(7x)(7x) write the expression without exponents
(7x)(7x) can be written as 49x².
To simplify the expression (7x)(7x) without using exponents, you can apply the distributive property.
The expression (7x)(7x) means that you multiply every term in the first set of parentheses by every term in the second set of parentheses.
Let's break it down step by step:
(7x) * (7x)
= 7x * 7x (Using the commutative property of multiplication)
= (7 * 7) * (x * x) (Applying the distributive property)
= 49 * x * x (Simplifying 7 * 7 to 49)
= 49x^2
Therefore, the expression (7x)(7x) is equivalent to 49x^2.
To write the expression (7x)(7x) without exponents, you can simply multiply 7x and 7x together by using the distributive property.
First, you multiply the coefficients: 7 * 7 = 49.
Next, you multiply the variables: x * x = x^2.
Finally, you combine the product of the coefficients and the product of the variables to get the simplified expression: 49x^2.
So, the expression (7x)(7x) without exponents is 49x^2.