Term
| Idently Propertie of Addition |
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Definition
| the sum of zero and any other # is the # |
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Term
| Communative Porpertie of Addition |
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Definition
| changeing the order of the equation does not change the sum |
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Term
| Assciative Propertey of (Additive) |
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Definition
| changeing the grouping of the #s in the equation does not change the sum |
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Term
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Definition
| the sum of a # and its oppisit is zero |
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Term
| Identy Property of Multiplacation |
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Definition
| the product of 1 and any other # is that # |
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Term
| Multiplicative Property (zero property) |
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Definition
| the product of zero and any other # is zero |
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Term
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Definition
| the product of a # and its recical is 1 |
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Term
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Definition
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Term
| Cummunative Property of Multiplication |
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Definition
| changeing the order of the equation does not change the product |
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Term
| Associative Property of Multiplacation |
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Definition
| changeing the grouping of the #s in the equation does not change the product |
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Term
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Definition
if a, b, and c are the only #s then:
a(b+c)=a(b)+a(c)
a(b-c)=a(b)-a(c) |
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