TMUA Logic and proof

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    Created by
    isabelly15

    Cards (226)

    • What is the fundamental notion at the heart of mathematical logic?
      A statement and the relationship between statements
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    • What can we say about statements in mathematics?
      They must be either true or false, not both
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    • What is the definition of a statement in this context?
      A sentence that is definitely true or false
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    • What is the law of the excluded middle?
      A statement can only be true or false
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    • Why is it acceptable if we cannot determine a statement's truth value?
      It must still be either true or false
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    • Give an example of a statement.
      It rained yesterday in Auckland
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    • Why is "The only barber in a town shaves each and every man who does not shave himself" not a statement?
      It is neither true nor false
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    • What is an example of a true statement?
      If x=x =3,thenx2= 3, then x^2 =9 9
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    • What is an example of a false statement?
      If x=x =3,thenx2= 3, then x^2 =4 4
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    • What is the truth value of the statement "The sum of two odd numbers is an even number"?
      True
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    • What are the three types of basic statements discussed?
      • Obviously true or false statements
      • Statements needing work to determine truth
      • Quantified combinations of expressions
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    • What does the truth value of a statement refer to?
      Whether the statement is true or false
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    • What does it mean for two statements to be logically equivalent?
      They have the same truth values
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    • Give an example of two logically equivalent statements.
      Today is Tuesday and Today is the day after Monday
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    • What is the process of making new statements in mathematics?
      • Combine existing statements
      • Analyze truth or falsity of combinations
      • Use logical rules to build new statements
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    • What does the term "not" do to a statement?
      It negates the truth value of the statement
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    • What is the negation of the statement "29 is a prime number"?
      29 is not a prime number
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    • What is the general property of the negation of a statement?
      It changes true to false and vice versa
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    • How does a truth table represent the relationship between a statement and its negation?
      It shows true becomes false and vice versa
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    • What are the two ways to display the relationship between a statement and its negation?
      • Truth table
      • Venn diagrams
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    • Why are statements important in mathematical logic?
      They form the basis for logical reasoning
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    • What distinguishes a statement from a non-statement?
      A statement can be true or false
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    • Why is quantification significant in statements?
      It clarifies the range of values for variables
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    • What is the significance of compound statements in logic?
      They show relationships between multiple statements
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    • What does the rule mentioned do to false statements?
      It changes them to true ones
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    • What does the law of the excluded middle state?
      Statements are always either true or false
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    • What are the two ways to display how not works for general statements?
      • Truth table
      • Diagrams (Venn diagrams)
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    • What does T stand for in the truth table?
      True
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    • What does F stand for in the truth table?
      False
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    • What does the first line of the truth table indicate?
      When A is true, not A is false
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    • What does the second line of the truth table indicate?
      When A is false, not A is true
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    • How do Venn diagrams represent statements A and not A?
      • Area inside A circle: A is true
      • Area outside A circle: not A is true
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    • How can A be thought of in set theory terms?
      A represents the set where A is true
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    • How can not A be thought of in set theory terms?
      As the complement of the set A
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    • What is the logical term used to combine statements A and B?
      And
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    • When is the compound statement A and B true?
      If both A and B are true
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    • When is the compound statement A and B false?
      If at least one of A or B is false
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    • What does the truth table for A and B look like?
      • A: T, B: T A and B: T
      • A: T, B: F → A and B: F
      • A: F, B: T → A and B: F
      • A: F, B: F → A and B: F
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    • What does the statement "the monarch is a woman and the Prince of Wales is called Charles" illustrate?
      Both parts are true, making the statement true
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    • How can A and B be represented in set theory terms?
      • A ∩ B (A intersect B)
      • Both A and B must occur
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