Suppose the proportion X of surface area in a randomly selected quadrat that is covered by...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by a certain plant has a standard beta distribution with α = 4 and β = 2. (a) Compute E(X) and V(X). (Round your answers to four decimal places.) E(X) = V(X) = (b) Compute P(X ≤ 0.5). (Round your answer to four decimal places.) (c) Compute P(0.5 ≤ X ≤ 0.8). (Round your answer to four decimal places.) (d) What is the expected proportion...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by a certain plant has a standard beta distribution with α = 5 and β = 4. (a) Compute E(X) and V(X). (Round your answers to four decimal places.) E(X) = V(X) = (b) Compute P(X ≤ 0.4). (Round your answer to four decimal places.) (c) Compute P(0.4 ≤ X ≤ 0.8). (Round your answer to four decimal places.) (d) What is the expected proportion...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by a certain plant has a standard beta distribution with α = 5 and β = 2. (a) Compute E(X) and V(X). (Round your answers to four decimal places.) E(X) = V(X) = (b) Compute P(X ≤ 0.4). (Round your answer to four decimal places.) (c) Compute P(0.4 ≤ X ≤ 0.8). (Round your answer to four decimal places.) (d) What is the expected proportion...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by...

Suppose the proportion X of surface area in a randomly selected quadrat that is covered by a certain plant has a standard beta distribution with α = 4 and β = 2. (a) Compute E(X) and V(X). (Round your answers to four decimal places.) E(X) = 0.6667 V(X) = 0.0317 (b) Compute P(X ≤ 0.2). (Round your answer to four decimal places.) (c) Compute P(0.2 ≤ X ≤ 0.5). (Round your answer to four decimal places.) (d) What is the...

Suppose that a random sample of size 64 is to be selected from a population with...

Suppose that a random sample of size 64 is to be selected from a population with mean 40 and standard deviation 5. (a) What are the mean and standard deviation of the sampling distribution? μx = σx = (b) What is the approximate probability that x will be within 0.4 of the population mean μ? (Round your answer to four decimal places.) P = (c) What is the approximate probability that x will differ from μ by more than 0.8?...

Let X ∼ Beta(α, β). (a) Show that EX 2 = (α + 1)α (α +...

Let X ∼ Beta(α, β). (a) Show that EX 2 = (α + 1)α (α + β + 1)(α + β) . (b) Use the fact that EX = α/(α + β) and your answer to the previous part to show that Var X = αβ (α + β) 2 (α + β + 1). (c) Suppose X is the proportion of free-throws made over the lifetime of a randomly sampled kid, and assume that X ∼ Beta(2, 8) ....

1 the probability distribution of x, the number of defective tires on a randomly selected automobile...

1 the probability distribution of x, the number of defective tires on a randomly selected automobile checked at a certain inspection station, is given in the following table. The probability distribution of x, the number of defective tires on a randomly selected automobile checked at a certain inspection station, is given in the following table. x 0 1 2 3 4 p(x) .53 .15 .08 .05 .19 (a) Calculate the mean value of x. μx =   (a) Calculate the mean...

Suppose that 65% of all registered voters in an area favor a certain policy. Among 100...

Suppose that 65% of all registered voters in an area favor a certain policy. Among 100 randomly selected registered voters, find the following: a. P(x ≤ 70), the probability that at most 70 favor the policy? Round to two decimal places. b. P(x ≥ 75), the probability that at least 75 favor the the policy? Round to two decimal places.

A random sample of size n = 50 is selected from a binomial distribution with population...

A random sample of size n = 50 is selected from a binomial distribution with population proportion p = 0.8. Describe the approximate shape of the sampling distribution of p̂. Calculate the mean and standard deviation (or standard error) of the sampling distribution of p̂. (Round your standard deviation to four decimal places.) mean = standard deviation = Find the probability that the sample proportion p̂ is less than 0.9. (Round your answer to four decimal places.)

Suppose that insurance companies did a survey. They randomly surveyed 450 drivers and found that 340...

Suppose that insurance companies did a survey. They randomly surveyed 450 drivers and found that 340 claimed they always buckle up. We are interested in the population proportion of drivers who claim they always buckle up. NOTE: If you are using a Student's t-distribution, you may assume that the underlying population is normally distributed. (In general, you must first prove that assumption, though.) A. (i) Enter an exact number as an integer, fraction, or decimal. x = (ii) Enter an...