Write an equivalent expression to (a⋅b)⋅c using the Associative Property of Multiplication.
By the Associative Property of Multiplication, we can group the factors differently without changing the value of the expression.
So, an equivalent expression to (a⋅b)⋅c using the Associative Property of Multiplication is a⋅(b⋅c).
According to the Associative Property of Multiplication, we can rearrange the grouping of factors without changing the result.
So, the equivalent expression to (a⋅b)⋅c using the Associative Property of Multiplication is a⋅(b⋅c).
The Associative Property of Multiplication states that the grouping of numbers being multiplied does not affect the result. It allows us to rearrange the order of multiplication without changing the outcome.
To write an equivalent expression to (a⋅b)⋅c using the Associative Property, we can rearrange the grouping. Instead of multiplying (a⋅b) first and then multiplying the result by c, we can group b and c together first and then multiply them by a.
So, an equivalent expression using the Associative Property of Multiplication would be a⋅(b⋅c).