The number of pairs (a,b) of real numbers, such that whenever α is a root of the equation x2+ax+b=0,α2−2 is also a root of this equation, is
A
4
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B
6
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C
8
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D
2
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Solution
The correct option is B6 Let α,β be the roots of the quadratic equation.
Then, α=β2−2 and β=α2−2 ⇒(α2−2)2−2=α ⇒α4−4α2−α+2=0 ⇒(α+1)(α−2)(α2+α−1)=0 ⇒(α,β)=(−1,−1),(−1,1),(2,2),(2,−2),(−1,2) and (√5−12,−√5+12)
Hence there will be 6 possible values of (a,b).