If is a continuous function and the , and , where denotes the greatest integer function, is continuous , then the least positive integral value of is |

If is a continuous function and the , and , where denotes the greatest integer function, is continuous , then the least positive integral value of is |

1 Answer

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is continuous if for for which we must have Hence the least value of is 6 |

Number of points where is discontinuous is (where denotes the greatest integer function) |

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