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Symbolic Logic: Conjunction • , Negation ~, Disjunction v
Examples
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Review Conjunction = “…and…” = • Negation = “not…” = ~
Conjunction is only true if both conjuncts are true Negation = “not…” = ~ Negation of a statement is true if statement is false Negation of a statement is false if statement is true Disjunction = “…or…” = v Disjunction is true if either disjunct is true
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Example: Translate the Following
It is not true that evil spirits exist. First step: Make a dictionary (define statements) Second step: Look at the sentence, symbolize statements correctly (using •, ~, or v) (Third step: Determine truth values)
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Solution It is not true that evil spirits exist. ~E
E=Evil spirits exist. If evil spirits do exist (E is True), then ~E is false. If evil spirits do not exist (E is False), then ~E is true.
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Example 2. There were three people involved in the accident, and no one was injured. Note: When symbolizing statements, always make the statement a positive one. If you have a negative statement in the sentence, put its positive in the dictionary – then when you translate, simply negate that sentence.
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Solution 2. There were three people involved in the accident, and no one was injured. T • ~O T=Three people were involved in the accident. O=Someone was injured.
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3. You cannot be a sailor and a marine both.
Example 3. You cannot be a sailor and a marine both.
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3. You cannot be a sailor and a marine both.
Solution 3. You cannot be a sailor and a marine both. ~(S • M) S=You can be a sailor. M=You can be a marine.
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Example 4. More educators, more administrators, and more students are turning to philosophy to provide them with the skills of reasoning.
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Solution 4. More educators, more administrators, and more students are turning to philosophy to provide them with the skills of reasoning. (E • A) • S or E • (A • S) E=More educators are turning to philosophy to provide them with the skills of reasoning. A=More administrators are turning… S=More students are turning…
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5. Either you are male or female but not both.
Example 5. Either you are male or female but not both.
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5. Either you are male or female but not both.
Solution 5. Either you are male or female but not both. (M v F) • ~(M • F) M=You are male. F=You are female.
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Example: Determine Truth Values
Given: A, B, and C are TRUE statements Given: X, Y, and Z are FALSE statements Is the following true or false? ~Y v C
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Solution ~Y v C 1. We know that Y is False
2. Since Y is false, this makes ~Y True. 3. We also know that C is True 4. Therefore, we have two true disjuncts (C and ~Y) 5. The main connective here is the wedge (v) and we know that a disjunction is false only if both disjuncts are false. 6. Therefore, ~Y v C is true.
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Given: A, B, and C are True X, Y, and Z are False
Example Determine whether the following is true: (B v C) • (Y v Z) Given: A, B, and C are True X, Y, and Z are False
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Solution (B v C) • (Y v Z) Look at one conjunct at a time. We have two here: (B v C) and (Y v Z) (B v C): since we know B and C are both true, this makes this disjunction true (Y v Z): since we know that Y and Z are both false, this makes this disjunction false Since we now know the whole left conjunct (B v C) is true, and that the right conjunct (Y v Z) is false, the conjunction of the two must be false (for a conjunction to be true, both conjuncts must be true)
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Given: A, B, and C are True X, Y, and Z are False
Example Determine whether the following is true: ~(A v C) v ~(X • ~Y) Given: A, B, and C are True X, Y, and Z are False
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Solution ~(A v C) v ~(X • ~Y)
The main connective = the middle wedge (v) (disjunction) Therefore we have two disjuncts Left disjunct= ~(A v C) Right disjunct = ~(X • ~Y) Strategy: determine truth values of each disjunct, then we know if at least one disjunct is true, this will make the whole statement true
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Solution (continued) ~(A v C) v ~(X • ~Y) Left disjunct: ~(A v C)
Both A and C are true. This makes (A v C) true. But (A v C) is negated, so ~(A v C) is false. Right disjunct: ~(X • ~Y) X is false. Y is false, so this means ~Y is true. This makes the inner conjunction false (to be true, both conjuncts (X and ~Y) must both be true) Because the whole statement (X • ~Y) is false, this makes its negated form ~(X • ~Y) true Since the left disjunct is false, and the right disjunct is true, this means ~(A v C) v ~(X • ~Y) is true (since at least one disjunct is true)
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Questions? Any problems you want to see worked out (if time permits)?
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