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Geometry Conditional Statements

Geometry Conditional Statements. Warm Up. Find the next item in each pattern:. 1) 1, 3, 131, 1313,………… 2) 2, 2 , 2 , 2 , ………. 3 9 27 3) x, 2x 2 , 3x 3 , 4x 4 , …………. 1) 13131 2) 2 81 3) 5x 5. Conditional Statements.

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Geometry Conditional Statements

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  1. GeometryConditional Statements CONFIDENTIAL

  2. Warm Up Find the next item in each pattern: 1) 1, 3, 131, 1313,………… 2) 2, 2, 2, 2, ………. 3 9 27 3) x, 2x2, 3x3, 4x4, ………… 1) 13131 2) 2 81 3) 5x5 CONFIDENTIAL

  3. Conditional Statements The conditional statement is a statement that can be written in the form “if p, then q”. The hypothesis is a part p of a conditional statement following the word if. The conclusion is the part q of a conditional statement following the word then. SYMBOLS VENN DIAGRAM p q q p CONFIDENTIAL

  4. By phrasing a conjecture as an if-then statement, you can quickly identify its hypothesis and conclusion. CONFIDENTIAL

  5. Identify the Parts of a conditional statement Identify the hypothesis and conclusion of each conditional. A) If a butterfly has a curved black line on its hind wing, then it is a viceroy. Hypothesis: A butterfly has a curved black line on its hind wing. Conclusion: A butterfly is a viceroy. B) A number is an integer if it a natural number. Hypothesis: A number is a natural number. Conclusion: The number is an integer . CONFIDENTIAL

  6. Now you try! 1) Identify the hypothesis and conclusion of the statement. “A number is divisible by 3 if it is divisible by 6”. 1) Hypothesis: A number is divisible by 6. Conclusion: The number is divisible by 3. CONFIDENTIAL

  7. Many sentences without the word if and then can be written as conditionals. To do so identify the sentence’s hypothesis and conclusion by figuring out which part of the statement depends on the other. CONFIDENTIAL

  8. Writing a conditional statement Write a conditional statement from each of the following: A) The midpoint M of a segment bisects the segment. The midpoint M of a segment bisects the segment. Identify the Hypothesis and conclusion Conditional: If M is the midpoint of a segment, then M bisects the segment. Conditional: If M is the midpoint of a segment, then M bisects the segment. B) spiders Tarantulas The inner oval represents the hypothesis, and the outer oval represents the conclusion. Conditional: If an animal is a Tarantulas then it is a spider. CONFIDENTIAL

  9. Now you try! 2) Write a conditional statement from the statement. “Two angles that are complementary are acute”. 2) If Two angles are complementary then they are acute. CONFIDENTIAL

  10. A conditional statement has a truth value of either true (T) or false (F). It is false only when the hypothesis is true and the conclusion is false. Consider the conditional “If I get paid, I will take you to the movie.”. If I don’t get paid, I haven’t broken my promise. So the statement is still true. To show that a conditional statement is false, you need to find only one counterexample where the hypothesis is true and the conclusion is false. CONFIDENTIAL

  11. Analyzing the Truth Value of a conditional statement Determine if each conditional is true. If false, give a counterexample. A) If you live in El Paso, then you live in Texas. When the hypothesis is true, the conclusion is also true because El Paso is in Texas. So the conditional is true. B) If an angle is obtuse, then it has a measure of 1000. You can draw an obtuse angle whose measure is not 1000. In this case the hypothesis is true, but the conclusion is false, Since you can find the counterexample, the conditional is false. CONFIDENTIAL

  12. C) If an odd number is divisible by 2, then 8 is a perfect square. An odd number is never divisible by 2, so the hypothesis is false. The number 8 is not a perfect square, so the conclusion is false. However, the conditional is true because the hypothesis is false. CONFIDENTIAL

  13. Now you try! 3) Determine if the conditional “If a number is odd the it is divisible by 3” is true. If false, give a counterexample. 3) If Two angles are complementary then they are acute. CONFIDENTIAL

  14. The negation of statement p is “not p” written as ~p. The negation of the statement “M is the midpoint of AB” is “M is not the midpoint of AB”. The negation of a true statement is false, and the negation of a false statement is true. Negations are used to write related conditional statements. CONFIDENTIAL

  15. Related conditionals CONFIDENTIAL

  16. Biology Application Write the converse, inverse, and contrapositive of the conditional statement. Also find the truth value of each statement: If an insect is butterfly, then it has four wings. Converse:If an insect has four wings then it is a butterfly. A moth is also an insect with four wings. So, the converse is false. Inverse:If an insect is not a butterfly, then it does not have four wings. A moth is not a butterfly, but it has four wings. So, the inverse is false. Contrapositive:If an insect does not have four wings, then it is a butterfly. Butterflies must have four wings. So, the Contrapositive is true. CONFIDENTIAL

  17. Now you try! 4) Write the converse, inverse, and contrapositive of the conditional statement “If an animal is a cat, then it has four paws”. Also find the truth value of each. 4) If Two angles are complementary then they are acute. CONFIDENTIAL

  18. In the example in the previous slide, the conditional statement and its contrapositive are both true, and the converse and inverse are both false. Related conditional statements that have the same truth value are called logically equivalent statements. A conditional and its contrapositive are logically equivalent, and so are the converse and the inverse. CONFIDENTIAL

  19. However, the converse of a true conditional is not necessarily false. All four related conditionals can be true, or all four can be false, depending on the statement. CONFIDENTIAL

  20. Assessment Identify the hypothesis and conclusion of the statements: 1) If a person is at least 16 years old, then the person can drive the car. 2) A figure is a parallelogram if it is a rectangle. 3) A statement a – b < a implies that b is a positive number. • Hypothesis: A person can drive the car. Conclusion: the person is 16 years old. • Hypothesis: A figure is a rectangle. Conclusion: the figure is a parallelogram . • Hypothesis: If b is a positive number.. Conclusion: a – b < a . CONFIDENTIAL

  21. Write a conditional statement from the each of the following: 4) Eighteen year old are eligible to vote. 5) (a)2 < a when 0 < a < b. (b)2 b 6) Transformations Rotations 4) If you are 18 yr old then you can vote. 5) If a < b then (a)2 < a. (b)2 b 6)If a figure is rotated then it is transformed. CONFIDENTIAL

  22. Determine if each conditional is true. If false, give a counterexample. 7) If three points form the vertices of a triangle, then they lie in the same plane. 8) If x > y, then |x| > |y|. 9) If season is spring then the month is march. 7) True. 8) False. -2 > -5 but |-2| < |-5|. 9) true CONFIDENTIAL

  23. 10) Write the converse, inverse, and contrapositive of the conditional statement “If Brielle drives at exactly 30 mi/h, then she travels 10 mi in 20 min”. Also find the truth value of each. Converse:If an insect has four wings then it is a butterfly. A moth is also an insect with four wings. So, the converse is false. Inverse:If an insect is not a butterfly, then it does not have four wings. A moth is not a butterfly, but it has four wings. So, the inverse is false. Contrapositive:If an insect does not have four wings, then it is a butterfly. Butterflies must have four wings. So, the Contrapositive is true. CONFIDENTIAL

  24. Let’s review Conditional Statements The conditional statement is a statement that can be written in the form “if p, then q”. The hypothesis is a part p of a conditional statement following the word if. The conclusion is the part q of a conditional statement following the word then. SYMBOLS VENN DIAGRAM p q q p CONFIDENTIAL

  25. Identify the Parts of a conditional statement Identify the hypothesis and conclusion of each conditional. A) If a butterfly has a curved black line on its hind wing, then it is a viceroy. Hypothesis: A butterfly has a curved black line on its hind wing. Conclusion: A butterfly is a viceroy. B) A number is an integer if it a natural number. Hypothesis: A number is a natural number. Conclusion: The number is an integer . CONFIDENTIAL

  26. Writing a conditional statement Write a conditional statement from each of the following: A) The midpoint M of a segment bisects the segment. The midpoint M of a segment bisects the segment. Identify the Hypothesis and conclusion Conditional: If M is the midpoint of a segment, then M bisects the segment. Conditional: If M is the midpoint of a segment, then M bisects the segment. B) spiders Tarantulas The inner oval represents the hypothesis, and the outer oval represents the conclusion. Conditional: If an animal is a Tarantulas then it is a spider. CONFIDENTIAL

  27. Analyzing the Truth Value of a conditional statement Determine if each conditional is true. If false, give a counterexample. A) If you live in El Paso, then you live in Texas. When the hypothesis is true, the conclusion is also true because El Paso is in Texas. So the conditional is true. B) If an angle is obtuse, then it has a measure of 1000. You can draw an obtuse angle whose measure is not 1000. In this case the hypothesis is true, but the conclusion is false, Since you can find the counterexample, the conditional is false. CONFIDENTIAL

  28. Related conditionals CONFIDENTIAL

  29. Biology Application Write the converse, inverse, and contrapositive of the conditional statement. Also find the truth value of each statement: If an insect is butterfly, then it has four wings. Converse:If an insect has four wings then it is a butterfly. A moth is also an insect with four wings. So, the converse is false. Inverse:If an insect is not a butterfly, then it does not have four wings. A moth is not a butterfly, but it has four wings. So, the inverse is false. Contrapositive:If an insect does not have four wings, then it is a butterfly. Butterflies must have four wings. So, the Contrapositive is true. CONFIDENTIAL

  30. However, the converse of a true conditional is not necessarily false. All four related conditionals can be true, or all four can be false, depending on the statement. CONFIDENTIAL

  31. You did a great job today! CONFIDENTIAL

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