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Question

The values of m for which both roots of the quadratic equation x2(m3)x+m=0; mR, are greater than 2 is

A
(10,)
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B
[9,10)
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C
[1,9]
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D
(7,9]
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Solution

The correct option is B [9,10)
Given: x2(m3)x+m=0; mR
On comparing with standard quadratic expression f(x)=ax2+bx+c, we have a=1,b=(m3),c=m.

Let, f(x)=x2(m3)x+m,
When both roots of f(x)=0 are greater than 2.


Condition :
(i) D0
(ii) b2a>2
(iii) f(2)>0

Now, on solving it,
(i) D0
(m3)24m0
m26m+94m0
m210m+90
(m1)(m9)0
m(,1][9,)

(ii) b2a>2
m32>2
m3>4m>7
m(7,)

(iii) f(2)>0
(2)2(m3)(2)+m>0
42m+6+m>0
m+10>0m<10
m(,10)

Now, taking intersection of both the condition,
m{{(,1][9,)}{(7,)}{(,10)}}
m[9,10)

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