Notice that, if the points fit the equation perfectly, then you only need four data to determine the parameters and not "thousand". The remaining points either fit the equations (hence are redundant) or cannot be made to fit the equation (i.e. your problem is impossible)
If instead the fit that you're looking for is not necessarily perfect and what you need is to find the parameters a,b,c,d that are the optimal fit (i.e. minimize square errors), then what you need is a linear regression.
Please notice that each of the equations that define one of your datapoint can be written in the form
Ax = B
where A are row-vectors of 4 values and x is a column-vector of 4 values.
For this reason,
- the vector A summarizes the info that in your writing is carried by the tuple (a, b, c, d)
- the vector x summarizes the info that in your writing is carried by the tuple (w, x, y, z).
- B is, then, a scalar.
At this point you may google for "linear regression" and apply the knowledge. :)
There are several software packages to do this, like matlab, octave, but probably even Excel can do it. :)