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Question

If a,b,c are the integral values of x (a<b<c) satisfying x2+10x16<x2, then which of the following statements is (are) FALSE?

A
The minimum value of |xa|+|xb|+|xc| is 2
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B
The quadratic equation whose roots are a and b is x215x+56=0
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C
2a+3b4c=0
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D
2b=a+c
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Solution

The correct option is C 2a+3b4c=0
x2+10x16<x2 is meaningful when
x2+10x160
x210x+160(x2)(x8)0x[2,8] (1)

Now, x2+10x16<x2
x2+10x16<(x2)22x214x+20>0x27x+10>0
(x2)(x5)>0
x(,2)(5,) (2)

From (1) and (2),
x(5,8]
a=6,b=7,c=8

The minimum value of |x6|+|x7|+|x8| occurs at x=median{6,7,8}
i.e., the minimum value of |x6|+|x7|+|x8| occurs at x=7 and the minimum value is 2.

The quadratic equation whose roots are a and b is,
x2(a+b)+ab=0x213x+42=0

Also, 2a+3b4c=12+2132=1
and 2b=14=a+c

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