# How to perform Simple Zoom into Mandelbrot Set

I have a general question with the Mandelbrot set "zoom" view and the math pertaining to it. I have implemented the mandelbrot set for the 256 X 256 window size with values

``````  // ImageWidth = ImageHeight = 256;

double MinRe = -2.0;
double MaxRe = 1.0;
double MinIm = -1.2;
double MaxIm = 1.8;

ComputeMandelbrot();
``````

Next, I select a region of square and these are the coordinates for the upper left most tip (76,55), and rightmost bottom tip (116, 99) (square of side 44 is chosen)

so , I choose `x2 = x1 + 44 ; y2 = y1 + 44;`

How do I translate these new coordinates to the complex plane ? and how would the new real and imaginary values change in order to compute it for the new set of values ?

This is what I have tried so far..

``````double Re_factor = (MaxRe-MinRe)/(ImageWidth-1);
double Im_factor = (MaxIm-MinIm)/(ImageHeight-1);

double newMinRe = MinRe + (Re_factor* x1);
double newMaxRe = MaxRe + (Re_factor* x2);
double newMinIm = MinIm + (Im_factor* y1);
double newMaxIm = MaxIm + (Im_factor* y2);

// and then I compute c - real and c- imag values

for(unsigned y=0; y<ImageHeight; ++y)
{
double c_im = newMaxIm - y*Im_factor;
for(unsigned x=0; x<ImageWidth; ++x)
{
double c_re = newMinRe + x*Re_factor;

// ComputeMandelbrot();

}

}
``````

I am having a hard time figuring out the math, and also with regards to generating a 'zoom' view and any help is appreciated !!

-

It's a linear scaling. Let's doing it in 1D. You have the screen space (screen coordinates), and the image space (the complex plane, in your case)

• screen space => [0, 255]
• image space => [-2, 1]

So to convert a coordinate X from screen space to image space X'

X' = (X / 255) * (1 - (-2)) + (-2)

To make it more generic

• screen space => [SMin, SMax]
• image space => [IMin, IMax]

X' = ((X - SMin) / (SMax - SMin)) * (IMax - IMin) + IMin

``````double newMinRe = MinRe + (Re_factor* x1);
``````

which is equivalent to what I show. But then you do

``````double newMaxRe = MaxRe + (Re_factor* x2);
``````

which is not correct, and should be

``````double newMaxRe = MinRe + (Re_factor* x2);
``````

Same problem in your loop, it should be

``````for(unsigned y=0; y<ImageHeight; ++y)  {
double c_im = MinIm + y*Im_factor;
for(unsigned x=0; x<ImageWidth; ++x) {
double c_re = MinRe + x*Re_factor;
// ComputeMandelbrot();
}
}
``````

Additional detail for extra-goodness : to sample properly the image space , I suggest this

``````for(unsigned SX = SMin; x < SMax; ++x) {
double k = (double(SX + 0.5) - SMin) / (SMax - SMin);
double IX = (k * (IMax - IMin)) + IMin;
}
``````

The +0.5 term is to sample right in the middle of the pixel...

-
Whoops. Thats what I had tried before. Let me post more code... –  Legolas Dec 5 '11 at 6:49
Nope, you think you are doing that in your code, but in reality you do something else ^^ –  Monkey Dec 5 '11 at 6:59
I get it !! But it seems to be displaying a different region in the mandelbrot set with a different square size. :( Check more code. –  Legolas Dec 5 '11 at 7:17
You do the same error in your loop, look again... Also, sample in the middle of your pixel, not in the corner ^^ –  Monkey Dec 5 '11 at 7:28
The `Im_factor` and the `Re_factor` have to calculated again right ? for the new range ? –  Legolas Dec 5 '11 at 7:31