Prove that if f: A to R is continuous at x=c, then for all (x_n) converging to c, it follows that f(x_n) converges to f(x).
Prove that if f: A to R is continuous at x=c, then for all (x_n) converging to c, it follows that f(x_n) converges to f(x).
Chapter6: Exponential And Logarithmic Functions
Section6.4: Graphs Of Logarithmic Functions
Problem 60SE: Prove the conjecture made in the previous exercise.
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Prove that if f: A to R is continuous at x=c, then for all (x_n) converging to c, it follows that f(x_n) converges to f(x).
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