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Question

The number of integral value(s) of a for which the equation 2ax24ax2a1=0 has exactly one root between 1 and 2 is

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Solution

2ax24ax2a1=0
x22ax112a=0
Let f(x)=x22ax112a
For exactly one root between 1 and 2
f(1)f(2)<0
(12a112a)(422a112a)<0
Assuming 2a=t
(1)2(t+1t)(2t+1t3)<0(t2+1)(2t23t+1)t2<0(t2+1)(2t1)(t1)t2<012<t<112<2a<1
Taking log2 on both sides,
1<a<0

Checking boundary condition,
When a=0, we get
x2x2=0x=1,2

When a=1, we get
x22x4121=02x2x6=0(2x+3)(x2)=0x=32,2

Hence, a(1,0), so no integral value of a lies in this interval.

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