1) Let ? be the number that shows up when you roll a fair, six-sided die,...

You flip a fair coin. If the coin lands heads, you roll a fair six-sided die...

You flip a fair coin. If the coin lands heads, you roll a fair six-sided die 100 times. If the coin lands tails, you roll the die 101 times. Let X be 1 if the coin lands heads and 0 if the coin lands tails. Let Y be the total number of times that you roll a 6. Find P (X=1|Y =15) /P (X=0|Y =15) .

Suppose you plan to roll a fair six-sided die two times. What is the probability of...

Suppose you plan to roll a fair six-sided die two times. What is the probability of rolling a ‘1’ both times? Group of answer choices

Let X equal the outcome (1, 2 , 3 or 4) when a fair four-sided die...

Let X equal the outcome (1, 2 , 3 or 4) when a fair four-sided die is rolled; let Y equal the outcome (1, 2, 3, 4, 5 or 6) when a fair six-sided die is rolled. Let W=X+Y. a. What is the pdf of W? b What is E(W)?

You roll a six-sided die repeatedly until you roll a one. Let X be the random...

You roll a six-sided die repeatedly until you roll a one. Let X be the random number of times you roll the dice. Find the following expectation: E[(1/2)^X]

Two identical fair 6-sided dice are rolled simultaneously. Each die that shows a number less than...

Two identical fair 6-sided dice are rolled simultaneously. Each die that shows a number less than or equal to 4 is rolled once again. Let X be the number of dice that show a number less than or equal to 4 on the first roll, and let Y be the total number of dice that show a number greater than 4 at the end. (a) Find the joint PMF of X and Y . (Show your final answer in a...

5. Suppose the six-sided die you are using for this problem is not fair. It is...

5. Suppose the six-sided die you are using for this problem is not fair. It is biased so that rolling a 6 is three times more likely than any other roll. For this problem, the experiment is rolling a six-sided die twice. (A): What is the probability that one or both rolls are even numbers (2, 4 or 6’s)? (B): What is the probability that at least one of the rolls is an even number or that the sum of...

You roll a fair 6 sided die 5 times. Let Xi be the number of times...

You roll a fair 6 sided die 5 times. Let Xi be the number of times an i was rolled for i = 1, 2, . . . , 6. (a) What is E[X1]? (b) What is Cov(X1, X2)? (c) Given that X1 = 2, what is the probability the first roll is a 1? (d) Given that X1 = 2, what is the conditional probability mass function of, pX2|X1 (x2|2), of X2? (e) What is E[X2|X1]

1. Suppose you have a fair 6-sided die with the numbers 1 through 6 on the...

1. Suppose you have a fair 6-sided die with the numbers 1 through 6 on the sides and a fair 5-sided die with the numbers 1 through 5 on the sides. What is the probability that a roll of the six-sided die will produce a value larger than the roll of the five-sided die? 2. What is the expected number of rolls until a fair five-sided die rolls a 3? Justify your answer briefly.

A 6-sided die rolled twice. Let E be the event "the first roll is a 1"...

A 6-sided die rolled twice. Let E be the event "the first roll is a 1" and F the event "the second roll is a 1". Find the probability of showing a 1 on both rolls. Write your answer as a reduced fraction.

A fair six-sided die is rolled 10 independent times. Let X be the number of ones...

A fair six-sided die is rolled 10 independent times. Let X be the number of ones and Y the number of twos. (a) (3 pts) What is the joint pmf of X and Y? (b) (3 pts) Find the conditional pmf of X, given Y = y. (c) (3 pts) Given that X = 3, how is Y distributed conditionally? (d) (3 pts) Determine E(Y |X = 3). (e) (3 pts) Compute E(X2 − 4XY + Y2).