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Logic: Chapter One: Sections V VI

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Title: Logic: Chapter One: Sections V VI


1
Logic Chapter One Sections V VI
  • Jay Odenbaugh
  • Philosophy
  • Lewis and Clark College

2
V. Reconstructing Arguments
  • As we have seen, arguments often do not contain
    indicator words.
  • Thus, we must determine what the premises and
    conclusion are from context. One can insert
    indicator words into the argument to see if the
    meaning is the same or different.

3
Incomplete Arguments (Enthymemes)
  • Another problem with reconstructing arguments is
    that some arguments are incomplete.
  • An argument is incomplete if there is at least
    one missing premise.
  • If an argument is incomplete, then at first
    glance, the argument might appear weak. However,
    to properly evaluate the argument, we must
    identify the missing premise(s).

4
Generalizations
  • Many incomplete arguments omit either universal
    or statistical generalizations.
  • Lets let A and B be general terms or what
    are called predicates (they stand for classes or
    sets of objects)
  • Universal generalizations All A are B No A
    are B
  • Statistical generalizations Most A are B
    (some, usually, seldom, frequently, rarely,
    etc.)

5
Square of Opposition
  • All As are Bs No As are Bs
  • Some As are Bs Some As are not Bs.
  • What are the logical relations between these
    generalizations?

6
Contradictions
  • Let P and Q be statements. Then
  • P and Q are contradictory just in case there are
    mutually exclusive.
  • P and Q are mutually exclusive just in case if P
    is true, the Q must be false and if Q is true,
    then P must be false
  • In our square of opposition, which statements are
    contradictory?

7
Contradictions, Cont.
  • In our square of opposition, there are two pairs
    of contradictions
  • All As are Bs and Some As are not Bs.
  • No As are Bs and Some As are Bs.
  • If everything which is A is also B, then there
    can be no A which is not also a B.
  • Similarly, if nothing which is an A is a B, then
    there can be no A which is a B.

8
Contradictions, Cont.
  • Here is an example of a contradiction
  • All of Sylvester Stallone movies are ridiculous.
  • Some of Sylvester Stallone movies are not
    ridiculous
  • Notice that if the former is true, then the
    latter must be false.
  • Likewise, if the latter is true, then the former
    must be true.

9
Contradictions, Cont.
  • Here is the other example of a contradiction
  • No Sylvester Stallone movie is ridiculous.
  • Some Sylvester Stallone movies are ridiculous.
  • If the former is true, then the latter must be
    false.
  • If the latter is true, the former must be false.

10
Contraries
  • Besides contradictions, our square of opposition
    also contains contraries.
  • P and Q are contraries just in case both P and Q
    cannot be true but they both can be false.
  • Which statements in our square of opposition are
    contraries?

11
Contraries, Cont.
  • In our square of opposition, the contraries are
  • All As are Bs and No As are Bs.
  • If every things which is an A is also a B, then
    it cannot be true that nothing is both an A and a
    B.
  • However, both statements may be false - it may be
    true that some As are Bs and some are not.

12
Contraries, Cont.
  • Here is an example of contraries
  • All Hondas are easy to steal.
  • No Hondas are easy to steal.
  • Notice that they cannot both be true but they can
    both be false.

13
Subcontraries
  • Besides contradictions and contraries, our square
    of opposition finally contains subcontraries
  • P and Q are subcontraries just in case they both
    can be true but that cannot both be false.
  • Which statements are subcontraries in our square
    of opposition?

14
Subcontraries, Cont.
  • In our square of opposition, the subcontraries
    are
  • Some As are Bs and Some As are not Bs.
  • Some As can be B and some might not be Bs.
  • However, for anything which is an A, it must
    either be a B or not a B.

15
Subcontraries, Cont.
  • Here is an example of subcontraries
  • Some Lewis and Clark students are democrats.
  • Some Lewis and Clark students are not democrats.
  • It is possible that some Lewis and Clark students
    are democrats and some are not.
  • However, for any Lewis and Clark student, they
    are either a democrat or they are not.

16
Summary
  • So, we have the following relationships
  • Contradictory
  • All A are B, Some A are not B
  • No As are Bs, Some As are Bs.
  • Contrary All As are Bs, No As are Bs
  • Subcontrary Some As are Bs, Some As are not Bs.

17
Statistical Generalizations
  • Statistical generalizations have the following
    form
  • Most As are Bs (or many, some, frequently, etc.)
  • For simplicity, one can think of generalizations
    as forming a continuum. A generalization can be
    construed as
  • n of A are B

18
Statistical Generalizations, Cont.
  • In the limiting cases, either n 100 or n 0.
  • 100 of As are Bs ? universal generalization
  • 0 of As are Bs ? universal generalization
  • If 100 lt n lt 0, then we have a statistical
    generalization.
  • n of As are Bs ? statistical generalization

19
Incomplete Arguments
  • Arguments are often incomplete because the
    missing premise(s) is taken to be obvious.
    However,
  • What we take to be obvious may not be so to
    everyone,
  • What everyone takes to be obvious may be false.
  • When you reconstruct arguments, use a principle
    of charity do not attribute false beliefs or
    unjustified beliefs to someone unless there is no
    alternative.

20
Important Skills for Reconstructing Arguments
  • Be sensitive to different uses of language.
  • Recognize when evidence is required to support an
    assertion.
  • Be aware of the difference between the truth of
    statements and the support they would provide
    some other statement if they were true.
  • Recognize arguments, identify their parts, supply
    missing premises, and distinguish between the
    premises and conclusion.

21
Homework, 1.4
  • 2. College graduates earn more than those who
    have never been to college.
  • 4. Most hockey players are missing at least one
    tooth.
  • 6. Zero percent of the ingredients of Brand X
    breakfast cereal are toxic.

22
Homework, 1.5
  • 3. Discriminationrefusing to admit someone to a
    public place of business on grounds of race, sex,
    or religionis against federal law. However, the
    law also respects the rights of people to
    associate privately with whomever they wish.
  • Last year the national organization of Jaycees
    voted to kick out the women members they had
    previously recruited. They even voted to kick out
    the chapters who wouldnt kick out the women they
    had previously invited.
  • But in Minnesota, the courts ruled that the
    Jaycees were actually operating as a public
    business. They were soliciting members, and open
    to anyone so long as that anyone was a male. So,
    this duty designated public business was
    forbidden to discriminate.

23
Homework, 1.5 Cont.
  • Discriminationrefusing to admit someone to a
    public place of business on grounds of race, sex,
    or religionis against federal law.
  • However, the law also respects the rights of
    people to associate privately with whomever they
    wish.
  • Last year the national organization of Jaycees
    voted to kick out the women members they had
    previously recruited.
  • They even voted to kick out the chapters who
    wouldnt kick out the women they had previously
    invited.
  • But in Minnesota, the courts ruled that the
    Jaycees were actually operating as a public
    business.
  • They were soliciting members, and open to anyone
    so long as that anyone was a male.
  • So, this duty designated public business was
    forbidden to discriminate.

24
Homework 1.5
  • Discriminationrefusing to admit someone to a
    public place of business on grounds of race, sex,
    or religionis against federal law.
  • However, the law also respects the rights of
    people to associate privately with whomever they
    wish.
  • Last year the national organization of Jaycees
    voted to kick out the women members they had
    previously recruited.
  • But in Minnesota, the courts ruled that the
    Jaycees were actually operating as a public
    business.
  • They were soliciting members, and open to anyone
    so long as that anyone was a male.
  • __________________________________________________
    _________
  • So, this duty designated public business was
    forbidden to discriminate.
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