Let \( f : [0, 1] \to {R} \) be a function. Which one of the following is a sufficient condition for \( f \) to be Lebesgue measurable?
Show Hint
- \( |f| \) is a Lebesgue measurable function
- There exist continuous functions \( g, h : [0, 1] \to {R} \) such that \( g \leq f \leq h \) on \( [0, 1] \)
- \( f \) is continuous almost everywhere on \( [0, 1] \)
- For each \( c \in {R} \), the set \( \{ x \in [0, 1] : f(x) = c \} \) is Lebesgue measurable
The Correct Option is C
Solution and Explanation
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