AHL 2.9 — Modelling with Advanced Functions

📘 1. Exponential Models and Half-Life

• General form: f(x) = a·b^x where a is the initial value and b > 0 is the base (growth if b > 1, decay if 0 < b < 1).
• Half-life concept: The time it takes for a quantity to reduce to half its original amount.
• Formula: N(t) = N₀·(½)^{t / h} where h is half-life.

Example: A 100 g radioactive sample decays with a half-life of 5 hours.

After 15 hours: N = 100(½)^{15 / 5} = 100(½)³ = 12.5 g

The exponential model accurately describes exponential decay in physics, chemistry, and finance (e.g., depreciation).

📗 2. Natural Logarithmic Models

• General form: f(x) = a + b·ln(x)
• Meaning: Models processes that increase rapidly and then level off, or where growth slows as x increases.
• Properties:
  • Domain: x > 0
  • Range: all real numbers
  • Vertical asymptote at x = 0

Example: Sound intensity in decibels (dB) can be expressed as I = 10·log₁₀(P / P₀), which is logarithmic in nature.

At x = 1 → f(1) = a (since ln(1) = 0).

📙 3. Sinusoidal Models

• General form: f(x) = a·sin[b(x − c)] + d
• Parameters:
  • a: amplitude (vertical stretch, height of wave)
  • b: affects the period, which is 2π / b (in radians)
  • c: horizontal shift, called the phase shift
  • d: vertical shift (moves graph up/down)

Example: f(x) = 3·sin(2x − π/2) + 1

• Amplitude = 3
• Period = 2π / 2 = π
• Phase shift = π/4 to the right
• Vertical shift = +1

Interpretation: This could represent temperature variation with time, where amplitude is the seasonal temperature range, period is one year, and vertical shift represents the average temperature.

📕 4. Logistic Models

• General form: f(x) = L / (1 + Ce^−kx), with L, C, k > 0
• Meaning: Used when growth begins exponentially but slows as it nears a maximum limit (carrying capacity L).
• Key features:
  • Horizontal asymptote: y = L (maximum population or capacity)
  • Inflection point: where growth rate is maximum

Example: A bacterial population grows according to f(t) = 100 / (1 + 9e^−0.5t).

• At t = 0 → f(0) = 100 / (1 + 9) = 10
• As t → ∞ → f(t) → 100 (the limiting population)

📒 5. Piecewise Models

• Definition: A function defined by different expressions over separate intervals of x.
• Purpose: Used when a situation behaves differently in different conditions.

Example:

f(x) = {
  1 + x ,   0 ≤ x < 2
  a·x² + x ,   x ≥ 2
}

To make f(x) continuous at x = 2:

1 + 2 = a(2)² + 2 → 3 = 4a + 2 → a = ¼