Metamath Proof Explorer

Theorem retbwax2

Description: tbw-ax2 rederived from merco1 . (Contributed by Anthony Hart, 17-Sep-2011) (Proof modification is discouraged.) (New usage is discouraged.)

		Ref	Expression
	Assertion	retbwax2	\|- ( ph -> ( ps -> ph ) )

Proof

Step	Hyp	Ref	Expression
1		merco1lem1	\|- ( ( ( ( ( ph -> ph ) -> ph ) -> ( ph -> F. ) ) -> ph ) -> ( F. -> ph ) )
2		merco1	\|- ( ( ( ( ( ( ph -> ph ) -> ph ) -> ( ph -> F. ) ) -> ph ) -> ( F. -> ph ) ) -> ( ( ( F. -> ph ) -> ( ph -> ph ) ) -> ( ph -> ( ph -> ph ) ) ) )
3	1 2	ax-mp	\|- ( ( ( F. -> ph ) -> ( ph -> ph ) ) -> ( ph -> ( ph -> ph ) ) )
4		merco1	\|- ( ( ( ( ( ph -> ( ph -> ph ) ) -> ( ph -> F. ) ) -> ( ph -> F. ) ) -> F. ) -> ( ( F. -> ph ) -> ( ph -> ph ) ) )
5		merco1	\|- ( ( ( ( ( ( ph -> ( ph -> ph ) ) -> ( ph -> F. ) ) -> ( ph -> F. ) ) -> F. ) -> ( ( F. -> ph ) -> ( ph -> ph ) ) ) -> ( ( ( ( F. -> ph ) -> ( ph -> ph ) ) -> ( ph -> ( ph -> ph ) ) ) -> ( ph -> ( ph -> ( ph -> ph ) ) ) ) )
6	4 5	ax-mp	\|- ( ( ( ( F. -> ph ) -> ( ph -> ph ) ) -> ( ph -> ( ph -> ph ) ) ) -> ( ph -> ( ph -> ( ph -> ph ) ) ) )
7	3 6	ax-mp	\|- ( ph -> ( ph -> ( ph -> ph ) ) )
8		merco1lem1	\|- ( ( ( ( ( ps -> ph ) -> ph ) -> ( ph -> F. ) ) -> ph ) -> ( F. -> ph ) )
9		merco1	\|- ( ( ( ( ( ( ps -> ph ) -> ph ) -> ( ph -> F. ) ) -> ph ) -> ( F. -> ph ) ) -> ( ( ( F. -> ph ) -> ( ps -> ph ) ) -> ( ph -> ( ps -> ph ) ) ) )
10	8 9	ax-mp	\|- ( ( ( F. -> ph ) -> ( ps -> ph ) ) -> ( ph -> ( ps -> ph ) ) )
11		merco1	\|- ( ( ( ( ( ph -> ( ps -> ph ) ) -> ( ps -> F. ) ) -> ( ( ph -> ( ph -> ( ph -> ph ) ) ) -> F. ) ) -> F. ) -> ( ( F. -> ph ) -> ( ps -> ph ) ) )
12		merco1	\|- ( ( ( ( ( ( ph -> ( ps -> ph ) ) -> ( ps -> F. ) ) -> ( ( ph -> ( ph -> ( ph -> ph ) ) ) -> F. ) ) -> F. ) -> ( ( F. -> ph ) -> ( ps -> ph ) ) ) -> ( ( ( ( F. -> ph ) -> ( ps -> ph ) ) -> ( ph -> ( ps -> ph ) ) ) -> ( ( ph -> ( ph -> ( ph -> ph ) ) ) -> ( ph -> ( ps -> ph ) ) ) ) )
13	11 12	ax-mp	\|- ( ( ( ( F. -> ph ) -> ( ps -> ph ) ) -> ( ph -> ( ps -> ph ) ) ) -> ( ( ph -> ( ph -> ( ph -> ph ) ) ) -> ( ph -> ( ps -> ph ) ) ) )
14	10 13	ax-mp	\|- ( ( ph -> ( ph -> ( ph -> ph ) ) ) -> ( ph -> ( ps -> ph ) ) )
15	7 14	ax-mp	\|- ( ph -> ( ps -> ph ) )