You roll a dice 20 times and count how many times the number 4 appears. if x is the number of times the number 4 appears, then ∼ ( , ) x∼binomial(n,p), where n and p are:
What is the probability that the number obtained is greater than 4? A standard 6-sided die numbered 1–6 has 2 sides that meet the criterion of greater than 4, namely 5 and 6. So there are 2 ways out of 6, so the probability is 2/6=1/3. You have a 1/3 chance of rolling greater than a 4
You roll a dice 20 times and count how many times the number 4 appears. if x is the number of times the number 4 appears, then ∼ ( , ) x∼binomial(n,p), where n and p are:
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What is the probability that the number obtained is greater than 4? A standard 6-sided die numbered 1–6 has 2 sides that meet the criterion of greater than 4, namely 5 and 6. So there are 2 ways out of 6, so the probability is 2/6=1/3. You have a 1/3 chance of rolling greater than a 4
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Answer:
You roll a dice 20 times and count how many times the number 4 appears. if x is the number of times the number 4 appears, then ∼ ( , ) x∼binomial(n,p), where n and p are:
Explanation: