mdandysum2p2e4

Description: CONTRADICTION PROVED AT 1 + 1 = 2 . Luckily Mario Carneiro did a successful version of his own.

See Mario's Relevant Work: 1.3.14 Half adder and full adder in propositional calculus.

Given the right hypotheses we can prove a dandysum of 2+2=4. The qed step is the value '4' in Decimal BEING IMPLIED by the hypotheses.

Note: Digits begin from left (least) to right (greatest). e.g. 1000 would be '1', 0100 would be '2'. 0010 would be '4'.

How to perceive the hypotheses' bits in order: ( th <-> F. ), ( ta <-> F. ) Would be input value X's first bit, and input value Y's first bit.

( et <-> F. ), ( ze <-> F. ) would be input value X's second bit, and input value Y's second bit.

In mdandysum2p2e4, one might imagine what jth or jta could be then do the math with their truths. Also limited to the restriction jth, jta are having opposite truths equivalent to the stated truth constants.

	Ref	Expression
Hypotheses	mdandysum2p2e4.1	No typesetting found for \|- ( jth <-> F. ) with typecode \|-
	mdandysum2p2e4.2	No typesetting found for \|- ( jta <-> T. ) with typecode \|-
	mdandysum2p2e4.a	$⊢ φ \leftrightarrow (θ \land τ)$
	mdandysum2p2e4.b	$⊢ ψ \leftrightarrow (η \land ζ)$
	mdandysum2p2e4.c	$⊢ χ \leftrightarrow (σ \land ρ)$
	mdandysum2p2e4.d	No typesetting found for \|- ( th <-> jth ) with typecode \|-
	mdandysum2p2e4.e	No typesetting found for \|- ( ta <-> jth ) with typecode \|-
	mdandysum2p2e4.f	No typesetting found for \|- ( et <-> jta ) with typecode \|-
	mdandysum2p2e4.g	No typesetting found for \|- ( ze <-> jta ) with typecode \|-
	mdandysum2p2e4.h	No typesetting found for \|- ( si <-> jth ) with typecode \|-
	mdandysum2p2e4.i	No typesetting found for \|- ( rh <-> jth ) with typecode \|-
	mdandysum2p2e4.j	No typesetting found for \|- ( mu <-> jth ) with typecode \|-
	mdandysum2p2e4.k	No typesetting found for \|- ( la <-> jth ) with typecode \|-
	mdandysum2p2e4.l	$⊢ κ \leftrightarrow ((θ ⊻ τ) ⊻ (θ \land τ))$
	mdandysum2p2e4.m	No typesetting found for \|- ( jph <-> ( ( et \/_ ze ) \/ ph ) ) with typecode \|-
	mdandysum2p2e4.n	No typesetting found for \|- ( jps <-> ( ( si \/_ rh ) \/ ps ) ) with typecode \|-
	mdandysum2p2e4.o	No typesetting found for \|- ( jch <-> ( ( mu \/_ la ) \/ ch ) ) with typecode \|-
Assertion	mdandysum2p2e4	Could not format assertion : No typesetting found for \|- ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ph <-> ( th /\ ta ) ) /\ ( ps <-> ( et /\ ze ) ) ) /\ ( ch <-> ( si /\ rh ) ) ) /\ ( th <-> F. ) ) /\ ( ta <-> F. ) ) /\ ( et <-> T. ) ) /\ ( ze <-> T. ) ) /\ ( si <-> F. ) ) /\ ( rh <-> F. ) ) /\ ( mu <-> F. ) ) /\ ( la <-> F. ) ) /\ ( ka <-> ( ( th \/_ ta ) \/_ ( th /\ ta ) ) ) ) /\ ( jph <-> ( ( et \/_ ze ) \/ ph ) ) ) /\ ( jps <-> ( ( si \/_ rh ) \/ ps ) ) ) /\ ( jch <-> ( ( mu \/_ la ) \/ ch ) ) ) -> ( ( ( ( ka <-> F. ) /\ ( jph <-> F. ) ) /\ ( jps <-> T. ) ) /\ ( jch <-> F. ) ) ) with typecode \|-

Proof

Step	Hyp	Ref	Expression
1		mdandysum2p2e4.1	Could not format ( jth <-> F. ) : No typesetting found for \|- ( jth <-> F. ) with typecode \|-
2		mdandysum2p2e4.2	Could not format ( jta <-> T. ) : No typesetting found for \|- ( jta <-> T. ) with typecode \|-
3		mdandysum2p2e4.a	$⊢ φ \leftrightarrow (θ \land τ)$
4		mdandysum2p2e4.b	$⊢ ψ \leftrightarrow (η \land ζ)$
5		mdandysum2p2e4.c	$⊢ χ \leftrightarrow (σ \land ρ)$
6		mdandysum2p2e4.d	Could not format ( th <-> jth ) : No typesetting found for \|- ( th <-> jth ) with typecode \|-
7		mdandysum2p2e4.e	Could not format ( ta <-> jth ) : No typesetting found for \|- ( ta <-> jth ) with typecode \|-
8		mdandysum2p2e4.f	Could not format ( et <-> jta ) : No typesetting found for \|- ( et <-> jta ) with typecode \|-
9		mdandysum2p2e4.g	Could not format ( ze <-> jta ) : No typesetting found for \|- ( ze <-> jta ) with typecode \|-
10		mdandysum2p2e4.h	Could not format ( si <-> jth ) : No typesetting found for \|- ( si <-> jth ) with typecode \|-
11		mdandysum2p2e4.i	Could not format ( rh <-> jth ) : No typesetting found for \|- ( rh <-> jth ) with typecode \|-
12		mdandysum2p2e4.j	Could not format ( mu <-> jth ) : No typesetting found for \|- ( mu <-> jth ) with typecode \|-
13		mdandysum2p2e4.k	Could not format ( la <-> jth ) : No typesetting found for \|- ( la <-> jth ) with typecode \|-
14		mdandysum2p2e4.l	$⊢ κ \leftrightarrow ((θ ⊻ τ) ⊻ (θ \land τ))$
15		mdandysum2p2e4.m	Could not format ( jph <-> ( ( et \/_ ze ) \/ ph ) ) : No typesetting found for \|- ( jph <-> ( ( et \/_ ze ) \/ ph ) ) with typecode \|-
16		mdandysum2p2e4.n	Could not format ( jps <-> ( ( si \/_ rh ) \/ ps ) ) : No typesetting found for \|- ( jps <-> ( ( si \/_ rh ) \/ ps ) ) with typecode \|-
17		mdandysum2p2e4.o	Could not format ( jch <-> ( ( mu \/_ la ) \/ ch ) ) : No typesetting found for \|- ( jch <-> ( ( mu \/_ la ) \/ ch ) ) with typecode \|-
18	6 1	aisbbisfaisf	$⊢ θ \leftrightarrow ⊥$
19	7 1	aisbbisfaisf	$⊢ τ \leftrightarrow ⊥$
20	8 2	aiffbbtat	$⊢ η \leftrightarrow ⊤$
21	9 2	aiffbbtat	$⊢ ζ \leftrightarrow ⊤$
22	10 1	aisbbisfaisf	$⊢ σ \leftrightarrow ⊥$
23	11 1	aisbbisfaisf	$⊢ ρ \leftrightarrow ⊥$
24	12 1	aisbbisfaisf	$⊢ μ \leftrightarrow ⊥$
25	13 1	aisbbisfaisf	$⊢ λ \leftrightarrow ⊥$
26	3 4 5 18 19 20 21 22 23 24 25 14 15 16 17	dandysum2p2e4	Could not format ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ph <-> ( th /\ ta ) ) /\ ( ps <-> ( et /\ ze ) ) ) /\ ( ch <-> ( si /\ rh ) ) ) /\ ( th <-> F. ) ) /\ ( ta <-> F. ) ) /\ ( et <-> T. ) ) /\ ( ze <-> T. ) ) /\ ( si <-> F. ) ) /\ ( rh <-> F. ) ) /\ ( mu <-> F. ) ) /\ ( la <-> F. ) ) /\ ( ka <-> ( ( th \/_ ta ) \/_ ( th /\ ta ) ) ) ) /\ ( jph <-> ( ( et \/_ ze ) \/ ph ) ) ) /\ ( jps <-> ( ( si \/_ rh ) \/ ps ) ) ) /\ ( jch <-> ( ( mu \/_ la ) \/ ch ) ) ) -> ( ( ( ( ka <-> F. ) /\ ( jph <-> F. ) ) /\ ( jps <-> T. ) ) /\ ( jch <-> F. ) ) ) : No typesetting found for \|- ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ( ph <-> ( th /\ ta ) ) /\ ( ps <-> ( et /\ ze ) ) ) /\ ( ch <-> ( si /\ rh ) ) ) /\ ( th <-> F. ) ) /\ ( ta <-> F. ) ) /\ ( et <-> T. ) ) /\ ( ze <-> T. ) ) /\ ( si <-> F. ) ) /\ ( rh <-> F. ) ) /\ ( mu <-> F. ) ) /\ ( la <-> F. ) ) /\ ( ka <-> ( ( th \/_ ta ) \/_ ( th /\ ta ) ) ) ) /\ ( jph <-> ( ( et \/_ ze ) \/ ph ) ) ) /\ ( jps <-> ( ( si \/_ rh ) \/ ps ) ) ) /\ ( jch <-> ( ( mu \/_ la ) \/ ch ) ) ) -> ( ( ( ( ka <-> F. ) /\ ( jph <-> F. ) ) /\ ( jps <-> T. ) ) /\ ( jch <-> F. ) ) ) with typecode \|-

Metamath Proof Explorer

Theorem mdandysum2p2e4

Proof