Location of Roots when Compared to two constants 'k1' & 'k2'
If a, b, c ar...
Question
If a,b,c are rational number (a>b>c>0) and quadratic equation (a+b−2c)x2+(b+c−2a)x+(c+a−2b)=0 has a root in the interval (−1,0), then which of the following statement(s) is/are correct?
A
a+c<2b
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B
Both roots are rational
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C
cx2+2bx+a=0 has both roots negative
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D
ax2+2bx+c=0 has both roots negative
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Solution
The correct option is Dax2+2bx+c=0 has both roots negative The given equation has one root as 1. 1.α=c+a−2ba+b−2c
So, the other root is x=c+a−2ba+b−2c
As c+a−2ba+b−2c<0⇒a+c<2b
For equation ax2+2bx+c=0 f(0)=c>0,−2ba<0
So both roots negative
Similarly option (D) is true