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Question

Let f(x) be a polynomial function satisfying the following conditions
limxf(x)|x|3=0, limx(f(x)x)=1 and f(0)=0
(where, [.] denotes greatest integer function) then which of the following is/are correct?

A
The number of points of discontinuity of g(x)=[f(x)] in [0, 3] is 3
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B
The number of points of discontinuity of g(x)=[f(x)] in [0, 3] is 5
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C
The number of points of non-derivability of h(x)=f(|x|) is 4
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D
The number of points of non-derivability of h(x)=f(|x|) is 3
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Solution

The correct options are
B The number of points of discontinuity of g(x)=[f(x)] in [0, 3] is 5
D The number of points of non-derivability of h(x)=f(|x|) is 3
limx f(x)|x|3=0f(x) is linear or quadratic and f(0)=0
So f(x)=ax2+bx
limx (ax2+bxx)=limx (a1)x2+bxx(a+bx+1)=1limx (a1)x+b(a+bx+1)=1
a1=0 and ba+1=1b=2
So f(x)=x22x
g(x)=[x22x],x[0,3]


g(x)=[f(x)] has total 5 points of discontinuity.
h(x)=f(|x|)=|x|22|x|

h(x)=f(|x|) has total 3 points of non-derivability.

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