2024 QCE Maths Methods Paper 1 Mini Test 3

QUESTION 1 [2024 Paper 1 Q7]

Twenty families are selected to participate in a lifestyle study related to family size. The number of children in these families is uniformly distributed as shown.

A random sample of five families is chosen from this group, without replacement. A possible mean number of children in the sample is

• (A) 5.0
• (B) 2.0
• (C) 1.0
• (D) 0.0

QUESTION 2 [2024 Paper 1 Q8]

The graph of \(f(x)\) is shown.

Identify the graph of the second derivative \(f''(x)\).

QUESTION 3 [2024 Paper 1 Q9]

At a certain location, the temperature (°C) can be modelled by the function \(T = 5\sin\left(\frac{\pi}{12}x\right) + 23\), where \(x\) is the number of hours after sunrise.

Determine the rate of change of temperature (°C/hour) when \(x = 4\).

• (A) \(\frac{5\pi}{48}\)
• (B) \(\frac{5\pi}{24}\)
• (C) \(\frac{5\pi\sqrt{3}}{24}\)
• (D) \(\frac{5\pi\sqrt{3}}{6}\)

QUESTION 4 (6 marks) [2024 Paper 1 Q13]

a) \(F(x) = \int (4e^{2x} + \sin(2x)) \, dx\). Use integration to determine \(F(x)\), if \(F(0) = 5\). [3 marks]

b) If \(\frac{dy}{dx} = \left( \frac{3x^7 - 2x}{x^4} \right)^2\), determine \(y\). [3 marks]