Definition: A function is continuous at point B if and only if the limit of f(x) as x approaches B is equal to f(B).
These examples are pretty cool, but all use the same idea of a piecewise function based on the discontinuity of the rational numbers within the reals.
Is there another way to do it either non-piecewise or not using the rationals?
blackjack
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flooble's webmaster puzzle
Non-piecewise
