HFCC Math Lab Beginning Algebra 2 MULTIPLICATION AND DIVISION OF SIGNED NUMBERS

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Darlene Sullivan
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1 HFCC Math Lab Beginning Algebra 2 MULTIPLICATION AND DIVISION OF SIGNED NUMBERS PART I: Multiplication of Signed Numbers Rules for Multiplication of Signed Numbers: (These Rules must be memorized.) Rule 1: To multiply two numbers with the same sign, multiply absolute values. The result is always positive. Rule 2: To multiply two numbers with different signs, multiply the absolute values. The result is always negative. We can state the Multiplication Rules in another equivalent way: Rule 1: Positive Negative Positive = Positive Negative = Positive Rule 2: Positive Negative = Negative Negative Positive = Negative Note: Even though + 3= 3, the positive signs are included in some of the examples below for emphasis. Examples: (Rule 1) 1. ( 3) ( 5) =+ 15= 15 The signs are the same, so the answer is positive. 2. ( + 6) ( + 2) =+ 12= 12 The signs are the same, so the answer is positive. 3. ( 6) ( 1.1) =+ 6.6= 6.6 The signs are the same, so the answer is positive.. ( 6) ( 7) =+ 2= 2 The signs are the same, so the answer is positive =+ =+ = The signs are the same, so the answer is positive ( ) =+ =+ = 2 The signs are the same, so the answer is positive Examples: (Rule 2) 1. ( + 3) ( ) = 12 The signs are different, so the answer is negative. 2. ( 6) ( + ) = 2 The signs are different, so the answer is negative. 3. ( + 3) ( 1.2) = 3.6 The signs are different, so the answer is negative. Revised 02/09 1

2 . ( 3) ( + 0.7) = 2.1 The signs are different, so the answer is negative. 5. (6) ( 3) = 18 The signs are different, so the answer is negative. 6. ( 0.02) (0.) = The signs are different, so the answer is negative ( + 12) = = = The signs are different, so the answer is negative The signs are different, so the answer is negative. = = When multiplying more than two signed numbers together do the multiplications one at a time from left to right. Examples: (Rules 1 and 2). Parentheses are used to indicate multiplication. 1. ( + 2)( 3)( 5) 2. ( 3)( 2)( + 7) 3. ( 2)( + )( 1) ( 6)( 5) ( + 6)( + 7) ( 8)( 1) ( 2)( 5)( 6) 5. ( 1)( + 3)( + ) 6. (6)(2)( 1) ( ) ( + 10)( 6) 3 ( + ) (12)( 1) (3)( )( + 2) 8. ( ) 9. ( 2) 2 3 ( 12)( + 2) ( )( ) ( 2)( 2)( 2) 2 16 ( + )( 2) 8 Note: In any multiplication problem: If there are an even number of negative factors, the answer is positive. See examples 1, 2 and 3 above. If there are an odd number of negative factors, the answer is negative. See examples, 5, 6 and 7 above. Revised 02/09 2

3 PART II: Division of Signed Numbers Rules for Division of Signed Numbers: (These Rules must be memorized.) Rule 1: To divide two numbers with the same sign, divide the absolute values. The result is always positive. Rule 2: To divide two numbers with different signs, divide the absolute values. The result is always negative. We can state the Division Rules in another equivalent way: Rule 1: Positive Negative Positive = Positive Negative = Positive Rule 2: Positive Negative = Negative Negative Positive = Negative Notice that the Rules for Division are the same as the Rules for Multiplication. Examples: 1. ( + 8) ( ) = 2 The signs are different, so the answer is negative. 2. ( 20) ( 5) =+ = The signs are the same, so the answer is positive. 3. ( 0) ( + 8) = 5 The signs are different, so the answer is negative.. ( + 50) ( + 5) =+ 10= 10 The signs are the same, so the answer is positive. 5. ( 1.2) ( 0.3) =+ = The signs are the same, so the answer is positive. 6. ( + 2.8) ( 0.) = 7 The signs are different, so the answer is negative ( 2) = 9 The signs are different, so the answer is negative. 8. ( 2) 3= 8 The signs are different, so the answer is negative. Revised 02/09 3

4 Remember that a fraction bar means division. Therefore, we can simplify fractions containing signed numbers by using the Division Rules for signed numbers. Examples: = 3 3 because a positive divided by a negative is negative = because a negative divided by a positive is negative =+ 3 3 because a negative divided by a negative is positive = = = =+ = = = = = = = = = = =+ = = = = Note: Be careful: = 7 whereas = Revised 02/09

5 Exercises: Perform the following multiplications and divisions. 1. ( + 3)( 6) 2. ( 2)( 2)( 2)( 2) 3. ( 3)( + ). ( 2)(5) 5. (5)( 3) 6. ( 6)( 7)( 8) 7. ( + 10) ( 5) ( 6) 10. ( 1) ( 1) 12. ( 8)( 7) 13. ( 6) (2) 1. 8 ( 2) 15. ( 2) ( 6) ( ) ( 1.2) ( 0.) 20. ( 1.5) ( 7) ( 5)( )( 3)( 2) Answers to all problems. Solutions to some problems ( 6) = ( 6)( 6) = Note: There are an odd number of negative factors, so the answer is negative = = = Revised 02/09 5

6 Answers continued: ( 7) = ( 7) 21 7 = = = = = = Note: There are an even number of negative factors, so the answer is positive = + = = = = = = = =+ = NOTE: You can get additional instruction and practice by going to the following websites: This website gives rules for multiplying and dividing signed numbers along with many interactive examples. This website includes flashcards, matching and concentration games that can be used to practice the rules for multiplying and dividing signed numbers. Revised 02/09 6

HFCC Math Lab Intermediate Algebra 18 SOLVING RADICAL EQUATIONS

HFCC Math Lab Intermediate Algebra 18 SOLVING RADICAL EQUATIONS You already know how to solve linear equations and quadratic equations by factoring. In this handout, you are going to learn how to solve