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Logic

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Title: Geometry Author: Kathryn Middlestead Last modified by: Kathryn Middlestead Created Date: 8/16/2006 12:00:00 AM Document presentation format – PowerPoint PPT presentation

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Title: Logic


1
Logic
  • A statement is a sentence that is either true or
    false (its truth value).
  • Logically speaking, a statement is either true or
    false. What are the values of these statements?
  • The sun is hot.
  • The moon is made of cheese.
  • A triangle has three sides.
  • The area of a circle is 2pr.
  • Statements can be joined together in various ways
    to make new statements.

2
Conditional Statements
  • A conditional (or propositional) statement has
    two parts
  • A hypothesis (or condition, or premise)
  • A conclusion (or result)
  • Many conditional statements are in If then
    form.
  • Ex. If it is raining outside, then I will get
    wet.
  • A conditional statement is made of two separate
    statements each part has a truth value. But the
    overall statement has a separate truth value.
    What are the values of the following statements?
  • If today is Friday, then tomorrow is Saturday.
  • If the sun explodes, then we can live on the
    moon.
  • If a figure has four sides, then it is a square.

3
Conditional Statements
  • Conditional statements dont have to be If
    then See if you can determine the condition
    and conclusion in each of the following, and
    restate in If then form.
  • An apple a day keeps the doctor away.
  • What goes up must come down.
  • All dogs go to heaven.
  • Triangles have three sides.

4
Inverse
  • The inverse of a statement is formed by negating
    both its hypothesis and conclusion.
  • Statement
  • If I take out my cell phone, then Mr. Peterson
    will confiscate it.
  • Inverse
  • If I do take out my cell phone, then Mr.
    Peterson will confiscate it.

not
not
5
Try these
  • Give the inverses for the following statements.
    (You may wish to rewrite as If then first.)
    Then determine the truth value of the inverse.
  • Barking dogs give me a headache.
  • If lines are parallel, they will not intersect.
  • I can use the Pythagorean Theorem on right
    triangles.
  • A square is a four-sided figure.

6
Converse
  • A statements converse will switch its hypothesis
    and conclusion.
  • Statement
  • If I am happy, then I smile.
  • Converse
  • If , then .

I smile
I am happy
7
Try these
  • Give the converses for the following statements.
    Then determine the truth value of the converse.
  • If I am a horse, then I have four legs.
  • When Im thirsty, I drink water.
  • All rectangles have four right angles.
  • If a triangle is isosceles, then two of its sides
    are the same.

8
Contrapositive
  • A contrapositive is a combination of a converse
    and an inverse. The premise and conclusion
    switch, and both are negated.
  • Statement
  • If my alarm has gone off,then I am awake.
  • Contrapositive
  • If
    ,then .

my alarm has not gone off
not

I am not awake
not

9
Try these
  • Give the contrapositives for the following
    statements. Then determine its truth value.
  • If it quacks, then it is a duck.
  • When Superman touches kryptonite, he gets sick.
  • If two figures are congruent, they have the same
    shape and size.
  • A pentagon has five sides.
  • Note A contrapositive always has the same truth
    value as the original statement!

10
Symbolic representation
  • Logic is an area of study, related to math (and
    computer science and other fields). In formal
    logic, we can represent statements symbolically
    (using symbols).
  • Some common symbols
  • a statement, usually a premise a statement,
    usually a conclusion creates a conditional
    statement negates a statement (takes its
    opposite)

11
Examples
  • If p, then q
  • InverseIf not p, then not q
  • ConverseIf q, then p
  • ContrapositiveIf not q, then not p

12
Truth Table
  • A truth table is a way to organize the truth
    values of various statements.
  • In a truth table, the columns are statements and
    the rows are possible scenarios.
  • The table contains every possible scenario and
    the truth values that would occur.
  • Example

p p


T
F
T
F
13
A conditional truth table
p q p ? q




T
T
T
T
F
F
F
T
T
F
F
T
14
A conditional truth table
p q p ? q




q ? p p ?q q ?p




T
T
T
T
T
T
T
F
F
T
F
T
F
T
F
F
T
T
F
F
T
T
T
T
15
Logical Equivalents
  • Two statements are considered logical equivalents
    if they have the same truth value in all
    scenarios. A way to determine this is if all the
    values are the same in every row in a truth table.

16
Logical Equivalents
  • Which of the following statements are logically
    equivalent?

p q p ? q




q ? p p ?q q ?p




T
T
T
T
T
T
T
F
F
T
F
T
F
T
F
F
T
T
F
F
T
T
T
T
17
Conjunctions
  • A conjunction consists of two statements
    connected by and.
  • Example
  • Water is wet and the sky is blue.
  • Notation
  • A conjunction of p and q is written as

18
Conjunctions
  • A conjunction is true only if both statements are
    true.
  • Remember the truth value of a conjunction refers
    to the statement as a whole.
  • Consider The sun is out and it is raining.

p q p q




T
T
T
T
F
F
T
F
F
F
F
F
19
Disjunctions
  • A disjunction consists of two statements
    connected by or.
  • Example
  • I can study or I can watch TV.
  • Notation
  • A disjunction of p and q is written as

20
Disjunctions
  • A disjunction is true if either statement is true.
  • Consider Timmy goes to Stanton or he goes to
    Paxon.

p q p v q




T
T
T
T
F
T
T
F
T
F
F
F
21
Homework
  • Page 129 1-14 all
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