*
10 3 9 eqtri t+ t* = t*