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TIFR-2011-Maths-A-25

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False ;

It is continuous at x=0 since |f(x0)-0|<a for all a , whenever |x-x0|<a.

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Suppose, f is conti. at x = 0

As "0" is rational number f(x)= f(0)= 0

For any rational number x there exist a seq. Of Irrational xn converges to x .

Here, f is conti. f(xn) converges to f(x)

But f(xn) never converges to 0 so f is nowher conti.

Ans. True
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