(7^2)^2 in exponential simplest form if the base remains 7?
(7^2)^2 in exponential simplest form if the base remains 7 is 7^4.
To simplify the expression (7^2)^2 when the base remains 7, you need to multiply the exponents.
First, calculate the exponent of (7^2) by multiplying 2 by 2:
(7^2)^2 = 7^(2*2) = 7^4
Therefore, the expression (7^2)^2 in exponential simplest form, with the base remaining 7, is 7^4.
To simplify the expression (7^2)^2 while keeping the base as 7, let's break it down step by step.
Step 1: Start with the innermost expression, which is 7^2.
7^2 = 49
Step 2: Substitute the simplified value into the original expression.
(7^2)^2 = 49^2
Step 3: Evaluate the squared value.
49^2 = 2401
So, the exponential expression (7^2)^2 simplifies to 2401 when the base remains 7.