Assume that n married couple (2n people) are seated at random on 2n seats around a...

Six married couples (twelve people in total) are to be seated around a circular table. Since...

Six married couples (twelve people in total) are to be seated around a circular table. Since the table is circular, two seating arrangements are considered the same if one is a rotation of the other. If each of the twelve people randomly chooses a seat, what is the probability that each member of a married couple sits next to the other member?

1) Suppose that the 10 people of 5 married couples (with each couple consisting of one...

1) Suppose that the 10 people of 5 married couples (with each couple consisting of one husband and one wife) will be randomly seated at a round table having 10 chairs. Letting X be the number of wives who will be seated next to their husband, give the value of E(X).

a group of 10 people sit around a table, how many arrangements are possible if a...

a group of 10 people sit around a table, how many arrangements are possible if a group of 4 seats together and another couple sit together?

A wedding organizer needs to sit 4 couples and 4 single persons around a round table....

A wedding organizer needs to sit 4 couples and 4 single persons around a round table. In how many ways can she sit those 12 people so that: (a) All couples sit together (the two members of each couple sit side-by-side)? (b) No couple sit together? Hint: Inclusion-Exclusio Note: Since the table is round, different rotations of the same arrangement are indistin- guishable, but a clockwise arrangement is distinguishable from its counterclockwise version.

Suppose that n people are seated in a random manner in a row of n theater...

Suppose that n people are seated in a random manner in a row of n theater seats. What is the probability that two particular people A and B will be seated next to each other? Can you provide a detailed explanation on the steps and process you use? Do you use combinations or permutations to solve for the answer? The answer should be n/2, according to my book, but I don't know how to get it.

10 couples go to a party (So 20 people in total). Each of the 20 people...

10 couples go to a party (So 20 people in total). Each of the 20 people are randomly seated at a large round table with 20 chairs. Let Xi = 1, for i = 1, 2, . . . , 20, if the i th person is sitting next to the other person in their couple, and 0 otherwise. Let Y be the total number of people who are seated next to their partner. (Note that the Xi ’s all...

Q1: A random sample of 390 married couples found that 290 had two or more personality...

Q1: A random sample of 390 married couples found that 290 had two or more personality preferences in common. In another random sample of 570 married couples, it was found that only 36 had no preferences in common. Let p1 be the population proportion of all married couples who have two or more personality preferences in common. Let p2 be the population proportion of all married couples who have no personality preferences in common. (a) Find a 95% confidence interval...

Let x be a random variable representing dividend yield of bank stocks. We may assume that...

Let x be a random variable representing dividend yield of bank stocks. We may assume that x has a normal distribution with σ = 3.1%. A random sample of 10 bank stocks gave the following yields (in percents). 5.7 4.8 6.0 4.9 4.0 3.4 6.5 7.1 5.3 6.1 The sample mean is = 5.38%. Suppose that for the entire stock market, the mean dividend yield is μ = 4.8%. Do these data indicate that the dividend yield of all bank...

13. Refer to the data set in the accompanying table. Assume that the paired sample data...

13. Refer to the data set in the accompanying table. Assume that the paired sample data is a simple random sample and the differences have a distribution that is approximately normal. Use a significance level of 0.10 to test for a difference between the number of words spoken in a day by each member of 30 different couples. Couple Male      Female 1              12320    11172 2              2410       1134 3              16390    9702 4              9550       9198 5              11360    10248 6              9450       3024 7             ...

Let x be a random variable representing dividend yield of bank stocks. We may assume that...

Let x be a random variable representing dividend yield of bank stocks. We may assume that x has a normal distribution with σ = 2.2%. A random sample of 10 bank stocks gave the following yields (in percents). 5.7   4.8   6.0   4.9   4.0   3.4   6.5   7.1   5.3   6.1 The sample mean is  = 5.38%. Suppose that for the entire stock market, the mean dividend yield is μ = 4.4%. Do these data indicate that the dividend yield of all bank stocks...