Which expression is correctly developed to use the power rule of exponents(

The expression that is correctly developed to use the power rule of exponents is:

(7^(8)) . (7^(10)) = 7^(8+10) = 7^(18)

which of the following correctly used the power rule of exponents in the expressions (10^(9))(7)

90^(7)

10^(63)

10^(16)

10^(2)

The expression that correctly uses the power rule of exponents is:

(10^(9))(7) = 10^(9+1) = 10^(10)

if the expression 4^(10) was simplified using the power rule of exponents what is an equivalent expanded expression

The equivalent expanded expression, when simplifying 4^(10) using the power rule of exponents, would be:

4^(10) = 4 * 4 * 4 * 4 * 4 * 4 * 4 * 4 * 4 * 4

Use the power rule of exponents to create an expression equivalent to ((15^(6))(2)

Using the power rule of exponents, the equivalent expression to ((15^(6))(2)) can be written as:

(15^(6))(2) = 15^(6+1) = 15^(7)

what exponent would make the two expressions equivalent ((3^(9))(x) = (3^(24)

To make the two expressions ((3^(9))(x) and (3^(24)) equivalent, the value of x would need to be:

x = 3^(24-9) = 3^15