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Just pick a point, called z, in the complex plane;
Let z1 be z squared plus c;
z2 is z1 squared plus c;
z3 is z2 squared plus c;
And so on. If the series of z's will always stay
Close to z and never trend away,
That point is in the Mandelbrot set. Mandelbrot set!...
If I have to have this song stuck in my head, then by God, so do at least some of the rest of you.
Let z1 be z squared plus c;
z2 is z1 squared plus c;
z3 is z2 squared plus c;
And so on. If the series of z's will always stay
Close to z and never trend away,
That point is in the Mandelbrot set. Mandelbrot set!...
If I have to have this song stuck in my head, then by God, so do at least some of the rest of you.