Answer:
The values of k are 2/3 and -1
Step-by-step explanation:
Product of zeros = αβ= constant / coefficient of x^2 = 4/k
Sum of zeros =α+β = - coefficient of x / coefficient of x^2= -4/k
Given
[tex](\alpha)^2 + (\beta)^2 = 24[/tex]
[tex](\alpha)^2 + (\beta)^2[/tex] can be written as [tex](\alpha)^2 + 2(\alpha)(\beta) + (\beta)^2[/tex] if we add [tex] \pm 2 (\alpha)(\beta)[/tex] in the above equation.
[tex](\alpha)^2 + 2(\alpha)(\beta) + (\beta)^2 -2(\alpha)(\beta)[/tex]
[tex](\alpha + \beta)^2 -2(\alpha)(\beta)[/tex]
Putting values of αβ and α+β
[tex](\frac {-4}{k})^2 -2( \frac {4}{k}) = 24\\\frac {16}{k^2} - \frac {8}{k} = 24\\Multiplying\,\, the \,\, equation\,\, with\,\, 8K^2\\ 2 - k= 3K^2\\3k^2-2+k=0\\or\\3k^2+k-2=0\\3k^2+3k-2k-2=0\\3k(k+1)-2(k+1)=0\\(3k-2)(k+1)=0\\3k-2=0 \,\,and\,\, k+1 =0\\k= 2/3 \,\,and\,\, k=-1[/tex]
The values of k are 2/3 and -1
