There are 6 people at a party. What is the probability that exactly four people in...

If 41 people are at a party, what is the probability that more than two of...

If 41 people are at a party, what is the probability that more than two of them have the same birthday? Assume that there are 365 days in a year and all days are equally likely to be the birthday of a specific person. Use Taylor series expansion of the exponential function to provide a first-order approximation of the result if necessary.

Suppose you are one of 18 people at a dinner party. Find the probability that at...

Suppose you are one of 18 people at a dinner party. Find the probability that at least 1 of the other guests has the same birthday as you and that some pair of guests share the same birthday. Assume there are 365 days in a year.

If there are N people in a room, What is the probability that at least two...

If there are N people in a room, What is the probability that at least two of them share the same birthday (the same day of the same month) a year = 365 days? How many people are needed such that the probability is better than even? 


6. There is a party of 1000 people in that party. Think that each person knows...

6. There is a party of 1000 people in that party. Think that each person knows 100 other people at the party and it is random and Relation is mutual, if C knows D then D also knows C. (a) What is the probability that 2 random chosen people know one and other(each other)? (b) What is the probability that 2 random chosen people don't know one and other(each other) and do not have mutual relations? (c) What is the...

6. There is party of 2000 people in that party. Think that each person knows 200...

6. There is party of 2000 people in that party. Think that each person knows 200 other people at the party and it is random and Relation is mutual, if C knows D then D also knows C. (a) What is the probability that 4 random chosen people know one and other(him self and other person)? (b) What is the probability that 4 random chosen people do't know one and other(him self and other person) and do not have mutual...

What is the probability that in a group of 10 people exactly 3 people will have...

What is the probability that in a group of 10 people exactly 3 people will have the same birth month, which will be different from the birth month of the other 7 people (all of whom will have different birth months)?

Using the Poisson approximation, estimate the probability measured as a percent that 6 other people at...

Using the Poisson approximation, estimate the probability measured as a percent that 6 other people at Ally's conference of 700 have her same birthday.

A group has 7 people. Find the probability that 2 or more people in this group...

A group has 7 people. Find the probability that 2 or more people in this group share the same birthday. (Assume a non-leap year with 365 days). Write each answer as a percent rounded to one decimal place, i.e. 16.8%. Do not include the percent symbol.

Forty-four people have served as President of the United States. Grover Cleveland is often counted twice...

Forty-four people have served as President of the United States. Grover Cleveland is often counted twice because he served two non-consecutive terms. Assume there are 366 days in a year, and assume you are a Bayesian. a. What is the probability that at least two of these 44 Presidents share the same birthday? (Same day and month, though not necessarily the same year.) b. What is the probability that at least one of these Presidents shares your birthday?

a) At a party, seven people meet to tell each other on the weekday they has...

a) At a party, seven people meet to tell each other on the weekday they has their birthday. Make reasonable assumptions and calculate the probability that everyone have different weekday as birth day. b) Select an integer between 0 and 999 at random with equal probability for each number. What is the probability that the number contains the number 4 at least once? c) A random variable X is binomial distributed, X ∼ Bin (2, p). We know that P...