Suppose that Lucy can reliably shake a paw with independent and constant probability ?. In a...

Consider a sequence of independent trials of an experiment where each trial can result in one...

Consider a sequence of independent trials of an experiment where each trial can result in one of two possible outcomes, “Success” or “Failure”. Suppose that the probability of success on any one trial is p. Let X be the number of trials until the rth success is observed, where r ≥ 1 is an integer. (a) Derive the probability mass function (pmf) for X. Show your work. (b) Name the distribution by matching your resulting pmf up with one in...

On each drive, you can have an accident with probability 0.2. Suppose each drive is independent...

On each drive, you can have an accident with probability 0.2. Suppose each drive is independent of all previous ones. Let Y denote the number of accidents in six drives. A) Find the probability distribution of Y. B) Expected value EY. C) Variance VY.

Suppose you roll two dice and count the number of dots showing. Let A = "the...

Suppose you roll two dice and count the number of dots showing. Let A = "the sum of the dots showing on the two rolls is a prime number." (a) Let B = "The first toss showed an even number of dots." Are A and B independent? Show your work. (b) Let C = "the second toss was greater than the first." Are A and C independent? Show your work. (c) Suppose we pick a value ?k for 1≤?≤61≤k≤6 and...

Can you explain with R Code: The probability that a car salesman successfully completes as sale...

Can you explain with R Code: The probability that a car salesman successfully completes as sale to a customer is 0.13. The salesman has decided to attempt car sales 1 until he has successfully completed six sales. His success/failure at completing a sale to different customers is independent. (a) What is the probability that he will need to attempt ten sales? (c) What is the expected value and variance of the number of sales that he needs to attempt? (b)...

Let A1, ... ,20 be independent events each with probability 1/2. Let X be the number...

Let A1, ... ,20 be independent events each with probability 1/2. Let X be the number of events among the first 10 which occur and let Y be the number of events among the last 10 which occur. Find the conditional probability that X = 5, given that X + Y = 12.

Shooters A, B, and C are having a truel. The probability that A hits his target...

Shooters A, B, and C are having a truel. The probability that A hits his target is 1/3, the probability for B is 2/3, and the probability for C is 1. A goes first, then B, then C, etc. until only one shooter is left. Suppose that A shoots into the air for his first shot, then B shoots at C, and C, if still alive, shoots at B. What is the expected number of shots fired until the truel...

Suppose in a certain region, there is an average of 0.6 ant nests per square kilometre...

Suppose in a certain region, there is an average of 0.6 ant nests per square kilometre and an average of 0.3 beehives per square kilometre. Suppose that the locations of ant nests are independent of other ant nests, the locations of beehives are independent of other beehives, and the locations of ant nests and beehives are independent of each other. (a) Let S be the count of ant nests and beehives in a randomly chosen square kilometre. That is, let...

Probability Conceptional Questions: 1. A intersection B^c= A-B? 2. can two independent events occur conditional probability...

Probability Conceptional Questions: 1. A intersection B^c= A-B? 2. can two independent events occur conditional probability 3. Three couples sit randomly in a row what is the probability that no husband sits beside his wife. (hint: use inclusion-exclusion formula and you have to use noation P(A),P(B), P(AUB), P(A intersection B) rather than just give out the number)

Suppose that X1 and X2 are independent continuous random variables with the same probability density function...

Suppose that X1 and X2 are independent continuous random variables with the same probability density function as: f(x) = ( x 2 0 < x < 2, 0 otherwise. Let a new random variable be Y = min(X1, X2,). a) Use distribution function method to find the probability density function of Y, fY (y). b) Compute P(Y > 1).

Suppose that X1 and X2 are independent continuous random variables with the same probability density function...

Suppose that X1 and X2 are independent continuous random variables with the same probability density function as: f(x) = ( x 2 0 < x < 2, 0 otherwise. Let a new random variable be Y = min(X1, X2,). a) Use distribution function method to find the probability density function of Y, fY (y). b) Compute P(Y > 1). c) Compute E(Y )