Location of Roots when Compared to two constants 'k1' & 'k2'
If the roots ...
Question
If the roots of x2−2x−a2+1=0 lie between the roots of x2−2(a+1)x+a(a−1)=0, then the range of a is
A
(1,∞)
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B
(−∞,0)
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C
(−14,1)
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D
(−∞,−14)
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Solution
The correct option is C(−14,1) x2−2x−a2+1=0⋯(i)
Let roots be α,β f(x)=x2−2(a+1)x+a(a−1)⋯(ii)
Let the roots of f(x)=0 be t1,t2
From Equation (i), x2−2x+1=a2 ⇒(x−1)2=a2 ⇒x=1±a
Assuming α=1−a,β=1+a
Now α,β lies in between the roots of the equation (ii),
Required conditions are (i)f(α)<0⇒f(1−a)<0 ⇒(1−a)2−2(1−a2)+a2−a<0 ⇒4a2−3a−1<0 ⇒(4a+1)(a−1)<0⇒a∈(−14,1) (ii)f(β)<0⇒f(1+a)<0 ⇒−3a−1<0 ⇒a>−13 ∴a∈(−14,1)