n = 35 and p =0.522. P(11< X <=17) is

Let X ? N(10, 16). Find 1. P(X ? 4) 2. P(?1 < X < 17)...

Let X ? N(10, 16). Find 1. P(X ? 4) 2. P(?1 < X < 17) 3. P(X > 14) 4. P(|X ? 10| > 8)

1. Suppose X approximates a binomial distribution with n = 10, p = .35 . Compute...

1. Suppose X approximates a binomial distribution with n = 10, p = .35 . Compute Pr ( X = 4 ). The population of students that took the last statistics quiz had a mean score of 17 and a standard deviation of 2. Assume a normal distribution. What is the Z score of 17? Group of answer choices 2 Cannot be determined 1 0 Group of answer choices 0.1285 0.4000 0.2377 0.2901 The population of students that took the...

Vector problem: add 11 N at 58 degrees, 17 N at 158 degrees and 22 N...

Vector problem: add 11 N at 58 degrees, 17 N at 158 degrees and 22 N at 258 degrees. How much acceleration would that net force provide on a proton (mp+ + 1.67 x 10^-27 kg)?

For a given binomial distribution with  n = 11, p = 0.35, find the following probabilities P(...

For a given binomial distribution with  n = 11, p = 0.35, find the following probabilities P( x is less than or equal to 6, x≤ 6)

(a) Given that X ~ N(?? = 3; ?? 2= 4), compute P[11 < X <...

(a) Given that X ~ N(?? = 3; ?? 2= 4), compute P[11 < X < 7]. (b)What would be the sampling distribution of the sample average, ?̅, given that sample size is equal to 10? Explain. (c) If the distribution of X is not known, but we still have ?? = 3, ?? 2= 4, what can you say about the sampling distribution of ?̅ when the sample size is 20? Does anything change if the sample size is...

Let p=11, q=17, n = pq = 187. Your (awful) public RSA encryption key is (e=107,...

Let p=11, q=17, n = pq = 187. Your (awful) public RSA encryption key is (e=107, n=187). (a) What is your private decryption key? (b) You receive the encrypted message: 100 Decrypt the message. (In other words, what was the original message, before it was encrypted? Just give me a number, don’t convert it to letters).

A simple random sample of size n=11 is obtained from a population with μ=68 and σ=17....

A simple random sample of size n=11 is obtained from a population with μ=68 and σ=17. ​(a) What must be true regarding the distribution of the population in order to use the normal model to compute probabilities involving the sample​ mean? Assuming that this condition is​ true, describe the sampling distribution of barx. ​(b) Assuming the normal model can be​ used, determine ​P(bar x < 71.4​). ​(c) Assuming the normal model can be​ used, determine ​P(bar x ≥ 69.6​).

Consider a binomial probability distribution with p=.35 and n=7. what is the probability of the following?...

Consider a binomial probability distribution with p=.35 and n=7. what is the probability of the following? a. exactly three successes P(x=3) b. less than three successes P(x<3) c. five or more successes P(x>=5)

For a given binomial distribution with n = 11, p = 0.35, find the following probabilities...

For a given binomial distribution with n = 11, p = 0.35, find the following probabilities P(x is greater than 7, x> 7)

Let X Geom(p). For positive integers n, k define P(X = n + k | X...

Let X Geom(p). For positive integers n, k define P(X = n + k | X > n) = P(X = n + k) / P(X > n) : Show that P(X = n + k | X > n) = P(X = k) and then briefly argue, in words, why this is true for geometric random variables.