Referring to Exercise 7, suppose that the standard deviation of the random deviation e is 350 psi. a. What is the probability that the observed value of 28-day strength will exceed 5000 psi when the value of accelerated strength is 2000? b. Repeat part (a) with 2500 in place of 2000. c. Consider making two independent observations on 28-day strength, the first for an accelerated strength of 2000 and the second for x = 2500. What is the probability that the second observation will exceed the first by more than 1000 psi? d. Let Y 1 , and Y 2 denote observations on 28-day strength when x = x 1 and .x = x 2 , respectively. By how much would x 2 have to exceed x 1 , in order that P ( Y 2 > Y 1 ) = .95?

Question

Want to see more full solutions like this?

Answer 1

Textbook Question

Chapter 12.1, Problem 8E

Referring to Exercise 7, suppose that the standard deviation of the random deviation e is 350 psi.

a. What is the probability that the observed value of 28-day strength will exceed 5000 psi when the value of accelerated strength is 2000?
b. Repeat part (a) with 2500 in place of 2000.
c. Consider making two independent observations on 28-day strength, the first for an accelerated strength of 2000 and the second for x = 2500. What is the probability that the second observation will exceed the first by more than 1000 psi?
d. Let Y₁, and Y₂ denote observations on 28-day strength when x = x₁ and .x = x₂, respectively. By how much would x₂ have to exceed x₁, in order that P(Y₂ > Y₁) = .95?

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

a.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

b.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

c.

Expert Solution

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

d.

Expert Solution

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33

Thus, the (x2−x1) is 626.33 when P(Y2>Y1)=0.95.

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

A major company in the Montreal area, offering a range of engineering services from project preparation to construction execution, and industrial project management, wants to ensure that the individuals who are responsible for project cost estimation and bid preparation demonstrate a certain uniformity in their estimates. The head of civil engineering and municipal services decided to structure an experimental plan to detect if there could be significant differences in project evaluation. Seven projects were selected, each of which had to be evaluated by each of the two estimators, with the order of the projects submitted being random. The obtained estimates are presented in the table below. a) Complete the table above by calculating: i. The differences (A-B) ii. The sum of the differences iii. The mean of the differences iv. The standard deviation of the differences b) What is the value of the t-statistic? c) What is the critical t-value for this test at a significance level of 1%?…

Compute the relative risk of falling for the two groups (did not stop walking vs. did stop). State/interpret your result verbally.

Microsoft Excel include formulas

Answer 2

Textbook Question

Chapter 12.1, Problem 8E

Referring to Exercise 7, suppose that the standard deviation of the random deviation e is 350 psi.

a. What is the probability that the observed value of 28-day strength will exceed 5000 psi when the value of accelerated strength is 2000?
b. Repeat part (a) with 2500 in place of 2000.
c. Consider making two independent observations on 28-day strength, the first for an accelerated strength of 2000 and the second for x = 2500. What is the probability that the second observation will exceed the first by more than 1000 psi?
d. Let Y₁, and Y₂ denote observations on 28-day strength when x = x₁ and .x = x₂, respectively. By how much would x₂ have to exceed x₁, in order that P(Y₂ > Y₁) = .95?

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

a.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

b.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

c.

Expert Solution

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

d.

Expert Solution

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33

Thus, the (x2−x1) is 626.33 when P(Y2>Y1)=0.95.

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!

Answer 3

Textbook Question

Chapter 12.1, Problem 8E

Referring to Exercise 7, suppose that the standard deviation of the random deviation e is 350 psi.

a. What is the probability that the observed value of 28-day strength will exceed 5000 psi when the value of accelerated strength is 2000?
b. Repeat part (a) with 2500 in place of 2000.
c. Consider making two independent observations on 28-day strength, the first for an accelerated strength of 2000 and the second for x = 2500. What is the probability that the second observation will exceed the first by more than 1000 psi?
d. Let Y₁, and Y₂ denote observations on 28-day strength when x = x₁ and .x = x₂, respectively. By how much would x₂ have to exceed x₁, in order that P(Y₂ > Y₁) = .95?

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

a.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

b.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

c.

Expert Solution

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

d.

Expert Solution

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33

Thus, the (x2−x1) is 626.33 when P(Y2>Y1)=0.95.

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!

Answer 4

Textbook Question

Chapter 12.1, Problem 8E

Referring to Exercise 7, suppose that the standard deviation of the random deviation e is 350 psi.

a. What is the probability that the observed value of 28-day strength will exceed 5000 psi when the value of accelerated strength is 2000?
b. Repeat part (a) with 2500 in place of 2000.
c. Consider making two independent observations on 28-day strength, the first for an accelerated strength of 2000 and the second for x = 2500. What is the probability that the second observation will exceed the first by more than 1000 psi?
d. Let Y₁, and Y₂ denote observations on 28-day strength when x = x₁ and .x = x₂, respectively. By how much would x₂ have to exceed x₁, in order that P(Y₂ > Y₁) = .95?

Features Features Normal distribution is characterized by two parameters, mean (µ) and standard deviation (σ). When graphed, the mean represents the center of the bell curve and the graph is perfectly symmetric about the center. The mean, median, and mode are all equal for a normal distribution. The standard deviation measures the data's spread from the center. The higher the standard deviation, the more the data is spread out and the flatter the bell curve looks. Variance is another commonly used measure of the spread of the distribution and is equal to the square of the standard deviation.

a.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

b.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

c.

Expert Solution

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

d.

Expert Solution

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33

Thus, the (x2−x1) is 626.33 when P(Y2>Y1)=0.95.

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!

Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

a.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

b.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

c.

Expert Solution

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

d.

Expert Solution

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33

Thus, the (x2−x1) is 626.33 when P(Y2>Y1)=0.95.

Answer 8

a.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength.

Answer 13

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Answer 14

Explanation of Solution

Given info:

The regression line corresponding to the variables 28-day strength (y) and accelerated strength (x) is y=1800+1.3x. The unit of measurement for both the variables is (psi) and the standard deviation of the variable 28-day strength is 350 psi.

Calculation:

Linear equation:

The general form of linear equation with one independent random variable is given as,

y=β0+β1x

Where β0 and β1 are constants, x is the independent variable and y is the dependent variable. Here β0 be the y-intercept of the linear equation and β1 be the slope of the linear equation.

Assume x be the predictor variable and y be the response variable, of a regression analysis. Then, the predicted or expected value of the response variable is y^E=β0+β1xE, where xE be particular value of predictor variable x.

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2000 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2000 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2000=4400

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 4400.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−4400350>5000−4400350)=P(Y−μyσy>5000−4400350)=P(Z>1.71)=1−P(Z≤1.71)

=1−Φ(1.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 1.71 area to the right is 0.9564.

Therefore, the probability value is,

P(Y>5000)=1−Φ(1.71)=1−0.9564=0.0436

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2000 psi accelerated strength is 0.0436.

Answer 15

b.

Expert Solution

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

To determine

Find the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength.

Answer 20

Answer to Problem 8E

The probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Answer 21

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that the observed value of 28-day strength will exceed 5000 psi when the accelerated strength is 2500 psi, the expected mean and standard deviation of the variable 28-day strength is necessary to apply normal approximation for the random variable 28-day strength.

Expected mean:

The expected mean of 28-day strength for 2500 accelerated strength is obtained as follows:

μy=1800+1.3x=1800+1.3×2500=5050

Thus, the expected mean of 28-day strength for 2000 accelerated strength is 5050.

Standard deviation:

The standard deviation of the variable 28-day strength is,

σy=350 psi.

Desired probability value:

The probability that the observed value of 28-day strength will exceed 5000 psi is obtained as follows:

P(Y>5000)=P(Y−5050350>5000−5050350)=P(Y−μyσy>5000−5050350)=P(Z>−0.14)=1−P(Z≤−0.14)

=1−Φ(−0.14)=1−(1−Φ(0.14))=Φ(0.14)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.14 area to the right is 0.5557.

Therefore, the probability value is,

P(Y>5000)=Φ(0.14)=0.5557

Thus, the probability that the observed value of 28-day strength will exceed 5000 psi for 2500 psi accelerated strength is 0.5557.

Answer 22

c.

Expert Solution

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Answer 23

c.

Expert Solution

Answer 24

c.

Expert Solution

Answer 25

Expert Solution

Answer 26

To determine

Find the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi.

Answer 27

Answer to Problem 8E

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Answer 28

Explanation of Solution

Given info:

Two independent observations are made on the variable 28-day strength. The first observation of 28-day strength is with 2000 psi accelerated strength and the second observation of 28-day strength is with 2500 psi accelerated strength.

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

To obtain the probability that, the second observation of 28-day strength will exceed the first observation by more than 1000 psi, the expected mean and standard deviation of the of difference between the observations of the variable 28-day strength is necessary to apply normal approximation for the random difference of two observations of the variable 28-day strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is 2000 psi and Y2 be the observation of 28-day strength when the accelerated strength is 2500 psi.

Therefore, Y2−Y1 be the difference between second observation and first observation.

From part (b), the expected mean of Y2 is μy2=5050 and from part (a), the expected mean of Y1 is μy1=4400.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=5050−4400=650

Thus, the expected mean of Y2−Y1 is 650.

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From the properties of covariance, the covariance between two independent variables is “0”.

Standard deviation:

The variance of Y2−Y1 is,

V(Y2−Y1)=V(Y2)+V(Y1)−2×cov(Y2,Y1)=(350)2+(350)2−0=245,0000

The general formula for standard deviation is,

S.D(Y2−Y1)=V(Y2−Y1)=245,000=494.97

Thus, the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is obtained as follows:

P(Y2−Y1>1000)=P((Y2−Y1)−650494.97>1000−650494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−650494.97)=P(Z>0.71)=1−P(Z≤0.71)

=1−Φ(0.71)

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to 0.71 area to the right is 0.7611.

Therefore, the probability value is,

P(Y2−Y1>1000)=1−Φ(0.71)=1−0.7611=0.2389

Thus, the probability that the second observation of 28-day strength will exceed the first observation by more than 1000 psi is 0.2389.

Answer 29

d.

Expert Solution

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33

Thus, the (x2−x1) is 626.33 when P(Y2>Y1)=0.95.

Answer 30

d.

Expert Solution

Answer 31

d.

Expert Solution

Answer 32

Expert Solution

Answer 33

To determine

Find the value of (x2−x1) in case of P(Y2>Y1)=0.95

Answer 34

Answer to Problem 8E

In case of P(Y2>Y1)=0.95 the value of (x2−x1) is 626.33.

Answer 35

Explanation of Solution

Calculation:

Here, the regression equation is y=1800+1.3x. Where y represents the variable 28-day strength and x represents the variable accelerated strength.

Let Y1 be the observation of 28-day strength when the accelerated strength is x=x1 and Y2 be the observation of 28-day strength when the accelerated strength is x=x2.

Therefore, Y2−Y1 be the difference between second observation and first observation.

Expected mean of Y2−Y1:

The expected mean of Y2−Y1 is obtained as follows:

μy2−y1=μy2−μy1=1800+1.3x2−(1800+1.3x1)=1.3(x2−x1)

Thus, the expected mean of Y2−Y1 is 1.3(x2−x1).

Here, Y1 and Y2 are independent and the standard deviation of both the variable is 350 psi.

From part (c), the standard deviation of Y2−Y1 is 494.97.

Desired probability value:

The probability that the second observation of 28-day strength will exceed the first observation is,

P(Y2−Y1>0)=P((Y2−Y1)−1.3(x2−x1)494.97>1000−1.3(x2−x1)494.97)=P((Y2−Y1)−μ(y2−y1)σ(y2−y1)>1000−1.3(x2−x1)494.97)=P(Z>1000−1.3(x2−x1)494.97)

The probability that the second observation exceeds the first observation is 0

.95.

The value of (x2−x1) is obtained as follows:

P(Y2−Y1>0)=P(Z>1000−1.3(x2−x1)494.97)=0.95

From Table A.3 of the standard normal distribution in Appendix , the critical value corresponding to left side of probability value 0.95 to the right is -1.645.

Therefore, the (x2−x1) value is,

1000−1.3(x2−x1)494.97=−1.6451000−1.3(x2−x1)=−814.2257−1.3(x2−x1)=−1814.2257(x2−x1)=626.33