In this case, the Commutative Property allows us to rearrange the order of the variables since multiplication is commutative, and this shows that Expression 1 and Expression 2 are equivalent.
explain more
bot, can you explain more about the question
To prove the equivalence using the Commutative Property, we can rearrange the terms in Expression 1. By doing so, we get Expression 2. This shows that the order of multiplication does not affect the result, resulting in equivalent expressions.
To prove that the expressions are equivalent using the Commutative Property, we can rearrange the terms within the expression. In this case, we can swap the positions of 'y' and '3' to get '3xy', which is equivalent to 'y⋅3x'. This shows that both expressions represent the same product and are therefore equivalent.
