EBK FIRST COURSE IN PROBABILITY, A
EBK FIRST COURSE IN PROBABILITY, A
10th Edition
ISBN: 9780134753683
Author: Ross
Publisher: VST
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Chapter 6, Problem 6.1P

Two fair dice are rolled. Find the joint probability mass function of X and Y when

a. X is the largest value obtained on any die and

Y is the sum of the values;

b. X is the value on the first die and

Y is the larger of the two values;

c. X is the smallest and

Y is the largest value obtained on the dice.

(a)

Expert Solution
Check Mark
To determine

To find: Joint probability mass function with X be the largest value Y be the sum of values.

Answer to Problem 6.1P

Joint probability mass function:

  P(X=k,Y=l)={236k<l<2k136l=2k

Explanation of Solution

Given information:

While rolling two fair dice,

X is the largest value obtained on any die.

Y is the sum of the values.

Let

N1 and N2 as the random variables that mark numbers obtained on the first and second die.

We know that

N1 and N2 are independent.

Such that

N1 , N2 ? D Unif(1,…,6).

In this part,

We have

  X=max(N1,N2)

And

  Y=N1+N2

Thus,

  X{1,...,6}

And

  Y{2,...,12}

Also,

We have

  X<Y almost certainly.

Then

Take any k<l ,

Where,

k and l are from the ranges of X and Y .

Consider event

  X=k,Y=l .

That means

The maximum value on any die is k .

And

The sum of both dice is l .

Now,

Observe that

If l<2k ,

The only possible pairs of (N1,N2) corresponding to the event are (l,lk) and (lk,k) .

If l=2k ,

The only possible pair is (k,k) .

Therefore,

The required probability mass function is

  P(X=k,Y=l)={236k<l<2k136l=2k

(b)

Expert Solution
Check Mark
To determine

To find: Joint probability mass function with X be the value on first die and Y be the larger value.

Answer to Problem 6.1P

Joint probability mass function:

  P(Y=l|X=k)P(X=k)={k36k=l136k<l

Explanation of Solution

Given information:

While rolling two fair dice,

X is the value on the first die.

Y is the larger of the two values.

Let

N1 and N2 as the random variables that mark numbers obtained on the first and second die.

We know that

N1 and N2 are independent.

In this part,

We have

  X=N1

And

  Y=max(N1,N2)

Then

Observe that

  {1,...,6}

And

  XY almost certainly.

Take any kl from the range {1,...,6}

Then

We have

  P(X=k,Y=l)=P(Y=l|X=k)P(X=k)

Suppose that

  k=l

We already have

  X=k

In such case,

N2 can be any number from the range 1,...,k to obtain the required Y=l .

Thus,

  P(Y=l|X=k)P(X=k)=k616=k36

If k<l ,

And

  X=k ,

N2 must be equal to l to obtain Y=l .

Thus,

  P(Y=l|X=k)P(X=k)=1616=136

(c)

Expert Solution
Check Mark
To determine

To find: Joint probability mass function with X be the smallest and Y be the largest value obtained.

Answer to Problem 6.1P

Joint probability mass function:

  P(X=k,Y=l)={236k<l136k=l

Explanation of Solution

Given information:

While rolling two fair dice,

X is the smallest value.

Y is the largest value.

Let

N1 and N2 as the random variables that mark numbers obtained on the first and second die.

We know that

N1 and N2 are independent.

In this part,

We have

  X=min(N1,N2)

And

  Y=max(N1,N2)

We also have

  XY almost certainly.

Then

Take any kl .

Suppose that

  k<l

In such case,

We need to have

  N1=k,N2=l

Or

  N1=l,N2=k

Thus,

There are only two possibilities.

  P(X=k,Y=l)=236

If k=l ,

The only possibility will be (N1,N2)=(k,k) .

Thus,

  P(X=k,Y=l)=136

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Chapter 6 Solutions

EBK FIRST COURSE IN PROBABILITY, A

Ch. 6 - In Example Id, verify that f(x,y)=2exe2y,0x,0y, is...Ch. 6 - The number of people who enter a drugstore in a...Ch. 6 - A man and a woman agree to meet at a certain...Ch. 6 - An ambulance travels back and forth at a constant...Ch. 6 - The random vector (X,Y) is said to be uniformly...Ch. 6 - Suppose that n points are independently chosen at...Ch. 6 - Prob. 6.17PCh. 6 - Let X1 and X2 be independent binomial random...Ch. 6 - Show that f(x,y)=1x, 0yx1 is a joint density...Ch. 6 - Prob. 6.20PCh. 6 - Let f(x,y)=24xy0x1,0y1,0x+y1 and let it equal 0...Ch. 6 - The joint density function of X and Y is...Ch. 6 - Prob. 6.23PCh. 6 - Consider independent trials, each of which results...Ch. 6 - Suppose that 106 people arrive at a service...Ch. 6 - Prob. 6.26PCh. 6 - Prob. 6.27PCh. 6 - The time that it takes to service a car is an...Ch. 6 - The gross daily sales at a certain restaurant are...Ch. 6 - Jills bowling scores are approximately normally...Ch. 6 - According to the U.S. National Center for Health...Ch. 6 - Monthly sales are independent normal random...Ch. 6 - Let X1 and X2 be independent normal random...Ch. 6 - Prob. 6.34PCh. 6 - Teams 1, 2, 3, 4 are all scheduled to play each of...Ch. 6 - Let X1,...,X10 be independent with the same...Ch. 6 - The expected number of typographical errors on a...Ch. 6 - The monthly worldwide average number of airplane...Ch. 6 - In Problem 6.4, calculate the conditional...Ch. 6 - In Problem 6.3 calculate the conditional...Ch. 6 - Prob. 6.41PCh. 6 - Prob. 6.42PCh. 6 - Prob. 6.43PCh. 6 - The joint probability mass function of X and Y is...Ch. 6 - Prob. 6.45PCh. 6 - Prob. 6.46PCh. 6 - An insurance company supposes that each person has...Ch. 6 - If X1,X2,X3 are independent random variables that...Ch. 6 - Prob. 6.49PCh. 6 - If 3 trucks break down at points randomly...Ch. 6 - Consider a sample of size 5 from a uniform...Ch. 6 - Prob. 6.52PCh. 6 - Let X(1),X(2),...,X(n) be the order statistics of...Ch. 6 - Let Z1 and Z2 be independent standard normal...Ch. 6 - Derive the distribution of the range of a sample...Ch. 6 - Let X and Y denote the coordinates of a point...Ch. 6 - Prob. 6.57PCh. 6 - Prob. 6.58PCh. 6 - Prob. 6.59PCh. 6 - Prob. 6.60PCh. 6 - Repeat Problem 6.60 when X and Y are independent...Ch. 6 - Prob. 6.62PCh. 6 - Prob. 6.63PCh. 6 - In Example 8b, let Yk+1=n+1i=1kYi. Show that...Ch. 6 - Consider an urn containing n balls numbered 1.. .....Ch. 6 - Suppose X,Y have a joint distribution function...Ch. 6 - Prob. 6.2TECh. 6 - Prob. 6.3TECh. 6 - Solve Buffons needle problem when LD.Ch. 6 - If X and Y are independent continuous positive...Ch. 6 - Prob. 6.6TECh. 6 - Prob. 6.7TECh. 6 - Let X and Y be independent continuous random...Ch. 6 - Let X1,...,Xn be independent exponential random...Ch. 6 - The lifetimes of batteries are independent...Ch. 6 - Prob. 6.11TECh. 6 - Show that the jointly continuous (discrete) random...Ch. 6 - In Example 5e t, we computed the conditional...Ch. 6 - Suppose that X and Y are independent geometric...Ch. 6 - Consider a sequence of independent trials, with...Ch. 6 - If X and Y are independent binomial random...Ch. 6 - Suppose that Xi,i=1,2,3 are independent Poisson...Ch. 6 - Prob. 6.18TECh. 6 - Let X1,X2,X3 be independent and identically...Ch. 6 - Prob. 6.20TECh. 6 - Suppose that W, the amount of moisture in the air...Ch. 6 - Let W be a gamma random variable with parameters...Ch. 6 - A rectangular array of mn numbers arranged in n...Ch. 6 - If X is exponential with rate , find...Ch. 6 - Suppose thatF(x) is a cumulative distribution...Ch. 6 - Show that if n people are distributed at random...Ch. 6 - Suppose that X1,...,Xn are independent exponential...Ch. 6 - Establish Equation (6.2) by differentiating...Ch. 6 - Show that the median of a sample of size 2n+1 from...Ch. 6 - Prob. 6.30TECh. 6 - Compute the density of the range of a sample of...Ch. 6 - Let X(1)X(2)...X(n) be the ordered values of n...Ch. 6 - Let X1,...,Xn be a set of independent and...Ch. 6 - Let X1,....Xn, be independent and identically...Ch. 6 - Prob. 6.35TECh. 6 - Prob. 6.36TECh. 6 - Suppose that (X,Y) has a bivariate normal...Ch. 6 - Suppose that X has a beta distribution with...Ch. 6 - 6.39. Consider an experiment with n possible...Ch. 6 - Prob. 6.40TECh. 6 - Prob. 6.41TECh. 6 - Each throw of an unfair die lands on each of the...Ch. 6 - The joint probability mass function of the random...Ch. 6 - Prob. 6.3STPECh. 6 - Let r=r1+...+rk, where all ri are positive...Ch. 6 - Suppose that X, Y, and Z are independent random...Ch. 6 - Let X and Y be continuous random variables with...Ch. 6 - The joint density function of X and Y...Ch. 6 - Consider two components and three types of shocks....Ch. 6 - Consider a directory of classified advertisements...Ch. 6 - The random parts of the algorithm in Self-Test...Ch. 6 - Prob. 6.11STPECh. 6 - The accompanying dartboard is a square whose sides...Ch. 6 - A model proposed for NBA basketball supposes that...Ch. 6 - Let N be a geometric random variable with...Ch. 6 - Prob. 6.15STPECh. 6 - You and three other people are to place bids for...Ch. 6 - Find the probability that X1,X2,...,Xn is a...Ch. 6 - 6.18. 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