Advertisements
Advertisements
Question
α, β are zeroes of the polynomial 3x2 – 8x + k. Find the value of k, if `α^2 + β^2 = 40/9`.
Sum
Advertisements
Solution
3x2 – 8x + k
Roots are α and β.
`α + β = (-b)/a`
= `-((-8))/3`
= `8/3`
`αβ = c/a`
= `k/3`
Now α2 + β2 = (α + β)2 – 2αβ
= `(8/3)^2 - (2k)/3`
Given, `α^2 + β^2 = 40/9`
`40/9 = 64/9 - (2k)/3`
`40/9 - 64/9 = (-2k)/3`
`(-24)/9 = - (-2k)/3`
k = `(24 xx 3)/(2 xx 9)`
k = 4
shaalaa.com
Is there an error in this question or solution?
