Asked by @fw.2trimm is my instagram if u want ta follow

To apply the properties of integer exponents and generate equivalent expressions with positive exponents, we can use the following rules:

1. For any nonzero number a, a^0 = 1.
2. For any nonzero number a, a^(-b) = 1/a^b.
3. For any nonzero number a, (a^b)/(a^c) = a^(b-c).

Using these rules, we can rewrite the expression 4^0 x 5^(-2)/(-2)^(-3) with positive exponents:

4^0 x 5^(-2)/(-2)^(-3) = 1 x 1/5^2 x (-1/2)^(-3)
= 1/5^2 x (-1/2)^(-3)

Next, we simplify the expression further using the negative exponent rule:

1/5^2 x (-1/2)^(-3) = 1/5^2 x (2/1)^3
= 1/5^2 x 2^3
= 1/25 x 8

Finally, we simplify the expression by multiplying 1/25 and 8:

1/25 x 8 = 8/25

Therefore, the simplified fraction with no remaining exponents is 8/25.

Apologies for the mistake. Let's reassess the problem.

Using the properties of integer exponents:

1. Any number raised to the power of 0 is equal to 1.
Therefore, 4^0 = 1.

2. When a number with a negative exponent is in the denominator, we can move it to the numerator and change the sign of the exponent.
Therefore, 5^(-2) = 1/5^2.

3. Similarly, for (-2)^(-3), we can rewrite it as 1/(-2)^3.

Applying these properties, the expression 4^0 x 5^(-2) / (-2)^(-3) can be rewritten as:

1 x (1/5^2) / (1/(-2)^3)
= 1 x (1/25) / (1/(-8))
= 1 x (1/25) x (-8/1)
= -8/25

Therefore, the simplified fraction with no remaining exponents is -8/25.