# Why does my perspective trasform come out affine?

I am trying to transform a unit square to an arbitrary quad. Here is the code that gives me the perspective transformation matrix:

``````bool Math::GetProjectiveMapping(const FPoint& p0, const FPoint& p1,
const FPoint& p2, const FPoint& p3,
Matrix33& m)
{
/*  This function maps a unit square onto a quadrilateral
specified by the four points p0-p3.  */

/*
Calculate the projective mapping

p0      p3
┌────┐            | a b c |
│    │        M = | d e f |
└────┘            | g h i |
p1      p2
*/

double Σx = p0.X - p1.X + p2.X - p3.X;
double Σy = p0.Y - p1.Y + p2.Y - p3.Y;

double a, b, c, d, e, f, g, h, i = 1;

if (Σx == 0 && Σy == 0) // affine
{
a = p1.X - p0.X;
b = p2.X - p1.X;
c = p0.X;
d = p1.Y - p0.Y;
e = p2.Y - p1.Y;
f = p0.Y;
g = 0;
h = 0;
}
else // perspective
{
double Δx1 = p1.X - p2.X;
double Δx2 = p3.X - p2.X;
double Δy1 = p1.Y - p2.Y;
double Δy2 = p3.Y - p2.Y;

double del = Δx1 * Δy2 - Δy1 * Δx2;

if (del == 0)
return false;

g = (Σx * Δy2 - Σy * Δx2) / del;
h = (Δx1 * Σy - Δy1 * Σx) / del;

a = p1.X - p0.X + g * p1.X;
b = p3.X - p0.X + h * p3.X;
c = p0.X;
d = p1.Y - p0.Y + g * p1.Y;
e = p3.Y - p0.Y + h * p3.Y;
f = p0.Y;
}

m = Matrix33(
a, b, c,
d, e, f,
g, h, i);

return true;
}
``````

But when I go to transform the square, the results come out affine (the orange is where it should be):

What's going on?

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