A baseball player has a batting average (probability of getting on base per time at bat) of 0.215. Based on this: What is the probability that they will get on base more than 6 of the next 15 at bats?
A baseball player has a batting average (probability of getting on base per time at bat)...
Suppose that the probability of a baseball player getting a hit in an at-bat is 0.2804. If the player has 33 at-bats during a week, what's the probability that he gets no more than 9 hits? Question 6 options: 1) 0.0768 2) 0.1536 3) 0.5493 4) 0.4507 5) 0.3957
A baseball player has a lifetime batting average of 0.303. If, in a season, this player has 220 "at bats", what is the probability he gets 85 or more hits? Probability of 85 or more hits =
A high school baseball player has a 0.201 batting average. In one game, he gets 9 at bats. What is the probability he will get at least 6 hits in the game?
A high school baseball player has a 0.285 batting average. In one game, he gets 5 at bats. What is the probability he will get at least 3 hits in the game?
A high school baseball player has a 0.168 batting average. In one game, he gets 8 at bats. What is the probability he will get at least 2 hits in the game?
4) A baseball player has a .300 batting average. Define H as the number of hits the batter gets in 4 at bats. a) What probability distribution does H follow? Give the name of the distribution and the value of its parameter(s) (2 points) b) Find the probability that the batter gets 3 hits in 4 at bats (1 point). c) Find the probability that the batter gets more than 1 hit in 4 at bats (1 point)
Every time Casey is at bat he has a 0.4 probability of getting on base (assume each at bat is an independent event, and that this probability never changes). In one week of baseball, he has twelve times at bat. What is the probability that he will get on base fewer than four times? [must be accurate to 4 decimal places]
A high school baseball player has a 0.278 batting average. In one game, he gets 7 at bats. What is the probability he will get at least 2 hits in the game? (Round answer to 3 decimal places) A certain kind of sheet metal has, on average, 8 defects per 15 square feet. Assuming a Poisson distribution, find the probability that a 19 square foot metal sheet has at least 9 defects. Round your answer to three decimal places.
Please use the central limit
theorem.
9.14 A baseball player has a batting average of 0.328. Let X be the number of hits the player gets during 20 times at bat. Use the central limit theorem to find the approximate probability P(X<k) for k = 1, 3, 6. Compare with the exact probability for each k. Problem 9.14. The problem assumes that the batter's probability of getting a hit stays constant at p=0.328 while he comes up to bat 20...
If a baseball player's batting average is 0.340 or 34%, find the probability that the player will have a bad season and only score at most 60 hits in 200 times at bat?