Calculating intersect point of 2 lat/lng line segments on earth

i've been trying multiple functions including 2D ones to try to get this somewhat working, but no luck yet...

I have 2 line segments of latlng endpoints on earth, and i want to know if and where the 2 lines intersect.

I'm currently working with this which a physics major says should be doing the job for a 2d plane but its not. it always returns true for intersect

[code]function intersectPoint(\$line1start, \$line1end, \$line2start, \$line2end) //(\$p0_x, \$p0_y, \$p1_x, \$p1_y, \$p2_x, \$p2_y, \$p3_x, \$p3_y) { \$p0_x = \$line1start['lat']; \$p0_y = \$line1start['lng']; \$p1_x = \$line1end['lat']; \$p1_y = \$line1end['lng']; \$p2_x = \$line2start['lat']; \$p2_y = \$line2start['lng']; \$p3_x = \$line1end['lat']; \$p3_y = \$line1end['lng'];

``````\$s1_x = (double) \$p1_x - (double) \$p0_x;
\$s1_y = (double) \$p1_y - (double) \$p0_y;
``````

// s1_x = p1_x - p0_x; // s1_y = p1_y - p0_y; \$s2_x = (double) \$p3_x - (double) \$p2_x; \$s2_y = (double) \$p3_y - (double) \$p2_y; \$s3_x = (double) \$p0_x - (double) \$p2_x; \$s3_y = (double) \$p0_y - (double) \$p2_y; // s2_x = p3_x - p2_x; // s2_y = p3_y - p2_y;

``````\$s = (double) ((double)(-\$s1_y * \$s3_x + \$s1_x * \$s3_y) / (double) (-\$s2_x * \$s1_y + \$s1_x * \$s2_y));
\$t = (double) ((double)( \$s2_x * \$s3_y - \$s2_y * \$s3_x) / (double) (-\$s2_x * \$s1_y + \$s1_x * \$s2_y));
``````

// s = (-s1_y * (p0_x - p2_x) + s1_x * (p0_y - p2_y)) / (-s2_x * s1_y + s1_x * s2_y); // t = ( s2_x * (p0_y - p2_y) - s2_y * (p0_x - p2_x)) / (-s2_x * s1_y + s1_x * s2_y);

``````if (\$s >= 0 && \$s <= 1 && \$t >= 0 && \$t <= 1)
{
AppCommUtility::echof(" FUNC RETURNED TRUE \$s >= 0 && \$s <= 1 && \$t >= 0 && \$t <= 1");
// Collision detected
return array(
'lat' => \$p0_x + (\$t * \$s1_x),
'lng' => \$p0_y + (\$t * \$s1_y)
);
}

return null; // No collision
``````

}[/code]

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