Quadratic Equations

• Daisuke-kun

  11 Mar 08, 20:07

  a) the roots of the equation 3x^2 +kx + 96 =0 are both positive and one is twice as large as the other Calculate the value of each root and find k

  b)Given taht p^2 +q^2 = 13 and that pq =16, constructthe quadratic equation whose roots are p^2 and p^2. Find all possible values of p.

  just learnt so not such.

  help pls

• ^tamago^

  11 Mar 08, 20:27

  3x²+kx+96=0
  
  For roots to be real and distinct, b² - 4ac > 0
  k² - 4(3)(96) > 0
  k² > 1152
  k ≥ 34 or k ≤ -34 (k ∈ Z)
  
  
  k = -3√(k²-1152)
  8k² = 10368
  k² = 1296
  k = ± 36
  
  for k = 36, x²+12x+32=0
  (x+8)(x+4) = 0
  x = -4 and -8 (rej. as x > 0)
  
  for k = -36, x²-12x+32=0
  (x-8)(x-4) = 0
  x = 4 and 8
  
  ∴ The two roots are 4 and 8, and the value of k is -36.
  
  Anyway using (x-a)(x-2a) should be an easier method as depicted below.
  
  
  
  
  p²+q²=13 ⇒ p²=13-q² ⇒ q²=13-p²
  pq=16
  
  (x-p²)(x-q²) = 0
  x²-(p²+q²)x+p²q² = 0
  x²-13x+256 = 0
  
  p²+q²=13 −−− (1)
  pq=16 −−− (2)
  sub (2) into (1): p²+(16/p)²=13
  (p²)²-13p²+256=0
  sub x into p², we have:
  x²-13x+256 = (x-p²)(x-q²) = 0
  ⇒ p² = q² or p² = p² (rej.)
  sub p²=q² into (1): 2p² = 13
  p² = 6.5
  p = ±2.55 (3 s.f.)
  
  
  
• deathscythe99

  11 Mar 08, 20:46

  Hmmm for first question, u work backwards.

  Assume a is the first root, 2a is the second root (twice as large)

  Therefore, (x-2a) (x-a) = 0 is the equation for the roots.

  x^2 - 3ax + 2a^2 = 0
  3x^2 - 9ax + 6a^2 = 0
  
  Comparing with 3x^2 + kx + 96 = 0,

  6a^2 = 96, thus...a is +4 or -4
  Solving for k, k can be -36 or +36 respectively.

  Dun understand second question. Typo error?

• davidche

  11 Mar 08, 22:35

  Wow all good ways.

  But tamago, is

  ''For roots to be real and distinct, b² - 4ac > 0
  k² - 4(3)(96) > 0
  k² > 1152
  k ≥ 34 or k ≤ -34 (k ∈ Z) ''

  needed to get answer?

• deathscythe99

  11 Mar 08, 22:37

  Originally posted by davidche:

  Wow all good ways.

  But tamago, is

  ''For roots to be real and distinct, b² - 4ac > 0
  k² - 4(3)(96) > 0
  k² > 1152
  k ≥ 34 or k ≤ -34 (k ∈ Z) ''

  needed to get answer?

  
  Tamago's right. U need to prove which is the correct pair of answers. I didn't do that, so I get half the marks =X

• davidche

  11 Mar 08, 22:38

  second qn looks like must use alpha beta lol

• ^tamago^

  11 Mar 08, 22:44

  Originally posted by davidche:

  Wow all good ways.

  But tamago, is

  ''For roots to be real and distinct, b² - 4ac > 0
  k² - 4(3)(96) > 0
  k² > 1152
  k ≥ 34 or k ≤ -34 (k ∈ Z) ''

  needed to get answer?

  
  u're right, not needed. it says distinct so thought just do a quick one to acertain roughly what is k.