The equation $$x^2 + kx + 8 = k$$ has no real solutions for $x$ - Edexcel - A-Level Maths Pure - Question 9 - 2008 - Paper 2

To find the set of possible values of $k$, we solve the quadratic inequality:

1. First, we find the roots of the equation $k^2 + 4k - 32 = 0$ using the quadratic formula:

k = rac{-b \\pm \\sqrt{b^2 - 4ac}}{2a} = rac{-4 \\pm \\sqrt{16 + 128}}{2} = rac{-4 \\pm 12}{2}

Calculating the roots yields:

• k = rac{8}{2} = 4
• k = rac{-16}{2} = -8

2. The roots are $k = -8$ and $k = 4$.

To determine where the quadratic is less than zero, we test intervals. The intervals are $(-\\infty, -8)$, $(-8, 4)$, and $(4, +\\infty)$.

3. Choosing test points in each interval:

• For $k = -9$ in $(-\\infty, -8)$, we have $(-9)^2 + 4(-9) - 32 = 81 - 36 - 32 = 13 > 0$.
• For $k = 0$ in $(-8, 4)$, we have $0^2 + 4(0) - 32 = -32 < 0$.
• For $k = 5$ in $(4, +\\infty)$, we have $5^2 + 4(5) - 32 = 25 + 20 - 32 = 13 > 0$.

4. Therefore, the quadratic is less than zero in the interval $(-8, 4)$:

The set of possible values of $k$ is

$-8 < k < 4$