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Chapter 3 Introduction to Logic 2012 Pearson Education, Inc.
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Chapter 3: Introduction to Logic
3.1 Statements and Quantifiers 3.2 Truth Tables and Equivalent Statements 3.3 The Conditional and Circuits 3.4 More on the Conditional 3.5 Analyzing Arguments with Euler Diagrams 3.6 Analyzing Arguments with Truth Tables 2012 Pearson Education, Inc.
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More on the Conditional
Section 3-4 More on the Conditional 2012 Pearson Education, Inc.
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More on the Conditional
Converse, Inverse, and Contrapositive Alternative Forms of “If p, then q” Biconditionals Summary of Truth Tables 2012 Pearson Education, Inc.
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Converse, Inverse, and Contrapositive
Conditional Statement If p, then q Converse If q, then p Inverse If not p, then not q Contrapositive If not q, then not p 2012 Pearson Education, Inc.
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Example: Determining Related Conditional Statements
Given the conditional statement If I live in Wisconsin, then I shovel snow, determine each of the following: a) the converse b) the inverse c) the contrapositive Solution a) If I shovel snow, then I live in Wisconsin. b) If I don’t live in Wisconsin, then I don’t shovel snow. c) If I don’t shovel snow, then I don’t live in Wisconsin. 2012 Pearson Education, Inc.
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Equivalences A conditional statement and its contrapositive are equivalent, and the converse and inverse are equivalent. 2012 Pearson Education, Inc.
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Alternative Forms of “If p, then q”
The conditional can be translated in any of the following ways. If p, then q. p is sufficient for q. If p, q. q is necessary for p. p implies q. All p are q. p only if q. q if p. 2012 Pearson Education, Inc.
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Example: Rewording Conditional Statements
Write each statement in the form “if p, then q.” a) You’ll be sorry if I go. b) Today is Sunday only if yesterday was Saturday. c) All Chemists wear lab coats. Solution a) If I go, then you’ll be sorry. b) If today is Sunday, then yesterday was Saturday. c) If you are a Chemist, then you wear a lab coat. 2012 Pearson Education, Inc.
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Biconditionals The compound statement p if and only if q (often abbreviated p iff q) is called a biconditional. It is symbolized , and is interpreted as the conjunction of the two conditionals 2012 Pearson Education, Inc.
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Truth Table for the Biconditional
p if and only if q p q T T T T F F F T F F 2012 Pearson Education, Inc.
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Example: Determining Whether Biconditionals are True or False
Determine whether each biconditional statement is true or false. a) = 7 if and only if = 5. b) 3 = 7 if and only if 4 = c) = 12 if and only if = 11. Solution a) True (both component statements are true) b) False (one component is true, one false) c) True (both component statements are false) 2012 Pearson Education, Inc.
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Summary of Truth Tables
1. The negation of a statement has truth value opposite of the statement. The conjunction is true only when both statements are true. The disjunction is false only when both statements are false. The biconditional is true only when both statements have the same truth value. 2012 Pearson Education, Inc.
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