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Additional Maths · Algebra

Quadratic functions

CIE 06061 min read

Overview

Quadratics have the form y = ax² + bx + c. Know completing the square and the discriminant.

Completing the square

Write as a(x + p)² + q. This instantly gives the turning point at (−p, q) — a minimum if a > 0, a maximum if a < 0.

The discriminant

For ax² + bx + c = 0, the discriminant is b² − 4ac:

  • > 0 → two distinct real roots
  • = 0 → one repeated root (the line is a tangent)
  • < 0 → no real roots

The quadratic formula

x = [−b ± √(b² − 4ac)] ÷ 2a.

Worked example

x² − 6x + 5: complete the square → (x − 3)² − 4. Minimum point at (3, −4); roots at x = 1 and x = 5.

Common mistakes

  • Forgetting the sign change: a(x + p)² + q has its turning point at x = −p.

Exam tips

  • "Line is a tangent to the curve" → set the discriminant = 0.

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