In San Francisco, 30% of workers take public transportation. A sample of 10 workers is chosen....

The following are airborne times (in minutes) for 10 randomly selected flights from San Francisco to...

The following are airborne times (in minutes) for 10 randomly selected flights from San Francisco to Washington Dulles airport. 269 255 267 285 274 275 266 258 271 281 (a) Compute a 90% confidence interval for the mean airborne time for flights from San Francisco to Washington Dulles. (Round your answers to three decimal places.) (b) Give an interpretation of the 90% confidence level associated with the interval estimate in part (a). a) If we were to take a large...

American Air Flight 2705 from New York to San Francisco has seats for 340 passengers. An...

American Air Flight 2705 from New York to San Francisco has seats for 340 passengers. An average of 5% if people with reservations don’t show up, so American Air overbooks by accepting 350 reservations for the 340 seats. We can analyze this system by using a binomial distribution with n = 350 and p = 0.95 (the probability that someone with a reservation does not show up). Find the probability that when 350 reservations are accepted for a particular flight,...

How many in a car? A study of rush-hour traffic in San Francisco counts the number...

How many in a car? A study of rush-hour traffic in San Francisco counts the number of people in each car entering a freeway at a suburban interchange. Suppose that the number of people per car in the population of all cars that enter at this interchange during rush hours has a mean of μ = 1.7 and a standard deviation of σ = 0.85. a.Describe the shape of the sampling distribution of x ̅ for SRSs of size n...

1. Normal Approximation to Binomial Assume n = 10, p = 0.1. a. Use the Binomial...

1. Normal Approximation to Binomial Assume n = 10, p = 0.1. a. Use the Binomial Probability function to compute the P(X = 2) b. Use the Normal Probability distribution to approximate the P(X = 2) c. Are the answers the same? If not, why?

If I take binomial distribution, like P % a population are graduates. Given a sample of...

If I take binomial distribution, like P % a population are graduates. Given a sample of Size n, i get p% of as graduates . Can we have a special case equations to find, for give n, probability of P-p < Threshold ? Lets Say n=600 , and P-p <= 1 % ie 6 .

A baseball player, Mickey, who bats 310 (or .310) gets an average of 3.1 hits in...

A baseball player, Mickey, who bats 310 (or .310) gets an average of 3.1 hits in ten at bats. We will assume that each time Mickey bats he has a 0.31 probability of getting a hit. This means Mickeys at bats are independent from one another. If we also assume Mickey bats 5 times during a game and that x= the number of hits that Mickey gets then the following probability mass function, p(x), and cumulative distribution function F(x) are...

(1) Consider X that follows the Bernoulli distribution with success probability 1/4, that is, P(X =...

(1) Consider X that follows the Bernoulli distribution with success probability 1/4, that is, P(X = 1) = 1/4 and P(X = 0) = 3/4. Find the probability mass function of Y , when Y = X4 . Find the second moment of Y . (2) If X ∼ binomial(10, 1/2), then use the binomial probability table (Table A.1 in the textbook) to find out the following probabilities: P(X = 5), P(2.9 ≤ X ≤ 4.9) (3) A deck of...

A baseball player, Mickey, who bats 310 (or .310) gets an average of 3.1 hits in...

A baseball player, Mickey, who bats 310 (or .310) gets an average of 3.1 hits in ten at bats. We will assume that each time Mickey bats he has a 0.31 probability of getting a hit. This means Mickeys at bats are independent from one another. If we also assume Mickey bats 5 times during a game and that x= the number of hits that Mickey gets then the following probability mass function, p(x), and cumulative distribution function F(x) are...

The Chime Company manufactures circuit boards for use on electric clocks. Much of the soldering work...

The Chime Company manufactures circuit boards for use on electric clocks. Much of the soldering work on the circuit boards is performed by hand and there are a proportion of the boards that during the final testing are found to be defective. Historical data indicates that of the defective boards, 60% can be corrected by redoing the soldering. The distribution of defective boards follows a binomial distribution. Directions: Round up to 3 digits after the decimal point. You may use...

Use n= 10 and p= 0.8 to complete parts (a) through (d) below.     (A) Construct...

Use n= 10 and p= 0.8 to complete parts (a) through (d) below.     (A) Construct a binomial probability distribution with the given parameters. (round to four decimal places as needed.)                       X                                                       P(x) 0    1 2 3 4 5 6 7 8 9 10         (b) compute the mean and standard deviation of the random variable using μx= ∑[x⋅P(x)] and σx= √ ∑[x2 ⋅ P(x)]-μ2x √= radical μx= ______ (round to two decimal places as needed.) σx= _______(round...