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Question
If the sum of the roots of the quadratic equation ky2 – 11y + (k – 23) = 0 is `13/21` more than the product of the roots, then find the value of k.
Solution
Given, quadratic equation is ky2 – 11y + (k – 23) = 0
Let the roots of the above quadratic equation be α and β.
Now, Sum of roots, α + β = `(-(-11))/k = 11/k` ...(i)
and Product of roots, αβ = `(k - 23)/k` ...(ii)
According to the question,
α + β = αβ + `13/21`
∴ `11/k = (k - 23)/k + 13/21` ...[From equations (i) and (ii)]
⇒ `11/k - ((k - 23))/k = 13/21`
⇒ `(11 - k + 23)/k = 13/21`
⇒ 21(34 – k) = 13k
⇒ 714 – 21k = 13k
⇒ 714 = 13k + 21k
⇒ 34k = 714
⇒ k = `714/34`
⇒ k = 21
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