Which of the following is an equivalent expression to

To simplify the expression and generate only positive exponents, we can apply the properties of integer exponents.

First, let's simplify each term individually:

(2^-3 x 9^3) = (1/2^3 x 9^3) = 1/8 x 729 = 729/8

(2^9 x 9^-10) = (2^9 x 1/9^10) = 512/9^10

Now, let's substitute these simplifications back into the expression:

(729/8)^-4/512/9^10

Using the properties of exponents, when we raise a fraction to a negative power, we invert the fraction and make the exponent positive:

(8/729)^4/512/9^10

Now, let's simplify the expression inside the parentheses separately:

(8/729)^4 = 8^4/729^4 = 4096/531441
(512/9^10) = 512/9^10

Now, substitute these values back into the expression:

(4096/531441)/(512/9^10)

To divide fractions, we multiply by the reciprocal of the second fraction:

(4096/531441) x (9^10/512)

Now, let's simplify each term individually again:

(4096/531441) = 8/729
(9^10) = 3486784401
(512) = 2^9 = 512

Substitute these values back into the expression:

(8/729) x (3486784401/512)

To multiply fractions, we simply multiply the numerators together and the denominators together:

(8 x 3486784401)/(729 x 512)

Finally, simplify the result:

27894275208/373248 = 746496/1 = 746496

Therefore, the equivalent expression with only positive exponents is 746496.