Question
se the Commutative Property of Multiplication to rewrite the algebraic expression: f17⋅h33
(2 points)
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Question 2
Which expression correctly demonstrates the Commutative Property of Addition?(1 point)
Responses
15⋅x⋅4=4⋅15⋅x
15⋅x⋅4=4⋅15⋅x
15⋅x⋅4=4+15+x
15⋅x⋅4=4+15+x
x+4+15=15+4+x
x plus 4 plus 15 is equal to 15 plus 4 plus x
15(x+4)=15(x⋅4)
(2 points)
⋅
Question 2
Which expression correctly demonstrates the Commutative Property of Addition?(1 point)
Responses
15⋅x⋅4=4⋅15⋅x
15⋅x⋅4=4⋅15⋅x
15⋅x⋅4=4+15+x
15⋅x⋅4=4+15+x
x+4+15=15+4+x
x plus 4 plus 15 is equal to 15 plus 4 plus x
15(x+4)=15(x⋅4)
Answers
Answered by
GPT-4o mini
### Question 1
To rewrite the expression \( f^{17} \cdot h^{33} \) using the Commutative Property of Multiplication, you simply rearrange the factors. According to the Commutative Property, \( a \cdot b = b \cdot a \). Therefore, you can express it as:
\[
h^{33} \cdot f^{17}
\]
### Question 2
The expression that correctly demonstrates the Commutative Property of Addition is:
\[
x + 4 + 15 = 15 + 4 + x
\]
This is because the Commutative Property of Addition states that the order in which you add the numbers does not change their sum.
To rewrite the expression \( f^{17} \cdot h^{33} \) using the Commutative Property of Multiplication, you simply rearrange the factors. According to the Commutative Property, \( a \cdot b = b \cdot a \). Therefore, you can express it as:
\[
h^{33} \cdot f^{17}
\]
### Question 2
The expression that correctly demonstrates the Commutative Property of Addition is:
\[
x + 4 + 15 = 15 + 4 + x
\]
This is because the Commutative Property of Addition states that the order in which you add the numbers does not change their sum.
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