So the problem is setup as so:
1 - 1 / ( 1 + a/[1-a])
which also reads as
1 - 1 / ( 1 + {a/[1-a]}) implying the denominator of 1-a does not apply to the first "1" within the parenthesis.
Ignoring the first term for a moment, let us focus on the second term
1
-------------------
1 + a /(1-a)
We dont like the denominator within the denominator here, so lets cancel it out by multiplying the whole denominator by 1-a. To make sure we are not changing the equation, we also must multiply the numerator by 1-a, in essence multiplying the whole term by (1-a)/(1-a) which is = to 1, hence not "changing" the problem.
1 (1-a)
-------------------
[1 + a /(1-a)] [1-a] (make sure to multiply the [1-a] to both the first and second term within the bracket
1-a
-----------
(1-a) + a
reduces to
1-a
-----
1-a+a=1
reduces to 1-a. Now, you can go ahead and plug back into the original equation
1 - 1 / ( 1 + a/[1-a]) where we have simplified the second term to (1-a) /1.
1 - (1-a)
Distribute the negative
1-1+a
0+a
a
