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this is the last part of my a bit more complex homework which I can't figure out myself.

Basically it's a tangent function, drawn to SVG using C.

This is how I'm drawing it:

enter image description here

and this is how it should look like:

enter image description here

it's pretty much the same except I'm drawing even those lines where tangent isn't defined.. How do I get rid of that? I'm actually generating that tangent using a simple for cycle, and I understand by changing Lineto to Moveto I will get rid of those line, but how to determine a formula which will be usable for any height/width and any (-x,x) (-y,y). Any thoughts?

Source codes: link to my drawing | link to original drawing

edit: structure

typedef struct svg_graph{
    int w;
    int h;
    int x;
    int y;
} graph;

and the code itself:

double initializer = 0;
double m = 0;
double temp = 0;

initializer = svg->h/2 - tan(-svg->x)*(((double)svg->h/2)/svg->y);
fprintf(output, "<path clip-path=\"url(#myClip)\" d=\"M 0 %.1f", initializer)
temp = ((double)svg->x/(svg->w/2));
m = svg->h/2 - tan(-svg->x+temp)*((double)(svg->h/2)/svg->y);
for (int i = 1; i<=svg->w; i++){

      fprintf(output, " L %d %.1f", i, m);

      temp = ((double)svg->x/(svg->w/2)) + temp;
      m = svg->h/2 - tan(-svg->x+temp)*((double)(svg->h/2)/svg->y);
share|improve this question
Can we see your code that you use to generate this? I'm not hugely au fait with this stuff, but I should think (since you know the points at which the graph will go from +inf to -inf) it should be easy to know when to do a Moveto. – halfer Jun 10 '12 at 21:56
@halfer: edited the first post and added the desired piece of code :) – Markus Jun 10 '12 at 23:54
up vote 0 down vote accepted

If the derivative is non-finite then you need a move rather than a line.

share|improve this answer
you mean derivative of tangent? or of those coordinates? Not sure if I caught on your idea. – Markus Jun 10 '12 at 14:13
if the co-ordinates are x, y then dy/dx is the derivative: – Robert Longson Jun 10 '12 at 17:53
all right, got it now.. thank you – Markus Jun 11 '12 at 12:17

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