The key in understanding how to do this is to understand what the
coords = line is doing:
coords = (uleft + (x/size) * (xwidth),uleft - (y/size) * (ywidth))
y values you are looping through which correspond to the coordinates of the on-screen pixel are being translated to the corresponding point on the complex plane being looked at. This means that
(0,0) screen coordinate will translate to the upper left region being looked at
(1,0) will be the same, but moved 1/500 of the distance (assuming a 500 pixel width window) between the
That's exactly what that line is doing - I'll expand just the X-coordinate bit with more illustrative variable names to indicate this:
mandel_x = mandel_start_x + (screen_x / screen_width) * mandel_width
mandel_ variables refer to the coordinates on the complex plane, the
screen_ variables refer to the on-screen coordinates of the pixel being plotted.)
If you want then to take a region of the screen to zoom into, you want to do exactly the same: take the screen coordinates of the upper-left and lower-right region, translate them to the complex-plane coordinates, and make those the new uleft and lright variables. ie to zoom in on the box delimited by on-screen coordinates (x1,y1)..(x2,y2), use:
new_uleft = (uleft + (x1/size) * (xwidth), uleft - (y1/size) * (ywidth))
new_lright = (uleft + (x2/size) * (xwidth), uleft - (y2/size) * (ywidth))
(Obviously you'll need to recalculate the size, xwidth, ywidth and other dependent variables based on the new coordinates)
In case you're curious, the maths behind the mandelbrot set isn't that complicated (just complex).
All it is doing is taking a particular coordinate, treating it as a complex number, and then repeatedly squaring it and adding the original number to it.
For some numbers, doing this will cause the result diverge, constantly growing towards infinity as you repeat the process. For others, it will always stay below a certain level (eg. obviously (0.0, 0.0) never gets any bigger under this process. The mandelbrot set (the black region) is those coordinates which don't diverge. Its been shown that if any number gets above the square root of 5, it will diverge - your code is just using
2.0 as its approximation to
2.236), but this won't make much noticeable difference.
Usually the regions that diverge get plotted with the number of iterations of the process that it takes for them to exceed this value (the
trials variable in your code) which is what produces the coloured regions.