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Theorem renicax 1622
Description: A rederivation of nic-ax 1598 from lukshef-ax1 1619, proving that lukshef-ax1 1619 with nic-mp 1596 can be used as a complete axiomatization of propositional calculus. (Contributed by Anthony Hart, 31-Jul-2011.) (Proof modification is discouraged.) (New usage is discouraged.)
Assertion
Ref Expression
renicax |- ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) )
Proof of Theorem renicax
StepHypRef Expression
1 lukshefth1 1620 . . . 4 |- ( ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) )
2 lukshefth2 1621 . . . 4 |- ( ( ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) -/\ ( ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) ) -/\ ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) ) ) )
31, 2nic-mp 1596 . . 3 |- ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) )
4 lukshefth2 1621 . . . 4 |- ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) ) )
5 lukshef-ax1 1619 . . . 4 |- ( ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) ) ) -/\ ( ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) ) -/\ ( ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) ) -/\ ( ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) -/\ ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) ) ) ) )
64, 5nic-mp 1596 . . 3 |- ( ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) -/\ ( ta -/\ ( ta -/\ ta ) ) ) ) -/\ ( ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) -/\ ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) ) )
73, 6nic-mp 1596 . 2 |- ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) )
8 lukshefth2 1621 . 2 |- ( ( ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) -/\ ( ph -/\ ( ch -/\ ps ) ) ) -/\ ( ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) ) -/\ ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) ) ) )
97, 8nic-mp 1596 1 |- ( ( ph -/\ ( ch -/\ ps ) ) -/\ ( ( ta -/\ ( ta -/\ ta ) ) -/\ ( ( th -/\ ch ) -/\ ( ( ph -/\ th ) -/\ ( ph -/\ th ) ) ) ) )
Colors of variables: wff setvar class
Syntax hints:   -/\ wnan 1447
This theorem was proved from axioms:  ax-mp 5  ax-1 6  ax-2 7  ax-3 8
This theorem depends on definitions:  df-bi 197  df-an 386  df-nan 1448
This theorem is referenced by: (None)
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