# How to find a middle point of a beizer curve?

I want to make a 'named' bezier curve. I want it to be one-word named so I don't have to worry about word-wrap.

I make bezier curve via P5 `bezier(sx,sy,c1x,c1y,c2x,c2y,ex,ey)` function and I want a string to be shown in the middle of bezier curve. But I don't know how to find 'the middle' of curve.

For now my result looks like this (I don't know where to start picking up this problem, so I went with the easier way of just printing text on a start of curve):

But I want it to look like this:

This means that I need P1 and P2 coordinates:

Sorry for paint, but I don't have my code yet. As soon as I will have my hands on it I will add it here.

Here is code that draws a curve:

``````let
b = dest.inTriangle.middle, // destination triangle
g = this.outTriangle.p3,    // tip of out triangle
c = {x:b.x-g.x,y:b.y-g.y},  // distance between objects
r1 = {},                    // bezier point 1
r2 = {};                    // bezier point 2
if(c.x > 0){
// b is on left
r1 = {
x: g.x + c.x/2,
y: g.y
};
r2 = {
x: b.x - c.x/2,
y: b.y
};
}
else {
// b is on right
r1 = {
x: g.x - c.x/2,
y: g.y + c.y
};
r2 = {
x: b.x + c.x/2,
y: b.y - c.y
};
}
noFill();
stroke(0);
bezier(
g.x, g.y,
r1.x, r1.y,
r2.x, r2.y,
b.x, b.y
);
noStroke();
fill(0);
text(this.name, g.x, (g.y-this.h/2))
``````
• Will the curves always be symmetrical? or at least almost symmetrical? Commented Jan 16, 2019 at 12:11
• Because I use symmetrical c1 and c2 I think, that curve will be always symmetrical. Commented Jan 16, 2019 at 12:14
• If always symmetrical, then point at 1/2 will be the middle. If not, there is no simple way to compute the "middle" point, alas. Commented Jan 16, 2019 at 12:26
• Yes! I didn't think about it. I am kind of new to curves and it crushed me at first. Sorry Commented Jan 16, 2019 at 12:31

You can use the `bezierPoint()` function that comes with P5.js.

From the reference:

``````noFill();
var x1 = 85,
x2 = 10,
x3 = 90,
x4 = 15;
var y1 = 20,
y2 = 10,
y3 = 90,
y4 = 80;
bezier(x1, y1, x2, y2, x3, y3, x4, y4);
fill(255);
var steps = 10;
for (var i = 0; i <= steps; i++) {
var t = i / steps;
var x = bezierPoint(x1, x2, x3, x4, t);
var y = bezierPoint(y1, y2, y3, y4, t);
ellipse(x, y, 5, 5);
}
``````

You'd probably want to use a value of `0.5` for `t` to get the midpoint.

• Thanks! I wasn't sure if this exist. Now I know it does! I checked reference twice, but I think I'm blind or something. :) Thanks for help. Commented Jan 16, 2019 at 20:28

The formula to translate the 4 points in a function over time is the following (image from wikipedia):

Since you want the middle, and `t` ranges from 0 to 1, you just have to set `t = 1/2`

So

B(1/2) = 1/8 P0 + 3/8 P1 + 3/8 P2 + 1/8 P3

• When a curve is given by a nonlinear parameterization (with `t` ranging over `[0,1]`), the point which is midpoint in arc length will typically not be the point which occurs at `t = 1/2`. I think that your answer is fallacious. On the other hand, this might be a reasonable heuristic for OP's problem, so I think that it has some merit. Commented Jan 16, 2019 at 12:05
• @JohnColeman That's true, but I supposed that the user just wanted all the labels to be on the same column, and maybe animate the position over time like many cubic-bezier generators do. In this scenario, the x-coordinate is known and the y-coordinate can be found with that formula. If he wants the exact middle of the curve, the problem isn't so trivial but I think it's still analytically solvable Commented Jan 16, 2019 at 13:23
• Since OP seems to have something symmetric in mind, this should work, so (+1). Even in the nonsymmetric case, it could be a reasonable approach if all you want to do is position text (which doesn't require mathematical precision). Commented Jan 16, 2019 at 13:58