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Do Now Try to extend the following patterns. What would be next? 1. January, March, May ….

Do Now Try to extend the following patterns. What would be next? 1. January, March, May …. 2. 7, 14, 21, 28, …. 3. 1, 4, 9, 16, …. 4. 1, 6, 4, 9, 7, 12, 10, …. July, September (Every other month). 35, 42 (Multiples of 7). 25, 36 (Perfect Squares. i.e. 1 2 , 2 2 , 3 2 , 4 2 …).

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Do Now Try to extend the following patterns. What would be next? 1. January, March, May ….

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  1. Do Now Try to extend the following patterns. What would be next? 1. January, March, May …. 2. 7, 14, 21, 28, …. 3. 1, 4, 9, 16, …. 4. 1, 6, 4, 9, 7, 12, 10, … July, September (Every other month) 35, 42 (Multiples of 7) 25, 36 (Perfect Squares. i.e. 12, 22, 32, 42…) 15, 13, 18, 16 (Add 5 then subtract 2)

  2. 2.1Using Patterns and Inductive Reasoning Target Use inductive reasoning to identify patterns and make conjectures.

  3. Vocabulary inductive reasoning conjecture

  4. The next figure is . Example 3: Identifying a Pattern Find the next item in the pattern. In this pattern, the figure rotates 90° counter-clockwise each time.

  5. Check It Out! Example 4 Find the next item in the pattern 0.4, 0.04, 0.004, … When reading the pattern from left to right, the next item in the pattern has one more zero after the decimal point. The next item would have 3 zeros after the decimal point, or 0.0004.

  6. When several examples form a pattern and you assume the pattern will continue, you are applying inductive reasoning. Inductive reasoning is the process of reasoning that a rule or statement is true because specific cases are true. You may use inductive reasoning to draw a conclusion from a pattern. A statement you believe to be true based on inductive reasoning is called a conjecture.

  7. Example 5: Making a Conjecture Complete the conjecture. The sum of two positive numbers is ? . • List some examples and look for a pattern. • 1 + 1 = 2 3.14 + 0.01 = 3.15 • 3,900 + 1,000,017 = 1,003,917 The sum of two positive numbers is positive.

  8. Check It Out! Example 6 Complete the conjecture. The product of two odd numbers is ? . • List some examples and look for a pattern. • 1  1 = 1 3  3 = 9 5  7 = 35 The product of two odd numbers is odd.

  9. Example 7: Biology Application The cloud of water leaving a whale’s blowhole when it exhales is called its blow. A biologist observed blue-whale blows of 25 ft, 29 ft, 27 ft, and 24 ft. Another biologist recorded humpback-whale blows of 8 ft, 7 ft, 8 ft, and 9 ft. Make a conjecture based on the data.

  10. Example 7: What conjectures can we make? Potential conjectures: The height of a blue-whale’s blow is greater than a humpback whale’s blow. -or- The height of a blue whale’s blow is about three times greater than a humpback whale’s blow.

  11. Check It Out! Example 8 Make a conjecture about the lengths of male and female whales based on the data. In 5 of the 6 pairs of numbers above the female is longer. Conjecture: Female whales are longer than male whales.

  12. To show that a conjecture is always true, you must prove it. To show that a conjecture is false, you have to find only one example in which the conjecture is not true. This case is called a counterexample. A counterexample can be a drawing, a statement, or a number.

  13. Lesson Quiz Find the next item in each pattern. 1. 0.7, 0.07, 0.007, … 2. 0.0007 Determine if each conjecture is true. If false, give a counterexample. 3. The quotient of two negative numbers is a positive number. 4. Every prime number is odd. 5. Two supplementary angles are not congruent. 6. The square of an odd integer is odd. true false; 2 false; 90° and 90° true

  14. Adjustment to Homework Policy • Homework that consists of answers only will receive a maximum of 5 points. • Write given information/sketch picture for every problem. • Show work on any problem requiring a calculation.

  15. Assignment #11 Pages 85-88 Foundation: 7-19 odd, 22, 23, 27-31 odd (on 7-19, describe the pattern in words) Core: 36-43, 51 Challenge: 54

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