Name a function with a domain of all real numbers that is continuous only at a single point.

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).

(In reply to Non-piecewise by Jer)

I don't understand what you mean by "piecewise." The function Kereki gives is F(x)=Id(x)*D(x) where Id(x)=x ("identity function")and D(x)=0 if x is rational, 1 if x is irrational ("Dirichlet function"). Usually a "piecewise" function has different analytic definitions on different intervals, but no intervals are involved in Kereki's function. So Kereki's function fulfills your requirement of being non-piecewise, in my book, anyway. A function not using the rationals can be designed along similar lines -- the rationals can be replaced by other sets that are dense in the real numbers (such sets do exist).

Posted by Richard on 2005-12-15 14:57:49