The solution is algorithmically simple once you get the math behind that.
You need to implement the Extended Euclidean Algorithm and few more things.

Let `M = X - K`

, you want to check if `M = H F + K B`

for some integers `H, K`

.

The answer (is called Bezout's Identity) is that equation admits a solution if and only if `M`

is divisible by the GCD (greatest common divisor) of `F`

and `B`

, we call it `D`

.

Let suppose that a solution exists, then you can solve

`H F + K B = D`

.

Call `(H,K) = (S_H, S_K)`

any of its solution, for finding it use the Extended Euclidean Algorithm.

Then there exist infinite solutions `(T_H, T_K)`

, one for each integer `L`

, and these are all of the form

```
T_H = S_H + L B/D
T_K = S_K - L F/D
```

You are interested in the solution with minimum values of `|T_H| + |T_K|`

, this can again be computed theoretically, or with a simple for loop checking for the minimum, it is a piecewise linear functions which goes to infinite when `L`

is approaching +- infinite.

For the background math look for the Bezout's identity, it is full of material online.

EDIT: this seems to contain all you need http://public.csusm.edu/aitken_html/m422/Handout1.pdf