Using the Power Rule of Exponents, what is the whole number exponent in an equivalent form of (2^7)^4? (1 point)
To find the whole number exponent in an equivalent form of (2^7)^4, we use the power rule of exponents which states that (a^b)^c = a^(b*c).
Therefore, (2^7)^4 = 2^(7*4) = 2^28.
The whole number exponent in this equivalent form is 28.
To find the whole number exponent in an equivalent form of (2^7)^4, we can use the Power Rule of Exponents, which states that when raising an exponent to another exponent, we multiply the exponents together.
In this case, we have (2^7)^4. To find the whole number exponent, we simply need to multiply the exponents 7 and 4.
So, (2^7)^4 = 2^(7 * 4) = 2^28.
Therefore, the whole number exponent in the equivalent form of (2^7)^4 is 28.
To find the whole number exponent in an equivalent form of (2^7)^4 using the Power Rule of Exponents, we need to multiply the exponents together.
First, we have the expression (2^7)^4. According to the Power Rule of Exponents, we can multiply the exponents to get a simplified form.
When we raise a power to another power, we multiply the exponents. In this case, the exponent 7 is raised to the exponent 4.
To find the whole number exponent, we simply multiply the exponents: 7 * 4 = 28.
Therefore, the whole number exponent in an equivalent form of (2^7)^4 is 28.