Squere root of 4x 4 power

Square root of four to the fourth? This'd be written as sqrt(4^4).

4^4 = 4 * 4 * 4 * 4.

Find the product of that, then the square root of the product.

Sorry, I meant square root of 4x to the fourth, unless you mean (four times four) to the fourth, which would be (4*4)^4 and would be solved differently.

4x^4 = 4x * 4x * 4x * 4x, then find the square root.

To find the square root of a number raised to a power, we can use the property of exponents which states that the square root of a number raised to a power is equal to that number raised to half of the power.

In this case, we have the expression (4x)^(4). To find the square root, we can rewrite it as (4x)^(4/2).

Now, (4x)^(4/2) simplifies to (4x)^2 since raising a number to the power of 1/2 is equivalent to taking its square root.

So, the square root of (4x)^(4) is (4x)^2.

Further simplifying (4x)^2, we can expand it as (4x) * (4x), which results in 16x^2.

Therefore, the square root of (4x)^(4) is 16x^2.