exercise:3b091a58ee

May 09'23

Exercise

Skateboarders A and B practice one difficult stunt until becoming injured while attempting the stunt. On each attempt, the probability of becoming injured is [math]p[/math], independent of the outcomes of all previous attempts.

Let [math]F(x, y)[/math] represent the probability that skateboarders A and B make no more than [math]x[/math] and [math]y[/math] attempts, respectively, where [math]x[/math] and [math]y[/math] are positive integers. It is given that [math]F(2, 2) = 0.0441[/math].

Calculate [math]F(1, 5)[/math].

0.0093
0.0216
0.0495
0.0551
0.1112

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AAdmin

May 09'23

Solution: C

The probability that a skateboarder makes no more than two attempts is the probability of being injured on the first or second attempt, which is

[[math]] p + (1-p)p = 2p - p^2. [[/math]]

Then,

[[math]] \begin{align*} 0.0441 = F(2,2) = (2p-p^2)^2 \\ 0.21 = 2p-p^2 \\ p^2-2p + 1 = 0.79 \\ (p-1)^2 = 0.79 \\ p-1 = ±0.88882 \\ p = 0.11118 \end{align*} [[/math]]

The probability that a skateboarder makes no more than one attempt is [math]p[/math] while the probability of making no more than five attempts is the complement of having no injuries on the first five attempts. Hence,

[[math]] F(1,5) = p[1-(1-p)^2] = 0.0495. [[/math]]