So I have a function that takes four numerical arguments and produces a numerical argument.

```
f(w,x,y,z) --> A
```

If I have the function `f`

and a target result `A`

, is there an iterative method for discovering parameters `w,x,y,z`

that produce a given number `A`

?

If it helps, my function `f`

is a quintic bezier where most of the parameters are determined. I have isolated just these four that are required to fit the value `A`

.

```
Q(t)=R(1−t)^5+5S(1−t)^4*t+10T(1−t)^3*t^2+10U(1−t)^2*t^3+5V(1−t)t^4+Wt^5
```

`R,S,T,U,V,W`

are vectors where `R`

and `W`

are known, I have isolated only a single element in each of `S,T,U,V`

that vary as parameters.

`(w,x,y,z)`

– Drew McGowen Aug 1 '13 at 18:56`SciPy`

, or just at black-box search algorithms (BBSAs) in general. They solve a superset of your problem, but they should work. – Ryan Marcus Aug 1 '13 at 19:13