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Over Lesson 2–2 5-Minute Check 1 A.True; 12 + (–4) = 8, and a triangle has four sides. B.True; 12 + (–4)  8, and a triangle has four sides. C.False; 12.

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Presentation on theme: "Over Lesson 2–2 5-Minute Check 1 A.True; 12 + (–4) = 8, and a triangle has four sides. B.True; 12 + (–4)  8, and a triangle has four sides. C.False; 12."— Presentation transcript:

1 Over Lesson 2–2 5-Minute Check 1 A.True; 12 + (–4) = 8, and a triangle has four sides. B.True; 12 + (–4)  8, and a triangle has four sides. C.False; 12 + (–4) = 8, and a triangle has four sides. D.False; 12 + (–4)  8, and a triangle has four sides. Use the following statements to find the truth value of p and r. Write the compound statement. p: 12 + (–4) = 8 q: A right angle measures 90 degrees. r: A triangle has four sides. Bell Ringer Please complete this problem at the end of your cornell notes from last class.

2 Over Lesson 2–2 5-Minute Check 2 Use the following statements to find the truth value of q or r. Write the compound statement. p: 12 + (–4) = 8 q: A right angle measures 90 degrees. r: A triangle has four sides. A.True; a right angle measures 90 degrees, or a triangle has four sides. B.True; a right angle measures 90 degrees, or a triangle does not have four sides. C.False; a right angle does not measure 90 degrees, or a triangle has four sides. D.False; a right angle measures 90 degrees, or a triangle has four sides.

3 Over Lesson 2–2 5-Minute Check 3 Use the following statements to find the truth value of ~p or r. Write the compound statement. p: 12 + (–4) = 8 q: A right angle measures 90 degrees. r: A triangle has four sides. A.True; 12 + (–4) = 8, or a triangle has four sides. B.True; 12 + (–4)  8, or a triangle has four sides. C.False; 12 + (–4)  8, or a triangle does not have four sides. D.False; 12 + (–4)  8, or a triangle has four sides.

4 Over Lesson 2–2 5-Minute Check 4 Use the following statements to find the truth value of q and ~r. Write the compound statement. p: 12 + (–4) = 8 q: A right angle measures 90 degrees. r: A triangle has four sides. A.True; a right angle does not measure 90 degrees or a triangle has four sides. B.True; a right angle measures 90 degrees and a triangle does not have four sides. C.False; a right angle does not measure 90 degrees and a triangle does not have four sides. D.False; a right angle does not measure 90 degrees and a triangle has four sides.

5 Over Lesson 2–2 5-Minute Check 5 Use the following statements to find the truth value of ~p or ~q. Write the compound statement. p: 12 + (–4) = 8 q: A right angle measures 90 degrees. r: A triangle has four sides. A.True; 12 + (–4) = 8, or a right angle measures 90 degrees. B.True; 12 + (–4)  8, or a right angle does not measure 90 degrees. C.False; 12 + (–4) = 8, or a right angle measures 90 degrees. D.False; 12 + (–4)  8, or a right angle does not measure 90 degrees.

6 Over Lesson 2–2 5-Minute Check 6 A.a or b B.a and b C.~a D.~b Consider two statements a and b. Given that statement a is true, which of the following statements must also be true?

7 Then/Now HW Answers for Page 103-104: (#1-#8) ALL, #10, (#17-#31) ALL, #33

8 Then/Now HW Answers for Page 103-104: (#1-#8) ALL, #10, (#17-#31) ALL, #33

9 Then/Now HW Answers for Page 103-104: (#1-#8) ALL, #10, (#17-#31) ALL, #33

10 Then/Now HW Answers for Page 103-104: (#1-#8) ALL, #10, (#17-#31) ALL, #33

11 Then/Now HW Answers for Page 103-104: (#1-#8) ALL, #10, (#17-#31) ALL, #33

12 Then/Now You used logic and Venn diagrams to determine truth values of negations, conjunctions, and disjunctions. Analyze statements in if-then form. Write the converse, inverse, and contrapositive of if-then statements.

13 Vocabulary conditional statement if-then statement hypothesis conclusion related conditionals converse inverse contrapositive logically equivalent

14 Concept

15 Example 1 Identify the Hypothesis and Conclusion A. Identify the hypothesis and conclusion of the following statement. Answer:Hypothesis: A polygon has 6 sides. Conclusion: It is a hexagon. If a polygon has 6 sides, then it is a hexagon. hypothesis conclusion

16 Example 1 Identify the Hypothesis and Conclusion B. Identify the hypothesis and conclusion of the following statement. Tamika will advance to the next level of play if she completes the maze in her computer game. Answer:Hypothesis: Tamika completes the maze in her computer game. Conclusion: She will advance to the next level of play.

17 Example 2 A.If an octagon has 8 sides, then it is a polygon. B.If a polygon has 8 sides, then it is an octagon. C.If a polygon is an octagon, then it has 8 sides. D.none of the above A. Which of the following is the correct if-then form of the given statement? A polygon with 8 sides is an octagon.

18 Example 2 A.If an angle is acute, then it measures less than 90°. B.If an angle is not obtuse, then it is acute. C.If an angle measures 45°, then it is an acute angle. D.If an angle is acute, then it measures 45°. B. Which of the following is the correct if-then form of the given statement? An angle that measures 45° is an acute angle.

19 Example 3 Truth Values of Conditionals A. Determine the truth value of the conditional statement. If true, explain your reasoning. If false, give a counterexample. If you subtract a whole number from another whole number, the result is also a whole number. Answer:Since you can find a counterexample, the conditional statement is false. Counterexample: 2 – 7 = –5 2 and 7 are whole numbers, but –5 is an integer, not a whole number. The conclusion is false.

20 Concept

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22 Example 4 Related Conditionals Conditional:First, rewrite the conditional in if-then form. If an animal is a bat, then it can fly. This statement is true. Converse:If an animal can fly, then it is a bat. Counterexample: A bird is an animal that can fly, but it is not a bat. The converse is false.

23 Example 4 Related Conditionals Inverse:If an animal is not a bat, then it cannot fly. Counterexample: A bird is not a bat, but it is an animal that can fly. The inverse is false. Contrapositive:If an animal cannot fly, then it is not a bat. The contrapositive is true.

24 Example 4 Related Conditionals CheckCheck to see that logically equivalent statements have the same truth value. Both the conditional and contrapositive are true.  Both the converse and inverse are false. 

25 Then/Now HW: Pages 111-113 (#1-#8) ALL, #10, #12, #14, (#26-#31) ALL, (#40-#52) ALL

26 Then/Now

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