# 1/4 of Newton's fractal is drawn only

I am facing a problem with drawing Newton's fractal for f(x) = x^3 - 1 using F# The problem is that my program seems to draw only the down right 1/4 of the fractal and nothing else. Since the actual drawn area is correct, I take it as the problem might be with the bitmap representation on the Form

Here's a link to the image I get https://i.stack.imgur.com/aeO23.jpg

The code I have come up with so far:

``````open System
open System.Drawing
open System.Windows.Forms
open System.Numerics

let pi = 3.14159265359
let MaxCount = 50
let multCol = 15
let Tol = 0.5
let r1 = Complex(1.0, 0.0)
let r2 = Complex(-0.5, sin(0.66*pi))
let r3 = Complex(-0.5, -sin(0.66 * pi))

let createImage () =
let image = new Bitmap (800, 800,System.Drawing.Imaging.PixelFormat.Format32bppPArgb)
let graphics = Graphics.FromImage(image)
let mutable maxMod = 0.0
for x = 0 to image.Width - 1 do
for y = 0 to image.Height - 1 do
let mutable z = Complex(float x , float y)
let mutable count = 0
while (count < MaxCount && Complex.Abs(z - r1) >= Tol && Complex.Abs(z - r2) >= Tol && Complex.Abs(z - r3) >= Tol) do
if(Complex.Abs(z) > 0.0) then
z <- z - (z*z*z - Complex(1.0,0.0))/(Complex(3.0,0.0) * z * z)
if(Complex.Abs(z) > maxMod) then
maxMod <- Complex.Abs(z)
count <- count + 1
let temp1 = Complex.Abs(z - r1)
let temp2 = Complex.Abs(z - r2)
let temp3 = Complex.Abs(z - r3)
if(Complex.Abs(z - r1) <= Tol) then
let Brush = new System.Drawing.SolidBrush(System.Drawing.Color.Red)
graphics.FillRectangle(Brush, new Rectangle(x,y,1,1))
if(Complex.Abs(z - r2) <= Tol) then
let Brush = new System.Drawing.SolidBrush(System.Drawing.Color.Blue)
graphics.FillRectangle(Brush, new Rectangle(x,y,1,1))
if(Complex.Abs(z - r3) <= Tol) then
let Brush = new System.Drawing.SolidBrush(System.Drawing.Color.Green)
graphics.FillRectangle(Brush, new Rectangle(x,y,1,1))
image.Save("redacted.png")

createImage()
``````

Can anyone give me a hint on what the problem might actually occur?

It actually looks like what you're seeing is the top right rather than the bottom right but it is flipped upside down. You can't tell because the right half of the fractal is symmetric about the x-axis.

The problem is that you are drawing according to the standard Cartesian plan with (+, +) to the upper right of the origin and forms are oriented with the origin at the top left with coordinates increasing to the right and down.

To correct it you'll need to transform the mathematical coordinates to the coordinates on the form like the following:

``````new Rectangle(x,y,1,1)
``````

becomes

``````new Rectangle(x - xmin,ymin - y,1,1)
``````

where `xmin` and `ymin` are the minimum extents of the area you are graphing. And notice the difference between the calculations for the x- and y-coordinates since the y-dimension also needs to be flipped.

• As I understood the form has (0,0) at the top left corner , is that correct? And do I need to do the calculations for transformation of coordinates on my own or is there a function that could do it for me ? May 7, 2018 at 13:22
• You are correct. (0, 0) is at the top left corner. You will also need to do the calculation to shift the coordinates yourself but I've updated my answer to show an example of what might be required. May 7, 2018 at 18:47