Statistics: The Binomial Distribution

A random variable X counts the number of successes in 10 independent trials. Each trial has exactly two outcomes, and the probability of success is 0.30 for every trial. Explain why X can be modeled with a binomial distribution and identify n and p.

A basketball player makes 70% of her free throws. If she shoots 6 free throws, what is the probability that she makes exactly 4 of them?

A multiple-choice quiz has 8 questions, each with 4 answer choices. A student guesses on every question. What is the probability that the student gets exactly 3 questions correct?

A factory knows that 5% of its light bulbs are defective. In a random sample of 20 bulbs, what is the probability that exactly 2 are defective?

A coin is flipped 12 times. What is the probability of getting at least 10 heads?

A survey finds that 60% of students at a school prefer digital textbooks. If 15 students are randomly selected, what is the probability that fewer than 5 prefer digital textbooks?

A game has a 20% chance of winning on each play. If a person plays 9 times, what is the probability that the person wins at least once?

A baseball player has a 0.280 probability of getting a hit in each at-bat. In 5 at-bats, what is the probability that he gets no hits?

A binomial random variable X has n = 40 and p = 0.25. Find the mean and standard deviation of X.

A website reports that 12% of visitors click on a certain ad. If 50 visitors come to the site, what is the expected number of visitors who click the ad?

A quality control inspector samples 30 items from a production line where each item has a 3% chance of being flawed. What is the probability that the sample contains 1 or fewer flawed items?

A teacher says the number of students who pass a test in a class of 25 can always be modeled by a binomial distribution if the overall pass rate is 80%. Explain one reason this claim might not be valid.