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Lesson 1-1. Patterns and Inductive Reasoning. Ohio Content Standards:. Ohio Content Standards:. Estimate, compute and solve problems involving real numbers, including ratio, proportion and percent, and explain solutions. -Demonstrate fluency in computations using real numbers.
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Lesson 1-1 Patterns and Inductive Reasoning
Ohio Content Standards: • Estimate, compute and solve problems involving real numbers, including ratio, proportion and percent, and explain solutions. -Demonstrate fluency in computations using real numbers. -Estimate, compute and solve problems involving rational numbers, including ratio, proportion and percent, and judge the reasonableness of solutions.
Ohio Content Standards: • Estimate, compute and solve problems involving real numbers, including ratio, proportion and percent, and explain solutions. -Demonstrate fluency in computations using real numbers. -Estimate, compute and solve problems involving rational numbers, including ratio, proportion and percent, and judge the reasonableness of solutions. • Generalize and explain patterns and sequences in order to find the next term and the nth term.
Vocabulary: • Inductive Reasoning –
Vocabulary: • Inductive Reasoning – When you make a conclusion based on a pattern of examples or past events.
Find the next three terms of each sequence. • 11.2, 9.2, 7.2, …
Find the next three terms of each sequence. • 11.2, 9.2, 7.2, … • 6, 12, 24, …
Find the next three terms of the sequence: • 101, 102, 105, 110, 117, …
Vocabulary: • Conjecture –
Vocabulary: • Conjecture – A conclusion that you reach based on inductive reasoning.
Vocabulary: • Conjecture – A conclusion that you reach based on inductive reasoning. • Counterexample –
Vocabulary: • Conjecture – A conclusion that you reach based on inductive reasoning. • Counterexample – an example that does not follow the conjecture, proving the conjecture false.
Jordan studied the data below and made the following conjecture:
Jordan studied the data below and made the following conjecture: • Multiplying a number by -1 produces a product that is less than -1.
Jordan studied the data below and made the following conjecture: • Multiplying a number by -1 produces a product that is less than -1. 5(-1) = -5 and -5 < -1
Jordan studied the data below and made the following conjecture: • Multiplying a number by -1 produces a product that is less than -1. 5(-1) = -5 and -5 < -1 15(-1) = -15 and -15 < -1
Jordan studied the data below and made the following conjecture: • Multiplying a number by -1 produces a product that is less than -1. 5(-1) = -5 and -5 < -1 15(-1) = -15 and -15 < -1 100(-1) = -100 and -100 < -1
Jordan studied the data below and made the following conjecture: • Multiplying a number by -1 produces a product that is less than -1. 5(-1) = -5 and -5 < -1 15(-1) = -15 and -15 < -1 100(-1) = -100 and -100 < -1 300(-1) = -300 and -300 < -1
Jordan studied the data below and made the following conjecture: • Multiplying a number by -1 produces a product that is less than -1. 5(-1) = -5 and -5 < -1 15(-1) = -15 and -15 < -1 100(-1) = -100 and -100 < -1 300(-1) = -300 and -300 < -1 Find a counter example for his conjecture.
Assignment: Pgs. 7 – 9 2 – 34 evens