# Modify a formula from calculating around a circle to around an oval?

I have this formula in a function below. It's a fairly simple concept, yet this formula took me almost 2 weeks to get perfect. What it does is calculates what point to place an object at a given degree around and distance from a central point. It's useful for manually drawing circles, and also I primarily use it for a needle gauge component of mine. It calculates where to draw the needle.

Now I'm trying to figure out how to modify this formula to take ovals or ellipses into account. I did think of the idea of drawing a component a round shape first, and then stretching it after everything's drawn, but this is not a clean solution, as the drawing which I'm doing will already be in the shape of an oval.

I need to add just one parameter to this function to tell it the ratio between the width/height so it knows how to off-set this point. By default, this parameter should be 1, meaning Width=Height, meaning no ovalish drawing or offset. But suppose I put 2, which means width is twice the size of the height, or 1.5 would mean the width is 1.5 times the height.

Here's the original function:

``````function NewPosition(Center: TPoint; Distance: Integer; Degrees: Single): TPoint;
var
begin
//Convert angle from degrees to radians; Subtract 135 to bring position to 0 Degrees
Radians:= (Degrees - 135) * Pi / 180;
end;
``````

Here it is with the added parameter I need:

``````function NewPosition(Center: TPoint; Distance: Integer; Degrees: Single;
OvalOffset: Single = 1): TPoint;
var
begin
//Convert angle from degrees to radians; Subtract 135 to bring position to 0 Degrees
Radians:= (Degrees - 135) * Pi / 180;
end;
``````

DEFINITIONS:

• Center = Central point where to base calculations from (center of ellipse)
• Distance = How far from Center in any direction, regardless of Degrees
• Degrees = How many degrees around central point, starting from up-right
• OvalOffset = Ratio of difference between Width and Height

-
Are the ellipse axes of symmetry horizontal and vertical? –  David Heffernan Dec 8 '11 at 15:47
Yes, I don't care about rotation of the oval, just width differing from height. –  Jerry Dodge Dec 8 '11 at 15:54
Just to clarify: the result from NewPosition shall have the given Distance from the center and be on the angle given by Degrees? At least that is what I read from your DEFINITIONS. –  Uwe Raabe Dec 8 '11 at 16:35
Exactly. I already have this working, no more help needed, unless you want to do something even fancier with it? Such as, add ability to rotate this oval to a certain degree? Not important though, thanks. –  Jerry Dodge Dec 8 '11 at 16:37
In that case your question is somewhat unclear. Given a fixed distance and varying degrees to the function, most of the resulting points will have a different distance to the center as specified. For an elliptic curve the values for Distance and Degree usually don't match the measured distance and degree of each point. –  Uwe Raabe Dec 8 '11 at 16:47

Add a division by `OvalOffset` to just the `Result.Y` formula...
``````Result.Y:= Trunc((Distance*Sin(Radians)+Distance*Cos(Radians))/OvalOffset)
Perhaps I got it wrong, but with your code won't the distance between `Result` and `Center` be different to the given value `Distance`? –  Uwe Raabe Dec 8 '11 at 16:13