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Inductive and Deductive Reasoning
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Notecard 30 Definition: Conjecture: an unproven statement that is based on observations or given information.
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Notecard 31 Definition: Counterexample: a specific case for which a conjecture is false.
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Counterexample Find a counter example to show that the following conjecture is false. The sum of two numbers is always greater than the larger number.
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Notecard 32 Definitions: Conditionals, Hypothesis, & Conclusions: A conditional statement is a logical statement that has two parts: If ____ then _____. The hypothesis is the “if” part and it tells you what you are talking about. The conclusion is the “then” part and it describes the hypothesis.
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Writing a conditional statement Writing the following statements as conditionals. Two angles that make a linear pair are supplementary. All 90 o angles are right angles.
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Notecard 33 The negation of a statement is the opposite of the original.
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Negation Negate the following statements. The ball is red. The cat is not black.
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Notecard 34 Definitions: Inverse, Converse, Contrapositive The converse of a conditional statement switches the hypothesis and conclusion. The inverse of a conditional statement negates both the hypothesis and conclusion The contrapositive of a conditional statement takes the inverse of the converse. (it switches and negates)
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Writing statements Write the converse, inverse and contrapositive of the conditional statement: “If two angles form a linear pair, then they are supplementary.” Which of these statements are true?
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Notecard 35 Definition: Biconditional: If a conditional statement and its converse are both true, then we can write it as a biconditional statement by using the phrase if and only if instead of putting it in if-then form. __________ if and only if ___________. (hypothesis) (conclusion)
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Biconditional Statement Write the following conditional statement as a biconditional statement. If two lines intersect to form a right angle, then they are perpendicular.
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The Law of Detachment This applies when one statement is conditional and a second statement confirms the hypothesis of the conditional. The conclusion is then confirmed. Here is an example. Notecard 36
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If it is Friday, then Mary goes to the movies. It is Friday. What conjecture can you make from the above statements? Deductive Reasoning
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If two angles form a linear pair, then they are supplementary. Angle 1 and Angle 2 are a linear pair. Deductive Reasoning
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If two angles form a linear pair, then they are supplementary. Angle 1 and Angle 2 are supplementary. Deductive Reasoning
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The Law of Syllogism This applies when you have two conditional statements. The conclusion of one, confirms the hypothesis of the other. In this case our result is still a conditional with the first hypothesis and the second conclusion. (I call this the “Oreo Cookie” Law.) Here is how it works… Notecard 37
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If it is Friday, then Mary goes to the movies. If Mary goes to the movies then she gets popcorn. Combine the two above conditional statements into one conditional statement. Deductive Reasoning
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If two angles form a linear pair, then they are supplementary. If two angles are supplementary then their sum is 180 degrees. Deductive Reasoning
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If a polygon is regular, then all angles in the interior of the polygon are congruent. If a polygon is regular, then all of its sides are congruent. Why can’t these two statements be combined like the last example. Deductive Reasoning
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