find the particular solution of the differential equation. dy dx=−9x8e−x9;

To find the center of mass of a cone of uniform density with radius R at the base, height h, and mass M, we need to use the formula:

x_cm = (1/M)∫∫∫xρdV
y_cm = (1/M)∫∫∫yρdV
z_cm = (1/M)∫∫∫zρdV

where x_cm, y_cm, and z_cm are the coordinates of the center of mass, ρ is the density, and V is the volume of the cone.

We can simplify the integral by using cylindrical coordinates, where the density is constant and equal to M/V, and the limits of integration are:

0 ≤ r ≤ R
0 ≤ θ ≤ 2π
0 ≤ z ≤ h(r/R)

Thus, the center of mass of the cone is:

x_cm = 0
y_cm = 0
z_cm = (3h/4)(r/R)^2

Therefore, the center of mass of the cone is located at (0, 0, (3h/4)(r/R)^2) with respect to the origin at the center of the base of the cone and +z going through the cone vertex.

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This is because when there is no correlation, the variation in y cannot be explained by the variation in x, leaving a lot of room for error. the error variance for the linear model

a) If the correlation between x and y is 1, it means that the two variables have a perfect positive linear relationship. In this case, the error variance for the linear model would be 0. This is because when there is a perfect correlation, all the variation in y can be explained by the variation in x, leaving no room for error. Therefore, the error variance would be 0.

b) If the bet correlation ween x and y is 0, it means that the two variables have no linear relationship. In this case, the error variance for the linear model would be the sum of the variances of x and y. This is because when there is no correlation, the variation in y cannot be explained by the variation in x, leaving a lot of room for error. Therefore, the error variance would be the sum of the variances of x and y, which is 49+4=53.

a) If the correlation between x and y is 1, the value of the error variance for your linear model would be 0. This is because a correlation of 1 indicates a perfect positive linear relationship between x and y, meaning there is no error or deviation from the predicted values of y based on the linear model.

b) If the correlation between x and y is 0, the value of the error variance would be equal to the variance of y. This is because a correlation of 0 indicates that there is no linear relationship between x and y, meaning that the linear model provides no predictive value for y. In this case, the error variance is equal to the variance of y, which can be calculated by squaring the standard deviation of y (2^2 = 4).

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If each value in a data set is decreased by 7 , when each value in a data set is decreased by 7, the mean, median, and mode are all affected by a decrease of 7.However, if the mode was not one of the values that was decreased by 7, then it will remain the same .

The median, on the other hand, may or may not change. The median is the middle value in a data set, so if the data set has an odd number of values, the median will remain the same because the middle value will still be the same. However, if the data set has an even number of values, the median may change because there will no longer be a single middle value. In this case, the new median will be the average of the two middle values, which may or may not be different from the original median.

The mode, or the most common value in the data set, may or may not change as well. If the mode is one of the values that was decreased by 7, then it will no longer be the most common value and a new value will take its place as the mode. However, if the mode was not one of the values that was decreased by 7, then it will remain the same.

Mean: The mean, or average, is calculated by adding all the data values and dividing by the total number of values. When each value is decreased by 7, the overall sum of the values is reduced by 7 times the total number of values. As a result, the mean will also decrease by 7.

Median: The median is the middle value in a data set when the values are arranged in ascending or descending order. Since each value is decreased by the same amount (7), the order of the values does not change, and the median value will also be decreased by 7.

Mode: The mode is the value that occurs most frequently in a data set. Decreasing each value by 7 does not affect the frequency of the values, only their magnitude. Thus, the mode will also be decreased by 7.

When each value in a data set is decreased by 7, the mean, median, and mode are all affected by a decrease of 7.

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Thus, the area of the region is 4π + 8 square units.

To find the area of the region bounded by y = 8 and y = 8sin(x) in the first quadrant, we will use integration to calculate the area between the two curves on the interval [0, π/2].
Step 1: Set up the integral
To find the area between the two curves, we will subtract the lower function (y = 8sin(x)) from the upper function (y = 8) and integrate over the interval [0, π/2].
Area = ∫[8 - 8sin(x)]dx from 0 to π/2
Step 2: Integrate
Now, we will integrate the expression with respect to x:
Area = [8x - (-8cos(x))] from 0 to π/2
Step 3: Evaluate the integral at the limits
Evaluate the integral at the upper limit (π/2) and subtract the evaluation at the lower limit (0):
Area = (8(π/2) - (-8cos(π/2))) - (8(0) - (-8cos(0)))
Area = (4π - 0) - (0 - 8)
Area = 4π + 8
Thus, the area of the region is 4π + 8 square units.

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The derivative of y = (x^2 + 3)(x^3 + 6) can be found in two ways. Both approaches yield the same derivative: dy/dx = 5x^4 + 9x^2 + 12x. One approach is to expand the expression and then differentiate it using the power rule and product rule. The second approach is to apply the product rule directly to the given expression.

Approach 1: Expand and differentiate

1. Expand the given expression: y = x^5 + 6x^3 + 3x^3 + 18

2. Simplify the expression: y = x^5 + 9x^3 + 18

3. Differentiate the expanded expression using the power rule: dy/dx = 5x^4 + 27x^2

Approach 2: Apply the product rule

1. Apply the product rule to the given expression: dy/dx = (x^2 + 3)(d/dx)(x^3 + 6) + (d/dx)(x^2 + 3)(x^3 + 6)

2. Differentiate each term separately using the power rule: dy/dx = (x^2 + 3)(3x^2) + (2x)(x^3 + 6)

3. Simplify the expression: dy/dx = 3x^4 + 9x^2 + 2x^4 + 12x

4. Combine like terms: dy/dx = 5x^4 + 9x^2 + 12x

Hence, both approaches yield the same derivative: dy/dx = 5x^4 + 9x^2 + 12x.

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Answer:

--------------

Find 25% of 240:

Add 25% to 240:

The relative rate of change of f(x) at x = 34 is -3.

To find the relative rate of change of f(x) at the indicated value of x, we need to calculate the derivative of f(x) and evaluate it at x = 34.

Given that f(x) = 297 - 3x, we can differentiate it with respect to x to find the derivative:

f'(x) = -3

The derivative f'(x) represents the rate of change of f(x) at any given x value. Since f'(x) is a constant (-3), it doesn't change with different x values.

Therefore, the relative rate of change of f(x) at x = 34 is -3.

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Answer: 0.4

Step-by-step explanation:

The number that occurs the most

The average age of the six students in the lab group is 24.33 years, and their standard deviation is approximately 10.43 years.

This means that the ages of the students vary quite a bit from the average age and are spread out over a relatively wide range.

To calculate the average age, we simply added up the ages of all six students (16 + 25 + 22 + 19 + 42 + 22 = 146) and divided by the number of students (6). This gave us an average age of 24.33 years.

To calculate the standard deviation, we used the formula for the sample standard deviation. First, we found the deviation of each age from the mean by subtracting the mean age (24.33 years) from each individual age.

Next, we squared each deviation, summed up the squares, and divided by the sample size minus one (i.e., 5). Finally, we took the square root of the result to obtain the standard deviation of approximately 10.43 years.

The standard deviation tells us how much the ages of the students in the lab group vary from the average age. A larger standard deviation indicates that the ages are more spread out and do not cluster closely around the mean.

In this case, the relatively large standard deviation suggests that the ages of the students in the lab group are widely dispersed and do not have a particularly narrow range.

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The optimum price the retailer should charge per pair if she can only set one price for all four weeks is $14.29, and her corresponding revenue will be $40,000.

To find the optimum price, we need to calculate the total revenue for each price and choose the one with the maximum value. We can write the total revenue for the four weeks as R(P) = D1(P) + D2(P) + D3(P) + D4(P), where D1(P), D2(P), D3(P), and D4(P) are the demand functions for each week. Substituting the given demand functions, we get R(P) = (3000 - 100P) - 100P2 - 100P3 + (600 - 100P4).

Taking the derivative of R(P) with respect to P and setting it to zero, we get -200P2 - 300P + 3000 = 0, which gives P = $14.29 as the optimum price. Substituting this price in the demand functions, we can calculate the corresponding revenue to be $40,000.

Therefore, the retailer should charge $14.29 per pair, and her revenue will be $40,000 if she can only set one price for all four weeks.

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1. The volume of the box is 287 cubic inches

2. The height of the box is 3 inches

From the question, we have the following parameters that can be used in our computation:

The figure

This figure can be broken down to

So, we have

Area = 1/2 * (3 + 7) * 2 * 2 + 7 * 3

Evaluate

Area = 41

The height is 7

So, we have

Volume = 41 * 7

Volume = 284

In (a), we have

Area = 41

So, we have

Height = Volume/Area

This gives

Height = 123/41

Evaluate

Height = 3

Hence, the height of the box is 3 inches

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If set x has 10 members, then p(x) has 1024 members and x has 1023 proper subsets.

If set x has 10 members, then the power set (or set of all subsets) of x, denoted as p(x), will have 2 to the power of 10 or 1024 members.

This is because, each of the 10 members of x, it can either be included or excluded in a subset, giving 2 options.

Multiplying these options for all 10 members gives us the total number of subsets.

As for the number of proper subsets of x, a proper subset is a subset that is not equal to the original set x.

To calculate the number of proper subsets, we need to subtract 1 (the set x itself) from the total number of subsets.

So, the number of proper subsets of x would be 1024 - 1 = 1023.

In summary, if set x has 10 members, then p(x) has 1024 members and x has 1023 proper subsets.

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A 90% confidence interval for the proportion of Americans with cancer was found to be (0.185, 0.210). is a. 0.1975.

The point estimate for a confidence interval is the midpoint of the interval. In this case, the midpoint would be the average of the lower and upper bounds: (0.185 + 0.210) / 2 = 0.1975.

Conclusion: Therefore, the point estimate for the given confidence interval of (0.185, 0.210) for the proportion of Americans with cancer is 0.1975.


To find the point estimate for a confidence interval, you can calculate the average of the lower and upper bounds. In this case, the lower bound is 0.185 and the upper bound is 0.210.

Step 1: Add the lower and upper bounds together: 0.185 + 0.210 = 0.395
Step 2: Divide the sum by 2 to find the average: 0.395 / 2 = 0.1975

Therefore, the point estimate for the 90% confidence interval for the proportion of Americans with cancer is 0.1975 (option a).

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The correct critical value(s) to be used in drawing a conclusion for a two-tailed test about a proportion at the 0.01 level of significance is +2.575 and -2.575.

When conducting hypothesis testing, critical values are used to determine the rejection region for the null hypothesis. The rejection region is determined based on the level of significance and the degrees of freedom.

For a two-tailed test at the 0.01 level of significance, the rejection region is divided between the upper and lower tails of the distribution, each containing 0.005 of the area.

The critical values for the upper and lower tails can be found using a standard normal distribution table or calculator. For a significance level of 0.01, the critical values are +/- 2.575, which corresponds to the area of 0.005 in each tail.

Therefore, if the test statistic falls outside the range of -2.575 to 2.575, the null hypothesis can be rejected at the 0.01 level of significance.

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25$ will be the final cost.

The cost (y) depends on the number of items purchased (x). We know that there is a flat fee of $10, so we start with the equation

y = 10 + ...

Then we add the cost of each item, which is $5 per item:

y = 10 + 5x

This is the linear equation that represents the total cost as a function of the number of items purchased.

For example, if a customer purchases 3 items, the total cost would be:

y = 10 + 5(3) = 25

So the total cost would be $25.

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Complete question:

A store charges a flat fee of $10 for every purchase, plus an additional $5 for every item purchased. Write a linear equation that represents the total cost (y) as a function of the number of items purchased (x).

There are 35 possible combinations of 3 employees that can be chosen from the set of 7 at Dunder Mifflin Paper Company.

To find the number of combinations of 3 employees that can be chosen from the set of 7, we can use the formula for combinations:

nCr = n! / (r! * (n-r)!)

where n is the total number of employees (7 in this case) and r is the number of employees we want to choose (3 in this case).

Plugging in the values, we get:

7C₃ = 7! / (3! * (7-3)!)

= (7 * 6 * 5) / (3 * 2 * 1)

= 35

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Yes, the segments CD || ĀB. This is because the ration of the EC to CA and ED to DB are equal.

For CD || ĀB to be true, then

EC/CA = ED/DB

12/4 = 3

14/14/4.6666666667 = 3.

Hence, since EC/CA = ED/DB

Then the segments are parallel and is written as

CD || ĀB

If two lines in a plane never collide or cross, they are said to be parallel. The distance between two parallel lines is always the same.

If two line segments in a plane may be stretched to produce parallel lines, they are parallel. A polygon has a pair of parallel sides if two of its sides are parallel line segments.

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Answer:4

Step-by-step explanation:

because A is actually 6,3 while B is 6,7 A to get 7 is 4 time

hope that helps u girl !!

The scale factor of the given scenario is 7/36.

Given that, the scale of the drawing was 7 inches = 1 yard.

We know that, 1 yard = 36 inches

The basic formula to find the scale factor of a figure is expressed as,

Scale factor = Dimensions of the new shape ÷ Dimensions of the original shape.

Here, scale factor = 7/36

Therefore, the scale factor of the given scenario is 7/36.

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The derivative of the function f is f'(x) = x^3 - 8x^2, and the original function f can be obtained by integrating the derivative.

The given derivative, f'(x) = x^3 - 8x^2, represents the rate of change of the function f with respect to x. To find the original function f, we need to integrate the derivative.

Integrating the derivative f'(x), we obtain:

f(x) = ∫(x^3 - 8x^2) dx

To integrate x^3, we add 1 to the exponent and divide by the new exponent:

∫x^3 dx = (1/4)x^4 + C1, where C1 is the constant of integration.

To integrate -8x^2, we use the same process:

∫-8x^2 dx = (-8/3)x^3 + C2, where C2 is another constant of integration.

Combining the two results, we have:

f(x) = (1/4)x^4 - (8/3)x^3 + C, where C = C1 + C2 is the overall constant of integration.

Thus, the original function f, corresponding to the given derivative, is f(x) = (1/4)x^4 - (8/3)x^3 + C.



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A 95% confidence interval estimate for the mean weight of newborn boys is to be constructed using a random sample of 195 weights where the sample mean is 32.7 hg, and the standard deviation of the population is 6.6 hg.

To construct a confidence interval estimate, we use the formula:

CI = X ± Zα/2 * (σ/√n)

Where X is the sample mean, Zα/2 is the z-value corresponding to the desired level of confidence (95% in this case), σ is the population standard deviation, and n is the sample size.

Plugging in the given values, we have:

CI = 32.7 ± Zα/2 * (6.6/√195)

To find the value of Zα/2, we refer to the standard normal distribution table or use a calculator. At 95% confidence, Zα/2 is 1.96.

Substituting the values, we get:

CI = 32.7 ± 1.96 * (6.6/√195)

Simplifying the expression gives us:

CI = (30.98, 34.42)

Therefore, we can be 95% confident that the true mean weight of newborn boys falls within the range of 30.98 hg to 34.42 hg.

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3,9,10 >>> not a right triangle. because 3^2 + 9^2 is not equal to 10^2

27, 36, 45 >>> yes, a right triangle bc 27^2 + 36^2 = 45^2

11,13,17 >>>

11^2 + 13^2 = 290

The sqrt of 290 = 17.0293863659.

If you are in the lower grades, probably your teacher expects you to round this to 17. I honestly don't know how to answer bc I don't know what your teacher's expectations are for rounding.

I am a precise person, but I could see a teacher accepting YES RIGHT TRIANGLE bc it's basically 17.

4, 8, 9 >>> NOT a right triangle.

4^2 + 8^2 = 80

The sqrt of 80 = 8.94427191

I would say NO because this does not equal 9!

Step-by-step explanation:

For Taxi A,

Every 40 miles would cost £35, so for 240 miles:

240 miles ÷ 40 miles = 6 (number of 40-mile trips)

6 trips x £35 per trip = £210 (original cost without discount)

With a 15% discount,

15% of £210 = £31.50 (discount amount)

£210 - £31.50 = £178.50 (final cost after discount)

For Taxi B,

240 miles x £0.70/mile = £168 (final cost)

Therefore, the cheaper taxi journey for Corey would be Taxi B, which would cost £168.

Answer:

Step-by-step explanation:

it is 6 because it is there 2 times

Evaluating the integral. /2 7 cos2() d 0 we get the value of the integral ∫₀² 7cos²(x) dx is approximately 3.927.

The integral can be evaluated as follows:

∫₀² 7cos²(x) dx

Using the trigonometric identity cos²(x) = (1/2)(1 + cos(2x)), the integral can be rewritten as:

∫₀² 7(1/2)(1 + cos(2x)) dx

= (7/2)∫₀² (1 + cos(2x)) dx

= (7/2)(x + (1/2)sin(2x)) ∣₀²

= (7/2)(2 + (1/2)sin(4) - (1/2)sin(0))

= (7/2)(2 + (1/2)(-0.757) - (1/2)(0))

= (7/2)(1.121)

= 3.927

Therefore, the value of the integral ∫₀² 7cos²(x) dx is approximately 3.927.

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The text describes various techniques for identifying potential sites for plants or facilities. These techniques include the centroid method, factor-rating systems, linear programming, the transportation method of decision analysis, and regression analysis.

However, the text does not mention one of these techniques as a way to identify potential sites. The technique that is not mentioned in the text is option D, the transportation method of decision analysis. The transportation method is a mathematical technique used to determine the optimal transportation of goods from one location to another. It involves minimizing transportation costs while meeting supply and demand requirements. While this technique can be useful in logistics and supply chain management, it is not typically used to identify potential sites for plants or facilities.

In summary, the techniques mentioned in the text for identifying potential sites are the centroid method, factor-rating systems, linear programming, and regression analysis. The transportation method of decision analysis is not mentioned in the text as a technique for identifying potential sites.

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The Taylor polynomial of degree 5 of the function f(x) = cos(x) at a = 0 is t5(x) = 1 - x^2/2 + x^4/24.

To find the Taylor polynomial of degree 5 of f(x) = cos(x) at a = 0, we need to compute the function's derivatives up to the fifth order and evaluate them at a = 0. Therefore, the Taylor polynomial of degree 5 of f(x) = cos(x) at a = 0 is t5(x) = 1 - x^2/2 + x^4/24.

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1. grad(T) . u = |grad(T)| cos(theta), 2. To maximize the rate of increase, we should move in the direction of the gradient vector, 3. The maximum rate of increase is |grad(T)|.

To answer your first question, we need to use the gradient vector which gives us the direction of the steepest increase of temperature. Let's call the point in question (x,y,z). Then, the gradient vector at that point is given by:
grad(T) = (dT/dx, dT/dy, dT/dz)
We are interested in the rate of change of temperature in the direction toward a specific point, which we will call (a,b,c). To find this rate of change, we need to compute the dot product between the gradient vector and the unit vector pointing from (x,y,z) toward (a,b,c). Let's call this unit vector u. Then, the rate of change of temperature in the direction toward (a,b,c) is given by:
grad(T) . u = |grad(T)| |u| cos(theta)
where |grad(T)| is the magnitude of the gradient vector, |u| is the magnitude of the unit vector, and theta is the angle between the two vectors. Since u is a unit vector, |u| = 1. Therefore, we can simplify the formula to:
grad(T) . u = |grad(T)| cos(theta)
To answer your second question, we need to find the direction in which the temperature increases fastest. This is simply the direction of the gradient vector. To see why, consider that the gradient vector points in the direction of the steepest increase in temperature. Therefore, to maximize the rate of increase, we should move in the direction of the gradient vector.
To answer your third question, we need to find the maximum rate of increase of temperature. This occurs in the direction of the gradient vector, and its magnitude is given by the magnitude of the gradient vector. Therefore, the maximum rate of increase is |grad(T)|.

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The roots of the quadratic equations are listed below:

Case 13: x = 4 or x = 2

Case 14: x = - 2 or x = - 4

Case 15: x = 6 or x = - 9

Case 16: x = - 1 + i √3 or x = - 1 - i √3

Case 17: x = - 5 or x = - 6

Case 18: x = 10 or x = - 9

Case 19: x = - 1 or x = - 10

Case 20: x = 4 or x = 2

Case 21: x = 1 or x = - 2

Case 22: x = 2 or x = - 1

Case 23: x = 10 or x = 5

Case 24: x = 5 or x = 2

Case 25: x = 3 or x = - 6

Case 26: x = - 33 / 26 + i √471 / 26 or x = - 33 / 26 - i √471 / 26

In this problem we need to determine the roots of each of 14 quadratic equations, this can be done by means of quadratic formula, which is introduced below:

a · x² + b · x + c = 0

x = - b / (2 · a) ± [1 / (2 · a)] · √(b² - 4 · a · c), where a, b, c are real coefficients.

Now we proceed to determine the roots of each equation:

Case 13: (a = 1, b = - 6, c = 8)

x = 4 or x = 2

Case 14: (a = 1, b = 6, c = 8)

x = - 2 or x = - 4

Case 15: (a = 2, b = 6, c = - 108)

x = 6 or x = - 9

Case 16: (a = 5, b = 10, c = 20)

x = - 1 + i √3 or x = - 1 - i √3

Case 17: (a = 2, b = 22, c = 60)

x = - 5 or x = - 6

Case 18: (a = 1, b = - 1, c = - 90)

x = 10 or x = - 9

Case 19: (a = 1, b = 11, c = 10)

x = - 1 or x = - 10

Case 20: (a = 5, b = - 30, c = 40)

x = 4 or x = 2

Case 21: (a = 2, b = 2, c = - 4)

x = 1 or x = - 2

Case 22: (a = 4, b = - 4, c = - 8)

x = 2 or x = - 1

Case 23: (a = 1, b = - 15, c = 50)

x = 10 or x = 5

Case 24: (a = 1, b = - 7, c = 10)

x = 5 or x = 2

Case 25: (a = 1, b = 3, c = - 18)

x = 3 or x = - 6

Case 26: (a = 26, b = 66, c = 60)

x = - 33 / 26 + i √471 / 26 or x = - 33 / 26 - i √471 / 26

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Using the formula of z-score, the highest and lowest acceptable scores are 132 and 108 respectively.

To find the highest and lowest acceptable scores for membership in the upper 25% range, we need to determine the z-scores corresponding to the cutoff points.

Since the variable is normally distributed, we know that the middle 50% of the distribution lies within ±0.6745 standard deviations from the mean. Therefore, the upper 25% range corresponds to the area beyond ±0.6745 standard deviations from the mean.

[tex]z = \frac{x - \mu}{\sigma}[/tex]

where;

In this problem, we are given that μ = 115 and σ = 12. We want to find the scores that correspond to the 75th percentile, which is 25% from the top. The 75th percentile is equivalent to a z-score of 0.6745.

Plugging these values into the z-score formula, we get:

z = (x - μ) / σ

0.6745 = (x - 115) / 12

x = 132

The highest acceptable score is 132.

The lowest acceptable score is the same as the mean, minus the z-score multiplied by the standard deviation. This gives us:

x = μ - zσ

x = 115 - 0.6745 * 12

x = 108

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