I'm trying to find a solution to this symbolic non-linear vector equation:

```
P = a*(V0*t+P0) + b*(V1*t+P1) + (1-a-b)*(V2*t+P2) for a, b and t
```

where P, V0, V1, V2, P0, P1, P2 are known 3d vectors.

I attempted to do that in Matlab like this:

```
P = sym('P', [3,1])
P0 = sym('P0', [3,1])
P1 = sym('P1', [3,1])
P2 = sym('P2', [3,1])
V0 = sym('V0', [3,1])
V1 = sym('V1', [3,1])
V2 = sym('V2', [3,1])
syms a b t
F = a*(V0*t+P0) + b*(V1*t+P1) + (1-a-b)*(V2*t+P2) - P
solve(F,a,b,t)
```

I get

```
Warning: Explicit solution could not be found.
```

I'm starting to run out of ideas how to solve it, this isn't the first math package I tried.

The interesting bit is that this equation has a simple geometrical interpretation. If you imagine that points P0-P2 are vertices of a triangle, V0-V2 are roughly vertex normals and point P lies above the triangle, then the equation is satisfied for a triangle containing point P with it's three vertices on the three rays (V*t+P), sharing the same parameter t value. a, b and (1-a-b) become the barycentric coordinates of the point P.

So if the case is not degenerate, there should be only one well defined solution for t.