1 Answer

Dov Wasserman · Answer 1 · 2022-09-25T17:59:27+0000

Answer:

$k=\pm 6$

Explanation:

The given quadratic equation is :

x^2 - kx + 8 = 0

One of the roots of this equation is twice that of the other. Let the roots are
$\alpha \ and\ \beta$ ,
$\alpha =2\beta$

Sum of roots,
$\alpha +\beta =(-b)/(a)$

$\alpha +\beta =(-(-k))/(1)\\\\\alpha +\beta =k\\\\3\beta =k\ .......(1)$

Product of roots,

$\alpha \beta =(c)/(a)\\\\2\beta ^2=(8)/(1)\\\\\beta =\pm 2$

If
$\beta =\pm2$ ,

$k=3(2)\\\\=\pm 6$

So, the value of k is equal to
$\pm 6$ .

Please log in or register to add a comment.