Quadratic Equations, SPM Practice (Paper 2)

Posted on April 18, 2020 by user

2.10.1 Quadratic Equations, SPM Practice (Paper 2)

Question 1:

(a) Find the values of k if the equation (1 – k) x²– 2(k + 5)x + k + 4 = 0 has real and equal roots.

Hence, find the roots of the equation based on the values of k obtained.

(b) Given the curve y = 5 + 4x – x²has tangen equation in the form y = px + 9. Calculate the possible values of p.

Solutions:

(a)

For equal roots,

b²– 4ac = 0

[–2(k + 5)]² – 4(1 – k)( k + 4) = 0

4(k + 5)²– 4(1 – k)( k + 4) = 0

4(k² + 10k + 25) – 4(4 – 3k – k²) = 0

4k² + 40k + 100 – 16 + 12k + 4k² = 0

8k² + 52k + 84 = 0

2k² + 13k + 21 = 0

(2k + 7) (k + 3) = 0

k = - \frac{7}{2}, - 3

k = - \frac{7}{2}

, the equation is

\begin{array}{l} (1 + \frac{7}{2}) x^{2} - 2 (- \frac{7}{2} + 5) x - \frac{7}{2} + 4 = 0 \\ \frac{9}{2} x^{2} - 3 x + \frac{1}{2} = 0 \end{array}

9x² – 6x + 1 = 0

(3x – 1) (3x – 1) = 0

x = ⅓

If k = –3, the equation is

(1 + 3)x²– 2(–3 + 5)x – 3 + 4 = 0

4x² – 4x + 1 = 0

(2x – 1) (2x – 1) = 0

x = ½

(b)

y = 5 + 4x – x²----- (1)

y = px + 9 ---------- (2)

(1) = (2), 5 + 4x – x²= px + 9

x² + px – 4x + 9 – 5 = 0

x² + (p – 4)x + 4 = 0

Tangen equation only has one intersection point with equal roots.

b²– 4ac = 0

(p – 4)² – 4(1)(4) = 0

p² – 8p + 16 – 16 = 0

p² – 8p = 0

p (p – 8) = 0

Therefore, p = 0 and p = 8.