Suppose we toss balls into 5 bins until some bin contains two balls. Each toss is...
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Suppose we toss balls into 5 bins until some bin contains two
balls. Each toss is...
(e) Suppose that 4 balls are placed sequentially into one of 5 bins, where the bin...
(e) Suppose that 4 balls are placed sequentially into one of 5 bins, where the bin for each ball is selected at random. For i = 1, 2,3,4,5, define the indicator variables 1, if the ith bin is empty; 0, otherwise Xi _ Then the number of empty boxes is given by X = X\+X2+ X3 + X4+X5, and we learned from week #7 lecture notes and midterm II that Xi ~ Bernoulli(p) with p = (1 - 2)4 =...
How many ways can n identical balls be distributed into k bins such that each bin...
How many ways can n identical balls be distributed into k bins such that each bin contains at least two balls? Assume that n ≥ 2k. Please type your answer or use neat handwriting.
We have 2 boxes, each containing 3 balls. Box number 1 contains one black and two...
We have 2 boxes, each containing 3 balls. Box number 1 contains one black and two white balls; box number 2 contains two black and one white ball. Our friend chooses one of the boxes at random, probability of choosing box number 1 is p. Then he takes one ball from a chosen box (each of three balls can be taken chosen equally likely), and it turns out to be white. We are going to find MAP estimate for the...
Q3. Suppose we toss a coin until we see a heads, and let X be the...
Q3. Suppose we toss a coin until we see a heads, and let X be the number of tosses. Recall that this is what we called the geometric distribution. Assume that it is a fair coin (equal probability of heads and tails). What is the p.m.f. of X? (I.e., for an integer i, what is P(X=i)? What is ?[X]? ({} this is a discrete variable that takes infinitely many values.)
Consider the following gam. We start with an urn with 1 red ball and 1 blue...
Consider the following gam. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 andn-1
Consider the following game We start with an urn with 1 red ball and 1 blue...
Consider the following game We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n -1.
Consider the following game. We start with an urn with 1 red ball and 1 blue...
Consider the following game. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n−1.
7. Consider the following gamd. We start with an urn with 1 red ball and 1...
7. Consider the following gamd. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n-1
7. Consider the following gamel. We start with an urn with 1 red ball and 1...
7. Consider the following gamel. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n - 1.
9.74. Suppose we toss a biased coin independently until we get two heads or two tails...
9.74. Suppose we toss a biased coin independently until we get two heads or two tails in total. The coin produces a head with probability p on any toss. 1. What is the sample space of this experiment? 2. What is the probability function? 3. What is the probability that the experiment stops with two heads?
(e) Suppose that 4 balls are placed sequentially into one of 5 bins, where the bin for each ball is selected at random. For i = 1, 2,3,4,5, define the indicator variables 1, if the ith bin is empty; 0, otherwise Xi _ Then the number of empty boxes is given by X = X\+X2+ X3 + X4+X5, and we learned from week #7 lecture notes and midterm II that Xi ~ Bernoulli(p) with p = (1 - 2)4 =...
We have 2 boxes, each containing 3 balls. Box number 1 contains one black and two white balls; box number 2 contains two black and one white ball. Our friend chooses one of the boxes at random, probability of choosing box number 1 is p. Then he takes one ball from a chosen box (each of three balls can be taken chosen equally likely), and it turns out to be white. We are going to find MAP estimate for the...
Consider the following gam. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 andn-1
Consider the following game We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n -1.
7. Consider the following gamd. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n-1
7. Consider the following gamel. We start with an urn with 1 red ball and 1 blue ball. Each round, we reach in and grab a ball at random, then return that ball plus one more ball of the same color. Repeat this process until there are n balls in the bin. Show that the number of red balls is equally likely to be any number between 1 and n - 1.
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