Symbolic Language and Basic Operators - PowerPoint PPT Presentation

1 / 25
About This Presentation
Title:

Symbolic Language and Basic Operators

Description:

Symbolic language allows us to abstract away the complexities of natural ... Either Polly and Quinn or Rita and Sam will not win the game show. ... – PowerPoint PPT presentation

Number of Views:70
Avg rating:3.0/5.0
Slides: 26
Provided by: kareemk
Category:

less

Transcript and Presenter's Notes

Title: Symbolic Language and Basic Operators


1
Symbolic Language and Basic Operators
  • Kareem Khalifa
  • Department of Philosophy
  • Middlebury College

2
Overview
  • Why this matters
  • Artificial versus natural languages
  • Conjunction
  • Negation
  • Disjunction
  • Punctuation
  • Sample Exercises

3
Why this matters
  • Symbolic language allows us to abstract away the
    complexities of natural languages like English so
    that we can focus exclusively on ascertaining the
    validity of arguments
  • Judging the validity of arguments is an important
    skill, so symbolic languages allow us to focus
    and hone this skill.
  • Symbolic language encourages precision. This
    precision can be reintroduced into natural
    language.

4
More on why this matters
  • You are learning the conditions under which a
    whole host of statements are true and false.
  • This is crucial for criticizing arguments.
  • It is a good critical practice to think of
    conditions whereby a claim would be false.

5
Artificial versus natural languages
  • Symbolic language (logical syntax) is an
    artificial language
  • It was designed to be as unambiguous as possible.
  • English (French, Chinese, Russian, etc.) are
    natural languages
  • They werent really designed in any strong sense
    at all. They emerge and evolve through very
    organic and (often) unreflective cultural
    processes.
  • As a result, they have all sorts of ambiguities.
  • The tradeoff is between clarity and expressive
    richness. Both are desirable, but theyre hard to
    combine.

6
Propositions as letters
  • Logical syntax represents individual propositions
    as letters.
  • When we dont care what the proposition actually
    stands for, we represent it with a lowercase
    letter, typically beginning with p.
  • When we have a fixed interpretation of a
    proposition, we represent it with a capital
    letter, typically beginning with P.
  • Ex. Let P Its raining.
  • Sometimes, letters are subscripted. Each
    subscripted letter should be interpreted as a
    different proposition.

7
Dispensable translation manuals
  • Often, the letters are given an interpretation,
    i.e., they are mapped onto specific sentences in
    English.
  • Ex. Let P be It is raining Q be The streets
    are wet, etc.
  • However, this is not necessary. The validity of
    an argument doesnt hinge on the interpretation.
  • If p then q
  • p
  • ? q

8
Logical connectives some basics
  • A logical connective is a piece of logical syntax
    that
  • Operates upon propositions and
  • Forms a larger (compound) proposition out of the
    propositions it operates upon, such that the
    truth of the compound proposition is a function
    of the truth of its component propositions.
  • Today, well look at AND, NOT, and OR.
  • Khalifa is cunning and cute.
  • Khalifa is not cunning.
  • Either Khalifa is cunning or he is foolish.

9
Conjunction
  • AND-statements
  • Middlebury has a philosophy department AND it has
    a neuroscience program.
  • Represented either as ? or as
  • I recommend , since its just SHIFT7
  • p q will be true when p is true and q is
    true false otherwise.

10
Truth-tables
  • Examine all of the combinations of component
    propositions, and define the truth of the
    compound proposition.

T
F
F
F
11
Subtleties in translating English conjunctions
into symbolic notation
  • The and does not always appear in between two
    propositions.
  • Khalifa is handsome and modest.
  • Khalifa and Grasswick teach logic.
  • Khalifa teaches logic and plays bass.

12
More subtleties
  • Sometimes and in English means and
    subsequently.
  • The truth-conditions for this are the same as
    , but the meaning of the English expression is
    not fully captured by the formal language.
  • Many English words have the same truth-conditions
    as but have additional meanings.
  • Ex. but, yet, still, although, however,
    moreover, nevertheless
  • General lesson The meaning of a proposition is
    not (easily) identifiable with the
    truth-functions that define it in logical
    notation.

13
Negation
  • Represented by a
  • In English, not, its not the case that,
    its false that, its absurd to think that,
    etc.

F
T
14
Disjunction
  • Represented in English by or.
  • However, there are two senses of or in English
  • Inclusive when p AND q are true, p OR q is true
  • Exclusive when p AND q is true, p OR q is false
  • Logical disjunction (represented as v) is an
    inclusive or.

15
Which is inclusive and which is exclusive?
  • You can take Intro to Logic in the fall or the
    spring.
  • Exclusive. You cant take the same course twice!
  • You can take Intro to Logic or Calculus I.
  • Inclusive. Youd then be learned in logic and in
    math!

16
Truth table for disjunction
T
T
T
F
17
Punctuation
  • We can daisy-chain logical connectives together.
  • Either Polly and Quinn or Rita and Sam will not
    win the game show.
  • If we have no way of grouping propositions
    together, it becomes ambiguous
  • P Q v R S
  • Logic follows the same conventions as math (
    ) , though some logicians prefer to use only (
    ( ( ) ) ).
  • (PQ) v (RS)

18
A few exceptions
  • A negation symbol applies to the smallest
    statement that the punctuation permits.
  • Ex. p q is equivalent to (p) q
  • It is NOT equivalent to (p q)
  • This reduces the number of ( )
  • We can also drop the outermost brackets of any
    expression.
  • Ex. p (q v r) is equivalent to p (q v r)

19
Lessons about punctuation from logic
  • Make sure, in English, that you phrase things so
    that there is no ambiguity
  • Commas are very useful here
  • Be especially sensitive when reading about small
    subtleties about logical structure that would
    change the meaning of a passage.

20
Sample Exercise A3 (327)
  • London is the capital of England Stockholm is
    the capital of Norway
  • T F
  • F T
  • F

21
Sample Exercise A4 (327)
  • (Rome is the capital of Spain v Paris the
    capital of France)
  • (F v T)
  • (T)
  • F

22
Sample Exercise A9 (327)
  • (London is the capital of England v Stockholm is
    the capital of Norway) (Rome is the capital of
    Italy Stockholm is the capital of Norway)
  • (T v F) (T F)
  • (T) (F T)
  • (T) (F)
  • F

23
Sample Exercise C3 (329)
  • Q v X
  • Q v F
  • Q v T
  • T

24
Exercise C12 (329)
  • (P Q) (P v Q)
  • The first conjunct (PQ), can only be true if P
    Q T
  • However, this would make the whole conjunction
    false. Heres the proof
  • (TT) (T v T)
  • (T) (F v F)
  • (T) (F)
  • F

25
Exercise D9 (330)
  • It is not the case that Egypts food shortage
    worsens, and Jordan requests more U.S. aid.
  • E J
Write a Comment
User Comments (0)
About PowerShow.com