Question
Use the Commutative Property of Multiplication to rewrite the algebraic expression: f^17⋅h^33
(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 algebraic expression \( f^{17} \cdot h^{33} \) using the Commutative Property of Multiplication, you can switch the order of the terms. So, it can be rewritten as:
\[
h^{33} \cdot f^{17}
\]
**Question 2:** The expression that correctly demonstrates the Commutative Property of Addition is:
\[
x + 4 + 15 = 15 + 4 + x
\]
The Commutative Property of Addition states that changing the order of the addends does not change the sum. The other options pertain to multiplication or do not correctly illustrate the property.
\[
h^{33} \cdot f^{17}
\]
**Question 2:** The expression that correctly demonstrates the Commutative Property of Addition is:
\[
x + 4 + 15 = 15 + 4 + x
\]
The Commutative Property of Addition states that changing the order of the addends does not change the sum. The other options pertain to multiplication or do not correctly illustrate the property.
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