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Question

If the equation (a2)(x[x])2+2(x[x])+a2=0,aR has no integral solution and has exactly one solution in [2,3), then a lies in the interval
(where [x] denotes the greatest integer function)

A
(1,2)
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B
(0,1)
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C
(1,0)
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D
(2,3)
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Solution

The correct option is C (1,0)
f(x)=(a2)(x[x])2+2(x[x])+a2=0
Let t=x[x]={x}
t[0,1)
(a2)t2+2t+a2=0

It is given that the given equation does not have any integer root.
So t0 ( xZ,x=[x]t=0)
t(0,1)

Case 1: a20
f(t)=(a2)t2+2t+a2=0
For f(x) to have exactly one root in [2,3), f(t) should have exactly one root in the interval (0,1).
f(0)f(1)<0
a2(a2+a)<0
a(1,0)

Case 2: a2=0
Then 2t+a2=0 which is not possible as LHS>0
a(1,0)

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