I am trying to solve

(2*(c^4)*2*(a^6))/(2*(a^10))
but the answer I am getting is 2c^4a^4.

Do you know if this is correct?

Answer is 2a^(-4)c^4

a^6/a^10 = a^(6-10) = a^-4

c^4/a^4 I believe is the answer

To solve the expression (2*(c^4)*2*(a^6))/(2*(a^10)), let's break it down step by step:

1. Simplify each part of the expression separately:
- 2*(c^4) simplifies to 2c^4.
- 2*(a^6) simplifies to 2a^6.
- 2*(a^10) simplifies to 2a^10.

2. Substitute the simplified expressions back into the original expression:
(2c^4 * 2a^6) / (2a^10)

3. Cancel out the common factors:
In this case, we can cancel out the factor of 2 from the numerator and the denominator:
(c^4 * a^6) / a^10

4. Simplify the remaining expression:
Since a^n / a^m = a^(n-m), we can simplify (a^6 / a^10) to a^(6-10) = a^(-4).

Therefore, the final result is:
c^4 * a^(-4) or 2c^4/a^4.

Hence, the answer you obtained, 2c^4/a^4, is correct.