Apply the Associative Property of Multiplication to rewrite the expression p⋅(q⋅r)
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Using the Associative Property of Multiplication, we can rewrite the expression p⋅(q⋅r) as (p⋅q)⋅r.
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The associative property of multiplication states that the grouping of factors in a multiplication expression does not affect the result.
Using the associative property of multiplication, we can rewrite the expression p⋅(q⋅r) as (p⋅q)⋅r.
To apply the Associative Property of Multiplication to rewrite the expression p⋅(q⋅r), we can rearrange the grouping of the factors.
The Associative Property of Multiplication states that for any three numbers a, b, and c, the product of a with the product of b and c will be the same as the product of b with the product of a and c. In other words:
a⋅(b⋅c) = (a⋅b)⋅c
So, applying this property to our expression, we can rewrite it as:
p⋅(q⋅r) = (p⋅q)⋅r
Now, we have changed the grouping of the factors, but the overall product remains the same.