Assuming that the homoskedastic normal regression assumption hold, find the critical value for the following situations: (a) n=28, 5% significance level, one-sided test. (b) n=40, 1% significance level, two-sided test. (c) n=10, 10% significance level, one-sided test. (d) n= 0,5% significance level, two-sided test.

Given matrix A, to find matrix exponential e^(At) use Taylor series, but it's complex. Neither computing the series nor numerical methods directly provide the correct e^(At) due to infinite series, so none of the given options are correct.

The given matrix A is:

A = [ 3  0 ]
      [ 2  3 ]

To find the matrix exponential e^(At), we can use the Taylor series expansion:

e^(At) = I + At + (At)^2 / 2! + (At)^3 / 3! + ...

where I is the identity matrix and t is a scalar. However, calculating the matrix exponential using the Taylor series can be quite complex. In this case, you can either attempt to compute the series up to a certain order or use a numerical method to approximate the matrix exponential.

Unfortunately, none of the given options directly provides the correct e^(At) as the matrix exponential involves an infinite series of terms. So, the correct answer is:

e. None of the responses

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The professor needs to sample at least 929 high school students to estimate the proportion of students enrolled in college-level courses each school year with a 99% confidence level and a margin of error of 3.5%.

To determine the necessary sample size for estimating the proportion of high school students enrolled in college-level courses each school year with a 99% confidence level and a margin of error of 3.5%, we can use the formula:

n = (Z^2 * p * (1-p)) / E²

where n is the sample size, Z is the Z-score for the desired confidence level (2.576 for 99%), p is the estimated proportion from the previous study (18.3% or 0.183 as a decimal), and E is the margin of error (0.035 or 3.5% as a decimal).

Substituting these values into the formula, we get:

n = (2.576² * 0.183 * (1-0.183)) / 0.035²

n = 928.62

Rounding up to the nearest whole number, we get a sample size of 929.

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Three pairs of negative x- and y-coordinates that lie on the line y = 3x + 4:

1. x = -2, y = -2

2. x = -3, y = --5

3. x = -5, y = -11

Here are three pairs of negative x- and y-coordinates that lie on the line y = 3x + 4:

1. x = -2, y = -2:

When x is -2, y = 3(-2) + 4 = -6 + 4 = -2. So the point (-2, -2) lies on the line y = 3x + 4.

2. x = -3, y = -5:

When x is -3, y = 3(-3) + 4 = -9 + 4 = -5. So the point (-3, -5) lies on the line y = 3x + 4.

3. x = -5, y = -11:

When x is -5, y = 3(-5) + 4 = -15 + 4 = -11. So the point (-5, -11) lies on the line y = 3x + 4.

In all three pairs of coordinates, the x-coordinate is negative, and the corresponding y-coordinate is also negative, and they all satisfy the equation y = 3x + 4.

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Answer: c

Step-by-step explanation:

131.5 inches

I do flvs!!

The derivative of f(x) = kx + d is,

⇒ k.

And, the domain of the function, it is all real numbers.

Now, For find the derivative of the function f(x) = kx + d using the definition of derivative,

Hence, we start by using the following formula:

f'(x) = lim (h → 0) [f(x + h) - f(x)] / h

First, let's apply this formula to our function:

f'(x) = lim (h → 0) [(k(x + h) + d) - (kx + d)] / h

f'(x) = lim (h → 0) [kx + kh + d - kx - d] / h

f'(x) = lim (h → 0) k(h) / h

f'(x) = lim (h → 0) k

So, the derivative of f(x) = kx + d is,

⇒ k.

And, since there are no restrictions on the values that x can take.

Hence, the domain of the function, it is all real numbers.

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The equation for the for the graph in picture is

The graph of a trigonometric function is known as a trigonometric graph.

We should apply the equation for the generic sine graph since we wish to determine the equation of the graph.

y = A sin (Bx + C) + D

where:

B = 2π/T, where T is the period, and

A is the amplitude.

A = [absolute maximum - absolute minimum]/2

A = [2.5 - 1.5] / 2

A = 1/2

B = 2π/T

where T = π (from  the graph)

B = 2π/T

B = 2π/(π)

B = 2

C = 0

D = vertical shift = -2

We then substitute into y, thus

y = A sin (Bx + C) + D

y = 1/2 sin 2x - 2

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Answer:

18

Step-by-step explanation:

(1 1/2 ✖ 2 ✖ 3) ➗1/2

Answer: 18

Step-by-step explanation:

first find the volume 1.5x3x2=9

then you take 9 and divide it by 0.5

9/0.5 is 18

The probability that a person is a man given that they have high blood pressure is  0.46 or 46%. 

We are given that there are 123 ladies and 178 men within the bunch of volunteers for a clinical trial, and 54 of the ladies and 46 of the men have tall blood weights.

We are inquired to discover the likelihood that an arbitrarily selected volunteer who has a tall blood weight may be a man.

Let M be the occasion that a volunteer could be a man,

and H be the occasion that a volunteer has a tall blood weight.

We need to discover P(M|H), the likelihood that a volunteer could be a man given that they have tall blood weight.

By Bayes' hypothesis, we have:

P(M|H) = P(H|M) * P(M) / P(H)

Ready to find the probabilities on the right-hand side of this condition as taken after

P(H|M) = 46/178, the likelihood that a man has a tall blood weight

P(M) = 178/(123+178), the likelihood that a volunteer may be a man

P(H) = (54+46)/(123+178), the likelihood that a volunteer has tall blood weight

Substituting these values into the condition, we get:

P(M|H) = (46/178) * (178/(123+178)) / ((54+46)/(123+178))

P(M|H) =  46/100

P(M|H) = 0.46

Therefore, the likelihood that a haphazardly(randomly) chosen volunteer who has high blood weight could be a man is 0.46 or 46%. 

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To find the number of hours it takes for the size of the bacteria sample to double, we will use the given function:

y = y0 * e^(0.0623t)

Since we want to find the time when the number of bacteria doubles, we can rewrite the function as:

2y0 = y0 * e^(0.0623t)

Now, divide both sides by y0 to isolate the exponential term:

2 = e^(0.0623t)

Next, we need to solve for t. To do this, take the natural logarithm (ln) of both sides:

ln(2) = ln(e^(0.0623t))

Using the logarithm property, ln(a^b) = b * ln(a), we get:

ln(2) = 0.0623t * ln(e)

Since ln(e) = 1, we have:

ln(2) = 0.0623t

Now, solve for t by dividing both sides by 0.0623:

t = ln(2) / 0.0623

Using a calculator, we get:

t ≈ 11.1 hours

So, it takes approximately 11.1 hours for the size of the bacteria sample to double.

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The standard deviation of Y is $8.32.

Based on the given information, we can expect John's average commute time for the week to be 90 minutes. This is found by adding up the expected time for each individual day, which is 18 minutes per day.

For the second part of the question, we know that 100% - 25% - 60% = 15% of students do not buy any books for the class. The table provided represents part (b). The expectation for part (c) is the total on the line yiP(Y=yi), which we do not have enough information to calculate as we do not know the values of yi or P(Y=yi).

For part (d), we are given the variance of Y as $69.28. To find the standard deviation, we take the square root of the variance: √($69.28) = $8.32.

Therefore, the standard deviation of Y is $8.32.

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The correct options are

They can work to decrease their marginal cost.

They can raise prices to increase marginal revenue.

They can keep marginal costs below marginal revenues.

What is the equivalent expression?

Equivalent expressions are expressions that perform the same function despite their appearance. If two algebraic expressions are equivalent, they have the same value when we use the same variable value.

Producers can make the most profit by:

Working to decrease their marginal cost.

Keeping marginal costs below marginal revenues.

Raising prices to increase marginal revenue, as long as it does not decrease demand for their product.

Therefore, the correct options are:

They can work to decrease their marginal cost.

They can raise prices to increase marginal revenue.

They can keep marginal costs below marginal revenues.

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Answer:

[tex]\huge\boxed{\sf 2.5 \times 10^4}[/tex]

Step-by-step explanation:

[tex]\displaystyle \frac{2.3 \times 10^7}{9.2 \times 10^2}[/tex]

Using law of exponent:

[tex]\displaystyle = \frac{2.3 }{9.2} \times 10^{7-2}\\\\= 0.25 \times 10^5\\\\= 2.5 \times 10^4\\\\\rule[225]{225}{2}[/tex]

The height of the trapezoid needs to be 30/11 units in order for the trapezoid to have area 30.

To find the height of the trapezoid, we can use the formula for the area of a trapezoid, which is:

A = (1/2)h(b1 + b2)

where A is the area of the trapezoid, h is the height, b1 and b2 are the lengths of the parallel bases.

We know that the lengths of the parallel bases are 8 and 14, and we want the area to be 30. Substituting these values into the formula, we get:

30 = (1/2)h(8 + 14)

Simplifying the right-hand side, we get:

30 = 11h

Dividing both sides by 11, we get:

h = 30/11

Therefore, the height of the trapezoid needs to be 30/11 units in order for the trapezoid to have area 30.

To see why this works, we can visualize the trapezoid as a rectangle with a smaller right triangle on top. The height of the rectangle is equal to the height of the trapezoid, and the width is equal to the average of the lengths of the bases, which is (8+14)/2 = 11. The area of the rectangle is therefore 11h, and the area of the triangle on top is (1/2)bh, where b is the difference between the lengths of the bases, which is 14-8 = 6. The total area of the trapezoid is the sum of the area of the rectangle and the area of the triangle, which is:

A = 11h + (1/2)(6)(h) = 11.5h

Setting this equal to 30 and solving for h, we get the same result as before:

11.5h = 30

h = 30/11

Therefore, the height of the trapezoid needs to be 30/11 units in order for the trapezoid to have area 30.

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Triangle ABC is an equilateral triangle with all sides measuring 11cm in length.

An equilateral triangle is a type of triangle where all three sides are equal in length, and all three angles are equal, measuring 60 degrees each.

Length is a measurement of how long or extended an object or distance is, typically measured in units such as meters, centimeters, feet, or inches.

According to the given information:

Triangle ABC is an equilateral triangle. An equilateral triangle is a triangle with all sides equal in length. In this case, the given measurements state that all three sides of the triangle are 11cm in length, which meets the criteria for an equilateral triangle.

Equilateral triangles have several unique properties, including having all angles measuring 60 degrees, being a regular polygon, and having three lines of symmetry. Equilateral triangles also have the largest area for a given perimeter, making them useful in a variety of applications such as construction and engineering.

In summary, triangle ABC is an equilateral triangle with all sides measuring 11cm in length.

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The five-number summary for this dataset is: 34, 39, 51, 73, 79. This can be answered by the concept from Sets.

The five-number summary for this dataset can be calculated as follows:

1. Minimum: The smallest number in the dataset is 34.
2. First quartile (Q1): To find Q1, we need to calculate the median of the lower half of the dataset. So, we first need to order the numbers from smallest to largest: 34 36 39 43 51 53 62 63 73 79. The median of the lower half (i.e. the first five numbers) is 39. Therefore, Q1 is 39.
3. Median (Q2): To find the median, we again need to order the numbers from smallest to largest: 34 36 39 43 51 53 62 63 73 79. The median is the middle number, which is 51.
4. Third quartile (Q3): To find Q3, we need to calculate the median of the upper half of the dataset. So, we first need to order the numbers from smallest to largest: 34 36 39 43 51 53 62 63 73 79. The median of the upper half (i.e. the last five numbers) is 73. Therefore, Q3 is 73.
5. Maximum: The largest number in the dataset is 79.

Therefore, the five-number summary for this dataset is: 34, 39, 51, 73, 79.

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The least squares estimator b2 is unbiased for the population parameter B2.

The least squares estimator b2 is consistent.

b2 has the smallest variance among all linear unbiased estimators of B2 and is the Best Linear Unbiased Estimator (BLUE) of the population parameter.

The Gauss-Markov theorem states

The linear regression model is correctly specified, and the error term has a mean of zero, constant variance, and is uncorrelated with the regressors, then the least squares estimator is the Best Linear Unbiased Estimator (BLUE) of the population parameters.

The least squares estimator has the smallest variance among all unbiased linear estimators.

To prove the Gauss-Markov theorem for the least squares estimator b2 of B2, we need to show that b2 is unbiased, consistent, and has the smallest variance among all linear unbiased estimators.

First, we can show that b2 is unbiased by taking the expected value of the least squares estimator:

[tex]E(b2) = E[(\Sigma(xi - \bar x)(yi - \bar y)) / \Sigma (xi - \bar x)2][/tex]

[tex]= E[\Sigma (xi - \bar x)(B2xi + Bi + ei - \bar y) / \Sigma (xi - \bar x)2][/tex]

[tex]= B2\Sigma(xi - \bar x)2 / \Sigma (xi - \bar x)2[/tex]

= B2

The least squares estimator b2 is unbiased for the population parameter B2.

b2 is consistent by showing that the variance of b2 approaches zero as the sample size approaches infinity.

This can be shown using the following formula for the variance of the least squares estimator:

[tex]Var(b2) = \sigma2 / \Sigma (xi - \bar x)2[/tex]

σ2 is the variance of the error term.

As the sample size n approaches infinity, the denominator [tex]\Sigma (xi - \bar x)2[/tex] also approaches infinity, causing Var(b2) to approach zero.

The least squares estimator b2 is consistent.

b2 has the smallest variance among all linear unbiased estimators. Suppose there is another linear unbiased estimator of B2, denoted as ẞ2.

Then we can write:

[tex]B2 = \Sigma aiyi[/tex]

where ai are constants. Since ẞ2 is unbiased, we have:

[tex]E(B2) = B2[/tex]

Taking the variance of both sides, we get:

[tex]Var(B2) = \Sigma a2i\sigma 2[/tex]

where σ2 is the variance of the error term. Using the Cauchy-Schwarz inequality, we have:

[tex]Var(B 2) = \Sigma a2i\sigma 2 < = \Sigma b2i\sigma 2 = Var(b2)[/tex]

where [tex]bi = yi - \^b2xi[/tex] are the residuals, and the inequality follows from the fact that the sum of squared residuals[tex]\Sigma b2i[/tex] is minimized by the least squares estimator b2.

b2 has the smallest variance among all linear unbiased estimators of B2, and is the Best Linear Unbiased Estimator (BLUE) of the population parameter.

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The value of p could be either 0.2846 or 0.7154.

To find the value of p, we need to use the formula for the probability of k successes in a multinomial distribution:

P(k1,k2,...,kn) = n!/(k1!k2!...kn!) * p1k1 * p2k2 * ... * pn^kn

where n is the number of trials, k1,k2,...,kn are the number of successes in each category, and p1,p2,...,pn are the probabilities of success in each category.

Since we are given that the probability of five successes out of ten trials is 0.2007, we can set k1=5, k2=0, ..., kn=0, and solve for p:

0.2007 = 10!/(5!0!...0!) * p5 * (1-p)5

0.2007 = 252 * p5 * (1-p)5

0.000795238 = p5 * (1-p)5

Taking the fifth root of both sides, we get:

0.5707 = p * (1-p)

Solving for p using the quadratic formula, we get:

p = 0.2846 or p = 0.7154

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The value of h(4) is 21.

To find the value of h(4) for the given function [tex]h(t)=t^{2}-t+9[/tex], follow these steps:

Step 1: Replace 't' with '4' in the function:
[tex]h(4)=4^{2}-4+9[/tex]

Step 2: Evaluate the expression:
h(4) = 16 - 4 + 9

Step 3: Simplify:
h(4) = 12 + 9

Step 4: Calculate the final result:
h(4) = 21

So, the value of h(4) is 21.

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The statement "If y1 and y2 are solutions to y''-6y²+5y=4x, then 2y1+3y2 is also a solution to the ODE" is false.

The given ODE is:

y'' - 6y² + 5y = 4x

Now, let y1 and y2 be two solutions of the above ODE. Then,

y1'' - 6y1² + 5y1 = 4x ... (1)

y2'' - 6y2² + 5y2 = 4x ... (2)

Now, we need to show whether 2y1 + 3y2 is also a solution of the ODE. So, let's find its second derivative:

(2y1 + 3y2)'' = 2y1'' + 3y2''

Substituting the values from equations (1) and (2), we get:

(2y1 + 3y2)'' = 2(6y1² - 5y1 + 4x) + 3(6y2² - 5y2 + 4x)

Simplifying, we get:

(2y1 + 3y2)'' = 12(y1² + y2²) - 10(2y1 + 3y2) + 10x

So, we can see that 2y1 + 3y2 is not a solution of the ODE, as it does not satisfy the ODE. Therefore, the statement "If y1 and y2 are solutions to y''-6y²+5y=4x, then 2y1+3y2 is also a solution to the ODE" is false.

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The value of k for which P(Z ≤ k) = 0.258 is k = 0.65.

To find the value of k for which P(Z ≤ k) = 0.258, we need to use a standard normal distribution table or a calculator that can compute the inverse of the standard normal cumulative distribution function.

Using a standard normal distribution table, we can find the closest probability value to 0.258, which is 0.2580. Then, we look for the corresponding z-score in the table, which is approximately 0.65. Therefore, the value of k for which P(Z ≤ k) = 0.258 is k = 0.65.

Alternatively, we can use a calculator that can compute the inverse of the standard normal cumulative distribution function, such as the NORMSINV function in Excel or the invNorm function in a graphing calculator. Using this method, we can input the probability value of 0.258 and the calculator will return the corresponding z-score, which is approximately 0.65.

It's important to note that the value of k represents the cutoff point below which the cumulative probability is 0.258. In other words, P(Z ≤ k) = 0.258 means that there is a 25.8% probability that a random observation from a standard normal distribution is less than or equal to k. The remaining probability of 1 - 0.258 = 0.742 is the area to the right of k, which represents the probability that a random observation is greater than k.

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The probability of selecting 4 red marbles out of the bag is approximately 0.0303, or 3.03%.

To find the probability of selecting 4 red marbles out of a bag containing 6 red, 4 blue, and 2 white marbles, we first need to determine the total number of possible combinations of 4 marbles that can be selected from the bag. This can be calculated using the formula for combinations, which is:
[tex]nC_{r}=    \frac{n!}{r!(n-r)}[/tex]

where n is the total number of items in the set, and r is the number of items being chosen. In this case, we have:

n = 12 (6 red + 4 blue + 2 white)
r = 4 (the number of marbles being chosen)

So the total number of possible combinations is:

[tex]12C_{4}=    \frac{12!}{(4!8!)} = 495[/tex]

Next, we need to determine the number of combinations that contain 4 red marbles. Since there are 6 red marbles in the bag, the number of ways to choose 4 of them is:

[tex]6C_{4}=    \frac{6!}{(4!2!)} = 15[/tex]

Therefore, the probability of selecting 4 red marbles out of the bag is:

[tex]p( 4 red) = \frac{15}{495}=\frac{1}{33}[/tex]

So the probability of selecting 4 red marbles out of the bag is approximately 0.0303, or 3.03%.

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Answer:

Step-by-step explanation:

It is not necessary to know the number of successes to determine the mean of a binomial distribution. So the given statement is false.

The mean of a binomial distribution can be determined without knowing the number of successes involved in the problem. The mean of a binomial distribution is given by the product of the number of trials (n) and the probability of success on a single trial (p), denoted as np. This is a fixed value that represents the expected number of successes in a binomial distribution. The number of successes involved in the problem is not necessary to calculate the mean of a binomial distribution.

Therefore, it is not necessary to know the number of successes to determine the mean of a binomial distribution.

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a. The 90% confidence interval for the calories within a Breakfast Baconator is (746.77, 763.23).

b. The 95% confidence interval for the calories within a Breakfast Baconator is (743.09, 767.91).

c. The 95% confidence interval for the weight of prawns with a sample size of 50 cannot be determined as we do not have information on the population of prawns.

d. The 95% confidence interval for the weight of prawns with a sample size of 100 is wider than the interval for a sample size of 50.

e. As the sample size increases, the confidence interval becomes narrower and more precise as there is more data to make inferences about the population.

This is because a larger sample size reduces the effect of random variation and provides a more accurate representation of the population.

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The volume of the parallelepiped with edges AB, AC, and AD is 10 cubic units.

The volume of the parallelepiped is given by the scalar triple product of the three vectors, which is defined as follows

V = | AB ⋅ (AC × AD) |

where AB is the vector from A to B, AC is the vector from A to C, and AD is the vector from A to D, and × denotes the cross product.

First, we need to calculate the cross product of AC and AD

AC × AD = (−3 − (−4), 4 − 1, (−2)⋅2 − (−4)⋅1) = (1, 3, −4)

Then, we can calculate the dot product of AB and the cross product of AC and AD

AB ⋅ (AC × AD) = (4 − 2, −5 + 3, 1 − 4) ⋅ (1, 3, −4) = (2, −2, −3) ⋅ (1, 3, −4) = 4 + (−6) + 12 = 10

Finally, we take the absolute value of the result to get the volume of the parallelepiped

V = |10| = 10  cubic units

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V can be generated by fewer vectors (from S2) than the number of linearly independent vectors (in S1), which is not possible as every vector in V can be expressed as a linear combination of vectors in S2. True, S1 cannot contain more vectors than S2.

Suppose that V is a finite-dimensional vector space, S1 is a linearly independent subset of V, and S2 is a subset of V that generates V.

If S2 generates V, it means that every vector in V can be expressed as a linear combination of vectors in S2. In other words, the span of S2 is equal to V.

On the other hand, S1 is linearly independent, which means that no vector in S1 can be expressed as a linear combination of other vectors in S1.

Now, if S1 contains more vectors than S2, it means that the number of linearly independent vectors in S1 is greater than the number of vectors that generate V in S2.

But this would imply that V can be generated by fewer vectors (from S2) than the number of linearly independent vectors (in S1), which is not possible as every vector in V can be expressed as a linear combination of vectors in S2.

Therefore, S1 cannot contain more vectors than S2.

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The variance of the given set of data 1010, 1005, 1020, 1025, and 1030 is equal to 107.5.

Set of the data is equal to,

1010, 1005, 1020, 1025, and 1030

Use the formula of variance,

Variance = (sum of (data point - mean)^2) / (number of data points - 1)

Mean

= (1010 + 1005 + 1020 + 1025 + 1030) / 5

= 1018

Calculate the deviations for each data points,

deviation of 1010

= 1010 - 1018

= -8

deviation of 1005

= 1005 - 1018

= -13

deviation of 1020

= 1020 - 1018

= 2

deviation of 1025

= 1025 - 1018

= 7

deviation of 1030

= 1030 - 1018

= 12

Square the deviations we get,

(-8)^2 = 64

(-13)^2 = 169

2^2 = 4

7^2 = 49

12^2 = 144

Add all the squared deviations we have,

= 64 + 169 + 4 + 49 + 144

= 430

Variance of the data set is equal to

= 430 / ( 5 - 1 )

= 430 / 4

= 107.5

Therefore, the variance of the set of data is 107.5.

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To determine the minimum sample size required when you want to be 95% confident that the sample mean is within one unit of the population mean of 12.9, assuming the population is normally distributed and a 95% confidence level:

We can use the formula for the margin of error:

Margin of error = Z * (standard deviation / square root of sample size)

Where Z is the z-score corresponding to the desired confidence level (in this case, 1.96 for a 95% confidence level).

We want the margin of error to be 1 (within one unit of the population mean), so we can rearrange the formula to solve for the sample size:

Sample size = (Z * standard deviation / margin of error)^2

Plugging in the given values, we get:

Sample size = (1.96 * standard deviation / 1)^2

We don't know the standard deviation of the population, but we can estimate it using a previous study or pilot test. Let's assume we have an estimate of the standard deviation of 2.

Sample size = (1.96 * 2 / 1)^2

Simplifying, we get:

Sample size = 15.21

Rounding up to the nearest whole number, we need a minimum sample size of 16 to be 95% confident that the sample mean is within one unit of the population mean of 12.9.

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The test statistic t0 for a sample with n = 20, x = 7.5, s = 1.9, and if H1: μ < 8.3 is calculated to be  -1.886.

To calculate the test statistic t0, we can use the following formula:

t0 = (x - μ) / (s / √n)

where x is the sample mean, μ is the hypothesized population mean (in this case, 8.3), s is the sample standard deviation, and n is the sample size.

Given the values provided:

x = 7.5 (sample mean)

μ = 8.3 (hypothesized population mean)

s = 1.9 (sample standard deviation)

n = 20 (sample size)

Plugging these values into the formula, we get:

t0 = (7.5 - 8.3) / (1.9 / √20)

t0 = -0.8 / (1.9 / √20)

t0 = -0.8 / (1.9 / 4.472) (rounded to three decimal places)

t0 = -0.8 / 0.424

t0 = -1.886 (rounded to three decimal places)

Therefore, the test statistic t0 is calculated to be -1.886.

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Step-by-step explanation:

There are TWO triangles with base = 10  height = 24

   area of a triangle = 1/2 b* h  = 1/2 (10)(24) = 120 cm^2

        TWO of them totals 240 cm^2

then there is also THREE sides

 10 x 20       +   26 x 20       +     24 x 20 = 1200 cm^2

Add the two triangles to this to get the total surface area = 1440 cm^2