1 three-person problem of points pascal fermat and their

Assignment Help Mathematics
Reference no: EM13347029

1) Three-person Problem of Points: Pascal, Fermat and their old friend the Chevalier de Mere each put ≥10.00 into a pot, and agree to play a game that has rounds. Each player has the same probability of winning each round. They agree to play until someone has won 10 rounds, and that person will get the entire pot. However, they are forced to stop playing after Pascal has won 8 rounds, Fermat has won 7 rounds and the Chevalier has won 9 rounds. How should they divide the pot?

2) a) Show that

809_Three-person Problem of Points.png

A counting proof could be fun(?). But any old proof will do.

b) Not connected to part a) above. Consider the two player Problem of Points set up, where the game consists of n rounds, and where player A has won a rounds and Player B has won b rounds (a, b < n)whentheyareforcedtoquit.Let r =2n ! 1 ! (a + b). Show that according to the Pascal-Fermat solution, the ratio of A's share of the pot to B's share of the pot should be:

1844_Three-person Problem of Points1.png

That is, all you need is the r'th row of Pascal's Triangle to get the split of the pot, as pointed out by Pascal.

3) The elevator in the Math and Computer Building can stop at one of six ?oors. Four riders get on the elevator at the ?rst ?oor and the elevator heads up. Each rider picks a ?oor at random (from ?oor 2 to ?oor 6) and gets o↵, and it is possible for more than one passenger to get o↵ at any ?oor.

a) Describe, in words (no need to list all possibilities), S, the sample space for this experiment. Be sure to include the total number of points in S.

b) Assuming the points in S to be equally probable, ?nd:

i) the probability that nobody gets o↵ at the second ?oor.

ii) the probability that nobody gets o↵ at the odd numbered ?oors

iii) the probability that half of the riders get o↵ at the same ?oor and the other half get o↵ at a di↵erent ?oor.

c) Generalize the results in i), ii) and iii) for r riders and n ?oors. Assume both r and n are even.

4)

In an agricultural experiment, we wish to compare the yields of three di↵erent varieties of wheat. Call these varieties A, B and C. We have a ?eld that has been marked into a 3 ? 3gridsothat there are 9 plots available to plant the varieties. We randomly assign the varieties to the plots so that each variety appears 3 times in the grid.

a) How many di↵erent ways can the varieties be assigned to the plots?

b) The random assignment of varieties to plots is called a completely randomized design. A better design might be to randomly assign the varieties so that each variety appears once in every row of the grid. This is called a randomized block design. How many possible randomized block designs are there involving 3 varieties and a 3 ? 3grid?

c) A third design would assign the varieties to the plots so that every variety appeared once in every row and once in every column of the grid. This is called a Latin square design. How many possible Latin square designs are there involving 3 varieties and a 3 ? 3grid?

d) For r varieties and an r ? r grid, how many designs of the ?rst two types are there? (The number of Latin Squares of a given oder is an open problem - solve it to become famous!!).

e) For the ?rst two designs (and the general case in d), what is the probability that at least one variety will appear in the same position in each row?

5) In a study of outcomes for patients who had been in the Intensive care Unit (ICU) at a large hospital, the records from last 150 patients who had been in the ICU for more than one day are obtained. The data for the number of patients in four categories is summarized in the table below.

767_Three-person Problem of Points2.png

So of the 150 patients, 120 were diagnosed with Coronary Heart Disease (CHD), 52 had both CHD and stroke, 68 had CHD but not stroke, etc. A patient record is selected at random. Let A be the event that the record is for an ICU patient who had CHD, and B be the event that the record is for a patient who had a stroke.

a) i) Are the events A and B independent? Explain.

ii) Are the events A and B mutually exclusive? Explain.

iii) Find P(AB).

iv) Find P(A [ B).

b) For a detailed chart review, 50 of the 150 records are selected at random without replacement.

i) Find the probability that the sample contains 45 patients with CHD. (An expression is OK here, but try to do the calculation).

ii) Find the probability that the sample contains more than 45 patients with CHD or stroke.

6)

In a three-cornered paint ball duel, A, B, and C successively take shots at each other until only one of them remains paint free. Once hit, a player is out of the game and gets no more shots. The three paint ballers have di↵erent probabilities of hitting their target. A hits the target 30% of the time, B hits the target 50% of the time and C (the brute) hits the target 100% of the time. A shoots ?rst, followed by B, then C, then back to A if paint free, etc. If each player adopts the best strategy at each turn, including possibly an intentional miss, ?nd the probability of remaining paint free for each of A, B, and C.

7)

There are two diagnostic tests for a disease. Among those who have the disease, 10% give negative results on the ?rst test, and independently of this, 5% give negative results on the second test. Among those who do not have the disease, 80% give negative results on the ?rst test, and, inde-pendently, 70% give negative results on the second test. Twenty percent of those tested actually have the disease.

a) If both tests are negative, what is the probability that the person tested has the disease?

b) If both tests are positive, what is the probability that the person tested has the disease?

c) If the ?rst test gives a positive result, what is the probability that the second test will also be positive?

8)

There are n seats on an airplane and n passengers have bought tickets. Unfortunately, the ?rst passenger to enter the plane has lost his ticket and, so he just chooses a seat at random and sits in it. Thereafter, each of the remaining passengers enters one at a time and either sits in their assigned seat if it is empty, or, if someone is sitting in their seat, chooses a seat at random from those that are empty.

a) If n=2, what is the probability that the last passenger to enter will end up sitting in her assigned seat?

b) If n=3, what is the probability that the last passenger to enter will end up sitting in her assigned seat?

c) For general n ≥ 2, what is the probability that the last passenger to enter will end up sitting in her assigned seat?

Reference no: EM13347029

Questions Cloud

You are required to produce a management report from the : you are required to produce a management report from the perspective of a consultant reporting back to your client -
Write down the essay : write down the essay on
1 let x1 middot middot middot xn be n ge 2 independent : 1. let x1 middot middot middot xn be n ge 2 independent random variables where each xi has the exponential distribution
Question 1a cantilever beam of constant cross section : question 1a cantilever beam of constant cross section carries a uniformly distributed load w nm across half its span as
1 three-person problem of points pascal fermat and their : 1 three-person problem of points pascal fermat and their old friend the chevalier de mere each put ge10.00 into a pot
Create a inventory management system in c applicationthis : create a inventory management system in c applicationthis is what the system must be able to
1 determine the value of c if any so that the system of : 1. determine the value of c if any so that the system of equations with the following augmented matrixhas the requested
1 risk assessment of ict systemperform risk assessment for : 1. risk assessment of ict systemperform risk assessment for the organization and it is related to ict security threats
Restaurant marketing leadership for this assignment you : restaurant marketing leadership for this assignment you will be evaluating mcdonalds restaurants.bullbased on the case

Reviews

Write a Review

Mathematics Questions & Answers

  Questions on ferris wheel

Prepare a Flexible Budget Gator Divers is a company that provides diving services such as underwater ship repairs to clients in the Tampa Bay area.

  Logistic map

This assignment has two question related to maths. Questions are related to bifurcation cascade and logistic map.

  Finding the probability of cards

This assignment has questions related to probabiltiy.

  Systems of ode

Find all the xed points, and study their stability and Draw the phase portrait of the system, as well as the graphs of the solutions in all relevant cases.

  Derive the boolean expression

Derive the Boolean Expression and construct the switching circuit for the truth table stated

  System of equations

Evaluate which equations are under-identified, just-identified, and over-identified.

  Linear programming problem

Linear programming problem consisting of only two constraints with one objective function.

  Find the natural domain

Find the natural domain of the given functions.

  Introduction to numerical methods

Compute the coecients of the polynomials using the term recurrence relation.

  Chart of the topological manifold

De?nition of smoothness of functions on a smooth manifold is chart independent and hence geometric.

  Mathematics in computing

Questions related on mathematics in computing.

  Complex problems

Complex problems

Free Assignment Quote

Assured A++ Grade

Get guaranteed satisfaction & time on delivery in every assignment order you paid with us! We ensure premium quality solution document along with free turntin report!

All rights reserved! Copyrights ©2019-2020 ExpertsMind IT Educational Pvt Ltd