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Sentential Logic

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A set G of sentences of SL is inconsistent in SD iff both a sentence P and its ... Inconsistent in SD. E.g. show that the followings sets of sentences of SL are ... – PowerPoint PPT presentation

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Title: Sentential Logic


1
Sentential Logic
  • Derivations

2
Basic Concepts of SD
  • Last day we started to look at the semantic
    concepts that we can use derivations in SD to
    test for.
  • Each of these concepts will be defined in terms
    of derivability in SD.

3
Basic Concepts of SD
  • Defn A sentence P of SL is derivable in SD from
    a set G of sentences iff there is a derivation in
    SD in which all of the primary assumptions are
    members of G and P occurs in the scope of only
    those assumptions.
  • This is written
  • G P

4
Basic Concepts of SD
  • Defn An argument of SL is valid in SD iff the
    conclusion of the argument is derivable in SD
    from the set consisting of the premises. An
    argument is invalid in SD iff it is not valid in
    SD.
  • NB You cannot use derivations to show that
    arguments are invalid in SD.

5
Basic Concepts of SD
  • A sentence P of SL is a theorem in SD iff P is
    derivable in SD from the empty set.
  • The theorems of SD are all the truth-functionally
    true sentences of SL.
  • This is written
  • P
  • or
  • Ø P

6
Theorem of SD
  • To say that a sentence is derivable from the
    empty set, is to say that it is derivable from a
    set containing no sentences.
  • In a derivation where we want to show that a
    sentence is a theorem of SD, there are no primary
    assumptions.

7
Theorem of SD
  • E.g. show that each of the following sentences of
    SL is a theorem of SD.
  • (A A) É B
  • (A v B) É (B v A)

8
E.G.
  • (A A) É B 1- ÉI

9
E.G.
  • (A A) Assumption
  • B
  • (A A) É B 1- ÉI

10
E.G.
  • (A A) Assumption
  • B Assumption
  • B 2- E
  • (A A) É B 1- ÉI

11
E.G.
  • (A A) Assumption
  • B Assumption
  • A 1 E
  • A 1 E
  • B 2- E
  • (A A) É B 1- ÉI

12
E.G.
  • (A A) Assumption
  • B Assumption
  • A 1 E
  • A 1 E
  • B 2-4 E
  • (A A) É B 1-5 ÉI

13
Basic Concepts of SD
  • Sentences P and Q of SL are equivalent in SD iff
    Q is derivable in SD from P and P is
    derivable in SD from Q .
  • In order to show that two sentences are
    equivalent in SD we need to construct two
    derivationsone in which P is the primary
    assumption, and Q is the last line of that
    derivation (next to the main scope line), and one
    where Q is the primary assumption and P is last
    line (next to the main scope line).

14
Equivalent in SD
  • E.g. show that the following pairs of sentences
    of SL are equivalent in SD.
  • (A v B) É A B É A
  • (A v B) C (A C) v (B C)

15
E.g.
  • (A v B) É A B É A
  • Show that
  • (A v B) É A B É A
  • and
  • B É A (A v B) É A

16
Basic Concepts of SD
  • A set G of sentences of SL is inconsistent in SD
    iff both a sentence P and its negation P are
    derivable in SD from G.
  • We cannot use SD to show that a set of sentences
    in consistent in SD.

17
Inconsistent in SD
  • E.g. show that the followings sets of sentences
    of SL are inconsistent in SD.
  • D É D, D
  • P É (A Y), Y É (A P), P v Y
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