Survey
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Topic 2 Review TOPIC VOCABULARY Ě biconditional, p. 55 Ě GHGXFWLYHUHDVRQLQJ p. 60 Ě /DZRI6\OORJLVP p. 60 Ě 5HIOH[LYH3URSHUW\ p. 65 Ě conclusion, p. 49 Ě GLDPHWHUp. 44 Ě QHJDWLRQ p. 49 Ě 6\PPHWULF3URSHUW\ p. 65 Ě conditional, p. 49 Ě HTXLYDOHQWVWDWHPHQWV p. 49 Ě SDUDJUDSKSURRI p. 71 Ě theorem, p. 71 Ě conjecture, p. 44 Ě hypothesis, p. 49 Ě SRO\JRQ p. 44 Ě 7UDQVLWLYH3URSHUW\ p. 65 Ě contrapositive, p. 50 Ě LQGXFWLYHUHDVRQLQJ p. 44 Ě SURRI p. 66 Ě WUXWKYDOXH p. 49 Ě converse, p. 50 Ě inverse, p. 50 Ě quadrilateral, p. 55 Ě WZRFROXPQSURRI p. 66 Ě counterexample, p. 44 Ě /DZRI'HWDFKPHQW p. 60 Ě radius, p. 44 Check Your Understanding Choose the correct vocabulary term to complete each sentence. 1. The part of a conditional that follows “then” is the ? . 2. Reasoning logically from given statements to a conclusion is ? . 3. A conditional has a(n) ? of true or false. 4. The ? of a conditional switches the hypothesis and conclusion. 5. When a conditional and its converse are true, you can write them as a single true statement called a(n) ? . 6. A statement that you prove true is a(n) ? . 2-1 Patterns and Conjectures Quick Review Exercises You use inductive reasoning when you make conclusions based on patterns you observe. A conjecture is a conclusion you reach using inductive reasoning. A counterexample is an example that shows a conjecture is incorrect. Find a pattern for each sequence. Describe the pattern and use it to show the next two terms. 7. 1000, 100, 10, c 8. 5, -5, 5, -5, c Example Describe the pattern. What are the next two terms in the sequence? 1, −3, 9, −27, . . . Each term is -3 times the previous term. The next two terms are -27 * ( -3) = 81 and 81 * ( -3) = -243. 9. 34, 27, 20, 13, c 10. 6, 24, 96, 384, c Find a counterexample for each conjecture. 11. The product of any integer and 2 is greater than 2. 12. The city of Portland is in Oregon. PearsonTEXAS.com 79 2-2 Conditional Statements Quick Review Exercises A conditional is an if-then statement. The symbolic form of a conditional is p S q, where p is the hypothesis and q is the conclusion. Rewrite each sentence as a conditional statement. Ě To find the converse, switch the hypothesis and conclusion of the conditional (q S p). 13. All motorcyclists wear helmets. 14. Two nonparallel lines intersect in one point. 15. Angles that form a linear pair are supplementary. Ě To find the inverse, negate the hypothesis and the conclusion of the conditional (∼p S ∼q). 16. School is closed on certain holidays. Ě To find the contrapositive, negate the hypothesis and the conclusion of the converse (∼q S ∼p). Write the converse, inverse, and contrapositive of the given conditional. Then determine the truth value of each statement. Example 17. If an angle is obtuse, then its measure is greater than 90 and less than 180. What is the converse of the conditional statement below? What is its truth value? If you are a teenager, then you are younger than 20. Converse: If you are younger than 20, then you are a teenager. 18. If a figure is a square, then it has four sides. 19. If you play the tuba, then you play an instrument. 20. If you baby-sit on Saturday night, then you are busy on Saturday night. A 7-year-old is not a teenager. The converse is false. 2-3 Biconditionals and Definitions Quick Review Exercises When a conditional and its converse are true, you can combine them as a true biconditional using the phrase if and only if. The symbolic form of a biconditional is p 4 q. You can write a good definition as a true biconditional. For Exercises 21–23, determine whether each statement is a good definition. If not, explain. Example Is the following definition reversible? If yes, write it as a true biconditional. A hexagon is a polygon with exactly six sides. Yes. The conditional is true: If a figure is a hexagon, then it is a polygon with exactly six sides. Its converse is also true: If a figure is a polygon with exactly six sides, then it is a hexagon. Biconditional: A figure is a hexagon if and only if it is a polygon with exactly six sides. 80 Topic 2 Review 21. A newspaper has articles you read. 22. A linear pair is a pair of adjacent angles whose noncommon sides are opposite rays. 23. An angle is a geometric figure. 24. Write the following definition as a biconditional. An oxymoron is a phrase that contains contradictory terms. 25. Write the following biconditional as two statements, a conditional and its converse. Two angles are complementary if and only if the sum of their measures is 90. 2-4 Deductive Reasoning Quick Review Exercises Deductive reasoning is the process of reasoning logically from given statements to a conclusion. Use the Law of Detachment to make a conclusion. Law of Detachment: If p S q is true and p is true, then q is true. Law of Syllogism: If p S q and q S r are true, then p S r is true. 26. If you practice tennis every day, then you will become a better player. Colin practices tennis every day. 27. ∠1 and ∠2 are supplementary. If two angles are supplementary, then the sum of their measures is 180. Use the Law of Syllogism to make a conclusion. Example What can you conclude from the given information? Given: If you play hockey, then you are on the team. If you are on the team, then you are a varsity athlete. The conclusion of the first statement matches the hypothesis of the second statement. Use the Law of Syllogism to conclude: If you play hockey, then you are a varsity athlete. 28. If two angles are vertical, then they are congruent. If two angles are congruent, then their measures are equal. 29. If your father buys new gardening gloves, then he will work in his garden. If he works in his garden, then he will plant tomatoes. 2-5 Reasoning in Algebra and Geometry Quick Review Exercises You use deductive reasoning and properties to solve equations and justify your reasoning. 30. Fill in the reason that justifies each step. A proof is a convincing argument that uses deductive reasoning. A two-column proof lists each statement on the left and the justification for each statement on the right. Given: QS = 42 Prove: x = 13 x13 Q Statements 2x R S Reasons 1) QS = 42 1) a. ? Example 2) QR + RS = QS 2) b. ? What is the name of the property that justifies going from the first line to the second line? 3) (x + 3) + 2x = 42 3) c. ? 4) 3x + 3 = 42 4) d. ? jA @ jB and jB @ jC jA @ jC 5) 3x = 39 5) e. ? 6) x = 13 6) f. ? Transitive Property of Congruence Use the given property to complete the statement. 31. Division Property of Equality: If 2(AX) = 2(BY), then AX = ? . 32. Distributive Property: 3p - 6q = 3( ? ) PearsonTEXAS.com 81 2-6 Proving Angles Congruent Quick Review Exercises A statement that you prove true is a theorem. A proof written as a paragraph is a paragraph proof. In geometry, each statement in a proof is justified by given information, a property, postulate, definition, or theorem. Use the diagram for Exercises 33–36. 33. Find the value of y. 35. Find m∠BED. Example 23 Write a paragraph proof. Given: ∠1 ≅ ∠4 4 1 Prove: ∠2 ≅ ∠3 ∠1 ≅ ∠4 because it is given. ∠1 ≅ ∠2 because vertical angles are congruent. ∠4 ≅ ∠2 by the Transitive Property of Congruence. ∠4 ≅ ∠3 because vertical angles are congruent. ∠2 ≅ ∠3 by the Transitive Property of Congruence. 82 Topic 2 Review B A 34. Find m∠AEC. 36. Find m∠AEB. 37. Given: ∠1 and ∠2 are complementary, ∠3 and ∠4 are complementary, ∠2 ≅ ∠4 Prove: ∠1 ≅ ∠3 (3y 1 20)8 E C (5y 2 16)8 D 1 3 2 4 Topic 2 TEKS Cumulative Practice Multiple Choice Read each question. Then write the letter of the correct answer on your paper. 1. What is the second step in constructing ∠S, an angle congruent to ∠A? 4. Which counterexample shows that the following conjecture is false? Every perfect square number has exactly three factors. F. The factors of 2 are 1, 2. G. The factors of 4 are 1, 2, 4. H. The factors of 8 are 1, 2, 4, 8. J. The factors of 16 are 1, 2, 4, 8, 16. A 5. How many rays are in the next two terms in the sequence? A. S C. T R S B. D. S R B A C 2. What is the converse of the following statement? If a whole number has 0 as its last digit, then the number is evenly divisible by 10. F. If a number is evenly divisible by 10, then it is a whole number. G. If a whole number is divisible by 10, then it is an even number. H. If a whole number is evenly divisible by 10, then it has 0 as its last digit. J. If a whole number has 0 as its last digit, then it must be evenly divisible by 10. 3. The sum of the measures of the complement and the supplement of ∠Y is 114. What is m∠Y ? A. 12 C. 78 B. 66 D. 102 A. 16 and 33 rays C. 17 and 34 rays B. 17 and 33 rays D. 18 and 34 rays 6. Which of the statements could be a conclusion based on the following information? If a polygon is a pentagon, then it has one more side than a quadrilateral. If a polygon has one more side than a quadrilateral, then it has two more sides than a triangle. F. If a polygon is a pentagon, then it has many sides. G. If a polygon has two more sides than a quadrilateral, then it is a hexagon. H. If a polygon has more sides than a triangle, then it is a pentagon. J. If a polygon is a pentagon, then it has two more sides than a triangle. 7. Which pair of angles must be congruent? A. supplementary angles B. complementary angles C. adjacent angles D. vertical angles PearsonTEXAS.com 83 8. Which of the following best defines a postulate? F. a statement accepted without proof G. a conclusion reached using inductive reasoning H. an example that proves a conjecture false J. a statement that you prove true 9. Which type of reasoning is based on patterns you observe? A. deductive reasoning B. inductive reasoning C. detachment and syllogism D. conclusion and hypothesis 10. Which property says that if a = b, then b = a? F. Reflexive Property 13. Which is an undefined term? A. ray C. line B. segment D. intersection 14. Write the following statement as a true biconditional if possible. Complementary angles are two angles with measures that have a sum of 90. F. Two angles are complementary if and only if the measures of the angles have a sum of 90. G. Two angles with measures that have a sum of 90 are complementary angles. H. Two angles with measures that do not have a sum of 90 are not complementary angles. J. not reversible 15. What is the value of x? G. Symmetric Property A. 120 C. 30 H. Transitive Property B. 60 D. 20 (x + 90)° 4x° J. Substitution Property 11. Which of the following is not a postulate? A. Through any three noncollinear points there is exactly one plane. B. If two distinct lines intersect, then they intersect in exactly one point. C. Vertical angles are congruent. D. Through any two points there is exactly one line. 12. When constructing a perpendicular bisector, what is the final step of the construction, after you’ve drawn two arcs, as shown here? X A B Y F. Draw a line through points A and X. G. Draw a line through points A and B. H. Draw a line through points X and B. J. Draw a line through points X and Y. 84 Topic 2 TEKS Cumulative Practice 16. Which is the biconditional of the given statement? A hexagon is a six-sided polygon. F. A figure is a hexagon if and only if it is a six-sided polygon. G. A figure is a polygon if and only if it is a six-sided hexagon. H. A six-sided polygon is a hexagon. J. A hexagon is a polygon if and only if it is a six-sided figure. 17. Given the statements below, what conclusion can be made using the Law of Detachment? If a student wants to go to college, then the student must study hard. Rashid wants to go to Rice University. A. Rashid will go to Rice University. B. Rashid will not have to study hard. C. College students study hard. D. Rashid must study hard. 18. What are two pairs of congruent angles in this figure? 11111 * 11111 = 1 11111 * 11111 = 121 11111 * 11111 = 12321 11111 * 11111 = 1234321 11111 * 11111 = ■ F E I G H F. ∠EIF ≅ ∠FIG and ∠FIG ≅ ∠GIH G. ∠EIF ≅ ∠GIH and ∠EIG ≅ ∠FIH H. ∠HIG ≅ ∠EIF and ∠FIG ≅ ∠GIH J. ∠HIG ≅ ∠EIF and ∠FIH ≅ ∠GIH Gridded Response 19. What is the next number in the pattern? Constructed Response 24. On a number line, P is at -4 and R is at 8. What is the coordinate of the point Q, which is 34 the way from R to P? Show your work. 25. Write the converse, inverse, and contrapositive of the following statement. Determine the truth value of each. If you live in Oregon, then you live in the United States. 1, -4, 9, -16, c 20. m∠BZD = 107 m∠FZE = 2x + 5 m∠CZD = x What is the measure of ∠CZD ? 26. Determine the truth value of the conjecture below. If false, provide a counterexample. A perpendicular bisector of a line segment forms three pairs of vertical angles. 27. The sequence below lists the first eight powers of 7. B 71, 72, 73, 74, 75, 76, 77, 78, . . . C A D Z F E a. Make a table that lists the digit in the ones place for each of the first eight powers of 7. For example, 74 = 2401. The digit 1 is in the ones place. b. What digit is in the ones place of 734 ? Explain your reasoning. 21. The measure of an angle is three more than twice its supplement. What is the measure of the angle? 28. Write a proof. Given: ∠1 and ∠2 are supplementary. 22. What is the value of x? X 3x 1 5C8 23. Continue the pattern. (2x 2 70)8 Prove: ∠1 and ∠2 are right angles. 1 2 PearsonTEXAS.com 85