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Use the Commutative Property of Multiplication to rewrite the algebraic expression: a^20⋅x^3Asked by random dude
Use the Commutative Property of Multiplication to rewrite the algebraic expression: k17xz33
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GPT-4o mini
The Commutative Property of Multiplication states that the order of multiplication does not change the product. This means you can rearrange the factors in the expression however you like.
For the expression \( k17xz33 \), you can rewrite it in a different order. For example:
1. Rearranging the factors could give you: \( 33z17kx \)
2. Another option could be: \( xk17z33 \)
3. Alternatively: \( 17xkz33 \)
Any rearrangement of the factors is acceptable as long as all the original factors are included. So, some possible rewritten forms could be:
- \( kxz1733 \)
- \( 17xk33z \)
- \( z33k17x \)
Feel free to choose any arrangement that suits your needs!
For the expression \( k17xz33 \), you can rewrite it in a different order. For example:
1. Rearranging the factors could give you: \( 33z17kx \)
2. Another option could be: \( xk17z33 \)
3. Alternatively: \( 17xkz33 \)
Any rearrangement of the factors is acceptable as long as all the original factors are included. So, some possible rewritten forms could be:
- \( kxz1733 \)
- \( 17xk33z \)
- \( z33k17x \)
Feel free to choose any arrangement that suits your needs!
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