Rewrite the expression ^2�ã�ã(64x^2)in the form of nx^r

Where n=?
Where r=?

To rewrite the expression ^2�ã�ã(64x^2) in the form of nx^r, we need to simplify the expression and identify the values of n and r.

Let's begin by simplifying the expression.

Step 1: Apply the exponent ^2 to each term within the parentheses.
(64x^2)^2

Step 2: Expand the expression by multiplying the exponents.
64^2 * (x^2)^2 = 4096x^4

Now, the expression (64x^2)^2 has been simplified to 4096x^4.

To identify the values of n and r, we can examine the simplified expression.

n = 4096
r = 4

So, in the form of nx^r, the expression ^2�ã�ã(64x^2) can be written as 4096x^4, where n = 4096 and r = 4.