Four people get on a bus that makes six regular stops. Find the probability that at least two of the people get off on the same stop.
Four people get on a bus that makes six regular stops. Find the probability that at...
An elevator has 5 people and makes 8 stops. What is the probability that no two people get off on the same floor? (Enter your answer as a fraction.)
Question D C. In Regular Bus City, there is a shuttle bus that goes between Stop A and Stop B, with no stops in between. The bus is perfectly punctual and arrives at Stop A at precise five minute intervals (6:00, 6:05, 6:10, 6:15, etc.) day and night, at which point it immediately picks up all passengers waiting. Citizens of Regular Bus City arrive at Stop A at Poisson random times, with an average of 5 passengers arriving every minute,...
5 people in a bus that has 7 stops left in it's journey. It's equally likely that any given passenger will leave at a given stop. What is the probability that no 2 passengers leave at the same stop.
Suppose we have a late-night bus and towards the end of the route, there are 3 passengers {P1, P2, P3} and 5 stops {S1, S2, S3, S4, S5} remain. Suppose further that each passenger is inebriated and is thus is equally likely to get off at any one of the stops. (i) We wish to list the set of outcomes in the sample space each of whose outcomes is an ordered triple of all three Sij for I-1,2,3, where Sij...
3. Suppose we have a late night bus and towards the end of the route, there are 3 passengers {P, Pz2 , P3} and 5 stops SI,S2,S3,S4,Ss, remain. Suppose further that each passenger is inebriated, and is thus is equally likely to get off at any one of the stops (i) We wish to list the set of outcomes in the sample space each of whose outcomes is an ordered triple of all three Sij for l=1,2,3, where Sij means...
A group of thirty-six people is selected at random. what is the probability that at least two of them will have the same birthday? round to four decimals
Supposewehavealatenightbusandtowardstheendofthe route, there are 3 passengers {P1 , P2 ,, P3} and 5 stops {S1,S2,S3,S4,S5, } remain. Suppose further that each passenger is inebriated, and is thus is equally likely to get off at any one of the stops. (i) We wish to list the set of outcomes in the sample space each of whose outcomes is an ordered triple of all three Sij for I=1,2,3, where Sij means that passenger Pi got off at the stop Sj. a) Write...
1. The birthday of six random people has been checked. Find the probability that (a) At least one of them is born in September. (b) All five are born in the Spring. Spring here means one of the month March, April, or May. (c) At least two of them are born in the same month. In this problem you can assume that a year is 365 days. 2.A fair die is rolled three times. We say that a match has...
please show all your steps ODDS Question 4 [3 marks Four tourists plan on taking a bus tour around Toronto. This tour allows them to hop on and off the bus at any of the 8 stops available. The available stops are the CN tower, Harbour Front, Queen's Quay, Dundas Square, Casa Loma, Distillery District, Bata Shoe Museum and the Royal Ontario Museum. a) [1 mark] What is the probability that two attend one location and two attend another same...
A group consists of six men and six women. Four people are selected to attend a conference. a. In how many ways can four people be selected from this group of twelve ? b. In how many ways can four women be selected from the six women? c. Find the probability that the selected group will consist of all women? Thank You please show work