PROBABILITY & STATS FOR ENGINEERING &SCI
PROBABILITY & STATS FOR ENGINEERING &SCI
9th Edition
ISBN: 9781285099804
Author: DEVORE
Publisher: CENGAGE L
bartleby

Videos

Textbook Question
Book Icon
Chapter 6.1, Problem 4E

The article from which the data in Exercise 1 was extracted also gave the accompanying strength observations for cylinders:

Chapter 6.1, Problem 4E, The article from which the data in Exercise 1 was extracted also gave the accompanying strength

Prior to obtaining data, denote the beam strengths by X1,..., Xm and the cylinder strengths by Y1, ..., Yn. Suppose that the Xi’s constitute a random sample from a distribution with mean μ1 and standard deviation σ1 and that the Yi’s form a random sample (independent of the Xi’s) from another distribution with mean μ2 and standard deviation σ2.

  1. a. Use rules of expected value to show that X ¯ - Y ¯ is an unbiased estimator of μ1 – μ2. Calculate the estimate for the given data.
  2. b. Use rules of variance from Chapter 5 to obtain an expression for the variance and standard deviation (standard error) of the estimator in part (a), and then compute the estimated standard error.
  3. c. Calculate a point estimate of the ratio σ12 of the two standard deviations.
  4. d. Suppose a single beam and a single cylinder are randomly selected. Calculate a point estimate of the variance of the difference XY between beam strength and cylinder strength.

a.

Expert Solution
Check Mark
To determine

Show that X¯Y¯ is an unbiased estimator of μ1μ2.

Find the point estimate of the population mean for the data.

Answer to Problem 4E

A point estimate of the population mean for the data is –0.434.

Explanation of Solution

Given info:

Reference- Exercise 1: The data gives 20 sample observations for cylinders. The sample beam strengths are denoted by X1,X2,...,Xm, taken from a distribution with mean μ1 and standard deviation σ1. The cylinder strengths are denoted by Y1,Y2,...,Yn, taken from a distribution with mean μ2 and standard deviation σ2. The two distributions are independent.

Calculation:

The sample means for beam strengths and cylinder strengths are respectively X¯ and Y¯.

An estimator is considered as an unbiased estimator, if and only if the expected value of the estimator is equal to the population characteristic it is estimating.

It is known that the sample mean is an unbiased estimator of the population mean. As a result, X¯ and Y¯ are unbiased estimators of μ1 and μ2 respectively, that is,

E(X¯)=μ1 and E(Y¯)=μ2.

Consider the expectation of X¯Y¯.

E(X¯Y¯)=E(X¯)E(Y¯)  (by sum law of expectation)=μ1μ2.

Hence, X¯Y¯ is an unbiased estimator of μ1μ2.

From Exercise 1, X¯=8.141.

Now, sample mean,

y¯=1mi=1myi.

For the data on cylinder strengths,

y¯=120i=120yi.

The following table shows the calculation for i=120yi:

yi
6.1
5.8
7.8
7.1
7.2
9.2
6.6
8.3
7.0
8.3
7.8
8.1
7.4
8.5
8.9
9.8
9.7
14.1
12.6
11.2
i=120yi=171.5

Thus,

y¯=120i=120yi=120×(171.5)=8.575.

Hence, a point estimate of the population mean for the data is:

X¯Y¯=8.1418.575=0.434_.

b.

Expert Solution
Check Mark
To determine

Find an expression for the variance and standard deviation (standard error) of the estimator in part a.

Calculate the estimated standard error.

Answer to Problem 4E

An expression for the variance of the estimator in part a is V(X¯Y¯)=σ21m+σ22n_.

An expression for the standard deviation (standard error) of the estimator in part a is σX¯Y¯=σ21m+σ22n_.

The estimated standard error is 0.5691.

Explanation of Solution

Calculation:

Consider the variance of the estimator in part a, that is, X¯Y¯.

V(X¯Y¯)=V(X¯)+V(Y¯)  (due to independence of the two distributions)=σ2X¯+σ2Y¯.

For a sample of size m, the variance of the mean x¯ is:

σ2X¯=σ2m

where σ2 is the variance of X.

Thus,

V(X¯Y¯)=σ2X¯+σ2Y¯=σ21m+σ22n.

Hence, the variance of the estimator in part a is:

V(X¯Y¯)=σ21m+σ22n_.

The corresponding standard deviation is:

σX¯Y¯=V(X¯Y¯)=σ21m+σ22n.

Thus, an expression for the standard deviation (standard error) of the estimator in part a is:

σX¯Y¯=σ21m+σ22n_.

For a sample of size m from a normally distributed random variable, the standard error of the mean x¯ is estimated as:

σ^X¯=sX¯=sm,

where s is the sample standard deviation of the observations of X. A point estimate of the population standard deviation is the sample standard deviation.

From Exercise 1, s1=1.663.

Now, sample variance is:

s2=1m1(i=1mxix¯)2=1m1(i=1mxi2mx¯2).

For the data,

s22=1201(i=120yi220x¯2)2=119(i=120yi2(20×(8.575)2))=119(i=120yi21,470.6125).

The following table shows the calculation for i=120yi2:

yiyi2
6.137.21
5.833.64
7.860.84
7.150.41
7.251.84
9.284.64
6.643.56
8.368.89
7.049.0
8.368.89
7.860.84
8.165.61
7.454.76
8.572.25
8.979.21
9.896.04
9.794.09
14.1198.81
12.6158.76
11.2125.44
Totali=120yi2=1,554.73

Thus,

s22=119(i=120yi229.08)=119(1,554.731,470.6125)=84.117519=4.4272.

Thus, the estimated standard error is:

σ^X¯Y¯=s21m+s22n=(1.663)227+4.427220=0.1025+0.2214=0.3239

=0.5691_.

c.

Expert Solution
Check Mark
To determine

Find a point estimate of the ratio σ1σ2 of the two standard deviations.

State the estimator used.

Answer to Problem 4E

A point estimate of the ratio σ1σ2 of the two standard deviations is 0.7904.

Explanation of Solution

Calculation:

A point estimate of the population standard deviation is the sample standard deviation. As a result, a point estimate of the ratio σ1σ2 is:

σ^1σ^2=s1s2.

From part b, s1=1.663. s1=1.663 and s22=4.4272. Thus,

s2=s22=4.4272=2.104.

Hence, a point estimate of the ratio σ1σ2 of the two standard deviations is:

s1s2=1.6632.104=0.7904_.

d.

Expert Solution
Check Mark
To determine

Find a point estimate of the variance of the difference XY between beam strength and cylinder strength, if a single beam and a single cylinder are randomly selected.

Answer to Problem 4E

A point estimate of the variance of the difference XY between beam strength and cylinder strength, when a single beam and a single cylinder are randomly selected is 7.1928.

Explanation of Solution

Calculation:

For independent random variables X and Y, it is known that:

V(XY)=V(X)+V(Y).

Here, V(X)=σ21 and V(Y)=σ22.

A point estimate of the variance of X is σ^21=s21. A point estimate of the variance of Y is σ^22=s22.

Thus, a point estimate of the variance of the difference XY between beam strength and cylinder strength, when a single beam and a single cylinder are randomly selected is:

V(X+Y)^=V(X)^+V(Y)^=σ^21+σ^22=(1.663)2+4.4272=2.7656+4.4272

     =7.1928_.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!
Students have asked these similar questions
Let Y₁, Y2, ..., Yn be a random sample from a population with a Gamma distribution with parameters a = 3 and unknown. Find the Minimum Variance Unbiased Estimator for B. Show your work, and explain how you know your estimator is the MVUE.
Two independent samples have 28 and 19 pairs of observations with correlation co efficients 0.55 and 0.75 respectively. Are these values of r consistent with the hypothesis that both the samples are drawn from the same population?
Let X1, X2,...Xn be a random sample from a Poisson distribution with variance 0. Find an unbiased estimator for Pe(X=0).

Chapter 6 Solutions

PROBABILITY & STATS FOR ENGINEERING &SCI

Ch. 6.1 - Of n1 randomly selected male smokers, X1 smoked...Ch. 6.1 - Suppose a certain type of fertilizer has an...Ch. 6.1 - Consider a random sample X1,..., Xn from the pdf...Ch. 6.1 - A sample of n captured Pandemonium jet fighters...Ch. 6.1 - Let X1, X2,..., Xn represent a random sample from...Ch. 6.1 - Suppose the true average growth of one type of...Ch. 6.1 - In Chapter 3, we defined a negative binomial rv as...Ch. 6.1 - Let X1, X2,..., Xn be a random sample from a pdf...Ch. 6.1 - An investigator wishes to estimate the proportion...Ch. 6.2 - A diagnostic test for a certain disease is applied...Ch. 6.2 - Let X have a Weibull distribution with parameters ...Ch. 6.2 - Let X denote the proportion of allotted time that...Ch. 6.2 - Let X represent the error in making a measurement...Ch. 6.2 - A vehicle with a particular defect in its emission...Ch. 6.2 - The shear strength of each of ten test spot welds...Ch. 6.2 - Consider randomly selecting n segments of pipe and...Ch. 6.2 - Let X1,..., Xn be a random sample from a gamma...Ch. 6.2 - Prob. 28ECh. 6.2 - Consider a random sample X1, X2,, Xn from the...Ch. 6.2 - At time t = 0, 20 identical components are tested....Ch. 6 - An estimator is said to be consistent if for any ...Ch. 6 - a. Let X1,.., Xn be a random sample from a uniform...Ch. 6 - At time t = 0, there is one individual alive in a...Ch. 6 - The mean squared error of an estimator is MSE ()...Ch. 6 - Prob. 35SECh. 6 - When the population distribution is normal, the...Ch. 6 - When the sample standard deviation S is based on a...Ch. 6 - Each of n specimens is to be weighed twice on the...
Knowledge Booster
Background pattern image
Statistics
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, statistics and related others by exploring similar questions and additional content below.
Similar questions
SEE MORE QUESTIONS
Recommended textbooks for you
Text book image
Glencoe Algebra 1, Student Edition, 9780079039897...
Algebra
ISBN:9780079039897
Author:Carter
Publisher:McGraw Hill
Hypothesis Testing using Confidence Interval Approach; Author: BUM2413 Applied Statistics UMP;https://www.youtube.com/watch?v=Hq1l3e9pLyY;License: Standard YouTube License, CC-BY
Hypothesis Testing - Difference of Two Means - Student's -Distribution & Normal Distribution; Author: The Organic Chemistry Tutor;https://www.youtube.com/watch?v=UcZwyzwWU7o;License: Standard Youtube License