MHT CET · Maths · Continuity and Differentiability
If \(\mathrm{f}(\mathrm{x})=\frac{\mathrm{x}}{2}-1\), then on the interval \([0, \pi]\) where [.] represents greatest integer function
- A \(\tan [\mathrm{f}(\mathrm{x})]\) is continuous but \(\frac{1}{\mathrm{f}(\mathrm{x})}\) is not continuous.
- B \(\tan [\mathrm{f}(\mathrm{x})]\) and \(\frac{1}{\mathrm{f}(\mathrm{x})}\) are both continuous.
- C \(\tan [\mathrm{f}(\mathrm{x})]\) and \(\frac{1}{\mathrm{f}(\mathrm{x})}\) are both discontinuous.
- D \(\tan [\mathrm{f}(\mathrm{x})]\) is discontinuous and \(\frac{1}{\mathrm{f}(\mathrm{x})}\) is continuous.
Answer & Solution
Correct Answer
(C) \(\tan [\mathrm{f}(\mathrm{x})]\) and \(\frac{1}{\mathrm{f}(\mathrm{x})}\) are both discontinuous.
Step-by-step Solution
Detailed explanation
\(\tan [\mathrm{f}(\mathrm{x})]=\tan \left[\frac{\mathrm{x}}{2}-1\right]=\left\{\begin{array}{lll}\tan (-1), & \text { if } & 0 \leq \mathrm{x}<2 \\ \tan (0)=0, & \text { if } & 2 \leq \mathrm{x} \leq \pi\end{array}\right.\)
which is discontinuous at \(\mathrm{x}=2\)
\(\frac{1}{f(x)}=\frac{1}{\frac{x}{2}-1}\) which is discontinuous at \(x=2\)
which is discontinuous at \(\mathrm{x}=2\)
\(\frac{1}{f(x)}=\frac{1}{\frac{x}{2}-1}\) which is discontinuous at \(x=2\)
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