# Calculate the arclength, curve length of a cubic bezier curve. Why is not working?

I'm calculating the arclength (length of a cubic bezier curve) with this algorithm

``````    function getArcLength(path) {

var STEPS = 1000; // > precision
var t = 1 / STEPS;
var aX=0;
var aY=0;
var bX=0, bY=0;
var dX=0, dY=0;
var dS = 0;
var sumArc = 0;
var j = 0;

for (var i=0; i<STEPS; j = j + t) {
aX = bezierPoint(j, path[0], path[2], path[4], path[6]);
aY = bezierPoint(j, path[1], path[3], path[5], path[7]);
dX = aX - bX;
dY = aY - bY;
// deltaS. Pitagora
dS = Math.sqrt((dX * dX) + (dY * dY));
sumArc = sumArc + dS;
bX = aX;
bY = aY;
i++;
}

return sumArc;
}
``````

But what I get is something like 915. but the curve is 480 and no more. (I know for sure this because the curve is almost a line) The path array has this values: 498 51 500 52 500 53 500 530

The bezierPoint function is:

``````        function bezierPoint(t, o1, c1, c2, e1) {
var C1 = (e1 - (3.0 * c2) + (3.0 * c1) - o1);
var C2 = ((3.0 * c2) - (6.0 * c1) + (3.0 * o1));
var C3 = ((3.0 * c1) - (3.0 * o1));
var C4 = (o1);

return ((C1*t*t*t) + (C2*t*t) + (C3*t) + C4)
}
``````

What I'm doing wrong ?

-
Because `bX` and `bY` are initialized to 0, the first segment when i = 0 measures the distance from the origin to the start of the path. This adds an extra sqrt(498^2+51^2) to the length. If you initialize `bX = path[0]` and `bY = path[1]`, I think it will work.