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3BDOK08MM01 FM 3/21/06 10:32 AM Page iii TABLE OF CONTENTS Introduction .................................................................................................... 1 Test-Taking Tips ................................................................................ 2 Unit 1 – Number Sense .................................................................................. 3 Lesson 1: Number Concepts ............................................................. 4 PASS Objective: 2.2 Lesson 2: Comparing and Ordering Rational Numbers ................. 13 PASS Objective: 2.1 Lesson 3: Computation with Rational Numbers............................. 27 PASS Objective: 2.1 Lesson 4: Ratio, Proportion, and Percent ....................................... 40 PASS Objective: 2.1 Lesson 5: Estimation and Problem Solving.................................... 46 PASS Objectives: 2.1, 2.2 Unit 2 – Algebraic Reasoning...................................................................... 57 Lesson 6: Writing and Solving Equations and Inequalities............ 58 PASS Objectives: 1.1, 1.2 Lesson 7: Graphing Equations and Inequalities ............................. 71 PASS Objectives: 1.1, 1.2 Unit 3 – Geometry........................................................................................ 93 Lesson 8: Plane Figures .................................................................. 94 PASS Objective: 3.2 Maintenance Concept: Geometric Figures © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. Lesson 9: Solid Figures................................................................. 112 PASS Objective: 3.1 Unit 4 – Measurement ............................................................................... 121 Lesson 10: Measurement Systems ................................................ 122 PASS Objective: 4.3 Maintenance Concepts: Customary and Metric Measurements Lesson 11: Geometric Measurement ............................................ 133 PASS Objectives: 4.1, 4.2, 4.3 iii 3BDOK08MM01 FM 3/21/06 10:32 AM Page iv Table of Contents Unit 5 – Data Analysis and Statistics ....................................................... 157 Lesson 12: Data Analysis.............................................................. 158 PASS Objectives: 5.1, 5.2, 5.3 Lesson 13: Probability .................................................................. 184 iv © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. Maintenance Concept: Simple Probabilities 3BDOK08MM01 L01 3/21/06 10:34 AM Page 4 Unit 1 – Number Sense PASS Objective: 2.2 Lesson 1: Number Concepts In this lesson, you will write numbers using exponents and scientific notation. You will also compute with numbers written using exponents and scientific notation. Exponents An exponent (or power) shows how many times the base number appears as a factor. To evaluate 23, multiply three twos together. exponent ‘ “ 23 2 • 2 • 2 8 base Here are a few reminders for evaluating exponents. • A base with an exponent of 0 equals 1. 100 1 50 1 25,000,0000 1 • A base with an exponent of 1 equals the base number. 101 10 51 5 25,000,0001 25,000,000 • A positive base with a positive exponent equals a positive number. 42 16 53 125 1 2 2 1 4 • A negative base with an even exponent equals a positive number. (3)2 (3) • (3) 9 (3)3 (3) • (3) • (3) 27 • A base with a negative sign in front equals a negative number. 33 (3 • 3 • 3) 27 92 (9 • 9) 81 • A base with a negative exponent equals the reciprocal of the base with a positive exponent. 53 4 1 3 5 1 125 (8)3 1 (8)3 1 512 © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. • A negative base with an odd exponent equals a negative number. 3BDOK08MM01 L01 3/21/06 10:34 AM Page 5 Lesson 1: Number Concepts PASS Objective: 2.2 Rules of exponents Follow these rules when multiplying or dividing powers with like bases or when simplifying a power of a power. Multiplication To multiply numbers with exponents that have the same bases, add the exponents and keep the bases the same. Example Multiply: 23 • 27 23 • 27 (2 • 2 • 2) • (2 • 2 • 2 • 2 • 2 • 2 • 2) 2(3 7) 210 1,024 The product of 23 and 27 is 1,024. Division To divide numbers with exponents that have the same bases, subtract the exponent of the denominator from the exponent of the numerator and keep the bases the same. Examples © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. Divide: 38 5 3 38 5 3 Divide: 46 9 4 46 9 4 4•4•4•4•4•4 4•4•4•4•4•4•4•4•4 3(8 5) 1 4•4•4 33 1 3 4 27 1 64 3•3•3•3•3•3•3•3 3•3•3•3•3 The quotient of 38 and 35 is 27. ( 4(6 9) 43) The quotient of 46 and 49 is 1 . 64 5 3BDOK08MM01 L01 3/21/06 10:34 AM Page 6 Unit 1 – Number Sense PASS Objective: 2.2 Power of a power To simplify a number that has a power raised to another power, multiply the exponents and keep the base the same. Example Evaluate: (53)2 (53)2 (5 • 5 • 5) • (5 • 5 • 5) 5(3 • 2) 56 15,625 (53)2 is equal to 15,625. Practice Directions: For Numbers 1 through 12, evaluate the expressions. 1. 42 ____________ 7. (22)0 ____________ 2. (82)2 ____________ 8. 109 2 10 3. 32 • 34 ____________ 9. (4)6 (4)3 ____________ 4. (3)3 ____________ 10. (32)3 ____________ 5. (25)2 ____________ 11. 75 • 72 ____________ 6. 64 ____________ 12. 6 156 3 15 ____________ © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. ____________ 3BDOK08MM01 L01 3/21/06 10:34 AM Page 7 Lesson 1: Number Concepts PASS Objective: 2.2 Scientific Notation Scientific notation is used to represent very large or very small numbers. The following table shows the first five positive and negative powers of 10. Powers of 10 Negative Positive 101 10 10 1 0.1 102 100 10 2 0.01 103 1,000 10 3 0.001 104 10,000 10 4 0.0001 105 100,000 10 5 0.00001 and so on . . . and so on . . . – – – – – Changing from standard form to scientific notation A number is written in scientific notation as the product of the coefficient (a number greater than or equal to 1 but less than 10) and some power of 10. Follow these steps to change a number from standard form to scientific notation. Step 1: Move the decimal point to the left or right until you have a number greater than or equal to 1 but less than 10. Step 2: Count the number of places you moved the decimal point to the left or right and use that number as the positive or negative power of 10. © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. Step 3: Multiply the decimal (in Step 1) by the power of 10 (in Step 2). Example Write 3,945,600 in scientific notation. Move the decimal point 6 places to the left. 3.945600. Since the decimal point moved 6 places to the left, multiply by 106. 3.9456 • 106 3,945,600 3.9456 • 106 7 3BDOK08MM01 L01 3/21/06 10:34 AM Page 8 Unit 1 – Number Sense PASS Objective: 2.2 Example Write 0.0000451 in scientific notation. Move the decimal point 5 places to the right. 0.00004.51 Since the decimal point moved 5 places to the right, multiply by 105. 4.51 • 105 0.0000451 4.51 • 105 Changing from scientific notation to standard form To change a number from scientific notation to standard form, either multiply or divide by a power of 10. A number written in scientific notation with a positive power of 10 shows that you are multiplying by a power of 10. To change a number written in scientific notation with a positive power of 10 to standard form, move the decimal point to the right. The exponent shows the number of places the decimal point will be moved. Examples 2.001 • 105 2.00100. 200,100 A number written in scientific notation with a negative power of 10 shows that you are dividing by a power of 10. To change a number written in scientific notation with a negative power of 10 to standard form, move the decimal point to the left. The exponent shows the number of places the decimal point will be moved. Examples 9.232 • 104 0.0009.2932 0.0009232 5.30704 • 103 0.005.30704 0.00530704 8 © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. 6.173 • 107 6.1730000. 61,730,000 3BDOK08MM01 L01 3/21/06 10:34 AM Page 9 Lesson 1: Number Concepts PASS Objective: 2.2 Practice Directions: For Numbers 1 through 5, write each number in scientific notation. Directions: For Numbers 6 through 10, write each number in standard form. 1. 0.0000821 _________________ 6. 8.7 • 108 _________________ 2. 5,033 _________________ 7. 9.162 • 105 _________________ 3. 1,743.55 _________________ 8. 6.524 • 105 _________________ 4. 0.0005894 _________________ 9. 5.00961 • 104 _________________ 5. 34,008 _________________ 10. 3.00006 • 104 _________________ Directions: For Numbers 11 through 14, write each number in standard form or scientific notation. © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. 11. The speed of light is approximately 3 • 108 meters per second. How is 3 • 108 written in standard form? ____________________ 12. Sound travels 10 feet through water in about 0.00206 seconds. How is 0.00206 written in scientific notation? ____________________ 13. Jake’s computer can do one calculation in 6 • 105 seconds. How is 6 • 105 written in standard form? ____________________ 14. In 2004, Oklahoma produced about 164,500,000 bushels of wheat. How is 164,500,000 written in scientific notation? ____________________ 9 3BDOK08MM01 L01 3/21/06 10:34 AM Page 10 Unit 1 – Number Sense PASS Objective: 2.2 Multiplying and dividing numbers in scientific notation When multiplying or dividing numbers written in scientific notation, multiply or divide the coefficients and use the rules of exponents to determine the power of 10. Make sure the product or quotient is written in correct scientific notation. Example Multiply: (4.5 • 105) • (6 • 108) Multiply the coefficients. 4.5 • 6 27 Add the powers of 10. 5 8 13 Make sure the quotient is written in correct scientific notation. (4.5 • 105) • (6 • 108) 27 • 1013 2.7 • 1014 Therefore, (4.5 • 105) • (6 • 108) 2.7 • 1014. Example Divide: (2.8 • 106) (5.6 • 103) Divide the coefficients. 2.8 5.6 0.5 6 (3) 9 Make sure the quotient is written in correct scientific notation. (2.8 • 106) (5.6 • 103) 0.5 • 109 5.0 • 108 Therefore, (2.8 • 106) (5.6 • 103) 5 • 108. 10 © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. Subtract the powers of 10. 3BDOK08MM01 L01 3/21/06 10:34 AM Page 11 Lesson 1: Number Concepts PASS Objective: 2.2 Practice Directions: For Numbers 1 through 8, multiply or divide the numbers in scientific notation. 1. (9.23 • 104) • (7.85 • 107) ____________________ 2. (6.3 • 103) (2.5 • 108) ____________________ 3. (2.25 • 105) • (4 • 105) ____________________ 4. (5.3 • 102) • (2.06 • 109) ____________________ 5. (8 • 107) (6.25 • 102) ____________________ © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. 6. (9.1 • 103) • (4.5 • 108) ____________________ 7. (9 • 107) (2.4 • 102) ____________________ 8. (1.9 • 1010) (8 • 103) ____________________ 11 3BDOK08MM01 L01 3/21/06 10:34 AM Page 12 Unit 1 – Number Sense OCCT Practice 1 5 9 Multiply: 12 • 12 3 What is the value of (2)4? A 123 A 16 6 B 12 B 8 C 1212 C 8 D 1227 D 16 6 2 The distance from the Sun to the Earth is approximately 1.5 • 108 kilometers. How is this number written in standard form? How is 0.00001578 written in scientific notation? A 1.578 • 105 B 1.578 • 106 A 15,000,000 km 5 C 15.78 • 10 B 150,000,000 km D 15.78 • 105 C 1,500,000,000 km D 15,000,000,000 km 3 4 7 A 9 • 10 Divide: B 9 • 105 2515 255 A 253 6 C 9 • 10 B 2510 7 D 9 • 10 C 2520 D 2575 4 How is 5,200,000,000 written in scientific notation? A 5.2 • 109 B 5.2 • 108 C 52 • 108 D 0.52 • 1010 12 8 What is the value of 252? A 5 B 50 C 225 D 625 © 2006 Buckle Down Publishing. COPYING IS FORBIDDEN BY LAW. Divide: (7.2 • 105) (8 • 1010)
