20 relay teams took part in the competition. For any particular team, the probability that they drop the baton at some point during the competition is 0.1. Find the probability that at most 2 teams drop the baton during the competition. Give your answer correct to 4 decimal places.

Leaving Cert Mathematics Probability: 20 relay teams took part in the

20 relay teams took part in the competition - Leaving Cert Mathematics - Question c - 2022

Question c

20 relay teams took part in the competition. For any particular team, the probability that they drop the baton at some point during the competition is 0.1. Find the ... show full transcript

Worked Solution & Example Answer:20 relay teams took part in the competition - Leaving Cert Mathematics - Question c - 2022

Step 1

P(at most 2) = P(0) + P(1) + P(2)

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Answer

To solve this, we first need to find the individual probabilities for 0, 1, and 2 teams dropping the baton using the binomial formula:

$P(k) = {n rack k} p^k (1-p)^{n-k}$

where:

$n = 20$ (the number of teams)
$p = 0.1$ (the probability of a team dropping the baton)
$1 - p = 0.9$ (the probability of a team not dropping the baton)

Calculate P(0): $= 0.12157665459056935$$$
Calculate P(1): $= 0.2707761179692164$$$
Calculate P(2): $= 0.28415504643208866$$$

Now, summing these:

= 0.67650881899187441$$ Thus, the final answer rounded to four decimal places is: $$P(at ext{ most } 2) = 0.6765$$

20 relay teams took part in the competition - Leaving Cert Mathematics - Question c - 2022

Worked Solution & Example Answer:20 relay teams took part in the competition - Leaving Cert Mathematics - Question c - 2022

P(at most 2) = P(0) + P(1) + P(2)

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