exploration 1-1 Sets of Numbers A set is a group of items, such as a group of numbers. For example, the numbers that appear on a telephone keypad form a set. The items in a set are called elements. 1. One method of describing a set is to list its elements inside a pair of braces, {t} . Use this notation to write the set of numbers found on a telephone keypad. {0, 1, 2, 3, 4, 5, 6, 7, 8, 9} 2. You can also describe a set by describing its properties. Describe the set of numbers found on a telephone keypad without listing them. Possible answer: whole numbers less than 10 3. List four numbers that are NOT included in the set you described in Problem 2. Possible answer: 0.5, 1.75, (cid:1) (cid:1)8 , (cid:1) THINK AND DISCUSS 4. Explain how terms such as natural numbers, whole numbers, and integers can help you describe a set. 111000 111000 5. Describe the set of numbers that 222000 222000 appear on a football field. 333000 333000 4. Possible answer: Using these types of terms to 444000 444000 describe a set is sometimes easier than listing each 555000 555000 element when a set is very large. 444000 444000 5. Possible answer: integer multiples of 10 that are greater than or equal to 10 and less than or equal to 50 333000 333000 222000 222000 111000 111000 1 Holt Algebra 2 All rights reserved. exploration 1-1 Sets of Numbers A set is a group of items, such as a group of numbers. For example, the numbers that appear on a telephone keypad form a set. The items in a set are called elements. 1. One method of describing a set is to list its elements inside a pair of braces, {t} . Use this notation to write the set of numbers found on a telephone keypad. {0, 1, 2, 3, 4, 5, 6, 7, 8, 9} 2. You can also describe a set by describing its properties. Describe the set of numbers found on a telephone keypad without listing them. Possible answer: whole numbers less than 10 3. List four numbers that are NOT included in the set you described in Problem 2. Possible answer: 0.5, 1.75, (cid:1) (cid:1)8 , (cid:1) THINK AND DISCUSS 4. Explain how terms such as natural numbers, whole numbers, and integers can help you describe a set. 111000 111000 5. Describe the set of numbers that 222000 222000 appear on a football field. 333000 333000 4. Possible answer: Using these types of terms to 444000 444000 describe a set is sometimes easier than listing each 555000 555000 element when a set is very large. 444000 444000 5. Possible answer: integer multiples of 10 that are greater than or equal to 10 and less than or equal to 50 333000 333000 222000 222000 111000 111000 1 Holt Algebra 2 All rights reserved. exploration 1-2 Properties of Real Numbers You may use a calculator to help you with the following problems. Tell whether each statement is true or false. 1. 6 (cid:1) (cid:1)(cid:2)2 (cid:2) (cid:3) (cid:1)(cid:2)2(cid:2) (cid:1) 6 true 2. 8 (cid:2) (cid:1)(cid:2)2(cid:2) (cid:3) (cid:1)(cid:2)2(cid:2) (cid:2) 8 false (cid:2) (cid:2) (cid:3) (cid:2) (cid:2) (cid:4) (cid:4) (cid:3) (cid:4) (cid:4) 3. 5 4 1 1 4 5 false 4. 20 5 2 2 5 20 false 5. 3(cid:1)7(cid:2) (cid:3) 7(cid:1)3 (cid:2) true 6. 7 (cid:1) 3 (cid:1) 2 (cid:3) 2 (cid:1) 7 (cid:1) 3 true (cid:4) (cid:3) (cid:4) (cid:5) (cid:5) (cid:3) (cid:5) (cid:5) 7. 9 3 3 9 false 8. 10 20 30 30 20 10 true 9. Based on your answers to Problems 1–8, for which operations (addition, subtraction, multiplication, and division) does the order of the numbers make a difference in the result? subtraction and division Tell whether each statement is true or false. 10. (cid:1)8 (cid:4) 4(cid:2) (cid:4) 2 (cid:3) 8 (cid:4) (cid:1)4 (cid:4) 2(cid:2) 11. (cid:1)9 (cid:1) 4(cid:2) (cid:1) 3 (cid:3) 9 (cid:1) (cid:1)4 (cid:1) 3 (cid:2) false true 12. (cid:1)5 (cid:2) 4 (cid:2) (cid:2) 1 (cid:3) 5 (cid:2) (cid:1)4 (cid:2) 1 (cid:2) 13. 21 (cid:5) (cid:1)32 (cid:5) 43(cid:2) (cid:3) (cid:1)21 (cid:5) 32(cid:2) (cid:5) 43 false true 14. Based on your answers to Problems 10–13, for which operations (addition, subtraction, multiplication, and division) does the grouping of the numbers make a difference in the result? subtraction and division THINK AND DISCUSS 15. Discuss how the properties you explored above might help (cid:5) (cid:5) you find 13 20 5 by using mental math. 16. Discuss whether it would matter which operation you did first if you had more than one operation in a problem. 15. Possible answer: The grouping of the numbers does not make a difference in multiplication. Group 20 and 5 because these two numbers are easy to multiply mentally. 13 (cid:1) (cid:2) 20 (cid:1) 5 (cid:3) (cid:2) 13 (cid:1) 100 (cid:2) 1300 16. Possible answer: Yes; in some cases, the order of operations would matter. For example, if you simplified 2 (cid:3) 3 (cid:1) 4 by adding first, you would get 20. If you simplified 2 (cid:3) 3 (cid:1) 4 by multiplying first, you would get 14. Copyright © by Holt, Rinehart and Winston. 2 Holt Algebra 2 All rights reserved. exploration 1-2 Properties of Real Numbers You may use a calculator to help you with the following problems. Tell whether each statement is true or false. 1. 6 (cid:1) (cid:1)(cid:2)2 (cid:2) (cid:3) (cid:1)(cid:2)2(cid:2) (cid:1) 6 true 2. 8 (cid:2) (cid:1)(cid:2)2(cid:2) (cid:3) (cid:1)(cid:2)2(cid:2) (cid:2) 8 false (cid:2) (cid:2) (cid:3) (cid:2) (cid:2) (cid:4) (cid:4) (cid:3) (cid:4) (cid:4) 3. 5 4 1 1 4 5 false 4. 20 5 2 2 5 20 false 5. 3(cid:1)7(cid:2) (cid:3) 7(cid:1)3 (cid:2) true 6. 7 (cid:1) 3 (cid:1) 2 (cid:3) 2 (cid:1) 7 (cid:1) 3 true (cid:4) (cid:3) (cid:4) (cid:5) (cid:5) (cid:3) (cid:5) (cid:5) 7. 9 3 3 9 false 8. 10 20 30 30 20 10 true 9. Based on your answers to Problems 1–8, for which operations (addition, subtraction, multiplication, and division) does the order of the numbers make a difference in the result? subtraction and division Tell whether each statement is true or false. 10. (cid:1)8 (cid:4) 4(cid:2) (cid:4) 2 (cid:3) 8 (cid:4) (cid:1)4 (cid:4) 2(cid:2) 11. (cid:1)9 (cid:1) 4(cid:2) (cid:1) 3 (cid:3) 9 (cid:1) (cid:1)4 (cid:1) 3 (cid:2) false true 12. (cid:1)5 (cid:2) 4 (cid:2) (cid:2) 1 (cid:3) 5 (cid:2) (cid:1)4 (cid:2) 1 (cid:2) 13. 21 (cid:5) (cid:1)32 (cid:5) 43(cid:2) (cid:3) (cid:1)21 (cid:5) 32(cid:2) (cid:5) 43 false true 14. Based on your answers to Problems 10–13, for which operations (addition, subtraction, multiplication, and division) does the grouping of the numbers make a difference in the result? subtraction and division THINK AND DISCUSS 15. Discuss how the properties you explored above might help (cid:5) (cid:5) you find 13 20 5 by using mental math. 16. Discuss whether it would matter which operation you did first if you had more than one operation in a problem. 15. Possible answer: The grouping of the numbers does not make a difference in multiplication. Group 20 and 5 because these two numbers are easy to multiply mentally. 13 (cid:1) (cid:2) 20 (cid:1) 5 (cid:3) (cid:2) 13 (cid:1) 100 (cid:2) 1300 16. Possible answer: Yes; in some cases, the order of operations would matter. For example, if you simplified 2 (cid:3) 3 (cid:1) 4 by adding first, you would get 20. If you simplified 2 (cid:3) 3 (cid:1) 4 by multiplying first, you would get 14. Copyright © by Holt, Rinehart and Winston. 2 Holt Algebra 2 All rights reserved. exploration 1-3 Square Roots You can use a calculator to help you investigate some properties of square roots. To enter square roots, press (cid:18)(cid:78)(cid:68) (cid:18) . 1. Find the value of each expression in the table. Round to the nearest thousandth. Expression Value Expression Value (cid:2) (cid:2) (cid:2) (cid:3)(cid:3)(cid:3)3 (cid:5) (cid:3)(cid:3)(cid:3)5 3.873 (cid:3)(cid:3)(cid:3)15 3.873 (cid:2) (cid:2) (cid:2) (cid:3)(cid:3)(cid:3)7 (cid:5) (cid:3)(cid:3)(cid:3)2 3.742 (cid:3)(cid:3)(cid:3)14 3.742 (cid:2) (cid:2) (cid:2) (cid:3)(cid:3)(cid:3)50 (cid:5) (cid:3)(cid:3)(cid:3)2 10 (cid:3)(cid:3)(cid:3)100 10 2. Based on your answers to Problem 1, what can you say about (cid:3)(cid:3)(cid:3) (cid:2)a (cid:5) (cid:3)(cid:3)(cid:3)(cid:2)b ? Possible answer: (cid:1)(cid:1)a (cid:4) (cid:1)(cid:1)b (cid:2) (cid:1)(cid:1)ab 3. Find the value of each expression in the table. Round to the nearest thousandth. Expression Value Expression Value (cid:2) (cid:3)(cid:3)(cid:3)15 (cid:2) ___(cid:2)(cid:2)_ 1.732 (cid:3)(cid:3)(cid:3)3 1.732 (cid:3)(cid:3)(cid:3)5 (cid:2) (cid:3)(cid:3)(cid:3)60 (cid:2) ____ (cid:2) 2.236 (cid:3)(cid:3)(cid:3)5 2.236 (cid:3)(cid:3)(cid:3)12 (cid:2) (cid:3)(cid:3)(cid:3)100 (cid:2) _____ (cid:2) 5 (cid:3)(cid:3)(cid:3)25 5 (cid:3)(cid:3)(cid:3)4 4. Based on your answers to Problem 3, what can you say (cid:2) (cid:1) (cid:1) about _ (cid:3)(cid:3)(cid:3)_(cid:2)a_ ? Possible answer: _ (cid:1)_(cid:1)a_ (cid:2) (cid:1) _a (cid:3)(cid:3)(cid:3)b (cid:1)b b THINK AND DISCUSS 5. Explain how you can use one of the properties you (cid:2) (cid:2) discovered above to simplify (cid:3)(cid:3)(cid:3)5 (cid:5) (cid:3)(cid:3)(cid:3)20 by using mental math. 5. Possible answer: Rewrite the expression as the square root of a product. Then simplify. (cid:1) (cid:1) (cid:2) (cid:1) (cid:1)5 · (cid:1)20 (cid:2) (cid:3) 5 · 20 (cid:2) (cid:1) 100 (cid:2) 10 Copyright © by Holt, Rinehart and Winston. 3 Holt Algebra 2 All rights reserved. exploration 1-3 Square Roots You can use a calculator to help you investigate some properties of square roots. To enter square roots, press (cid:18)(cid:78)(cid:68) (cid:18) . 1. Find the value of each expression in the table. Round to the nearest thousandth. Expression Value Expression Value (cid:2) (cid:2) (cid:2) (cid:3)(cid:3)(cid:3)3 (cid:5) (cid:3)(cid:3)(cid:3)5 3.873 (cid:3)(cid:3)(cid:3)15 3.873 (cid:2) (cid:2) (cid:2) (cid:3)(cid:3)(cid:3)7 (cid:5) (cid:3)(cid:3)(cid:3)2 3.742 (cid:3)(cid:3)(cid:3)14 3.742 (cid:2) (cid:2) (cid:2) (cid:3)(cid:3)(cid:3)50 (cid:5) (cid:3)(cid:3)(cid:3)2 10 (cid:3)(cid:3)(cid:3)100 10 2. Based on your answers to Problem 1, what can you say about (cid:3)(cid:3)(cid:3) (cid:2)a (cid:5) (cid:3)(cid:3)(cid:3)(cid:2)b ? Possible answer: (cid:1)(cid:1)a (cid:4) (cid:1)(cid:1)b (cid:2) (cid:1)(cid:1)ab 3. Find the value of each expression in the table. Round to the nearest thousandth. Expression Value Expression Value (cid:2) (cid:3)(cid:3)(cid:3)15 (cid:2) ___(cid:2)(cid:2)_ 1.732 (cid:3)(cid:3)(cid:3)3 1.732 (cid:3)(cid:3)(cid:3)5 (cid:2) (cid:3)(cid:3)(cid:3)60 (cid:2) ____ (cid:2) 2.236 (cid:3)(cid:3)(cid:3)5 2.236 (cid:3)(cid:3)(cid:3)12 (cid:2) (cid:3)(cid:3)(cid:3)100 (cid:2) _____ (cid:2) 5 (cid:3)(cid:3)(cid:3)25 5 (cid:3)(cid:3)(cid:3)4 4. Based on your answers to Problem 3, what can you say (cid:2) (cid:1) (cid:1) about _ (cid:3)(cid:3)(cid:3)_(cid:2)a_ ? Possible answer: _ (cid:1)_(cid:1)a_ (cid:2) (cid:1) _a (cid:3)(cid:3)(cid:3)b (cid:1)b b THINK AND DISCUSS 5. Explain how you can use one of the properties you (cid:2) (cid:2) discovered above to simplify (cid:3)(cid:3)(cid:3)5 (cid:5) (cid:3)(cid:3)(cid:3)20 by using mental math. 5. Possible answer: Rewrite the expression as the square root of a product. Then simplify. (cid:1) (cid:1) (cid:2) (cid:1) (cid:1)5 · (cid:1)20 (cid:2) (cid:3) 5 · 20 (cid:2) (cid:1) 100 (cid:2) 10 Copyright © by Holt, Rinehart and Winston. 3 Holt Algebra 2 All rights reserved. exploration Simplifying Algebraic 1-4 Expressions Whenever you simplify numerical or algebraic expressions, it is important to perform the operations in the correct order. Simplify each expression. In each case, think about the order in which you should do the operations. 1. (cid:1)7 (cid:1) 2(cid:2)2 (cid:2) 5 76 2. [(cid:1)2 (cid:2) 10(cid:2) (cid:1) (cid:1)4 (cid:2) 1(cid:2)]2 25 3. 3 (cid:2) 5 (cid:1)21 (cid:2) 19(cid:2)3 (cid:5)37 4. [(cid:1)3 3 (cid:2) 1(cid:2) (cid:4) 13 ]2 4 5. Check your answers to Problems 1–4 by entering each expression into a graphing calculator. Order of Operations 6. The order of operations tells you the sequence in which you should perform 1. Parentheses operations. Fill in the flow chart by arranging the steps given below in 2. Exponents the correct order. (cid:127) Add and subtract from left to right. 3. Multiply and divide (cid:127) Parentheses from left to right. (cid:127) Multiply and divide from left to right. 4. Add and subtract (cid:127) Exponents from left to right. THINK AND DISCUSS 7. Explain how you can use the order of operations to evaluate x 2 (cid:2) (cid:1)x (cid:1) y (cid:2) when x (cid:3) (cid:2)3 and y (cid:3) 4. (cid:2) (cid:1) (cid:1) (cid:2) (cid:2) (cid:1) 8. Discuss whether x y 1 and x y 1 are equivalent expressions. How does the order of operations determine the value of the expressions? 7. Possible answer: Substitute (cid:5)3 for x and 4 for y : (cid:2) (cid:5)3 (cid:3) 2 (cid:5) (cid:2) (cid:5)3 (cid:3) 4 (cid:3) . Simplify the expression in parentheses, then square (cid:5)3, and finally perform the subtraction. (cid:2) (cid:5)3 (cid:3) 2 (cid:5) (cid:2) (cid:5)3 (cid:3) 4 (cid:3) (cid:2) (cid:2) (cid:5)3 (cid:3) 2 (cid:5) 1 (cid:2) 9 (cid:5) 1 (cid:2) 8 8. No; possible answer: in the first expression, 1 is added to y and then the sum is subtracted from x. In the second expression, y is subtracted from x and then 1 is added to the difference. Copyright © by Holt, Rinehart and Winston. 4 Holt Algebra 2 All rights reserved. exploration Simplifying Algebraic 1-4 Expressions Whenever you simplify numerical or algebraic expressions, it is important to perform the operations in the correct order. Simplify each expression. In each case, think about the order in which you should do the operations. 1. (cid:1)7 (cid:1) 2(cid:2)2 (cid:2) 5 76 2. [(cid:1)2 (cid:2) 10(cid:2) (cid:1) (cid:1)4 (cid:2) 1(cid:2)]2 25 3. 3 (cid:2) 5 (cid:1)21 (cid:2) 19(cid:2)3 (cid:5)37 4. [(cid:1)3 3 (cid:2) 1(cid:2) (cid:4) 13 ]2 4 5. Check your answers to Problems 1–4 by entering each expression into a graphing calculator. Order of Operations 6. The order of operations tells you the sequence in which you should perform 1. Parentheses operations. Fill in the flow chart by arranging the steps given below in 2. Exponents the correct order. (cid:127) Add and subtract from left to right. 3. Multiply and divide (cid:127) Parentheses from left to right. (cid:127) Multiply and divide from left to right. 4. Add and subtract (cid:127) Exponents from left to right. THINK AND DISCUSS 7. Explain how you can use the order of operations to evaluate x 2 (cid:2) (cid:1)x (cid:1) y (cid:2) when x (cid:3) (cid:2)3 and y (cid:3) 4. (cid:2) (cid:1) (cid:1) (cid:2) (cid:2) (cid:1) 8. Discuss whether x y 1 and x y 1 are equivalent expressions. How does the order of operations determine the value of the expressions? 7. Possible answer: Substitute (cid:5)3 for x and 4 for y : (cid:2) (cid:5)3 (cid:3) 2 (cid:5) (cid:2) (cid:5)3 (cid:3) 4 (cid:3) . Simplify the expression in parentheses, then square (cid:5)3, and finally perform the subtraction. (cid:2) (cid:5)3 (cid:3) 2 (cid:5) (cid:2) (cid:5)3 (cid:3) 4 (cid:3) (cid:2) (cid:2) (cid:5)3 (cid:3) 2 (cid:5) 1 (cid:2) 9 (cid:5) 1 (cid:2) 8 8. No; possible answer: in the first expression, 1 is added to y and then the sum is subtracted from x. In the second expression, y is subtracted from x and then 1 is added to the difference. Copyright © by Holt, Rinehart and Winston. 4 Holt Algebra 2 All rights reserved. exploration 1-5 Properties of Exponents You can use a calculator to help you investigate some properties of exponents. Use the key to indicate an exponent. 1. Find the value of each expression in the table. Expression Value Expression Value 2 2 (cid:5) 2 3 32 25 32 4 3 (cid:5) 4 3 4096 4 6 4096 10 2 (cid:5) 1 0 5 10,000,000 10 7 10,000,000 2. Based on your answers to Problem 1, what can you say about a m (cid:5) a n? Possible answer: a m (cid:4) a n (cid:2) a m(cid:3)n 3. Find the value of each expression in the table. Expression Value Expression Value _ 2_ 5_ 8 2 3 8 22 _ 5_ 3_ 25 5 2 25 5 1 _1_0_ 6_ 1000 10 3 1000 10 3 4. Based on your answers to Problem 3, what can you say about _ a_ m_? Possible answer: _a m_ (cid:2) a m(cid:5)n a nn a n THINK AND DISCUSS 5. Explain how you can use one of the properties you 12 7 _____ discovered above to simplify by using mental math. 126 5. Possible answer: Rewrite the expression as a power of 12 by subtracting the exponents. Then simplify. _ 1_2_ 7_ (cid:2) 12 7(cid:5)6 (cid:2) 12 1 (cid:2) 12 12 6 Copyright © by Holt, Rinehart and Winston. 5 Holt Algebra 2 All rights reserved. exploration 1-5 Properties of Exponents You can use a calculator to help you investigate some properties of exponents. Use the key to indicate an exponent. 1. Find the value of each expression in the table. Expression Value Expression Value 2 2 (cid:5) 2 3 32 25 32 4 3 (cid:5) 4 3 4096 4 6 4096 10 2 (cid:5) 1 0 5 10,000,000 10 7 10,000,000 2. Based on your answers to Problem 1, what can you say about a m (cid:5) a n? Possible answer: a m (cid:4) a n (cid:2) a m(cid:3)n 3. Find the value of each expression in the table. Expression Value Expression Value _ 2_ 5_ 8 2 3 8 22 _ 5_ 3_ 25 5 2 25 5 1 _1_0_ 6_ 1000 10 3 1000 10 3 4. Based on your answers to Problem 3, what can you say about _ a_ m_? Possible answer: _a m_ (cid:2) a m(cid:5)n a nn a n THINK AND DISCUSS 5. Explain how you can use one of the properties you 12 7 _____ discovered above to simplify by using mental math. 126 5. Possible answer: Rewrite the expression as a power of 12 by subtracting the exponents. Then simplify. _ 1_2_ 7_ (cid:2) 12 7(cid:5)6 (cid:2) 12 1 (cid:2) 12 12 6 Copyright © by Holt, Rinehart and Winston. 5 Holt Algebra 2 All rights reserved.