# How to convert a 2D line equation in General Form to a Slope-intercept Form, in C++

I have the equation of a 2D line in the General Form `a x + b y + c = 0` and I need to convert it to the proper Slope-intercept Form; with proper I mean I can choose between `y = m x + q` and `x = m y + q`.

My idea is to check if the line appears "more" horizontal or vertical and consequently choose one of the two Slope-intercept Form.

This is a sample code:

``````#include <iostream>
#include <cmath>

void abc2mq( double a, double b, double c, double& m, double& q, bool& x2y )
{
if ( fabs(b) >= fabs(a) ) {
x2y = true;
m = -a/b;
q = -c/b;
} else {
x2y = false;
m = -b/a;
q = -c/a;
}
}

void test(double a, double b, double c)
{
double m,q;
bool x2y;
abc2mq( a, b, c, m, q, x2y );
std::cout << a << " x + " << b << " y + " << c << " = 0\t";
if ( x2y ) {
std::cout << "y = " << m << " x + " << q << "\n";
} else {
std::cout << "x = " << m << " y + " << q << "\n";
}
}

int main(int argc, char* argv[])
{
test(0,0,0);
test(0,0,1);
test(0,1,0);
test(0,1,1);
test(1,0,0);
test(1,0,1);
test(1,1,0);
test(1,1,1);

return 0;
}
``````

And this is the output

``````0 x + 0 y + 0 = 0       y = -1.#IND x + -1.#IND
0 x + 0 y + 1 = 0       y = -1.#IND x + -1.#INF
0 x + 1 y + 0 = 0       y = -0 x + -0
0 x + 1 y + 1 = 0       y = -0 x + -1
1 x + 0 y + 0 = 0       x = -0 y + -0
1 x + 0 y + 1 = 0       x = -0 y + -1
1 x + 1 y + 0 = 0       y = -1 x + -0
1 x + 1 y + 1 = 0       y = -1 x + -1
``````

Any different or better idea? In particular, how can I handle the first two "degenerate" lines?

-
Why do you need to do this? –  Andreas Brinck Jun 27 '12 at 9:56
@AndreasBrinck I need to draw the lines and the legacy code for drawing a line can accept both the Slope-intercept Forms and so I need to choose the proper one. Unfortunately I can't change the legacy code. –  Alessandro Jacopson Jun 27 '12 at 10:01

You're almost done, just handle the degenerate case. Add the check for a and b to be non-zero.

``````if(fabs(a) > DBL_EPSILON && fabs(b) > DBL_EPSILON)
{
... non-degenerate line handling
} else
{
// both a and b are machine zeros
degenerate_line = true;
}
``````

``````void abc2mq( double a, double b, double c, double& m, double& q, bool& x2y, bool& degenerate_line)
{
if(fabs(a) > DBL_EPSILON && fabs(b) > DBL_EPSILON)
{
if ( fabs(b) >= fabs(a) ) {
x2y = true;
m = -a/b;
q = -c/b;
} else {
x2y = false;
m = -b/a;
q = -c/a;
}

degenerate_line = false;
} else
{
degenerate_line = true;
}
}
``````

And then check for the line to be empty set:

``````void test(double a, double b, double c)
{
double m,q;
bool x2y, degenerate;
abc2mq( a, b, c, m, q, x2y, degenerate );
std::cout << a << " x + " << b << " y + " << c << " = 0\t";
if(!degenerate)
{
if ( x2y ) {
std::cout << "y = " << m << " x + " << q << std::endl;
} else {
std::cout << "x = " << m << " y + " << q << std::endl;
}
} else
{
if(fabs(c) > DBL_EPSILON)
{
std::cout << "empty set" << std::endl
} else
{
std::cout << "entire plane" << std::endl
}
}
}
``````

If all you need is to draw the line, just use Thorsten's advice - use the rasterization algorithm instead.

-

If you are looking for a good way to draw these lines, I would recommend using Bresenham's algorithm instead of sampling the result of the slope-intercept form of your line equation. Apologies if this is not what you are trying to do.

-
+1, thank you for remembering me the Bresenham's line algorithm. –  Alessandro Jacopson Jun 27 '12 at 10:03

The equations corresponding to the two degenerated cases do not represent lines but the full plane (ℝ2) and the empty set (∅) respectively. The right thing to do is probably to discard them or to throw an error.

For the non degenerate cases, you are already handling them properly.

-
+1, thank you for the precisation. –  Alessandro Jacopson Jun 27 '12 at 12:01