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Title: Reason and Argument


1
Reason and Argument
  • Chapter 6 (1/4)

2
Common misperceptions about logic
  • The science of Deduction and Analysis is one
    which can only be acquired by long and patient
    study, nor is life long enough to allow any
    mortal to attain the highest possible perfection
    in it. From A Study in Scarlet

3
A joke
  • Sherlock Holmes and Dr. Watson go on a camping
    trip. After a good dinner and a bottle of wine,
    they retire for the night, and go to sleep. Some
    hours later, Holmes wakes up and nudges his
    faithful friend. "Watson, look up at the sky and
    tell me what you see.""I see millions and
    millions of stars, Holmes" replies Watson."And
    what do you deduce from that?"Watson ponders for
    a minute."Well, astronomically, it tells me that
    there are millions of galaxies and potentially
    billions of planets. Astrologically, I observe
    that Saturn is in Leo. Horologically, I deduce
    that the time is approximately a quarter past
    three. Meteorologically, I suspect that we will
    have a beautiful day tomorrow. Theologically, I
    can see that God is all powerful, and that we are
    a small and insignificant part of the universe.
    What does it tell you, Holmes?" Holmes is silent
    for a moment.

4
The punchline
  • "Watson, you idiot!" he says. "Someone has stolen
    our tent!"

5
Common misperceptions about logic
  • Typically, Spock said nothing about logic, per
    se.
  • Whenever Spock would claim that something was or
    was not logical, he generally meant rational.

6
A note about the rules of logic
  • The rules of logic are not made up or stipulated,
    or even proved (though they can be derived from
    one another like the axioms of Euclidian
    geometry, and as with any axiomatic system, at
    least one axiom will always remain unproven)
  • The rules of logic are discovered, and are lent
    force by the very fact that theyre obvious,
    otherwise we wouldnt be able to call them rules
    of logic.
  • Well start with the simplest rules the rules
    for and

7
But first, Propositions
  • The textbook authors are (understandably)
    imprecise about talk of propositions. To wit
    John is Tall is not a proposition, just like
    3 is not a number.

8
Propositions
  • John is tall is a sentence that expresses the
    proposition that John is tall.
  • 3 is a numeral that expresses what we mean by
    the number 3.
  • This is important because one should not get the
    idea that any sentence can express a proposition.
    To express a proposition, a sentence must be an
    example of a linguistic act.

9
Propositional Form and Substitution Instances
  • p q represents any two joined propositions.
  • Though the rule in the book (p. 144) allows that
    different variables be replaced by the same
    proposition, for practical purposes we will never
    do this.
  • Also contrary to the text, Roses are red and
    violets are blue does not represent a single
    proposition, but instead a conjunction of two of
    them.
  • The 8th edition of the book inserts a
    justification for this based on an analogy to
    mathematics. My reply logic, whatever it looks
    like, is not precisely math. We have good reasons
    to limit one proposition to one propositional
    variable and vice versa.

10
Something else about propositions
  • Propositions are bearers of truth-values.
  • That means that any given proposition can have
    the property of being true or the property of
    being false, and all propositions have one or the
    other (which is why we insist on the linguistic
    act constraint)
  • Does that mean that we must view truth as a
    black-and-white kind of thing? Well, yes, it
    does.

11
Got a problem with black and white? Why dont you
tell me that to my face! Thought so
12
Bearers of truth-value
  • Since propositions are expressed by sentences
    that are meaningful, they reflect states of
    affairs. In other words, they reflect the way
    things are or are not.
  • Take the proposition expressed by the sentence
    John is tall.
  • The proposition is true if it is considered in a
    state of affairs in which John is tall and it is
    false if it is considered in a state of affairs
    in which John is not tall.
  • Notice that whether we agree about the state of
    affairs is a different question.

13
How truth tables work
  • The leftmost columns are called reference columns
    and contain each individual propositional
    variable (or sentence), usually in alphabetical
    order.
  • There is one remaining column for each connective
    (, v, , ?) used.
  • Each row of a truth table corresponds to one
    possible state of affairs.
  • Every possible state of affairs is represented on
    a truth table. The number of rows is 2n where n
    is the number of reference columns.

14
The truth table for
p q p q
T T T
T F F
F T F
F F F
15
Propositional versus nonpropositional conjunction
  • Exercise IV
  • 1. nonpropositional
  • 2. nonpropositional
  • 3. nonpropositional
  • 4. propositional
  • 5. propositional
  • 6. nonpropositional
  • 7. nonpropositional
  • 8. either (ambiguous)
  • 9. nonpropositional

16
Validity for
conclusion premise
p q p q
T T T
T F F
F T F
F F F
17
How about this one?
conclusion premise
p q p q
T T T
T F F
F T F
F F F
18
What about this?
premise conclusion
p q p q
T T T
T F F
F T F
F F F
19
Notice
premise conclusion
p q p q
T T T
T F F
F T F
F F F
20
How about
premise premise conclusion
p q p q
T T T
T F F
F T F
F F F
21
So any substitution instances of the following
will ALWAYS be valid.
  • p q
  • p
  • p q
  • q
  • p
  • q___
  • p q

22
Exercise V
  • 1. valid
  • 2. not valid
  • 3. valid (trivially)
  • 4. valid
  • 5. valid (though conversationally, a different
    meaning is implied)
  • 6. nonpropositional, but valid (would require
    predicate logic to demonstrate)

23
Exercise VI
  • 1. True
  • 2. True
  • 3. True

24
Exclusive vs. Inclusive or
  • Sometimes when a person says something of the
    form p or q they mean p or q or both and
    sometimes they mean p or q and not both. The
    former is an inclusive or and the latter is
    exclusive.
  • Most logicians default to the inclusive or.
    Some even claim that all uses of or are
    inclusive, and it is conversational implication
    that makes some of them exclusive.
  • In any case, it is important to examine cases
    where or is used to determine which is which,
    because it will affect the validity of any
    argument that or is used in.

25
Disjunction
p q p v q
T T T
T F T
F T T
F F F
26
Negation
  • It is tempting to say that Smurfs are blue and
    Smurfs are not blue are sentences that express
    two propositions.
  • That is not the case. What is going on is that
    the same proposition is involved, and in one case
    the proposition is negated.
  • If s stands for Smurfs are blue and is
    our symbol for negation, then Smurfs are not
    blue is formalized as s.

27
Be careful with Negation
  • Sometimes not is syntactically ambiguous.
    Translating as it is not the case that can
    help to disentangle ambiguity.
  • Be careful with opposites.
  • nobody owns Mars is the negation of somebody
    owns Mars because it is not the case that
    somebody owns Mars means the same thing as
    nobody owns Mars
  • However, some opposites are not binary. Consider
    Cheering for the Yankees is moral. The
    negation of this should just be It is not the
    case that cheering for the Yankees is moral.
    Resist the temptation to translate the negation
    as Cheering for the Yankees is immoral. This
    is because actions that are not moral could be
    either amoral or immoral (but not both).
  • The point is, just be strict in translating
    as it is not the case that

28
Further ambiguity in negation
  • Consider (Everyone loves running)
  • Not everyone loves running
  • Everyone does not love running
  • Everyone loves not running
  • No one loves running
  • Everyone hates running
  • Everyone loves walking
  • For the sake of Pete, just say It is not the
    case that everyone loves running

29
Disjunctive Syllogism
  • Consider the argument
  • p v q
  • p
  • q

C P2 P1
p q p p v q
T T
T F
F T
F F
30
Disjunctive Syllogism
  • Consider the argument
  • p v q
  • p
  • q
  • VALID

C P2 P1
p q p p v q
T T F T
T F F T
F T T T
F F T F
31
Consider the Argument
  • p v q
  • p___
  • q

P2 C P1
p q q p v q
T T
T F
F T
F F
32
Consider the Argument
  • p v q
  • p___
  • q
  • INVALID

P2 C P1
p q q p v q
T T F T
T F T T
F T F T
F F T F
33
Pay attention to parentheses
  • Notice that a g means something different than
    (a g).
  • Substitute Annie is rich for a and Gina is
    happy for g.
  • The first phrase translates to It is not the
    case that Annie is rich and it is the case that
    Gina is happy.
  • The second phrase translates to It is not the
    case that both Annie is rich and Gina is happy.
  • How about a g?

34
Logic and Math
  • I know that logic LOOKS for all the world like
    math, but resist the temptation to treat
    mathematical symbols and logical symbols as
    interchangeable.
  • For example, math has parentheses, and also has a
    negative symbol, - that looks a bit like
    logics negation symbol , so since changing
    (2 3) to -2 -3 is a mathematically valid
    procedure, changing (p q) to p q should be
    logically valid, right?

35
Equivalence of a g, (a g), a g
a g a g a g a g (a g) a g
T T F F T F F F
T F F T F F T F
F T T F F T T F
F F T T F F T T
36
Exercise XII
  • 15. A v ((B C) v (B v (Z v B)))
  • T v ((T T) v (T v (F v T)))
  • T v ((T T) v (T v T))
  • T v ((T T) v (T v T))
  • T v ((F T) v (F v F))
  • T v ((F T) v (F v F))
  • T v (F v F)
  • T v (F v F)
  • T v (F v T)
  • T v (F v T)
  • T v T
  • T v T
  • T
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