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Question

If P={xN:14xx+1(9x30x4)0},
Q={xZ:|x1|5 and |x1|2}
and R={xR:log6x+2log6x}=3, then which of the following options is (are) CORRECT?

A
n(PQR)=10
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B
n(PQR)=1
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C
n(PQR)=1
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D
n(PQR)=1
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Solution

The correct option is D n(PQR)=1
For set P
14xx+1(9x30x4)0
For the inequality to be defined, x1,4
(14x256x)(9x221x30)(x+1)(x4)0
5x235x+30(x+1)(x4)0
5(x1)(x6)(x+1)(x4)0
x(1,1](4,6]
Since xN,P={1,5,6}

For set Q
|x1|5 and |x1|2
2|x1|5
5x12 or 2x15
4x1 or 3x6
x[4,1][3,6]
Since xZ,Q={4,3,2,1,3,4,5,6}

For set R
Clearly, x>0 and x1
log6x+2log6x=3
(log6x)23log6x+2=0
(log6x1)(log6x2)=0
log6x=1 or log6x=2
x=6,36
R={6,36}

PQR={1,5,6,4,3,2,1,3,4,36}
PQR={6}
PQ={1}, PQR={1}
PQ={5,6}, PQR={5}

So, n(PQR)=10
n(PQR)=1
n(PQR)=1
n(PQR)=1

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