2023 QCE Maths Methods Paper 1 Mini Test 6

QUESTION 1 [2023 Paper 1 Q10]

The continuous random variable \(Y\) has the probability density function

\[ f(y) = \begin{cases} 1+y, & 0 \le y \le \sqrt{3}-1 \\ 0, & \text{otherwise} \end{cases} \]

Determine \(P(0 \le y \le \frac{1}{2})\).

• (A) \(\frac{1}{5}\)
• (B) \(\frac{3}{8}\)
• (C) \(\frac{5}{8}\)
• (D) \(\frac{3}{4}\)

QUESTION 2 (4 marks) [2023 Paper 1 Q15]

In a certain game, players throw one water balloon at a target. There is a one in four chance of hitting the target.

a) State the probabilities of all the possible outcomes for one throw at the target. [2 marks]

b) Let \(H\) be the discrete random variable for one of the possible outcomes. Determine the mean and variance of the distribution of random variable \(H\) when 20 players throw a water balloon at the target. [2 marks]

QUESTION 3 (4 marks) [2023 Paper 1 Q18]

A person enters the lowest carriage of a miniature Ferris wheel with a six-metre diameter. The bottom carriage is one metre off the ground. When top speed is reached, it takes three seconds for a carriage to travel from the lowest to the highest point of the ride. It is claimed that:

The vertical motion of the Ferris wheel produces a maximum vertical acceleration on each rider that is more than half the acceleration of free fall.

Free fall occurs when gravity is the only force acting, resulting in an acceleration of 9.8 ms\(^{-2}\).

Evaluate the reasonableness of the claim.