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Let f Z rightarrow R be a function. Show that f is continuous.So.pdf

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Let f: Z rightarrow R be a function. Show that f is continuous. Solution The given function domain is only integers that means it is defined only for integers values so for every non integers value function is not defined,that means function is discountinous at every integer point. \"f\" can not be a continous function.

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Let f: Z rightarrow R be a function. Show that f is continuous. Solution The given function domain is only integers that means it is defined only for integers values so for every non integers value function is not defined,that means function is discountinous at every integer point. "f" can not be a continous function

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Let f Z rightarrow R be a function. Show that f is continuous.So.pdf

  • 1. Let f: Z rightarrow R be a function. Show that f is continuous. Solution The given function domain is only integers that means it is defined only for integers values so for every non integers value function is not defined,that means function is discountinous at every integer point. "f" can not be a continous function