If α, β are the zeros of polynomial f(x) = x2 – p (x + 1) – c, then (α + 1) (β + 1) =

Given,f(x) = x2 – p (x + 1) – cα and β are the zerosSo,f(x) = x2 – p (x + 1) – c= x2 – px – (p + c)As(α + 1)(β + 1) = αβ + α + β + 1= – p – c + p + 1= 1 – c

Q6 of 109 Page 3

If α, β are the zeros of polynomial f(x) = x² – p (x + 1) – c, then (α + 1) (β + 1) =

Given,

f(x) = x² – p (x + 1) – c

α and β are the zeros

So,

f(x) = x² – p (x + 1) – c

= x² – px – (p + c)

(α + 1)(β + 1) = αβ + α + β + 1

= – p – c + p + 1

= 1 – c

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