A circular ornamental garden pond, of radius 2 metres, has weed starting to grow and cover its surface - AQA - A-Level Maths Pure - Question 3 - 2019 - Paper 3

$B = 0.25$ m², since at $t = 0$, $A = 0.25$ m².

From the information given:

• When $t = 0$, $A = 0.25$ m².
• When $t = 20$, $A = 0.5$ m².

We can express $A$ as:

$A = 0.25 \cdot 2^{\frac{t}{20}}$

Therefore, since $A$ jumps from $0.25$ to $0.5$, we can linearize this as:

$A = \frac{1}{2} \times 2^{\frac{t}{20}}$.

The surface area of the pond is: $\text{Area} = \pi r^2 = \pi (2)^2 = 4\pi \text{ m}^2$

Half of this area is: $2\pi \text{ m}^2$

We set the equation $A = \frac{1}{2} \times 2^{\frac{t}{20}}$ equal to $2\pi$ and solve for $t$:

$2\times 2^{\frac{t}{20}} = 2\pi$

This simplifies to: $2^{\frac{t}{20}} = \pi$

Taking the logarithm of both sides: $\frac{t}{20} = \log_2(\pi)$

Thus, $t = 20 \log_2(\pi) \approx 20 \times 1.585 = 31.7\text{ days}.$

The model assumes unlimited resources for the weed growth, which might not hold true in a real-world scenario.

One refinement could be to include a limiting factor such as nutrient availability or competition from other plants, which typically slows the growth rate as the area covered increases.