For f(x) = floor(x), does lim_{x->1} f(x) exist?

• A. Yes; the limit exists and equals 1.
• B. Yes; the limit exists and equals 0.
• C. No; the left-hand limit is 0 and the right-hand limit is 1, so the limit does not exist.
• D. No; both one-sided limits equal 0.

Answer: (C)

Think about how floor behaves near an integer. For numbers just below 1, floor(x) is 0, while for numbers just above 1, floor(x) is 1. So the left-hand limit as x approaches 1 is 0 and the right-hand limit is 1. Since these one-sided limits don’t agree, the two-sided limit does not exist. The function value at x = 1 is 1, but the limit concerns values as x approaches 1 from both sides, not the value at the point. This jump at integers explains why the limit fails to exist.