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Let \( f:[0,1]\to\mathbb{R} \) and \( g:[0,1]\to\mathbb{R} \) be defined as: \[ f(x)= \begin{cases} 1, & x \text{ rational}\\ 0, & x \text{ irrational} \end{cases} \quad g(x)= \begin{cases} 0, & x \text{ rational}\\ 1, & x \text{ irrational} \end{cases} \] Then:

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Dirichlet functions: Rational/irrational switching ⇒ nowhere continuous. Sum may become constant.

Updated On: Mar 3, 2026

\( f \) and \( g \) are continuous at \( x=\frac12 \).
\( f+g \) is continuous at \( x=\frac23 \) but \( f,g \) are discontinuous there.
\( f(x),g(x)>0 \) for some \( x\in(0,1) \).
\( f+g \) is not differentiable at \( x=\frac34 \).

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The Correct Option is B

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