The number of pairs a , b of real numbers, such that whenever α is a root of the equation x 2 + a x + b = 0 , α 2 - 2 is also a root of this equation, is :

Question

TestHub · Accepted Answer

Consider the equation x 2 + a x + b = 0 It has two roots (not necessarily real α and β ) Either α = β or α ≠ β Case (1) If α = β , then it is repeated root. Given than α 2 - 2 is also root So, α = α 2 - 2 ⇒ α + 1 α - 2 = 0 ⇒ α = - 1 or α = 2 When α = - 1 then a , b = 2 , 1 α = 2 then a , b = - 4 , 4 Case (2) If α ≠ β , then four possibilities are there (I) α = α 2 - 2 and β = β 2 - 2 Here α , β = 2 , - 1 or - 1 , 2 Hence a , b = - α + β , α β = - 1 , - 2 (II) α = β 2 - 2 and β = α 2 - 2 Then α - β = β 2 - α 2 = β - α β + α Since α ≠ β we get α + β = β 2 + α 2 - 4 α + β = α + β 2 - 2 α β - 4 Thus - 1 = 1 - 2 α β - 4 which implies α β = - 1 . Therefore a , b = - α + β , α β = 1 , - 1 (III) α = α 2 - 2 = β 2 - 2 and α ≠ β ⇒ α = - β Thus α = 2 , β = - 2 α = - 1 , β = 1 Therefore a , b = 0 , - 4 and 0 , - 1 (IV) β = α 2 - 2 = β 2 - 2 and α ≠ β is same as (III) Therefore we get 6 pairs of a , b Which are 2 , 1 , - 4 , 4 , - 1 , - 2 , 1 , - 1 , 0 , - 4 , 0 , - 1

Mathematics - Quadratic Equation Question with Solution | TestHub

Options:

Doubts & Discussion