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Published byBathsheba Sullivan Modified over 8 years ago
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Lesson 1.2 Inductive Reasoning Pages 8 - 10 Observe Look for patterns Develop a hypothesis (or conjecture) Test your hypothesis
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Inductive what??? Scientists and mathematicians look for patterns and try to draw conclusions from them. A conjecture is an unproven statement that is based on a pattern or observation. Looking for patterns and making conjectures is part of a process called inductive reasoning.
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Example 1: Complete the conjecture. The sum of any two odd numbers is _______. 1 st – Try some examples 1+1 = ___5 + 7 = ___9 + 1 = ___ 3+5 = ___3 + 11 = ___9 + 5 = ___ 2 nd – Do you see a pattern? 3 rd – Make a conjecture. 4 th – Test it!
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Example 2: Complete the conjecture. The sum of two positive numbers is ________. 1 st – Try some examples. 5 + 4 = ___10 + 1 = ___6 + 2 = ___ _____________________________ 2 nd – Look for a pattern. 3 rd – Make a conjecture. 4 th – Test it!
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Counterexamples!!! Just because something is true for several examples does not mean that it is true in general. To prove that a conjecture is false, all you need to do is find one counterexample. A counterexample is an example that shows a conjecture is false.
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Example 3: Show the conjecture is false by finding a counterexample. All shapes with 4 sides are squares. All multiples of 3 are odd numbers.
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Assignment: Worksheet 1.2
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