## Some geometry with Paint:

0. You have a corner:

1. You know the coordinates of corner points, let it be P_{1}, P_{2} and P:

2. Now you can get vectors from points and angle between vectors:

angle = atan(P_{Y} - P_{1Y}, P_{X} - P_{1X}) - atan(P_{Y} - P_{2Y}, P_{X} - P_{2X})

3. Get the length of segment between angular point and the points of intersection with the circle.

segment = PC_{1} = PC_{2} = radius / |tan(angle / 2)|

4. Here you need to check the length of segment and the minimal length from PP_{1} and PP_{2}:

Length of PP_{1}:

PP_{1} = sqrt((P_{X} - P_{1X})^{2} + (P_{Y} - P_{1Y})^{2})

Length of PP_{2}:

PP_{2} = sqrt((P_{X} - P_{2X})^{2} + (P_{Y} - P_{2Y})^{2})

If segment > PP_{1} or segment > PP_{2} then you need to decrease the radius:

min = Min(PP_{1}, PP_{2}) (for polygon is better to divide this value by 2)
segment > min ?
segment = min
radius = segment * |tan(angle / 2)|

5. Get the length of PO:

PO = sqrt(radius^{2} + segment^{2})

6. Get the C_{1X} and C_{1Y} by the proportion between the coordinates of the vector, length of vector and the length of the segment:

Proportion:

(P_{X} - C_{1X}) / (P_{X} - P_{1X}) = PC_{1} / PP_{1}

So:

C_{1X} = P_{X} - (P_{X} - P_{1X}) * PC_{1} / PP_{1}

The same for C_{1Y}:

C_{1Y} = P_{Y} - (P_{Y} - P_{1Y}) * PC_{1} / PP_{1}

7. Get the C_{2X} and C_{2Y} by the same way:

C_{2X} = P_{X} - (P_{X} - P_{2X}) * PC_{2} / PP_{2}
C_{2Y} = P_{Y} - (P_{Y} - P_{2Y}) * PC_{2} / PP_{2}

8. Now you can use the addition of vectors PC_{1} and PC_{2} to find the centre of circle by the same way by proportion:

(P_{X} - O_{X}) / (P_{X} - C_{X}) = PO / PC
(P_{Y} - O_{Y}) / (P_{Y} - C_{Y}) = PO / PC

Here:

C_{X} = C_{1X} + C_{2X} - P_{X}
C_{Y} = C_{1Y} + C_{2Y} - P_{Y}
PC = sqrt((P_{X} - C_{X})^{2} + (P_{Y} - C_{Y})^{2})

Let:

dx = P_{X} - C_{X} = P_{X} * 2 - C_{1X} - C_{2X}
dy = P_{Y} - C_{Y} = P_{Y} * 2 - C_{1Y} - C_{2Y}

So:

PC = sqrt(dx^{2} + dy^{2})
O_{X} = P_{X} - dx * PO / PC
O_{Y} = P_{Y} - dy * PO / PC

9. Here you can draw an arc. For this you need to get start angle and end angle of arc:

Found it here:

startAngle = atan((C_{1Y} - O_{Y}) / (C_{1X} - O_{X}))
endAngle = atan((C_{2Y} - O_{Y}) / (C_{2X} - O_{X}))

10. At last you need to get a sweep angle and make some checks for it:

```
sweepAngle = endAngle - startAngle
```

If sweepAngle < 0 then swap startAngle and endAngle, and invert sweepAngle:

```
sweepAngle < 0 ?
sweepAngle = - sweepAngle
startAngle = endAngle
```

Check if sweepAngle > 180 degrees:

```
sweepAngle > 180 ?
sweepAngle = 180 - sweepAngle
```

11. And now you can draw a rounded corner:

## Some geometry with c#:

```
private void DrawRoundedCorner(Graphics graphics, PointF angularPoint,
PointF p1, PointF p2, float radius)
{
//Vector 1
double dx1 = angularPoint.X - p1.X;
double dy1 = angularPoint.Y - p1.Y;
//Vector 2
double dx2 = angularPoint.X - p2.X;
double dy2 = angularPoint.Y - p2.Y;
//Angle between vector 1 and vector 2 divided by 2
double angle = (Math.Atan2(dy1, dx1) - Math.Atan2(dy2, dx2)) / 2;
// The length of segment between angular point and the
// points of intersection with the circle of a given radius
double tan = Math.Abs(Math.Tan(angle));
double segment = radius / tan;
//Check the segment
double length1 = GetLength(dx1, dy1);
double length2 = GetLength(dx2, dy2);
double length = Math.Min(length1, length2);
if (segment > length)
{
segment = length;
radius = (float)(length * tan);
}
// Points of intersection are calculated by the proportion between
// the coordinates of the vector, length of vector and the length of the segment.
var p1Cross = GetProportionPoint(angularPoint, segment, length1, dx1, dy1);
var p2Cross = GetProportionPoint(angularPoint, segment, length2, dx2, dy2);
// Calculation of the coordinates of the circle
// center by the addition of angular vectors.
double dx = angularPoint.X * 2 - p1Cross.X - p2Cross.X;
double dy = angularPoint.Y * 2 - p1Cross.Y - p2Cross.Y;
double L = GetLength(dx, dy);
double d = GetLength(segment, radius);
var circlePoint = GetProportionPoint(angularPoint, d, L, dx, dy);
//StartAngle and EndAngle of arc
var startAngle = Math.Atan2(p1Cross.Y - circlePoint.Y, p1Cross.X - circlePoint.X);
var endAngle = Math.Atan2(p2Cross.Y - circlePoint.Y, p2Cross.X - circlePoint.X);
//Sweep angle
var sweepAngle = endAngle - startAngle;
//Some additional checks
if (sweepAngle < 0)
{
startAngle = endAngle;
sweepAngle = -sweepAngle;
}
if (sweepAngle > Math.PI)
sweepAngle = Math.PI - sweepAngle;
//Draw result using graphics
var pen = new Pen(Color.Black);
graphics.Clear(Color.White);
graphics.SmoothingMode = SmoothingMode.AntiAlias;
graphics.DrawLine(pen, p1, p1Cross);
graphics.DrawLine(pen, p2, p2Cross);
var left = circlePoint.X - radius;
var top = circlePoint.Y - radius;
var diameter = 2 * radius;
var degreeFactor = 180 / Math.PI;
graphics.DrawArc(pen, left, top, diameter, diameter,
(float)(startAngle * degreeFactor),
(float)(sweepAngle * degreeFactor));
}
private double GetLength(double dx, double dy)
{
return Math.Sqrt(dx * dx + dy * dy);
}
private PointF GetProportionPoint(PointF point, double segment,
double length, double dx, double dy)
{
double factor = segment / length;
return new PointF((float)(point.X - dx * factor),
(float)(point.Y - dy * factor));
}
```

To get points of arc you can use this:

```
//One point for each degree. But in some cases it will be necessary
// to use more points. Just change a degreeFactor.
int pointsCount = (int)Math.Abs(sweepAngle * degreeFactor);
int sign = Math.Sign(sweepAngle);
PointF[] points = new PointF[pointsCount];
for (int i = 0; i < pointsCount; ++i)
{
var pointX =
(float)(circlePoint.X
+ Math.Cos(startAngle + sign * (double)i / degreeFactor)
* radius);
var pointY =
(float)(circlePoint.Y
+ Math.Sin(startAngle + sign * (double)i / degreeFactor)
* radius);
points[i] = new PointF(pointX, pointY);
}
```

`t=R/sin(a/2)`

, where`t`

is the distance from the center to the angle point,`a`

is the angle.