Which equation exemplifies the Associative Property of Multiplication?
(1 point)
Responses
4 times left parenthesis 2 times 5 right parenthesis equals left parenthesis 2 times 5 right parenthesis times 4
Image with alt text: 4 times left parenthesis 2 times 5 right parenthesis equals left parenthesis 2 times 5 right parenthesis times 4
4 times left parenthesis 2 times 5 right parenthesis equals 4 times left parenthesis 5 times 2 right parenthesis
Image with alt text: 4 times left parenthesis 2 times 5 right parenthesis equals 4 times left parenthesis 5 times 2 right parenthesis
4 times left parenthesis 2 times 5 right parenthesis equals left parenthesis 4 times 2 right parenthesis times 5
Image with alt text: 4 times left parenthesis 2 times 5 right parenthesis equals left parenthesis 4 times 2 right parenthesis times 5
4 times 2 times 5 equals 5 times 2 times 4
The equation "4 times (2 times 5) equals 2 times (5 times 4)" exemplifies the Associative Property of Multiplication.
The Associative Property of Multiplication states that the grouping of factors does not affect the result of the multiplication. To determine which equation exemplifies this property, we need to look for an equation where the factors are grouped differently, but the overall result remains the same.
The equation that exemplifies the Associative Property of Multiplication is:
4 times (2 times 5) equals (2 times 5) times 4.
In this equation, the factors 2 and 5 are grouped differently, but when multiplied together, the product remains the same.
The equation that exemplifies the Associative Property of Multiplication is:
4 times (2 times 5) equals (2 times 5) times 4.