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| Type | Label | Description |
|---|---|---|
| Statement | ||
| Definition | df-tru 1401 |
Definition of the truth value "true", or "verum", denoted
by  .
This is a tautology, as proved by tru 1402. In this definition, an
instance of id 19 is used as the definiens, although any
tautology, such
as an axiom, can be used in its place. This particular id 19
instance
was chosen so this definition can be checked by the same algorithm that
is used for predicate calculus. This definition should be referenced
directly only by tru 1402, and other proofs should depend on tru 1402
(directly or indirectly) instead of this definition, since there are
many alternate ways to define . (Contributed by Anthony Hart,
13-Oct-2010.) (Revised by NM, 11-Jul-2019.)
(New usage is discouraged.)
|
     
  | ||
| Theorem | tru 1402 |
The truth value is
provable. (Contributed by Anthony Hart,
13-Oct-2010.)
|
| | ||
| Syntax | wfal 1403 |
 is a wff.
|
 | ||
| Definition | df-fal 1404 |
Definition of the truth value "false", or "falsum", denoted
by .
See also df-tru 1401. (Contributed by Anthony Hart, 22-Oct-2010.)
|
 | ||
| Theorem | fal 1405 |
The truth value is
refutable. (Contributed by Anthony Hart,
22-Oct-2010.) (Proof shortened by Mel L. O'Cat, 11-Mar-2012.)
|
| | ||
| Theorem | dftru2 1406 | An alternate definition of "true". (Contributed by Anthony Hart, 13-Oct-2010.) (Revised by BJ, 12-Jul-2019.) (New usage is discouraged.) |
 | ||
| Theorem | mptru 1407 |
Eliminate as an
antecedent. A proposition implied by is
true. (Contributed by Mario Carneiro, 13-Mar-2014.)
|
 | ||
| Theorem | tbtru 1408 |
A proposition is equivalent to itself being equivalent to .
(Contributed by Anthony Hart, 14-Aug-2011.)
|
|
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| Theorem | nbfal 1409 |
The negation of a proposition is equivalent to itself being equivalent to
. (Contributed
by Anthony Hart, 14-Aug-2011.)
|
|
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| Theorem | bitru 1410 | A theorem is equivalent to truth. (Contributed by Mario Carneiro, 9-May-2015.) |
|
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| Theorem | bifal 1411 | A contradiction is equivalent to falsehood. (Contributed by Mario Carneiro, 9-May-2015.) |
|
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| Theorem | falim 1412 |
The truth value
implies anything. Also called the principle of
explosion, or "ex falso quodlibet". (Contributed by FL,
20-Mar-2011.)
(Proof shortened by Anthony Hart, 1-Aug-2011.)
|
| | ||
| Theorem | falimd 1413 |
The truth value
implies anything. (Contributed by Mario Carneiro,
9-Feb-2017.)
|
![/\](wedge.gif "/\"){kind=small}  | ||
| Theorem | trud 1414 |
Anything implies .
(Contributed by FL, 20-Mar-2011.) (Proof
shortened by Anthony Hart, 1-Aug-2011.)
|
| | ||
| Theorem | truan 1415 | True can be removed from a conjunction. (Contributed by FL, 20-Mar-2011.) (Proof shortened by Wolf Lammen, 21-Jul-2019.) |
| | ||
| Theorem | dfnot 1416 |
Given falsum, we can define the negation of a wff as the statement
that a contradiction follows from assuming . (Contributed by Mario
Carneiro, 9-Feb-2017.) (Proof shortened by Wolf Lammen, 21-Jul-2019.)
|
| | ||
| Theorem | inegd 1417 | Negation introduction rule from natural deduction. (Contributed by Mario Carneiro, 9-Feb-2017.) |
|
| ||
| Theorem | pm2.21fal 1418 | If a wff and its negation are provable, then falsum is provable. (Contributed by Mario Carneiro, 9-Feb-2017.) |
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| Theorem | pclem6 1419 | Negation inferred from embedded conjunct. (Contributed by NM, 20-Aug-1993.) (Proof rewritten by Jim Kingdon, 4-May-2018.) |
| | ||
| Syntax | wxo 1420 | Extend wff definition to include exclusive disjunction ('xor'). |
 | ||
| Definition | df-xor 1421 |
Define exclusive disjunction (logical 'xor'). Return true if either the
left or right, but not both, are true. Contrast with (wa 104),
 (wo 716), and
(wi 4) .
(Contributed by FL, 22-Nov-2010.)
(Modified by Jim Kingdon, 1-Mar-2018.)
|
| | ||
| Theorem | xoranor 1422 | One way of defining exclusive or. Equivalent to df-xor 1421. (Contributed by Jim Kingdon and Mario Carneiro, 1-Mar-2018.) |
| | ||
| Theorem | excxor 1423 | This tautology shows that xor is really exclusive. (Contributed by FL, 22-Nov-2010.) (Proof rewritten by Jim Kingdon, 5-May-2018.) |
| | ||
| Theorem | xoror 1424 | XOR implies OR. (Contributed by BJ, 19-Apr-2019.) |
| | ||
| Theorem | xorbi2d 1425 | Deduction joining an equivalence and a left operand to form equivalence of exclusive-or. (Contributed by Jim Kingdon, 7-Oct-2018.) |
  | ||
| Theorem | xorbi1d 1426 | Deduction joining an equivalence and a right operand to form equivalence of exclusive-or. (Contributed by Jim Kingdon, 7-Oct-2018.) |
|
| ||
| Theorem | xorbi12d 1427 | Deduction joining two equivalences to form equivalence of exclusive-or. (Contributed by Jim Kingdon, 7-Oct-2018.) |
| ||
| Theorem | xorbi12i 1428 | Equality property for XOR. (Contributed by Mario Carneiro, 4-Sep-2016.) |
| | ||
| Theorem | xorbin 1429 | A consequence of exclusive or. In classical logic the converse also holds. (Contributed by Jim Kingdon, 8-Mar-2018.) |
| | ||
| Theorem | pm5.18im 1430 | One direction of pm5.18dc 891, which holds for all propositions, not just decidable propositions. (Contributed by Jim Kingdon, 10-Mar-2018.) |
| | ||
| Theorem | xornbi 1431 | A consequence of exclusive or. For decidable propositions this is an equivalence, as seen at xornbidc 1436. (Contributed by Jim Kingdon, 10-Mar-2018.) |
|
| ||
| Theorem | xor3dc 1432 | Two ways to express "exclusive or" between decidable propositions. (Contributed by Jim Kingdon, 12-Apr-2018.) |
| DECID DECID | ||
| Theorem | xorcom 1433 |
is commutative.
(Contributed by David A. Wheeler, 6-Oct-2018.)
|
| | ||
| Theorem | pm5.15dc 1434 | A decidable proposition is equivalent to a decidable proposition or its negation. Based on theorem *5.15 of [WhiteheadRussell] p. 124. (Contributed by Jim Kingdon, 18-Apr-2018.) |
| DECID DECID | ||
| Theorem | xor2dc 1435 | Two ways to express "exclusive or" between decidable propositions. (Contributed by Jim Kingdon, 17-Apr-2018.) |
| DECID DECID | ||
| Theorem | xornbidc 1436 | Exclusive or is equivalent to negated biconditional for decidable propositions. (Contributed by Jim Kingdon, 27-Apr-2018.) |
| DECID DECID | ||
| Theorem | xordc 1437 | Two ways to express "exclusive or" between decidable propositions. Theorem *5.22 of [WhiteheadRussell] p. 124, but for decidable propositions. (Contributed by Jim Kingdon, 5-May-2018.) |
| DECID DECID | ||
| Theorem | xordc1 1438 | Exclusive or implies the left proposition is decidable. (Contributed by Jim Kingdon, 12-Mar-2018.) |
| DECID | ||
| Theorem | nbbndc 1439 | Move negation outside of biconditional, for decidable propositions. Compare Theorem *5.18 of [WhiteheadRussell] p. 124. (Contributed by Jim Kingdon, 18-Apr-2018.) |
| DECID DECID | ||
| Theorem | biassdc 1440 |
Associative law for the biconditional, for decidable propositions.
The classical version (without the decidability conditions) is an axiom of system DS in Vladimir Lifschitz, "On calculational proofs", Annals of Pure and Applied Logic, 113:207-224, 2002, http://www.cs.utexas.edu/users/ai-lab/pub-view.php?PubID=26805, and, interestingly, was not included in Principia Mathematica but was apparently first noted by Jan Lukasiewicz circa 1923. (Contributed by Jim Kingdon, 4-May-2018.) |
| DECID DECID DECID | ||
| Theorem | bilukdc 1441 | Lukasiewicz's shortest axiom for equivalential calculus (but modified to require decidable propositions). Storrs McCall, ed., Polish Logic 1920-1939 (Oxford, 1967), p. 96. (Contributed by Jim Kingdon, 5-May-2018.) |
| DECID DECID
DECID
| ||
| Theorem | dfbi3dc 1442 | An alternate definition of the biconditional for decidable propositions. Theorem *5.23 of [WhiteheadRussell] p. 124, but with decidability conditions. (Contributed by Jim Kingdon, 5-May-2018.) |
| DECID DECID | ||
| Theorem | pm5.24dc 1443 | Theorem *5.24 of [WhiteheadRussell] p. 124, but for decidable propositions. (Contributed by Jim Kingdon, 5-May-2018.) |
| DECID DECID
| ||
| Theorem | xordidc 1444 | Conjunction distributes over exclusive-or, for decidable propositions. This is one way to interpret the distributive law of multiplication over addition in modulo 2 arithmetic. (Contributed by Jim Kingdon, 14-Jul-2018.) |
| DECID DECID DECID
| ||
| Theorem | anxordi 1445 | Conjunction distributes over exclusive-or. (Contributed by Mario Carneiro and Jim Kingdon, 7-Oct-2018.) |
| | ||
For classical logic, truth tables can be used to define propositional
logic operations, by showing the results of those operations for all
possible combinations of true (
Although the intuitionistic logic connectives are not as simply defined,
Here we show that our definitions and axioms produce equivalent results for
| ||
| Theorem | truantru 1446 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
|
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| Theorem | truanfal 1447 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
|
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| Theorem | falantru 1448 |
A identity.
(Contributed by David A. Wheeler, 23-Feb-2018.)
|
|
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| Theorem | falanfal 1449 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
|
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| Theorem | truortru 1450 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.) (Proof
shortened by Andrew Salmon, 13-May-2011.)
|
|
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| Theorem | truorfal 1451 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
|
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| Theorem | falortru 1452 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
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| Theorem | falorfal 1453 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.) (Proof
shortened by Andrew Salmon, 13-May-2011.)
|
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| Theorem | truimtru 1454 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
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| Theorem | truimfal 1455 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.) (Proof
shortened by Andrew Salmon, 13-May-2011.)
|
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| Theorem | falimtru 1456 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
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| Theorem | falimfal 1457 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
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| Theorem | nottru 1458 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.)
|
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| Theorem | notfal 1459 |
A identity.
(Contributed by Anthony Hart, 22-Oct-2010.) (Proof
shortened by Andrew Salmon, 13-May-2011.)
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| Theorem | trubitru 1460 |
A identity. (Contributed by Anthony Hart, 22-Oct-2010.)
(Proof
shortened by Andrew Salmon, 13-May-2011.)
|
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| Theorem | trubifal 1461 |
A identity. (Contributed by David A. Wheeler, 23-Feb-2018.)
|
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| Theorem | falbitru 1462 |
A identity. (Contributed by Anthony Hart, 22-Oct-2010.)
(Proof
shortened by Andrew Salmon, 13-May-2011.)
|
|
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| Theorem | falbifal 1463 |
A identity. (Contributed by Anthony Hart, 22-Oct-2010.)
(Proof
shortened by Andrew Salmon, 13-May-2011.)
|
|
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| Theorem | truxortru 1464 |
A identity.
(Contributed by David A. Wheeler, 2-Mar-2018.)
|
|
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| Theorem | truxorfal 1465 |
A identity.
(Contributed by David A. Wheeler, 2-Mar-2018.)
|
|
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| Theorem | falxortru 1466 |
A identity.
(Contributed by David A. Wheeler, 2-Mar-2018.)
|
|
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| Theorem | falxorfal 1467 |
A identity.
(Contributed by David A. Wheeler, 2-Mar-2018.)
|
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The Greek Stoics developed a system of logic. The Stoic Chrysippus, in particular, was often considered one of the greatest logicians of antiquity. Stoic logic is different from Aristotle's system, since it focuses on propositional logic, though later thinkers did combine the systems of the Stoics with Aristotle. Jan Lukasiewicz reports, "For anybody familiar with mathematical logic it is self-evident that the Stoic dialectic is the ancient form of modern propositional logic" ( On the history of the logic of proposition by Jan Lukasiewicz (1934), translated in: Selected Works - Edited by Ludwik Borkowski - Amsterdam, North-Holland, 1970 pp. 197-217, referenced in "History of Logic" https://www.historyoflogic.com/logic-stoics.htm). For more about Aristotle's system, see barbara and related theorems. A key part of the Stoic logic system is a set of five "indemonstrables" assigned to Chrysippus of Soli by Diogenes Laertius, though in general it is difficult to assign specific ideas to specific thinkers. The indemonstrables are described in, for example, [Lopez-Astorga] p. 11 , [Sanford] p. 39, and [Hitchcock] p. 5. These indemonstrables are modus ponendo ponens (modus ponens) ax-mp 5, modus tollendo tollens (modus tollens) mto 668, modus ponendo tollens I mptnan 1468, modus ponendo tollens II mptxor 1469, and modus tollendo ponens (exclusive-or version) mtpxor 1471. The first is an axiom, the second is already proved; in this section we prove the other three. Since we assume or prove all of indemonstrables, the system of logic we use here is as at least as strong as the set of Stoic indemonstrables. Note that modus tollendo ponens mtpxor 1471 originally used exclusive-or, but over time the name modus tollendo ponens has increasingly referred to an inclusive-or variation, which is proved in mtpor 1470. This set of indemonstrables is not the entire system of Stoic logic. | ||
| Theorem | mptnan 1468 | Modus ponendo tollens 1, one of the "indemonstrables" in Stoic logic. See rule 1 on [Lopez-Astorga] p. 12 , rule 1 on [Sanford] p. 40, and rule A3 in [Hitchcock] p. 5. Sanford describes this rule second (after mptxor 1469) as a "safer, and these days much more common" version of modus ponendo tollens because it avoids confusion between inclusive-or and exclusive-or. (Contributed by David A. Wheeler, 3-Jul-2016.) |
| | ||
| Theorem | mptxor 1469 |
Modus ponendo tollens 2, one of the "indemonstrables" in Stoic logic.
Note that this uses exclusive-or . See rule 2 on
[Lopez-Astorga] p. 12 , rule 4 on
[Sanford] p. 39 and rule A4 in
[Hitchcock] p. 5 . (Contributed by
David A. Wheeler, 2-Mar-2018.)
|
| | ||
| Theorem | mtpor 1470 |
Modus tollendo ponens (inclusive-or version), aka disjunctive syllogism.
This is similar to mtpxor 1471, one of the five original
"indemonstrables"
in Stoic logic. However, in Stoic logic this rule used exclusive-or,
while the name modus tollendo ponens often refers to a variant of the
rule that uses inclusive-or instead. The rule says, "if is not
true, and or (or
both) are true, then must be
true". An alternate phrasing is, "Once you eliminate the
impossible,
whatever remains, no matter how improbable, must be the truth". --
Sherlock Holmes (Sir Arthur Conan Doyle, 1890: The Sign of the Four,
ch. 6). (Contributed by David A. Wheeler, 3-Jul-2016.) (Proof
shortened by Wolf Lammen, 11-Nov-2017.)
|
| | ||
| Theorem | mtpxor 1471 |
Modus tollendo ponens (original exclusive-or version), aka disjunctive
syllogism, similar to mtpor 1470, one of the five "indemonstrables"
in
Stoic logic. The rule says, "if is not true, and either
or
(exclusively) are true, then must be true". Today the
name "modus tollendo ponens" often refers to a variant, the
inclusive-or
version as defined in mtpor 1470. See rule 3 on [Lopez-Astorga] p. 12
(note that the "or" is the same as mptxor 1469, that is, it is
exclusive-or df-xor 1421), rule 3 of [Sanford] p. 39 (where it is not as
clearly stated which kind of "or" is used but it appears to be
in the
same sense as mptxor 1469), and rule A5 in [Hitchcock] p. 5 (exclusive-or
is expressly used). (Contributed by David A. Wheeler, 4-Jul-2016.)
(Proof shortened by Wolf Lammen, 11-Nov-2017.) (Proof shortened by BJ,
19-Apr-2019.)
|
| | ||
| Theorem | stoic1a 1472 |
Stoic logic Thema 1 (part a).
The first thema of the four Stoic logic themata, in its basic form, was: "When from two (assertibles) a third follows, then from either of them together with the contradictory of the conclusion the contradictory of the other follows." (Apuleius Int. 209.9-14), see [Bobzien] p. 117 and https://plato.stanford.edu/entries/logic-ancient/ We will represent thema 1 as two very similar rules stoic1a 1472 and stoic1b 1473 to represent each side. (Contributed by David A. Wheeler, 16-Feb-2019.) (Proof shortened by Wolf Lammen, 21-May-2020.) |
|
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| Theorem | stoic1b 1473 | Stoic logic Thema 1 (part b). The other part of thema 1 of Stoic logic; see stoic1a 1472. (Contributed by David A. Wheeler, 16-Feb-2019.) |
| | ||
| Theorem | stoic2a 1474 |
Stoic logic Thema 2 version a.
Statement T2 of [Bobzien] p. 117 shows a reconstructed version of Stoic logic thema 2 as follows: "When from two assertibles a third follows, and from the third and one (or both) of the two another follows, then this other follows from the first two."
Bobzien uses constructs such as This version a is without the phrase "or both"; see stoic2b 1475 for the version with the phrase "or both". We already have this rule as syldan 282, so here we show the equivalence and discourage its use. (New usage is discouraged.) (Contributed by David A. Wheeler, 17-Feb-2019.) |
|
| ||
| Theorem | stoic2b 1475 |
Stoic logic Thema 2 version b. See stoic2a 1474.
Version b is with the phrase "or both". We already have this rule as mpd3an3 1375, so here we prove the equivalence and discourage its use. (New usage is discouraged.) (Contributed by David A. Wheeler, 17-Feb-2019.) |
|
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| Theorem | stoic3 1476 |
Stoic logic Thema 3.
Statement T3 of [Bobzien] p. 116-117 discusses Stoic logic thema 3. "When from two (assemblies) a third follows, and from the one that follows (i.e., the third) together with another, external external assumption, another follows, then other follows from the first two and the externally co-assumed one. (Simp. Cael. 237.2-4)" (Contributed by David A. Wheeler, 17-Feb-2019.) |
|
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| Theorem | stoic4a 1477 |
Stoic logic Thema 4 version a.
Statement T4 of [Bobzien] p. 117 shows a reconstructed version of Stoic logic thema 4: "When from two assertibles a third follows, and from the third and one (or both) of the two and one (or more) external assertible(s) another follows, then this other follows from the first two and the external(s)."
We use |
| | ||
| Theorem | stoic4b 1478 |
Stoic logic Thema 4 version b.
This is version b, which is with the phrase "or both". See stoic4a 1477 for more information. (Contributed by David A. Wheeler, 17-Feb-2019.) |
| | ||
| Theorem | syl6an 1479 | A syllogism deduction combined with conjoining antecedents. (Contributed by Alan Sare, 28-Oct-2011.) |
| | ||
| Theorem | syl10 1480 | A nested syllogism inference. (Contributed by Alan Sare, 17-Jul-2011.) |
 | ||
| Theorem | a1ddd 1481 | Triple deduction introducing an antecedent to a wff. Deduction associated with a1dd 48. Double deduction associated with a1d 22. Triple deduction associated with ax-1 6 and a1i 9. (Contributed by Jeff Hankins, 4-Aug-2009.) |
|
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| Theorem | exbir 1482 | Exportation implication also converting head from biconditional to conditional. (Contributed by Alan Sare, 31-Dec-2011.) |
|
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| Theorem | 3impexp 1483 | impexp 263 with a 3-conjunct antecedent. (Contributed by Alan Sare, 31-Dec-2011.) |
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| Theorem | 3impexpbicom 1484 | 3impexp 1483 with biconditional consequent of antecedent that is commuted in consequent. (Contributed by Alan Sare, 31-Dec-2011.) |
|
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| Theorem | 3impexpbicomi 1485 | Deduction form of 3impexpbicom 1484. (Contributed by Alan Sare, 31-Dec-2011.) |
|
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| Theorem | ancomsimp 1486 | Closed form of ancoms 268. (Contributed by Alan Sare, 31-Dec-2011.) |
| | ||
| Theorem | expcomd 1487 | Deduction form of expcom 116. (Contributed by Alan Sare, 22-Jul-2012.) |
|
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| Theorem | expdcom 1488 | Commuted form of expd 258. (Contributed by Alan Sare, 18-Mar-2012.) |
|
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| Theorem | simplbi2comg 1489 | Implication form of simplbi2com 1490. (Contributed by Alan Sare, 22-Jul-2012.) |
| | ||
| Theorem | simplbi2com 1490 | A deduction eliminating a conjunct, similar to simplbi2 385. (Contributed by Alan Sare, 22-Jul-2012.) (Proof shortened by Wolf Lammen, 10-Nov-2012.) |
| | ||
| Theorem | syl6ci 1491 | A syllogism inference combined with contraction. (Contributed by Alan Sare, 18-Mar-2012.) |
|
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| Theorem | mpisyl 1492 | A syllogism combined with a modus ponens inference. (Contributed by Alan Sare, 25-Jul-2011.) |
| | ||
| Theorem | dcfromnotnotr 1493 |
The decidability of a proposition follows from a suitable
instance of double negation elimination (DNE). Therefore, if we were to
introduce DNE as a general principle (without the decidability condition
in notnotrdc 851), then we could prove that every proposition
is
decidable, giving us the classical system of propositional calculus
(since DNE itself is classically valid). (Contributed by Adrian
Ducourtial, 6-Oct-2025.)
|
|
DECID
| ||
| Theorem | dcfromcon 1494 |
The decidability of a proposition follows from a suitable
instance of the principle of contraposition. Therefore, if we were to
introduce contraposition as a general principle (without the
decidability condition in condc 861), then we could prove that every
proposition is decidable, giving us the classical system of
propositional calculus (since the principle of contraposition is itself
classically valid). (Contributed by Adrian Ducourtial, 6-Oct-2025.)
|
|
DECID | ||
| Theorem | dcfrompeirce 1495 |
The decidability of a proposition follows from a suitable
instance of Peirce's law. Therefore, if we were to introduce Peirce's
law as a general principle (without the decidability condition in
peircedc 922), then we could prove that every proposition
is decidable,
giving us the classical system of propositional calculus (since Perice's
law is itself classically valid). (Contributed by Adrian Ducourtial,
6-Oct-2025.)
|
| DECID | ||
The universal quantifier was introduced above in wal 1396 for use by df-tru 1401. See the comments in that section. In this section, we continue with the first "real" use of it. | ||
| Axiom | ax-5 1496 | Axiom of Quantified Implication. Axiom C4 of [Monk2] p. 105. (Contributed by NM, 5-Aug-1993.) |
| | ||
| Axiom | ax-7 1497 | Axiom of Quantifier Commutation. This axiom says universal quantifiers can be swapped. One of the predicate logic axioms which do not involve equality. Axiom scheme C6' in [Megill] p. 448 (p. 16 of the preprint). Also appears as Lemma 12 of [Monk2] p. 109 and Axiom C5-3 of [Monk2] p. 113. (Contributed by NM, 5-Aug-1993.) |
| ||
| Axiom | ax-gen 1498 |
Rule of Generalization. The postulated inference rule of predicate
calculus. See, e.g., Rule 2 of [Hamilton] p. 74. This rule says that
if something is unconditionally true, then it is true for all values of
a variable. For example, if we have proved , we can
conclude
or even
. Theorem spi 1585
shows we can go
the other way also: in other words we can add or remove universal
quantifiers from the beginning of any theorem as required. (Contributed
by NM, 5-Aug-1993.)
|
| | ||
| Theorem | gen2 1499 | Generalization applied twice. (Contributed by NM, 30-Apr-1998.) |
| | ||
| Theorem | mpg 1500 | Modus ponens combined with generalization. (Contributed by NM, 24-May-1994.) |
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