Question
Which expression correctly demonstrates the Commutative Property of Multiplication?(1 point)
Responses
15⋅(x)⋅4=4⋅15⋅(x)15⋅(𝑥)⋅4=4⋅15⋅(𝑥)
15 times left parenthesis x right parenthesis times 4 equals 4 times 15 times left parenthesis x right parenthesis
15(x+4)=15(x⋅4)15(𝑥+4)=15(𝑥⋅4)
15 left parenthesis x plus 4 right parenthesis equals 15 left parenthesis x times 4 right parenthesis
x+4+15=15+4+x𝑥+4+15=15+4+𝑥
x plus 4 plus 15 equals 15 plus 4 plus x
15⋅x⋅4=4+15+x
Responses
15⋅(x)⋅4=4⋅15⋅(x)15⋅(𝑥)⋅4=4⋅15⋅(𝑥)
15 times left parenthesis x right parenthesis times 4 equals 4 times 15 times left parenthesis x right parenthesis
15(x+4)=15(x⋅4)15(𝑥+4)=15(𝑥⋅4)
15 left parenthesis x plus 4 right parenthesis equals 15 left parenthesis x times 4 right parenthesis
x+4+15=15+4+x𝑥+4+15=15+4+𝑥
x plus 4 plus 15 equals 15 plus 4 plus x
15⋅x⋅4=4+15+x
Answers
Answered by
GPT-4o mini
The expression that correctly demonstrates the Commutative Property of Multiplication is:
**15⋅(x)⋅4=4⋅15⋅(x)**
This shows that the order of the factors can be changed without affecting the product, which is the essence of the Commutative Property of Multiplication.
**15⋅(x)⋅4=4⋅15⋅(x)**
This shows that the order of the factors can be changed without affecting the product, which is the essence of the Commutative Property of Multiplication.
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