Martha has a fair die with the usual six sides. She throws the die and records...

Two fair dice (6 sides) are tossed. a) What is the probability that the sum of...

Two fair dice (6 sides) are tossed. a) What is the probability that the sum of the tosses is 6 or 10 ? b) But what if it is given that the outcome of the first or the second dice is 5 ?

A fair six-sided die has two sides painted red, 3 sides painted blue and one side...

A fair six-sided die has two sides painted red, 3 sides painted blue and one side painted yellow. The die is rolled and the color of the top side is recorded. List all possible outcomes of this random experiment Are the outcomes equally likely? Explain Make a probability distribution table for the random variable X: color of the top side        2. If a pair of dice painted the same way as in problem 1 is rolled, find the probability...

A fair six-sided die is tossed twice. Consider the following events: 1. A : First toss...

A fair six-sided die is tossed twice. Consider the following events: 1. A : First toss yields an even number. 2. B : Second toss yields an odd number. 3. C : Sum of two outcomes is even. Find P(A), P(B), P(C), P(B ∩ C), P(C|B), P(C|A ∩ B) and P(B|C).

I roll a fair die until I get my first ace. Let X be the number...

I roll a fair die until I get my first ace. Let X be the number of rolls I need. You roll a fair die until you get your first ace. Let Y be the number of rolls you need. (a) Find P( X+Y = 8) HINT: Suppose you and I roll the same die, with me going first. In how many ways can it happen that X+Y = 8, and what is the probability of each of those ways?...

A fair die is continually rolled until an even number has appeared on 10 distinct rolls....

A fair die is continually rolled until an even number has appeared on 10 distinct rolls. Let Xi denote the number of rolls that land on side i. Determine (a) E[X1] (b) E[X2] (c) the probability mass function of X1 (d) the probability mass function of X2 Same Questions are on Q&A but I want to know why X1 is geometric. I know that geometric distribution means that the number of trials for first success. Thanks

Consider tossing a fair die two times. Let A = 3 or less on the first...

Consider tossing a fair die two times. Let A = 3 or less on the first roll, B = sum of the two rolls is at least 10. Events A and B . Events A and B . (a) are disjoint, are independent (b) are disjoint, are not independent (c) are not disjoint, are independent (d) are not disjoint, are not independent Consider tossing a fair die two times. Let A = 4 or less on the first roll, B...

Assignment 2 1. Assume that you have two biased coins and one fair coin. One of...

Assignment 2 1. Assume that you have two biased coins and one fair coin. One of the biased coins are two tailed and the second biased one comes tails 25 percent of the time. A coin is selected randomly and flipped. What is the probability that the flipped coin will come up tail? 2. One white ball, one black ball, and two yellow balls are placed in a bucket. Two balls are drawn simultaneously from the bucket. You are given...

1.A fair die is rolled once, and the number score is noted. Let the random variable...

1.A fair die is rolled once, and the number score is noted. Let the random variable X be twice this score. Define the variable Y to be zero if an odd number appears and X otherwise. By finding the probability mass function in each case, find the expectation of the following random variables: Please answer to 3 decimal places. Part a)X Part b)Y Part c)X+Y Part d)XY ——- 2.To examine the effectiveness of its four annual advertising promotions, a mail...

Do the following problems. 1. Each of three barrels from a manufacturing line are classified as...

Do the following problems. 1. Each of three barrels from a manufacturing line are classified as either above (a) or below (b) the target weight. Provide the ordered sample space. 2. The heat on each of two soldered parts is measured and labeled as either low (l), medium (m), or high (h). State the number of elements in the ordered sample space. 3. Consider the set of Beatles songs with a primary writer as either Paul McCartney (P) or John...

#46 In a survey of 2000 adults 50 years and older of whom 20% were retired...

#46 In a survey of 2000 adults 50 years and older of whom 20% were retired and 80% were pre-retired, the following question was asked: Do you expect your income needs to vary from year to year in retirement? Of those who were retired, 23% answered no, and 77% answered yes. Of those who were pre-retired, 28% answered no, and 72% answered yes. If a respondent in the survey was selected at random and had answered yes to the question,...