I think I would consider starting with 2 Collections, one to indicate the left hand side of the equation and one for the right hand side. The RHS would start with just one element, the entire formula. Then, start stripping off parentheses from the outside working in. And as each element becomes exposed, add it to the 2nd collection, making sure to inverse the operation. Then, as soon as you move the element you're searching for, start moving from the 2nd collection back to the first.
Since I really think this is homework, I don't want to give a code answer, but my above gibberish translates to "step through the arithmetic transformations". So, to expose C3:
(c5 - c6) = (((c1+c2)/c3)*c4)
(c5 - c6) = ((c1+c2)/c3)*c4
((c5 - c6) / c4) = ((c1+c2)/c3)
((c5 - c6) / c4) = (c1+c2)/c3
(c3* ((c5- c6) / c4) = (c1 + c2)
c3* (c5- c6) = (c1 + c2) * c4
c3 = (((c1 + c2) * c4) / (c5 - c6))
I'm not entirely certain where I went wrong that my final equation differs from yours, but I believe that is the approach I would take - step through each transformation until the variable you need is exposed.