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प्रश्न
If α, β are the zeroes of the quadratic polynomial px2 + qx + r, then find the value of α3β + β3α.
योग
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उत्तर
Given:
Quadratic polynomial px2 + qx + r
α, β are the zeroes of the polynomial.
From the relationship between zeroes and coefficients:
Sum of zeroes `(α + β) = - q/p`
Product of zeroes `(αβ) = r/p`
To find: α3β + β3α
Taking αβ common:
α3β + β3α = αβ(α2 + β2)
Using the identity α2 + β2 = (α + β)2 – 2αβ:
= αβ[(α + β)2 – 2αβ]
Substituting the values of (α + β) and αβ:
= `r/p [(-q/p)^2 - 2(r/p)]`
= `r/p [q^2/p^2 - (2r)/p]`
= `r/p [(q^2 - 2pr)/p^2]`
= `(r(q^2 - 2pr))/p^3`
Therefore, `α^3β + β^3α = (r(q^2 - 2pr))/p^3`.
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