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Lesson 1.3 Properties of Real Numbers
Objective - To identify properties of real numbers and use them to solve problems. Commutative Properties Commutative Property of Addition a + b = b + a Example: 3 + 5 = 5 + 3 Commutative Property of Multiplication Example: Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series Algebra 1 by James Wenk © 2003 published by TEACHINGpoint
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Are the following operations commutative?
1) Subtraction Counterexamples a - b = b - a 8 - 5 = 5 - 8 3 = -3 Therefore, subtraction is not commutative. 2) Division Therefore, division is not commutative. Counterexample - a single example that proves a statement false. Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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( a + b ) + c = a + ( b + c ) ( 4 + 11 ) + 6 = 4 + ( 11 + 6 )
Associative Properties Associative Property of Addition ( a + b ) + c = a + ( b + c ) Example: ( ) + 6 = 4 + ( ) Associative Property of Multiplication Example: Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Are the following operations associative?
1) Subtraction (a - b) - c = a - (b - c) (10 - 5) - 2 = 10 - (5 - 2) Therefore, subtraction is not associative. = 3 = 7 2) Division Therefore, division is not associative. Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Commutative vs. Associative
( Flip-flop ) Associative ( Re-group ) Flip-flop Re-grouping Flip-flop Commutative Situations 1) Drinking orange juice and then eating cereal. 2) Doing math homework and then science homework. Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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x + 0 = x Identities Identity Property of Addition
Identity Property of Multiplication Properties of Zero Multiplication Property of Zero Division Property of Zero Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 ounce glass Division by Zero?
= ? 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 ounce glass Division by Zero? 8 oz.
= ? = 1 time 8 oz. 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 8 ounce glass Division by Zero? 4 oz.
= ? = 1 time = 4 oz. 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 ounce glass Division by Zero?
= ? = 1 time = 2 times 4 oz. 4 oz. 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 8 ounce glass
Division by Zero? = ? = 1 time = 2 times = 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 8 ounce glass
Division by Zero? = ? = 1 time = 2 times = 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 8 ounce glass
Division by Zero? = ? = 1 time = 2 times = 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 ounce glass
Division by Zero? = ? = 1 time = 2 times = 4 times 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 1 = 8 ounce glass
Division by Zero? = ? = 1 time = 2 times = 4 times = 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 1 = 8 times
Division by Zero? = ? = 1 time = 2 times 8 oz. = 4 times = 8 times 8 ounce glass Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 1 = 8 times 8 =
Division by Zero? = ? = 1 time = 2 times = 4 times = 8 times 8 ounce glass = Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 1 = 8 times
Division by Zero? = ? = 1 time = 2 times 8 oz. = 4 times = 8 times 8 ounce glass = 16 times Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = ? 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 1 = 8 times
Division by Zero? = ? = 1 time = 2 times = 4 times = 8 times 8 ounce glass = 16 times = ? Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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8 0 = Undefined 8 8 = 1 time 8 4 = 2 times 8 2 = 4 times 8 1 = 8 times
Division by Zero? = Undefined = 1 time = 2 times = 4 times = 8 times 8 ounce glass = 16 times = ? Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Review 0 8 = 8 0 = Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Review 0 8 = 8 0 = undefined Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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x = 0 x = -5 x = 0 or x = 0 x = -9 x = 1 or x = 3 x = -7
In the expression below the variable x can represent any real number except what? 1) x = 0 4) x = -5 x = 0 or 2) x = 0 5) x = -9 x = 1 or 3) 6) x = 3 x = -7 Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Identify the property shown below.
1) 7 + ( ) = ( ) + 5 Assoc. Prop. of Add. 2) Mult. Prop. of Zero 3) Comm. Prop. of Mult. 4) Comm. Prop. of Mult. 5) = 8 + 7 Comm. Prop. of Add. 6) = 12 Identity Prop. of Add. 7) Identity Prop. of Mult. Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Identify the property shown below.
1) (2 + 10) + 3 = (10 + 2) + 3 Comm. Prop. of Add. 2) Comm. Prop. of Mult. 3) (6 + 8) + 9 = 6 + (8 + 9) Assoc. Prop. of Add. 4) Assoc. Prop. of Mult. 5) Mult. Prop. of Zero 6) = 5 Identity Prop. of Add. 7) Identity Prop. of Mult. Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Use a property to simplify each expression below.
Identify the property used. 1) Comm. Prop. of Mult. 2) 7 + ( ) Assoc. Prop. of Add. ( ) + 29 ( 50 ) + 29 79 Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Use a property to simplify each expression below.
Identify the property used. 3) Mult. Prop. of Zero 4) Assoc. Prop. of Mult. Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Closure Property A set of numbers is said to be ‘closed’ if the
numbers produced under a given operation are also elements of the set. Tell whether the whole numbers are closed under the given operation. If not, give a counterexample. 1) Addition Closed 3) Multiplication 5 + 7 = 12 Closed 6 + 0 = 6 2) Subtraction Not Closed 4) Division Not Closed 5 - 7 = -2 2 8 = 0.25 Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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Closure Property A set of numbers is said to be ‘closed’ if the
numbers produced under a given operation are also elements of the set. Tell whether the integers are closed under the given operation. If not, give a counterexample. 1) Addition Closed 3) Multiplication = -2 Closed = 4 2) Subtraction Closed 4) Division Not Closed = 12 2 8 = 0.25 Algebra I by James Wenk © 2003 published by TEACHINGpoint as part of the Expert Systems for Teachers Series
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