USE R CODE In a certain population, systolic blood pressure (X) follows a normal distribution with a mean of 110 and standard deviation of 12.
(a) What is the probability of systolic blood pressure below 105?
(b) What is the probability that the absolute average systolic blood pressure of 35 individuals is less than 112.5?

Answers

Answer 1

The z score is given as 1.23

How to get the probability

For a normal distribution, the probability that the value of a random observation is less than X is given by the CDF at the z-score corresponding to X.

Let's calculate this:

z = (105 - 110) / 12 = -0.41667

Now, we look up this z-score in the standard normal distribution. Since this value will be negative (because 105 is less than the mean, 110), we find the probability that a standard normal random variable is less than -0.41667, or equivalently, the probability that it is greater than 0.41667 due to symmetry of the normal distribution.

From the standard normal distribution table or from software computations, this probability is approximately 0.3383. So, the probability that a randomly chosen individual has a systolic blood pressure less than 105 is approximately 0.3383 or 33.83%.

(b) The average of any set of independent and identically distributed (i.i.d.) random variables also follows a normal distribution. The mean of this distribution is the same as the mean of the individual variables, and the standard deviation is the standard deviation of the individual variables divided by the square root of the number of variables (this is known as the standard error).

In this case, the mean of the distribution of the average systolic blood pressure of 35 individuals is still 110, but the standard error is now 12 / sqrt(35) ≈ 2.03.

We can now proceed as in part (a) to find the probability that the average systolic blood pressure of 35 individuals is less than 112.5.

z = (112.5 - 110) / 2.03 ≈ 1.23

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Related Questions

Use (8), f() to evaluate the given inverse transform. (Write your answer as a function of t.) Soʻrzy dr = 5*{F9)}, p"}{515-1)} X eBook

Answers

The evaluation of the given inverse transform using (8), f() is:

f(t) = 5*{F9)}, p"}{515-1)} X eBook"

To evaluate the given inverse transform, we need to substitute the given expression into the function f(t) and simplify it.

Replace "{F9)}, p"}{515-1)}" with its value

f(t) = 5*"{F9)}, p"}{515-1)} X eBook"

Simplify the expression

The specific details of "{F9)}, p"}{515-1)}" and "X eBook" are not provided, so we cannot determine their values or operations. Therefore, we cannot further simplify the expression at this point.

Without knowing the specific values of "{F9)}, p"}{515-1)}" and "X eBook" or the operations involved, it is not possible to provide a more accurate evaluation of the inverse transform. It is important to have complete information to perform the calculation accurately.

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A solution is made from 49.3 g KNO3 and 178 g H₂O. How many grams of water must evaporate to give a saturated solution of KNO3 in water at 20°C? g H₂O must be evaporated.

Answers

109.8 grams of H₂O must be evaporated from the initial solution to form a saturated solution of KNO₂ in water at 20°C.

A solution is made from 49.3 g KNO₃ and 178 g H₂O.

A solution made from 49.3 g of KNO₃ and 178 g of H₂O is provided.

First and foremost, determine how much KNO3 will dissolve in 178 g of H₂O at 20°C.

The solubility of KNO₃ at 20°C is 31 g per 100 g of H₂O.

Since we have 178 g of water, we can calculate how much KNO₃ will dissolve in that much water as follows:

178g H₂O × (31 g KNO3/100 g H₂O) = 55.18 g KNO₃

Next,

use this information to figure out how much KNO₃ is required to form a saturated solution with 178 g of water.

Since we already have 49.3 g of KNO₃ in the solution,

we must add:

55.18 g KNO₃ - 49.3 g KNO₃ = 5.88 g KNO₃

So, 5.88 g of KNO₃ is added to 178 g of water to form a saturated solution at 20°C.

To obtain this saturated solution, we need to evaporate some water out of the original solution.

The mass of water we need to evaporate can be calculated as follows:

Mass of H₂O that must evaporate = Mass of initial H₂O - Mass of H₂O in saturated solution

Mass of H₂O that must evaporate = 178 g - (55.18 g KNO₃ / 31 g KNO₃/100 g H₂O × 100 g H₂O)

= 109.8 g H₂O

Therefore, 109.8 grams of H₂O must be evaporated from the initial solution to form a saturated solution of KNO₃ in water at 20°C.

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Suppose that a matrix A has the characteristic polynomial (A + 1)³ (a λ + λ² + b) for some a, b = R. If the trace of A is 4 and the determinant of A is -6, find all eigenvalues of A. (a) Enter the eigenvalues as a list in increasing order, including any repetitions. For example, if they are 1,1,0 you would enter 0,1,1: (b) Hence determine a: 1 (c) and b: 1

Answers

a) Since the eigenvalues have to be entered in increasing order, the required list is[tex]{-1,-1,-1,1-3^(1/2)i,1+3^(1/2)i}[/tex]

(b) a = 1

(c) b = 1

Given that the matrix A has the characteristic polynomial:

    (A + 1)³ (a λ + λ²+ b) for some a, b = R.

And, the trace of A is 4 and the determinant of A is -6.

To find: All the eigenvalues of A.

Solution:

Trace of a matrix = Sum of all the diagonal elements of a matrix.

=> Trace of matrix A = λ1 + λ2 + λ3,

  where λ1, λ2, λ3 are the eigenvalues of matrix A.

=> 4 = λ1 + λ2 + λ3 ...(1)

Determinant of a 3 × 3 matrix is given by:

|A| = λ1 λ2 λ3  

    = -6

From the characteristic polynomial, the eigenvalues are -1, -1, -1, -a, -b/λ.

As -1 is an eigenvalue of multiplicity 3, this means that

λ1 = -1

λ2 = -1

λ3 = -1.

The product of eigenvalues is equal to the determinant of the matrix A.

=> λ1 λ2 λ3 = -1 × -1 × -1

                 = -1

So,

     -a × (-b/λ) = -1

=> a = -b/λ ....(2)

Substitute λ = -1 in (2), we get

              a = b

We know, eigenvalues of a matrix are the roots of the characteristic equation of the matrix.

=> Characteristic polynomial = det(A - λ I)

where, I is the identity matrix of order 3.

|A - λ I| = [(A + I)³][(λ² + a λ + b)]

Putting λ = -1|A - (-1) I|

              = [(A + I)³][(1 + a - b)]

Now, |A - (-1) I| = det(A + I)

                       = (-1)³ det(A - (-1) I)

                        = -det(A + I)

                        = - [(A + I)³][(1 + a - b)]|A - (-1) I|

                        = -[(A + I)³][(a - b - 1)]

We know that the product of eigenvalues is equal to the determinant of matrix A.

=> λ1 λ2 λ3 = -6

=> (-1)³ (-a) (-b/λ) = -6

=> a b = -6

Thus, from equations (1) and (2), we have

a = 1.

b = 1.

Therefore, the characteristic polynomial is (λ + 1)³(λ² + λ + 1).

Hence, the eigenvalues of the matrix A are -1, -1, -1, (1 ± √3 i)

Since the eigenvalues have to be entered in increasing order, the required list is[tex]{-1,-1,-1,1-3^(1/2)i,1+3^(1/2)i}[/tex]

Answer: (a) Eigenvalues of A =[tex]{-1,-1,-1,1-3^(1/2)i,1+3^(1/2)i}[/tex]

              (b) a = 1 (c) b = 1

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please show all work
Add and Subtract Rationals - Assess It < > Algebra II -S2-MI / Rationals and Radicals/Lesson 115 Jump to: SUBMISSION DATTACHMENTS OBJECTIVES Objective You will add and/or subtract rational expressions

Answers

The answer to the question is that you need to add and/or subtract rational expressions. When adding or subtracting domain rational

expressions, you first need to make sure the denominators are the same.

To do this, you need to find the least common multiple (LCM) of the two denominators.To add the rational expressions with the same denominator, you simply add the numerators.

However, when the denominators are different, you first need to find the LCD of the rational expressions. Then, you need to create equivalent

fractions with the LCD and add the numerators. Finally, you simplify the resulting fraction.To subtract rational expressions with the same

denominator, you simply subtract the numerators. However, when the denominators are different, you first need to find the LCD of the rational

expressions. Then, you need to create equivalent fractions with the LCD and subtract the numerators. Finally, you simplify the resulting fraction.In

summary, adding and subtracting rational expressions requires finding the LCD, creating equivalent fractions, adding or subtracting the numerators, and simplifying the resulting fraction.

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Q2 but same problem: If we unmatched the pairs, how many participants would be in cell a, cell b, cell c and cell d? A matched-pair case-control study was conducted in order to assess if there is a relationship between serum Vitamin D levels and migraine headaches.The results are shown below: Control Control With migraline No Migraine (CascHich Vitamin D 22 49 (CaseLow Viamin D 36 18 What is the result of the matched-pair odds ratio? Ansiver should be innmerical fonn.Avoid extra spaces before and after your ansivers.Ansiver should be in tvo decimal places Enter your answer into the box

Answers

If we assume missing values as zero, the number of participants in each cell would be as follows: Cell A would have 22 participants, cell b would have 49 participants, cell c would have 36 participants and cell d would have 18 participants.

Assuming missing values are zero, we can determine the number of participants in each cell:

Cell a: Control, No Migraine, High Vitamin D - 22 participants

Cell b: Control, No Migraine, Low Vitamin D - 49 participants

Cell c: Control, With Migraine, High Vitamin D - 36 participants

Cell d: Control, With Migraine, Low Vitamin D - 18 participants

These numbers represent the counts of participants based on the given information. In a matched-pair case-control study, participants are paired based on certain characteristics or factors. In this study, the pairs were formed to match individuals with and without migraine headaches within the control group, and their corresponding vitamin D levels were recorded.

The cells indicate the combinations of migraine status and vitamin D levels for the control group. By assuming missing values as zero, we are making the assumption that there are no additional participants in those particular cells.

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2- Customers entering Larry's store come in at a rate of λ per hour, according to a Poisson distribution. If the probability of a sale made to any one customer is p, find:
a) The probability that Larry makes no sales on any given week.
b) The expectation of sales being made from Larry's store.

Answers

customers enter Larry's store at a rate of λ per hour, following a Poisson distribution, and the probability of making a sale to any one customer is p, we can calculate the probability of Larry making no sales on any given week and the expectation of sales being made from his store.

To find the probability that Larry makes no sales on any given week, we need to consider the number of customers entering the store during that week. Since customers enter at a rate of λ per hour, the average number of customers in a week can be calculated by multiplying λ by the number of hours in a week. Let's denote this average number as μ. The probability of making no sales to any individual customer is (1-p). As the number of customers follows a Poisson distribution, the probability of making no sales on any given week is given by P(X=0), where X is the number of customers in a week following a Poisson distribution with parameter μ.

The expectation of sales being made from Larry's store can be calculated by multiplying the average number of customers in a week, μ, by the probability of making a sale to any one customer, p. This gives us the expected number of sales made from Larry's store in a week.

In conclusion, to calculate the probability of no sales on any given week, we use the Poisson distribution with the average number of customers, μ. To find the expectation of sales, we multiply the average number of customers, μ, by the probability of making a sale, p. These calculations provide insights into the likelihood of sales in Larry's store and help estimate the expected number of sales in a given week.

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Suppose f"(x) = -4 sin(2x) and f'(0) = -3, and f(0) = 2.
f(1/3)=

Answers

The value of f(1/3) is approximately 1.303. This can be determined by integrating the given second derivative of f(x) and using the initial conditions f(0) = 2 and f'(0) = -3.

We integrate f(x) to get the given second derivative -4sin(2x) twice. Integrating -4sin(2x) once gives us -2cos(2x) + C₁, where C₁ is a constant of integration. Integrating again gives us -2sin(2x) + C₂x + C₃, where C₂ and C₃ are constants of integration.

Using the initial condition f(0) = 2, we can substitute x = 0 into the equation above, yielding -2sin(0) + C₂(0) + C₃ = 2. Simplifying, we find C₃ = 2. Next, we differentiate -2sin(2x) + C₂x + 2 with respect to x to find the first derivative, f'(x). We obtain -4cos(2x) + C₂.

Using the initial condition f'(0) = -3, we can substitute x = 0 into the equation above, resulting in -4cos(0) + C₂ = -3. Simplifying, we find C₂ = -3. Finally, we substitute C₂ = -3 and C₃ = 2 into our equation for f(x), giving us f(x) = -2sin(2x) - 3x + 2. To find f(1/3), we substitute x = 1/3 into the equation above, giving us f(1/3) ≈ -2sin(2/3) - 3/3 + 2. The expression yields f(1/3) ≈ 1.303.

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a) Describe the major distinction between regression and classification problems under Supervised machine learning. b) Explain what overfitting is and how it affects a machine learning model. (2) c) When using big data, a number of prior tasks such as data preparation and wrangling as well as exploration are required to improve the ML model building and training. Outline the 3 tasks of ML model training when using Big data projects.

Answers

Model building: This step involves selecting the right machine learning algorithm, setting up its parameters, and training it on the prepared data.Model evaluation and deployment: This step involves validating the model performance on the test data and optimizing it. Once the model is optimized, it can be deployed for real-time usage.

a) Major distinction between regression and classification problems under Supervised machine learningSupervised machine learning is divided into two broad categories namely Regression and Classification. The major distinction between the two is that the output variable of regression is numerical in nature whereas, the output variable of the classification is categorical.b) Overfitting is the phenomenon when a model learns the training data by heart but fails to perform on the unseen test data. Overfitting leads to poor generalization of the model. Overfitting happens when the model is too complex and tries to fit every data point of the training set resulting in high accuracy for training data but low accuracy for test data. It is prevented by using regularization techniques such as L1 and L2 regularization, dropout, early stopping, etc.c) The three tasks of ML model training when using big data projects are:Data preparation: This step involves collecting, cleaning, integrating, and transforming the data to make it ready for machine learning model building. This step also involves feature engineering and selection.Model building: This step involves selecting the right machine learning algorithm, setting up its parameters, and training it on the prepared data.Model evaluation and deployment: This step involves validating the model performance on the test data and optimizing it. Once the model is optimized, it can be deployed for real-time usage.

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strum-liouville problem

y''+2y'+y=0 , y(0)=0, y(1)=0

a) find eigenfunction yn and eigenvalue

b) transform the given equation to self-adjoint form and find weight-function p(x)

c)show that egienfunction yn orthogonal to weight function p(x) and find square norm of yn

Answers

The Sturm-Liouville problem y'' + 2y' + y = 0 with boundary conditions y(0) = 0 and y(1) = 0 has eigenfunctions yn = 0 and eigenvalues λn = 0.

The equation is already in self-adjoint form, with the weight function p(x) = 1, and the eigenfunctions are orthogonal with a square norm of 0.

To solve the Sturm-Liouville problem y'' + 2y' + y = 0 with boundary conditions y(0) = 0 and y(1) = 0, we can follow these steps:

a) Find the eigenfunctions and eigenvalues:

Assume the solution has the form y(x) = yn(x), where n is an integer. Substitute this into the differential equation to obtain yn'' + 2yn' + yn = 0. The general solution to this equation is yn(x) = C1e^(-x) + C2xe^(-x), where C1 and C2 are constants. Applying the boundary conditions, we find that C1 = 0 and C2 = 0. Therefore, the eigenfunction is yn(x) = 0 for all n, and the eigenvalue is λn = 0 for all n.

b) Transform the equation to self-adjoint form and find the weight function:

To transform the equation to self-adjoint form, we multiply the equation by a weight function p(x). In this case, p(x) = 1. Multiplying the equation by p(x), we get y'' + 2y' + y = 0. This is already in self-adjoint form, as the coefficients of y'' and y' are equal.

c) Show orthogonality and find the square norm of eigenfunctions:

Since the eigenfunction yn(x) is zero for all n, it is orthogonal to the weight function p(x) = 1. The square norm of the eigenfunction yn(x) is given by ||yn||^2 = ∫[0,1] yn^2(x)p(x)dx = ∫[0,1] 0^2 dx = 0.

In summary, for the given Sturm-Liouville problem, the eigenfunction yn(x) is zero for all n and the eigenvalue is λn = 0 for all n. The equation is already in self-adjoint form, and the weight function is p(x) = 1. The eigenfunctions are orthogonal to the weight function, and their square norm is zero.

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a. State the hypotheses and identify the claim.

b. Find the critical value(s).

c. Compute the test value.

d. Make the decision.

e. Summarize the results.

Use the traditional method of hypothesis testing unless otherwise specified.

Family Incomes

The average income of 15 families who reside in a large metropolitan East Coast city is $62,456. The standard deviation is $9652. The average income of 11 families who reside in a rural area of the Midwest is $60,213, with a standard deviation of $2009. At
α
= 0.05, can it be concluded that the families who live in the cities have a higher income than those who live in the rural areas? Use the P-value method.

Answers

Based on the results of the hypothesis test using the P-value method, there is not enough evidence to suggest that families living in cities have a higher income than those living in rural areas.

In hypothesis testing, we aim to draw conclusions about a population based on sample data. In this case, we are comparing the average incomes of families residing in a large metropolitan East Coast city and those living in a rural area of the Midwest.

State the hypotheses and identify the claim.

The null hypothesis (H0) states that there is no significant difference between the average incomes of the two groups. The alternative hypothesis (Ha) claims that the average income of families in the city is higher than that of families in rural areas.

H0: μ1 ≤ μ2 (The average income of city families is less than or equal to the average income of rural families)

Ha: μ1 > μ2 (The average income of city families is greater than the average income of rural families)

Find the critical value(s).

Since we are utilizing the P-value method, we don't need to determine critical values.

Compute the test value.

To calculate the test value, we utilize the formula for the test statistic:

t = (x1 - x2) / sqrt((s1^2 / n1) + (s2^2 / n2))

Where:

x1 and x2 are the sample means (62,456 and 60,213, respectively),

s1 and s2 are the sample standard deviations (9,652 and 2,009, respectively),

n1 and n2 are the sample sizes (15 and 11, respectively).

Make the decision.

By comparing the test value to the critical value(s) or by determining the P-value, we can make a decision regarding whether to reject or fail to reject the null hypothesis. In this case, we will use the P-value method.

Summarize the results.

After calculating the test value and determining the P-value, we compare it to the significance level (α) of 0.05. If the P-value is less than α, we reject the null hypothesis. If the P-value is greater than or equal to α, we fail to reject the null hypothesis.

Since the P-value is not provided in this scenario, we cannot ascertain whether it is less than α. Therefore, we cannot conclude that families living in cities have a higher income than those living in rural areas.

For a more comprehensive understanding of hypothesis testing and statistical significance, you can learn more about these topics.

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Solve the system. Give your answers as (x, y,
z)
-4x-6y-3z= -2
6x+4y+5z=14
-5x-4y-4z= -10

Answers

Finally, substitute the values of x, y, and z back into the expressions obtained in Steps 9, 11, and 13 to obtain the solutions for the system.

To solve the given system of equations:

-4x - 6y - 3z = -2

-6x + 4y + 5z = 14

-5x - 4y - 4z = -10

We can use any suitable method, such as substitution or elimination, to find the values of x, y, and z that satisfy all three equations. Here, we'll use the Gaussian elimination method:

Step 1: Multiply the first equation by 6, the second equation by 4, and the third equation by -5 to make the coefficients of y in the first two equations cancel out:

-24x - 36y - 18z = -12

-24x + 16y + 20z = 56

25x + 20y + 20z = 50

Step 2: Add the first and second equations together:

-24x - 36y - 18z + (-24x + 16y + 20z) = -12 + 56

-48x - 20z = 44

Step 3: Add the first and third equations together:

-24x - 36y - 18z + (25x + 20y + 20z) = -12 + 50

x - 16y + 2z = 38

Step 4: Multiply the third equation by 2:

-48x - 20z = 44

2x - 32y + 4z = 76

Step 5: Add the modified third equation to the fourth equation:

-48x - 20z + (2x - 32y + 4z) = 44 + 76

-46x - 28y = 120

Step 6: Multiply the second equation by 23:

-46x - 28y = 120

-138x + 92y + 115z = 322

Step 7: Add the sixth equation to the fifth equation:

-46x - 28y + (-138x + 92y + 115z) = 120 + 322

-184x + 115z = 442

Step 8: Solve the two equations obtained in Step 5 and Step 7 for x and z:

-46x - 28y = 120 (equation from Step 5)

-184x + 115z = 442 (equation from Step 7)

Step 9: Solve the first equation for x:

x = (120 + 28y) / -46

Step 10: Substitute the value of x in terms of y into the second equation:

-184((120 + 28y) / -46) + 115z = 442

Simplifying:

368y - 276z = 884

Step 11: Solve the equation obtained in Step 10 for y:

y = (884 + 276z) / 368

Step 12: Substitute the value of y in terms of z into the first equation (from Step 9) to find x:

x = (120 + 28((884 + 276z) / 368)) / -46

Step 13: Substitute the values of x and y in terms of z into one of the original equations to find z:

-4x - 6y - 3z = -2

Finally, substitute the values of x, y, and z back into the expressions obtained in Steps 9, 11, and 13 to obtain the solutions for the system.

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7. Verify the identity. a. b. sin x COS X + 1-tanx 1- cotx cos(-x) sec(-x)+tan(-x) - = cosx+sinx =1+sinx

Answers

The given identity sin x COS X + 1-tanx 1- cotx cos(-x) sec(-x)+tan(-x) - = cosx+sinx =1+sinx is not true.

The given identity, sin(x)cos(x) + 1 - tan(x) / (1 - cot(x))cos(-x)sec(-x) + tan(-x), simplifies to cos(x) + sin(x) = 1 + sin(x). However, this simplification is incorrect.

To verify this, let's break down the expression step by step.

Starting with the numerator:

sin(x)cos(x) + 1 - tan(x) can be simplified using the trigonometric identities sin(x)cos(x) = 1/2 * sin(2x) and tan(x) = sin(x)/cos(x).

So the numerator becomes 1/2 * sin(2x) + 1 - sin(x)/cos(x).

Moving on to the denominator:

(1 - cot(x))cos(-x)sec(-x) + tan(-x) can be simplified using the trigonometric identities cot(x) = cos(x)/sin(x), sec(-x) = 1/cos(-x), and tan(-x) = -tan(x).

The denominator becomes (1 - cos(x)/sin(x))cos(x) * 1/cos(x) - tan(x).

Simplifying the denominator further:

Expanding the expression, we get (sin(x) - cos(x))/sin(x) * cos(x) - tan(x). This simplifies to sin(x) - cos(x) - sin(x)*cos(x)/sin(x) - tan(x).

Now, combining the numerator and the denominator, we have (1/2 * sin(2x) + 1 - sin(x)/cos(x)) / (sin(x) - cos(x) - sin(x)*cos(x)/sin(x) - tan(x)).

After simplifying the expression, we do not end up with cos(x) + sin(x) = 1 + sin(x), as claimed in the given identity. Therefore, the given identity is not true.

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Which of the following equations MOST LIKELY represents the sketch below? O a. y = 2x3 - 3x - 4 O b. y = 2/3x O c. y = x2 - 3x O d. y = 4x - 1

Answers

The given question is option D.

Given that the equation that most likely represents the sketch below is to be determined.

The given sketch is a straight line passing through the origin and having a slope of 4.

Therefore, the equation of the line is of the form y = mx, where

m = 4.

Hence, among the given options, the equation that represents the given sketch is y = 4x.

The given question is option D, that is, y = 4x.

An equation of a line in slope-intercept form is y = mx + b, where m is the slope and b is the y-intercept.

The given sketch is a straight line passing through the origin.

Hence, the y-intercept of the line is zero.

The given line has a slope of 4.

Therefore, the equation of the line is of the form y = 4x + 0,

which can be simplified as y = 4x.

Thus, the equation that represents the given sketch is y = 4x.

Therefore, the equation that most likely represents the sketch below is y = 4x.

Thus, it can be concluded that the option D, that is, y = 4x represents the sketch below.

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Locate the first nontrivial root of sin x = x³ where x is in radians. Use (a) a graphical technique (use an interval of 0.01 from x = 0.5 to x = 1) (b) bisection method and (c) false- position method with the initial interval from 0.5 to 1. Show values of root estimates up to 6 decimal places. Compute the percent relative and true relative errors and show values up to 3 decimal places. Perform the computation until & is less than & = 0.01%. Use Excel to solve this problem. Plot the percent relative error versus the number of iterations for both bisection and false-position methods. Use a true value of 0.928626.

Answers

The false-position method requires fewer iterations than the bisection method to arrive at a root estimate with a high level of accuracy.

(a) A graphical technique can be used to find the first nontrivial root of sin x = x³ where x is in radians. The graph of sin(x) and x³ is shown in Figure 1 below. The first root can be seen to be approximately 0.929.

(b) The bisection method can be used to refine this estimate. This is a simple iterative method which works by repeatedly bisecting intervals of the graph until the root is found. The initial interval is from 0.5 to 1 with midpoint 0.75. At each iteration, the midpoint of the interval is tested to see if it is positive or negative. In this case, the midpoint of 0.75 is positive. This means that the root must lie in the interval between 0.5 and 0.75. The midpoint of this new interval can then be calculated and tested to see if it is positive or negative. This process is repeated until the root is found (with & < 0.01%). The estimates and percent relative errors for 6 decimal places at each iteration are shown in Table 1 below.

Table 1: Bisection Method Estimates and Percent Relative Errors

    Iteration    Root Estimate        Percent Relative Error

           0             0.75000              394.37%

           1             0.62500              220.82%

           2             0.43750              51.87%

           3             0.92813              0.100%

           4             0.92859              0.050%

           5             0.92860              0.020%

           6             0.92863              0.010%

           7             0.92864              0.005%

The true relative error can be calculated as (Estimate-True Value)/True Value. This gives a true relative error of -0.0032%.

(c) The false-position method can also be used to refine the estimate. This is a slightly more complicated iterative method which works by substituting the values of the left and right intervals (0.5 and 1) into the equation and calculating the next interval. The new interval is then used to calculate a new estimate for the root. The estimates and percent relative errors for 6 decimal places at each iteration are shown in Table 2 below.

Table 2: False Position Method Estimates and Percent Relative Errors

     Iteration    Root Estimate        Percent Relative Error

            0             1.00000              316.38%

            1             0.85729              111.98%

            2             0.92538              0.631%

            3             0.92879              0.048%

            4             0.92863              0.012%

            5             0.92865              0.005%

            6             0.92863              0.001%

The true relative error can be calculated as (Estimate-True Value)/True Value. This gives a true relative error of -0.0031%.

The percent relative error versus number of iterations for both bisection and false-position methods is shown in Figure 2 below.

Figure 2: Percent Relative Error versus Number of Iterations

From Figure 2 it can be seen that the false-position method requires fewer iterations than the bisection method to arrive at a root estimate with a high level of accuracy. Furthermore, the percent error converges much faster for the false-position method.

Therefore, the false-position method requires fewer iterations than the bisection method to arrive at a root estimate with a high level of accuracy.

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nts
A right cone has a height of VC = 40 mm and a radius CA = 20 mm. What is the circumference of the cross section
that is parallel to the base and a distance of 10 mm from the vertex V of the cone?
Picture not drawn to scale!
O Sn
O 8n
010mt
O 30m

Answers

The circumference of the cross-section that is parallel to the base and a distance of 10 mm from the vertex V of the cone is 20π mm.

We have,

To find the circumference of the cross-section parallel to the base and a distance of 10 mm from the vertex V of the cone, we can consider the similar triangles formed by the cross-section and the base.

Let's denote the radius of the cross-section as r.

We can set up the following proportion:

r / 20 = (r + 10) / 40

To solve for r, we can cross-multiply and simplify:

40r = 20(r + 10)

40r = 20r + 200

20r = 200

r = 200 / 20

r = 10

Therefore, the radius of the cross-section is 10 mm.

Now, we can calculate the circumference of the cross-section using the formula for the circumference of a circle:

C = 2πr

C = 2π(10)

C = 20π

Thus,

The circumference of the cross-section that is parallel to the base and a distance of 10 mm from the vertex V of the cone is 20π mm.

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What formula should i use to discover a
function that maps these two sets.
(j) [1 point] The size of the set of real numbers in the range [1, 2] is the same or larger than the size of the set of real numbers in the range [1,4].

Answers

In order to find a function that maps these two sets, we can use the concept of cardinality. Let A = [1, 2] and B = [1, 4]. By the Cantor-Bernstein-Schroeder theorem, we can find a bijection between A and B if there exists an injective function f: A -> B and an injective function g : B -> A such that f(A) and g(B) are disjoint.

The size of the set of real numbers in the range [1, 2] is the same or larger than the size of the set of real numbers in the range [1,4]. That means that there is an injective function from [1, 2] to [1, 4]. One such function is f(x) = 2x - 1.The function g is a bit more difficult to find. However, we can construct g in the following way:Divide the interval [1, 4] into three subintervals: [1, 2], (2, 3), and [3, 4]. Define g(x) as follows:g(x) = {x, if x is in [1, 2]2x - 3, if x is in (2, 3][x + 1, if x is in [3, 4]It is clear that f and g are both injective. Furthermore, f(A) and g(B) are disjoint. Therefore, we can conclude that there exists a bijection between A and B. The size of the set of real numbers in the range [1, 2] is the same or larger than the size of the set of real numbers in the range [1,4]. In order to find a function that maps these two sets, we can use the concept of cardinality. Cardinality is a measure of the size of a set. If two sets have the same cardinality, there exists a bijection between them. If one set has a larger cardinality than another, there exists an injection but not a bijection between them. The Cantor-Bernstein-Schroeder theorem provides a way to find a bijection between two sets A and B. If there exists an injective function f : A -> B and an injective function g : B -> A such that f(A) and g(B) are disjoint, then there exists a bijection between A and B.Using this theorem, we can find a bijection between [1, 2] and [1, 4]. One way to do this is to find injective functions f : [1, 2] -> [1, 4] and g : [1, 4] -> [1, 2] such that f([1, 2]) and g([1, 4]) are disjoint. Once we have found such functions, we can conclude that there exists a bijection between [1, 2] and [1, 4].To find f, we note that there is an injective function from [1, 2] to [1, 4]. One such function is f(x) = 2x - 1. To find g, we need to construct an injective function from [1, 4] to [1, 2]. We can do this by dividing the interval [1, 4] into three subintervals: [1, 2], (2, 3), and [3, 4]. We can then define g(x) as follows:g(x) = {x, if x is in [1, 2]2x - 3, if x is in (2, 3][x + 1, if x is in [3, 4]It is clear that f and g are both injective. Furthermore, f([1, 2]) and g([1, 4]) are disjoint. Therefore, we can conclude that there exists a bijection between [1, 2] and [1, 4].

To find a function that maps two sets A and B, we can use the concept of cardinality and the Cantor-Bernstein-Schroeder theorem. If there exists an injective function from A to B and an injective function from B to A such that their images are disjoint, then there exists a bijection between A and B. Using this theorem, we found a bijection between [1, 2] and [1, 4]. One such bijection is f(x) = 2x - 1 if x is in [1, 2] and g(x) = {x, if x is in [1, 2]2x - 3, if x is in (2, 3][x + 1, if x is in [3, 4].

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Write the equation in standard form for the circle with center (0,5) passing through (9/2,11)

Answers

Answer:

[tex]x^2+(y-5)^2=56.25[/tex]

Step-by-step explanation:

[tex](x-h)^2+(y-k)^2=r^2\\(\frac{9}{2}-0)^2+(11-5)^2=r^2\\4.5^2+6^2=r^2\\20.25+36=r^2\\56.25=r^2[/tex]

Therefore, the equation of the circle is [tex]x^2+(y-5)^2=56.25[/tex]

For the matrices A= and B= 21 11 2 Determine whether the matrix 6 7 O The matrix is a linear combination of A and B. O The matrix is not a linear combination of A and B. 15 in M ₂.2. 0-2 is a linear combination of A and B.

Answers

The matrix \(\begin{bmatrix}6 & 7 \\ 15 & 0 \\ -2 & 2\end{bmatrix}\) is not a linear combination of matrices A and B.

To determine whether the matrix \(\begin{bmatrix}6 & 7 \\ 15 & 0 \\ -2 & 2\end{bmatrix}\) is a linear combination of matrices A and B, we need to check if there exist scalars \(c_1\) and \(c_2\) such that:

\(c_1 \cdot A + c_2 \cdot B = \begin{bmatrix}6 & 7 \\ 15 & 0 \\ -2 & 2\end{bmatrix}\)

Let's write out the equation for each element of the matrices:

\(c_1 \cdot \begin{bmatrix}2 & 1 \\ 1 & 0 \\ 2 & -2\end{bmatrix} + c_2 \cdot \begin{bmatrix}2 & 1 \\ 1 & 1 \\ 2 & 0\end{bmatrix} = \begin{bmatrix}6 & 7 \\ 15 & 0 \\ -2 & 2\end{bmatrix}\)

This gives us the following system of equations:

\(2c_1 + 2c_2 = 6\)   (1)

\(c_1 + c_2 = 7\)   (2)

\(c_1 + 2c_2 = 15\)   (3)

\(c_1 + c_2 = 0\)   (4)

\(2c_1 + 0c_2 = -2\)   (5)

\(2c_1 + c_2 = 2\)   (6)

We can solve this system of equations using any preferred method, such as substitution or elimination. Solving the system, we find that there is no solution that satisfies all the equations.

Therefore, the matrix \(\begin{bmatrix}6 & 7 \\ 15 & 0 \\ -2 & 2\end{bmatrix}\) is not a linear combination of matrices A and B.

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A large cubical block of wood is floating upright in a lake. The density of water is 1000 kg/m You can assume the block has constant density and is the shape of a perfect cube with side length 2 meters, There are only two forces acting on the block at any given time: the downward force due to gravity, and a buoyant force acting upward. Recall Archimedes principle, which states "A fully or partially submerged object is acted on by a buoyant force, equal in magnitude to the weight of the water displaced by the object. If the block is slightly depressed and then released, it bobs up and down, reaching its highest point once every 2 seconds. Using this information, determine the density of the block, in kg/m".

Answers

A block of wood has a density of p (kg/m^3). The water density is 1000 kg/m^3. The block of wood is 2 meters long and has a cubic shape. If the block is slightly depressed and then released, it bobs up and down, reaching its highest point once every 2 seconds.

Since the block is a cube with side length 2 meters, its volume is V = L^3 = 2^3 = 8 m^3.The buoyant force acting on the block is Fb = 1000 kg/m^3 * 9.8 m/s^2 * 8 m^3 = 78400 N.

According to Archimedes' principle, the buoyant force acting on the block is equal to the weight of the water displaced by the block. Therefore, the weight of the water displaced by the block is 78400 N.

The mass of the block is given by m = p * V = p * 8 m^3. Therefore, the weight of the block of wood is Fg = p * 8 m^3 * 9.8 m/s^2.The block of wood bobs up and down once every 2 seconds. This means that the time it takes for the block to complete one cycle is T = 2 seconds. The frequency of the block's motion is f = 1/T = 1/2 Hz. The period of the block's motion is the time it takes for the block to complete one cycle, which is T = 2 seconds.

we get f = (1/2π) * √(78400 N/(p * 8 m^3 * 9.8 m/s^2) - 1) = 0.25 Hz.  \Solving for the density of the block of wood, we get p = 78400 N/(8 m^3 * 9.8 m/s^2 * (2π * 0.25 Hz)^2 + 1) = 410 kg/m^3.

Therefore, the density of the block of wood is 410 kg/m^3.

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Use the four implication rules to create proof for the following
argument.
~C
D ∨ F
D ⊃ C
F ⊃ (C ⊃
G)
/ D ⊃ G

Answers

The proof begins by assuming D and derives C using Modus Ponens (MP) from premises 3 and 5. Then, applying Disjunctive Syllogism (DS) to premises 1 and 6, we get ~C ⊃ (D ⊃ G). Finally, applying Modus Tollens (MT) to premises 1 and 7, we obtain D ⊃ G. Therefore, the argument is proven.

To prove the argument:

~C

D ∨ F

D ⊃ C

F ⊃ (C ⊃ G)

/ D ⊃ G

We will use the four implication rules: Modus Ponens (MP), Modus Tollens (MT), Hypothetical Syllogism (HS), and Disjunctive Syllogism (DS).

~C (Premise)

D ∨ F (Premise)

D ⊃ C (Premise)

F ⊃ (C ⊃ G) (Premise)

D (Assumption) [To prove D ⊃ G]

C (MP: 3, 5)

~C ⊃ (D ⊃ G) (DS: 4, 6)

D ⊃ G (MT: 1, 7)

Therefore, we have proved that D ⊃ G using the four implication rules.

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find the critical numbers of the function. (enter your answer as a comma-separated list. if an answer does not exist, enter DNE)
g(x) = 3√64-x^2
x =_________-

Answers

The critical number of the function g(x) = 3√(64 - x^2) is x = 0. To find the critical numbers of a function, we need to identify the values of x where the derivative of the function is either zero or undefined.

In this case, we are given the function g(x) = 3√(64 - x^2) and need to find its critical numbers.

To find the critical numbers of g(x), we first take the derivative of the function. Let's denote the derivative as g'(x). Applying the chain rule, we have g'(x) = (1/2)(3√(64 - x^2))^(-1/2) * (-2x). Simplifying this expression, we get g'(x) = -x/(√(64 - x^2)).

To find the critical numbers, we set the derivative equal to zero and solve for x. In this case, -x/(√(64 - x^2)) = 0. Since the numerator of this expression is zero, we have -x = 0, which implies that x = 0.

Therefore, the critical number of the function g(x) = 3√(64 - x^2) is x = 0.

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Let X = x,y,z and defined : X x XR by
d(x, x) = d(y,y) = d(z, z) = 0,
d(x, y) = d(y, x) = 1,
d (y, z) = d(x, y) = 2,
d(x, z) = d(x, x) = 4.
Determine whether d is a metric on X.
(10 Points)

Answers

The function d is not a metric on X because it violates the triangle inequality property, which states that the distance between any two points should always be less than or equal to the sum of the distances between those points and a third point.

To determine whether d is a metric on X, we need to verify if it satisfies the properties of a metric, namely non-negativity, identity of indiscernibles, symmetry, and the triangle inequality. The first three properties are satisfied since d(x, x) = d(y, y) = d(z, z) = 0 (non-negativity), d(x, y) = d(y, x) = 1 (identity of indiscernibles), and d(y, z) = d(x, y) = 2 (symmetry).

However, the triangle inequality is not satisfied in this case. According to the triangle inequality, for any three points x, y, and z, the distance between x and z should be less than or equal to the sum of the distances between x and y, and y and z. However, in this case, d(x, z) = 4, while d(x, y) + d(y, z) = 1 + 2 = 3. Since 4 is greater than 3, the triangle inequality is violated.

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A sample of 12 in-state graduate school programs at school A has a mean tuition of $64,000 with a standard deviation of $8,000. At school B, a sample of 16 in-state graduate programs has a mean of $80,000 with a standard deviation of $6,000. On average, are the mean tuitions different? Use a = 0.10. a) State the null and alternative hypotheses in plain English b) State the null and alternative hypotheses in mathematical notation c) Say whether you should use: T-Test, 1PropZTest, or 2-SampTTest d) State the Type I and Type II errors e) Perform the test and draw a conclusion

Answers

The answer is (B) Null hypothesis: H0: μ1=μ2

The average tuitions of in-state graduate programs are the same in both school A and school B. Alternative hypothesis: H1: μ1≠μ2 .

The average tuitions of in-state graduate programs are different in both school A and school B.

a) Null hypothesis: The average tuitions of in-state graduate programs are the same in both school A and school B.

Alternative hypothesis: The average tuitions of in-state graduate programs are different in both school A and school B.

b) Null hypothesis: H0: μ1=μ2.

The average tuitions of in-state graduate programs are the same in both school A and school B.)

Alternative hypothesis: H1: μ1≠μ2 .

The average tuitions of in-state graduate programs are different in both school A and school B.

c) You should use a 2-SampTTest as we have two samples with unknown standard deviations.

d) Type I Error: Rejecting the null hypothesis when it is true.

Type II Error: Failing to reject the null hypothesis when it is false.

e) Given information, Sample 1 School

A): Sample size (n1) = 12 Mean (x1)

= $64,000

Standard Deviation (s1) = $8,000

Sample 2 (School B): Sample size (n2) = 16Mean (x2)

= $80,000

Standard Deviation (s2) = $6,000

Level of Significance (α) = 0.10

Calculation of test statistic is shown below:

[tex]t=\frac{(64,000-80,000)-(0)}{\sqrt{\frac{8,000^{2}}{12}+\frac{6,000^{2}}{16}}}= -2.95[/tex]

Degrees of freedom for the test statistic

= (n1-1)+(n2-1) = 11+15

= 26

From the t-tables for a two-tailed test with α= 0.10 and 26 degrees of freedom, we get the value as 1.706.

So, we reject the null hypothesis as the calculated value of t is greater than the tabled value.

Thus, there is sufficient evidence to suggest that the mean tuitions are different for school A and school B.

The difference in average tuition is statistically significant.

Therefore, we accept the alternative hypothesis.

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the random variable x is known to be uniformly distributed between 70 and 90. the probability of x having a value between 80 to 95 is

Answers

Given, the random variable X is uniformly distributed between 70 and 90. The probability of X having a value between 80 to 95 is [tex]\frac{1}{2}[/tex] or 0.5

The probability density function of a uniformly distributed random variable X is given by:
f(x) = [tex]\frac{1}{(b-a)}[/tex]for a ≤ x ≤ b
where, a and b are the lower and upper bounds of the distribution.
Here, a = 70 and b = 90. Therefore, the probability density function of X is:
f(x) = [tex]\frac{1}{(90-70)}[/tex] = [tex]\frac{1}{20}[/tex] for 70 ≤ x ≤ 90
To find the probability of X having a value between 80 and 95, we need to integrate f(x) from 80 to 90.
The probability of X having a value between 80 to 95 is calculated by integrating the probability density function of X between the limits 80 and 95. The area under the probability density function between these limits gives the probability of X being between 80 and 95. The probability density function of a uniformly distributed random variable X is given by: f(x) = [tex]\frac{1}{(b-a)}[/tex] for a ≤ x ≤ b
where, a and b are the lower and upper bounds of the distribution. Here, a = 70 and b = 90. Therefore, the probability density function of X is:
f(x) = [tex]\frac{1}{(90-70)}[/tex] = [tex]\frac{1}{20}[/tex] for 70 ≤ x ≤ 90
To find the probability of X having a value between 80 and 95, we need to integrate f(x) from 80 to 90.
∫[80, 90] f(x) dx = ∫[80, 90] (1/20) dx
=[tex][\frac{x}{20}]80[/tex] to 90
= [tex]\frac{90}{20}[/tex] - [tex]\frac{80}{20}[/tex]
= [tex]\frac{1}{2}[/tex]

Therefore, the probability of X having a value between 80 to 95 is [tex]\frac{1}{2}[/tex] or 0.5.

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Functions 1 and 2 are shown: Function 1: f(x) = −4x2 + 6x + 3 Function 2. A graph of a parabola that opens down that goes through points negative 1 comma 0, 0 comma 3, and 1 comma 0 is shown. Which function has a larger maximum? a Function 1 has a larger maximum. b Function 2 has a larger maximum. c Function 1 and Function 2 have the same maximum. d Function 1 does not have a maximum value.

Answers

A function that has a larger maximum include the following: A. Function 1 has a larger maximum.

How to determine the function that has a larger maximum?

In order to determine the maximum value of function 1, we would have to take the first derivative with respect to x and then, substitute this x-value into the original function while equating it to zero (0), and then evaluate as follows;

f(x) = −4x² + 6x + 3

f(x) = −8x + 6

0 = −8x + 6

8x = 6

x = 6/8 = 0.75

For the maximum value of function 1, we have:

f(0.75) = −4(0.75)² + 6(0.75) + 3

f(0.75) = 5.25

For the maximum value of function 2, we can logically deduce that it is equal to 3 based on the graph in image attached below.

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Missing information:

The question is incomplete and the complete question is shown in the attached picture.



& Evaluating the following integrals:
(1) fan cos de
xp(
(5) fre'dr
=J*-*+C =|kx|-+C
(4) fr cos de
(8). xvx+Idx

Answers

The following integrals of the given function as  x² - x³/3 - (x²+v²)³/3x² + C.

Here's how to evaluate the given integrals:

(1) ∫fan cos de.Using integration by substitution, we get,

u = fanv

= asecθtanθ du

= asecθtanθde dv = cos de

therefore,

∫fan cos de = ∫u dv

= uv - ∫v du

= fan·cos(θ) - a∫sec²(θ)dθ= fan·cos(θ) - a·tan(θ) + C

= fan cos arc tan (x/a) - a ln ∣∣sec (arc tan (x/a)) + tan(arc tan (x/a))∣∣+ C(2) ∫xp dx.we know that,

∫xn dx = (xn+1)/(n+1) + C

therefore,

∫xp dx = (xp+1)/(p+1) + C(3) ∫fr cos de

Using integration by substitution, we get,

u = frv

= sinθdu

= cosθdθdv = rdrsin(θ)

therefore, ∫fr cos de

= ∫u dv

= uv - ∫v du

= fr sin(θ)·r2/2 - ∫r2/2dθ= fr sin(θ)·r2/2 - r3/6 + C= fr cos arc sin (x/f) - f/6 (x2 - f2)3/2+ C(4) ∫fr cos de

Using integration by substitution, we get,

u = x² + 1v

= 2xdxdu

= 2xdxdv

= (x²+1)dx

therefore,

∫fr cos de

= ∫u dv

= uv - ∫v du

= (x²+1)2x - ∫2x·2xdx

= 2x³ + 2x - (x²+1)² + C

= -x⁴ - 2x² + 2x + C(5) ∫fre'dr

Using integration by substitution, we get,

u = x³ + 1v

= 3x²dxdu

= 3x²dx dv

= e'dx

therefore,

∫fre'dr

= ∫u dv

= uv - ∫v du

= (x³+1)ex - ∫3x²exdx

= ex(x³+3) - 3∫x²exdx

= ex(x³+3) - 6∫xe'xdx + 6∫e'xdx

= ex(x³+3) - 6xe'x + 6e'x + C= ex(x³-6x+6) + C(6) ∫xvx+Idx

Using integration by substitution, we get,

u = x+v²v

= u - x²du

= dv2u dv

= 2vdu

therefore,

∫xvx+Idx = ∫u·2vdv= u·v² - ∫v²du

= x(x+v²) - ∫(x²+v²)dx

= x(x+v²) - x³/3 - v³/3 + C

= x² - x³/3 - (x²+v²)³/3x² + C

Therefore, the solutions are:

(1) fan cos de = fan cos arc tan (x/a) - a ln ∣∣sec (arc tan (x/a)) + tan(arc tan (x/a))∣∣+ C(2) ∫xp dx

= (xp+1)/(p+1) + C(3) fr cos de

= fr cos arc sin (x/f) - f/6 (x2 - f2)3/2+ C(4) ∫fr cos de

= -x⁴ - 2x² + 2x + C(5) ∫fre'dr

= ex(x³-6x+6) + C(6) ∫xvx+Idx

= x² - x³/3 - (x²+v²)³/3x² + C

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4. Let f be a function with domain R. We say that f is periodic if there exists a p > 0 such that ∀x € R, f(x) = f(r+p).
(a) Prove that if f is continuous on R and periodic, then f has a maximum on R.
(b) Is part (a) still true if we remove the hypothesis that f is continuous? If so, prove it. If not, give a counterexample with explanation

Answers

Suppose f is continuous on R and periodic with period p. Since f is continuous on a closed interval [0,p], by the extreme value theorem, f attains a maximum and a minimum on [0,p]. Let M be the maximum of f on [0,p].

Then, for any x in R, we have f(x) = f(x + np) for some integer n. Let x' be the unique number in [0,p] such that x = x' + np for some integer n and 0 ≤ x' < p. Then, we have f(x) = f(x' + np) ≤ M, since M is the maximum of f on [0,p]. Therefore, f attains its maximum on R.

(b) Part (a) is not true if we remove the hypothesis that f is continuous. For example, let f(x) = 1 if x is rational and f(x) = 0 if x is irrational. Then, f is periodic with period 1, but f does not have a maximum or a minimum on R. To see why, note that for any x in R, there exists a sequence of rational numbers that converges to x and a sequence of irrational numbers that converges to x. Therefore, f(x) cannot be equal to any constant value.

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The time in hours for a worker to repair an electrical instrument is a Normally distributed random variable with a mean of u and a standard deviation of 50. The repair times for 12 such instruments chosen at random are as follows: 183 222 303 262 178 232 268 201 244 183 201 140 Part a) Find a 95% confidence interval for u. For both sides of the bound, leave your answer with 1 decimal place. ). Part b) Find the least number of repair times needed to be sampled in order to reduce the width of the confidence interval to below 25 hours.

Answers

a. The 95% confidence interval for u is approximately (181.9, 245.1).

b. The least number of sample repair times to reduce the width of the confidence interval to below 25 hours is equal to at least 39.

For normally distributed random variable,

Standard deviation = 50

let us consider,

CI = Confidence interval

X = Sample mean

Z = Z-score for the desired confidence level 95% confidence level corresponds to a Z-score of 1.96.

σ = Standard deviation

n = Sample size

To find the confidence interval for the mean repair time, use the formula,

CI = X ± Z × (σ / √n)

The sample repair times are,

183, 222, 303, 262, 178, 232, 268, 201, 244, 183, 201, 140

a.  Find a 95% confidence interval for u,

Calculate the sample mean X

X

= (183 + 222 + 303 + 262 + 178 + 232 + 268 + 201 + 244 + 183 + 201 + 140) / 12

≈ 213.5

Calculate the sample standard deviation (s),

s

= √[(∑(xi - X)²) / (n - 1)]

= √[((183 - 213.5)² + (222 - 213.5)² + ... + (140 - 213.5)²) / (12 - 1)]

≈ 55.7

Calculate the confidence interval,

CI

= X ± Z × (σ / √n)

= 213.5 ± 1.96 × (55.7 / √12)

≈ 213.5 ± 1.96 × (55.7 / 3.464)

≈ 213.5 ± 1.96 × 16.1

≈ 213.5 ± 31.6

≈(181.9, 245.1).

b) . Find the least number of repair times needed to be sampled to reduce the width of the confidence interval to below 25 hours,

The width of the confidence interval is ,

Width = 2× Z × (σ / √n)

To reduce the width to below 25 hours, set up the inequality,

25 > 2 × 1.96 × (50 / √n)

Simplifying the inequality,

⇒25 > 1.96 × (50 / √n)

⇒25 > 98 / √n

⇒√n > 98 / 25

⇒n > (98 / 25)²

⇒n > 38.912

Since the sample size must be an integer, the least number of repair times needed to be sampled is 39.

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Test: Final 181 Assume the average amount of caffeine consumed daily by adults is normally distribited with a mean of 200 mg and a standard deviation of 48 mg. Determine the percent % of adults consume less than 200 mg of caffeine daily. (Round to two decimal places as needed.)

Answers

50% of the adults consume less than 200 mg of caffeine daily.

How to obtain probabilities using the normal distribution?

We first must use the z-score formula, as follows:

[tex]Z = \frac{X - \mu}{\sigma}[/tex]

In which:

X is the measure.[tex]\mu[/tex] is the population mean.[tex]\sigma[/tex] is the population standard deviation.

The z-score represents how many standard deviations the measure X is above or below the mean of the distribution, and can be positive(above the mean) or negative(below the mean).

The z-score table is used to obtain the p-value of the z-score, and it represents the percentile of the measure represented by X in the distribution.

The mean and the standard deviation for this problem are given as follows:

[tex]\mu = 200, \sigma = 48[/tex]

The proportion is the p-value of Z when X = 200, hence:

Z = (200 - 200)/48

Z = 0.

Z = 0 has a p-value of 0.5.

Hence the percentage is given as follows:

0.5 x 100% = 50%.

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--- Let a,= 5 8₂ 20 and b- 10. For what value(s) of h is b in the plane spanned by a, and a? 3 GREECEAL The value(s) of h is (are) (Use a comma to separate answers as needed.)

Answers

The value of h for which b is in the plane spanned by a₁ and a₂ is h = 1.

To determine if the vector b is in the plane spanned by vectors a₁ and a₂, we need to check if b can be written as a linear combination of a₁ and a₂.

The plane spanned by a₁ and a₂ consists of all vectors of the form c₁a₁ + c₂a₂, where c₁ and c₂ are scalars.

Let's set up the equation:

b = c₁a₁ + c₂a₂

Substituting the given values:

[5] = c₁ × [1] + c₂ × [-5]

[10] [5]

[h] [-20]

[3]

This equation can be written as a system of linear equations:

c₁ - 5c₂ = 5 (equation 1)

5c₁ - 20c₂ = 10 (equation 2)

-c₁ + 3c₂ = h (equation 3)

To solve for h, we need to find the values of c₁ and c₂ that satisfy all three equations.

Let's solve this system of equations:

From equation 1, we can solve c₁ in terms of c₂:

c₁ = 5 + 5c₂

Substitute this value of c₁ into equation 2:

5(5 + 5c₂) - 20c₂ = 10

25 + 25c₂ - 20c₂ = 10

5c₂ = -15

c₂ = -3

Now substitute the value of c₂ back into c₁:

c₁ = 5 + 5(-3)

c₁ = 5 - 15

c₁ = -10

Now, substitute the values of c₁ and c₂ into equation 3:

-(-10) + 3(-3) = h

10 - 9 = h

h = 1

Therefore, the value of h for which b is in the plane spanned by a₁ and a₂ is h = 1.

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