Solve the equation. Show all work.

To solve this equation, we need to find a common denominator and then combine the fractions.

Given equation: a/(a^2 - 25) + 2/(a + 5) = 2/(a - 5)

The common denominator is (a - 5)(a + 5) = a^2 - 25.

Rewrite the equation with the common denominator:

a/(a^2 - 25) + 2/(a + 5) = 2/(a - 5)
a/(a^2 - 25) + 2(a - 5)/(a - 5)(a + 5) = 2/(a - 5)

Now combine the fractions:

a/(a^2 - 25) + 2(a - 5)/(a^2 - 25) = 2/(a - 5)

a + 2(a - 5) = 2

Expand and simplify:

a + 2a - 10 = 2
3a - 10 = 2
3a = 12
a = 4

Therefore, the solution to the equation is a = 4.