See this first: Postfix notation to expression tree to convert your RPN into a tree.

Once you have the equation `left expression = right expression`

change this to `left expression - right expression = 0`

and create a tree of `left expression - right expression`

via Shunting Yard and the above answer. Thus when you evaluate the tree, you must get the answer as 0.

Now based on your restrictions, observe that if a variable (say x) is unknown, the resulting expression will always be of the form

`(ax + b)/(cx + d)`

where a,b,c,d will depend on the other variables.

You can now recursively compute the expression as a tuple (a,b,c,d).

In the end, you will end up solving the linear equation

`(ax + b)/(cx + d) = 0`

giving `x = -b/a`

This way you don't have to compute separate expressions for each variable. One expression tree is enough. And given the other variables, you just recursively compute the tuple (a,b,c,d) and solve the linear equation in the end.

The (incomplete) pseudocode will be

```
TupleOrValue Eval (Tree t) {
if (!t.ContainsVariable) {
blah;
return value;
}
Tuple result;
if (t.Left.ContainsVariable) {
result = Eval(t.Left);
value = Eval(t.Right);
return Compose(t.Operator, result, value);
} else {
result = Eval(t.Right);
value = Eval(t.Left);
return Compose(t.Operator, result, value);
}
}
Tuple Compose(Operator op, Tuple t, Value v) {
switch (op) {
case 'PLUS': return new Tuple(t.a + v*t.c, t.b + v*t.d, t.c, t.d);
// (ax+b)/(cx+d) + v = ( (a + vc)x + b + dv)/(cx + d)
// blah
}
}
```

For an example, if the expression is `x+y-z = 0`

. The tree will be

```
+
/ \
x -
/ \
y z
```

For y=5 and z=2.

Eval (t.Right) will return y-z = 3 as that subtree does not contain x.

Eval(t.Left) will return `(1,0,0,1)`

which corresponds to `(1x + 0)/(0x + 1)`

. Note: the above pseudo-code is incomplete.

Now Compose of (1,0,0,1) with the value 3 will give `(1 + 3*0, 0 + 3*1, 0, 1) = (1,3,0,1)`

which corresponds to `(x + 3)/(0x + 1)`

.

Now if you want to solve this you take x to be `-b/a = -3/1 = -3`

I will leave the original answer:

In general it will be impossible.

For instance consider the expression

`x*x*x*x*x + a*x*x*x*x + b*x*x*x + c*x*x + d*x = e`

Getting an expression for `x`

basically corresponds to find the roots of the polynomial

x^{5} + ax^{4} + bx^{3} + cx^{2} + dx -e

which has been proven to be impossible in general, if you want to use +,-,/,* and nth roots. See Abel Ruffini Theorem.

Are there are some restrictions you forgot to mention, which might simplify the problem?