Inductive Reasoning and Conjecture

1. Inductive Reasoning and Conjecture Unit 2 2/3/11

2. A Conjecture is a guess based on analyzing information or observing a pattern. • Inductive Reasoning is to make a conjecture after looking at several situations. (An educated guess).

3. Make a conjecture about the next number in the following sequence… 1, 3, 9, 27, 81,… What is the pattern? Conjecture: the next number will be 243.

4. Find the pattern and make a conjecture about the next number in the sequence. • -5, 10, -20, 40… • 1, 10, 100, 1000…

5. Make a conjecture based on the given information. Draw a figure to illustrate your conjecture. • <1 and <2 form a right angle. Draw a picture: Conjecture: <1 and <2 are complementary angles.

6. <ABC and <DBE are vertical angles. Draw a picture: Conjecture: m<ABC = m<DBE

7. Finding Counterexamples • A Counterexample is a false example. • A conjecture is false if there is even one situation in which the conjecture is not true. • A counterexample can be a written explanation or simply a picture.

8. Determine whether the conjecture is true or false. If false, give a counterexample. • Given’s are set in stone. They are FACT. • Conjectures are simply guesses!! Ex. Given: AB = BC Conjecture: B is the midpoint of AC. Draw a picture: Counterexample? Is the conjecture True or False?

9. Given: Points A, B, and C are collinear. • Conjecture: AB + BC = AC Draw a Picture: Counterexample? Is the conjecture True or False?

10. Given: <R and <S are supplementary. <R and <T are supplementary. • Conjecture: <T and <S are congruent. Draw a Picture: Counterexample? Is the conjecture True or False?