Acme Company has three identical manufacturing plants, one on the Texas Gulf Coast, one in southern Alabama, and one in Florida. Each plant is valued at $200 million. Acme's risk manager is concerned about the damage which could be caused by a single hurricane. The risk manager believes there is an extremely low probability that a single hurricane could destroy two or all three plants because they are located so far apart. What is the maximum possible loss associated with a single hurricane

To find the point with the largest z-coordinate that lies on the intersection of the plane x + y + 0 and the sphere x^2 + y^2 + z^2 = 9, we can start by finding the intersection curve of the plane and the sphere.

Substituting y = -x into the equation of the sphere, we get.

x^2 + (-x)^2 + z^2 = 9

2x^2 + z^2 = 9

z^2 = 9 - 2x^2

Substituting y = -x into the equation of the plane, we get:

x + (-x) + 0 = 0

x = 0

So the intersection curve is given by the parametric equations:

x = 0

y = -x = 0

z = ±√(9 - 2x^2)

Since we want the point with the largest z-coordinate, we need to find the point on the curve where z is maximized. Since z^2 is a decreasing function on the interval [0, √(9/2)], we know that z is maximized at x = 0 or x = ±√(9/2). We can evaluate z at these three points:

(0, 0, 3)

(√(9/2), 0, √(9/2 - 9/2)) = (√(9/2), 0, 0)

(-√(9/2), 0, √(9/2 - 9/2)) = (-√(9/2), 0, 0)

Therefore, the point with the largest z-coordinate that lies on the intersection of the plane x + y + 0 and the sphere x^2 + y^2 + z^2 = 9 is (0, 0, 3).

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This means there is approximately a 3.33% chance that the student will be able to solve all 6 problems on the exam.

We have a student who can solve 7 out of the 10 problems. The instructor will select 6 questions at random for the exam. We want to find the probability that the student can solve all 6 problems on the exam.

To determine this probability, we will use the concept of combinations. A combination is a selection of items from a larger set, where the order of the items does not matter. In this case, we will calculate the combinations of problems the student can solve and the total possible combinations of problems on the exam.

The student can solve 7 problems, so there are C(7,6) combinations of problems she can solve, where C(n,k) represents the number of combinations of n items taken k at a time. There are a total of 10 problems, so there are C(10,6) possible combinations of problems that could appear on the exam.

The probability that the student can solve all 6 problems on the exam is given by the ratio of the combinations of solvable problems to the total possible combinations of problems on the exam:

Probability = C(7,6) / C(10,6)

Using the formula for combinations, we find:

C(7,6) = 7! / (6!(7-6)!) = 7
C(10,6) = 10! / (6!(10-6)!) = 210

So, the probability that the student can solve all 6 problems on the exam is:

Probability = 7 / 210 = 1/30 ≈ 0.0333

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All of the examples listed are unit rates. A unit rate is a ratio between two different units where one of the terms has a value of 1.

In all of the options given, there is a value of 1 associated with one of the units. For example, in option A, the unit rate is 1.5 cups of flour per 1 cup of milk. Similarly, in option B, the unit rate is 1.33 sandwiches per 1 person. In option C, the unit rate is 1 stamp per 1 person. In option D, the unit rate is 11.4 cars per 1 hour. In option E, the unit rate is 6 coins per 1 player (since 24 divided by 4 is 6). Finally, in option F, the unit rate is 30 miles per 1 hour.

Here are the examples that are unit rates from the given options:

C. 5 stamps per person
D. 11.4 cars per hour
F. 30 miles per hour

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When we conclude that the results we have gathered from our sample are probably also found in the population from which the sample was drawn, we say that the results are statistically significant.

In statistical analysis, we use hypothesis testing to determine whether the results of a sample are likely to be representative of the population as a whole. If the results are statistically significant, we can infer that there is a low probability that the observed differences between the sample and the population occurred by chance alone.

This allows us to generalize the findings from the sample to the larger population with a reasonable degree of confidence.

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Answer:

[tex] \frac{x + 4}{6x} = \frac{1}{x} [/tex]

x(x + 4) = 6x

x^2 + 4x = 6x

x^2 = 2x

x = 0, 2

0 is an extraneous solution, so x = 2 is the only solution.

the probability that the mean life of a random sample of 9 bread-making machines falls between 6.4 and 7.2 years is: 0.6106.

We can use the central limit theorem to approximate the sampling distribution of the sample mean of bread-making machines, which is also normally distributed with a mean of 7 years and a standard deviation of 1/√9 = 1/3 years.

Then, we need to standardize the values of 6.4 and 7.2 using the formula:

z = (x - μ) / σ

where x is the value of interest, μ is the mean, and σ is the standard deviation.

For 6.4 years:

z1 = (6.4 - 7) / (1/3) = -1.2

For 7.2 years:

z2 = (7.2 - 7) / (1/3) = 0.6

We want to find the probability that the sample mean falls between 6.4 and 7.2 years, which is equivalent to finding the probability that the standardized sample mean falls between z1 and z2.

Using a standard normal distribution table or calculator, we can find the probabilities associated with each z-value:

P(z < -1.2) = 0.1151

P(z < 0.6) = 0.7257

Therefore, the probability that the mean life of a random sample of 9 bread-making machines falls between 6.4 and 7.2 years is:

P(-1.2 < z < 0.6) = P(z < 0.6) - P(z < -1.2) = 0.7257 - 0.1151 = 0.6106

The probability is approximately 0.6106 or 61.06%.

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The volume of the blue triangular prism is 216 cubic centimeters.

We assume that the two figures are similar, if the scale factor between the two is K, then the volume of the blue prism will be K³ times the volume of the green one.

To find the value of K, we can compare the two known sides:

4cm*K = 6cm

K = 6cm/4cm = 3/2

Then the volume of the blue prism is:

(3/2)³*64cm³ = 216 cm³

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The 90% confidence interval for the population proportion of iPhones that obtain over 85 apps is 0.48 ± 0.16., which can be simplified to 0.48 ± 0.16. The correct answer choice is B.

To construct the confidence interval, we first calculate the sample proportion of iPhones with over 85 apps downloaded:

p = 12/25 = 0.48

We can use the following formula to calculate the margin of error:

[tex]ME = z \alpha /2 * \sqrt{(p * (1 - p)) / n)}[/tex]

Where zα/2 is the critical value from the standard normal distribution for a 90% confidence level, which is 1.645. Substituting the values, we get:

[tex]ME = 1.645 * \sqrt{(0.48 * 0.52) / 25} = 0.159[/tex]

Finally, we construct the confidence interval:

p ± ME = 0.48 ± 0.159

So the answer is option B: 0.48 ± 0.16.

The complete question is:

In a sample of 25 iPhones, 12 had over 85 apps downloaded. Construct a 90% confidence interval for the population proportion of all iPhones that obtain over 85 apps. Assume z0.05 = 1.7=645.

Group of answer choices

 A  0.29 ± 0.15

 B  0.48 ± 0.16

 C  0.48 ± 0.09

 D  0.29 ± 0.16

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Answer:

The awnser is this, very real, dond fake 122

Boxplots are most useful for graphically comparing distributions of numerical data, including the median, quartiles, and potential outliers. Therefore, the correct answer is "comparing two populations graphically."

Boxplots allow us to see the distribution of the data, including measures of central tendency (such as the median), and the spread of the data (such as the interquartile range).

Additionally, boxplots can help identify potential outliers and asymmetry in the data.

They are particularly useful for comparing multiple groups or populations side-by-side to identify any differences in their distributions.

Boxplots are most useful for graphically comparing distributions of numerical data, including the median, quartiles, and potential outliers.

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Thus, the shaded region is the set of solutions for this system of inequalities, and the integers in this region are -4, -3, -2, -1, 0, 1, 2, and 3.

To solve the system of inequalities by graphing, we first need to rewrite each inequality in slope-intercept form, y < mx + b, where y is the dependent variable (in this case, we can use y to represent both 3-2a and 5a), m is the slope, x is the independent variable (in this case, a), and b is the y-intercept.

Starting with the first inequality, 3-2a < 13, we can subtract 3 from both sides to get -2a < 10, and then divide both sides by -2 to get a > -5. So the slope is negative 2 and the y-intercept is 3. We can graph this as a dotted line with a shading to the right, since a is greater than -5:

y < -2a + 3

Next, we can rewrite the second inequality, 5a < 17, by dividing both sides by 5 to get a < 3.4. So the slope is 5/1 (or just 5) and the y-intercept is 0. We can graph this as a dotted line with a shading to the left, since a is less than 3.4:

y < 5a

To find the integers that are in the set of solutions for this system of inequalities, we need to look for the values of a that satisfy both inequalities. From the first inequality, we know that a must be greater than -5, but from the second inequality, we know that a must be less than 3.4. So the integers that are in the set of solutions are the integers between -4 and 3 (inclusive):

-4, -3, -2, -1, 0, 1, 2, 3

To see this graphically, we can shade the region that satisfies both inequalities:

y < -2a + 3 and y < 5a

The shaded region is the set of solutions for this system of inequalities, and the integers in this region are -4, -3, -2, -1, 0, 1, 2, and 3.

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Hi! To find the primitive function of 4x, you need to determine the antiderivative of the given function.

The primitive function of 4x is:

∫(4x) dx = 4∫(x) dx = 4(x^2/2) + C

So the primitive function of 4x is [tex]2x^2 + C[/tex], where C is the constant of integration.

This is true, we can verify that the equation n(A∪B)=n(A)+n(B) holds for the given disjoint sets A={a,e,i,o,u} and B={g,h,k,l,m}.

Since A and B are disjoint sets, meaning they have no common elements, we can say that A∩B=∅. Therefore, the equation n(A∪B)=n(A)+n(B) becomes:
n({a,e,i,o,u,g,h,k,l,m}) = n({a,e,i,o,u}) + n({g,h,k,l,m})
Counting the elements, we see that n({a,e,i,o,u,g,h,k,l,m})=10, n({a,e,i,o,u})=5, and n({g,h,k,l,m})=5.
Substituting these values back into the equation, we get:
10 = 5 + 5
Hi! To verify the equation n(A∪B) = n(A) + n(B) for the given disjoint sets A = {a, e, i, o, u} and B = {g, h, k, l, m}, we first need to find the union of sets A and B.
Since A and B are disjoint (meaning they have no elements in common), the union of A and B, denoted as A∪B, simply combines the elements of both sets. So, A∪B = {a, e, i, o, u, g, h, k, l, m}.
Now, let's find the number of elements (n) in each set:
n(A) = 5 (as there are 5 elements in set A)
n(B) = 5 (as there are 5 elements in set B)
n(A∪B) = 10 (as there are 10 elements in the union of A and B)
Now, we can verify the equation:
n(A∪B) = n(A) + n(B)
10 = 5 + 5

The equation holds true for the given disjoint sets A and B.

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The slope of a function f(x) at a point x is given by its derivative f'(x). Therefore, to find the average slope of the function f(x) on the interval (-4, 10)

We need to compute the average value of its derivative f'(x) over this interval.

The derivative of f(x) is:

f'(x) = 4x - 12x - 48

We can compute the definite integral of f'(x) over the interval (-4, 10) as follows:

∫[-4,10] f'(x) dx = ∫[-4,10] (4x - 12x - 48) dx

= [2x^2 - 6x^2 - 48x] |[-4,10]

= [(2(10)^2 - 6(10)^2 - 48(10)) - (2(-4)^2 - 6(-4)^2 - 48(-4))]

= (-380) - (120)

= -500

Therefore, the average slope of the function f(x) on the interval (-4, 10) is:

Average slope = (-500) / (10 - (-4)) = (-500) / 14 = -35.71 (approximately)

Hence, the average slope of the function f(x) on the interval (-4, 10) is approximately -35.71.

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Answer:

c

Step-by-step explanation:

volume value multiplyer = 1

The metric system is based on units of 10, with the liter (L) as the basic unit of volume. One liter is equal to 1,000 milliliters (mL). The answer is d. none of the above.

Therefore, option a is incorrect because 1 liter is equal to 1,000 mL, which is 100 times more than 10 mL.

Option b is also incorrect because 1 deciliter (dL) is equal to 100 mL, so 10 dL is equal to 1,000 mL, which is again 100 times more than 10 mL.

Option c is incorrect because 1 cubic centimeter (cm³) is equal to 1 milliliter (mL), so 10 cm³ is equal to 10 mL.

However, this does not mean that 10 mL is equal to 10 cm³, as they are simply two different ways of expressing the same volume.

Therefore, the correct answer is d.

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If Ivan can rinse the dishes in minutes and Lamar can rinse the same dishes in minutes, then their combined rinsing power is dishes per minute. To find out how long it will take them to rinse the dishes together, we need to use the formula:


Ivan's rate: 1 dish/minute
Lamar's rate: 1 dish/minute

When working together, their combined rate is the sum of their individual rates. So, the combined rate is (1 + 1) dishes/minute, which equals 2 dishes/minute.

Now, we can use the formula to find the time it takes for them to rinse the dishes together:

work = rate × time

dishes = (2 dishes/minute) × x

Since the number of dishes is the same for both Ivan and Lamar, we can set up an equation:

dishes = 2x

Solving for x, we find that it will take half the time for them to rinse the dishes together compared to doing it individually.

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Step-by-step explanation:

a number to a negative power is the same as 1/(base).

In the simple linear regression model, the residual term accounts for the variability in the dependent variable that cannot be explained by the linear relationship between the variables.

In a simple linear regression model, we assume that there is a linear relationship between the dependent variable and the independent variable.

The residual term is the difference between the actual value of the dependent variable and the predicted value based on the regression line. It represents the part of the variation in the dependent variable that is not accounted for by the linear relationship with the independent variable.

The residual term is also referred to as the error term, and its sum of squares is used to estimate the variability of the dependent variable around the regression line. A lower sum of squared residuals indicates a better fit of the regression line to the data.

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When a weather reporter predicts that there is a 20% chance of snow tomorrow for a certain region,

They are essentially saying that there is a small probability of snowfall occurring in that particular area.

This phrase indicates the likelihood of snowfall, and it is based on various factors such as temperature, atmospheric pressure, wind patterns, and moisture content in the air.

In general, weather forecasting is a complex process that involves analyzing vast amounts of data from various sources, such as satellites, radar, and weather stations.

Forecasters use this data to create computer models that simulate weather conditions in a given region, which they then use to make predictions.

When it comes to predicting snowfall, there are several factors that forecasters consider. For example, they look at the temperature and dew point to determine whether the conditions are suitable for snow to form.

They also analyze the amount of moisture in the air, as well as the wind direction and speed, which can affect how much snow falls and where it accumulates.

In terms of the 20% chance of snow, this indicates that there is a relatively low probability of snowfall occurring in the region in question. It does not mean that it is impossible for snow to fall, but rather that it is less likely than other weather conditions, such as rain or clear skies.

Overall, weather forecasting is an essential tool that helps us prepare for and respond to changes in the weather.

By understanding the meaning behind phrases such as the 20% chance of snow, we can make informed decisions about how to dress, travel, and plan our activities.

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The assumptions for the two proportions z-test that would not be a concern, in this case, are random sampling, independence, large sample size, and normality of the sampling distribution.

When comparing two proportions using a z-test, there are several assumptions that need to be met to ensure that the results are valid. In this case, the assumptions that would not be a concern are:

Random sampling: The sample of 50 mushrooms from each company is assumed to be a random sample from the population of mushrooms for each company. This assumption ensures that the sample is representative of the population and that the results can be generalized to the larger population.

Independence: The samples from each company are assumed to be independent of each other. This means that the mushrooms from one company do not influence the mushrooms from the other company in any way. This assumption is necessary for the validity of the z-test.

Large sample size: The sample size of 50 mushrooms from each company is sufficiently large. When the sample size is large, the sample proportion can be used as an estimate of the population proportion, and the sampling distribution can be assumed to be approximately normal. A general rule of thumb is that the sample size should be at least 30.

Normality: The z-test assumes that the sampling distribution of the difference between the two sample proportions is approximately normal. This assumption is valid when the sample size is large, as mentioned above.

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A scientist might set a lower significance level to reduce the likelihood of a Type I error (false positive) and increase the confidence in their results.

When conducting a hypothesis test, a scientist uses statistical methods to evaluate the evidence for or against a proposed hypothesis.

The significance level of a hypothesis test is the probability of rejecting the null hypothesis when it is true, which is also known as a Type I error. In other words, a significance level of 0.05 means that there is a 5% chance of rejecting a true null hypothesis, and accepting a false alternative hypothesis.

Setting a lower significance level, such as 0.01, means that the scientist is willing to accept a higher level of confidence in their results and reduce the likelihood of making a Type I error.

This means that the researcher is willing to accept that there is only a 1% chance of rejecting a true null hypothesis, which is a more conservative approach.

There are several reasons why a scientist might choose to set a lower significance level.

First, if the consequences of a false positive are severe or costly, such as in medical research or engineering, then a lower significance level can help to minimize the risk of making a wrong decision.

Second, if the sample size is small, a lower significance level can help to reduce the impact of random variation and increase the confidence in the results.

Finally, if the effect size of the study is small, a lower significance level can help to ensure that the observed difference is not due to chance and is truly meaningful.

In summary, setting a lower significance level can help a scientist to increase the confidence in their results, reduce the likelihood of making a Type I error, and ensure that the observed difference is not due to chance.

However, it is important to balance the need for a high level of confidence with the practical considerations of the study and the potential consequences of a false positive.

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In a major sports rights deal, the NCAA just renewed its contract with CBS/Turner through 2032 for March Madness. CBS and Turner Sports both serve as the broadcasting means in the media process

They play a crucial role in the communication process by broadcasting the NCAA March Madness tournament to millions of viewers around the world. The agreement between the NCAA and CBS/Turner is a significant deal that will ensure the continued popularity and success of the annual college basketball tournament for years to come. This partnership has allowed CBS/Turner to provide in-depth coverage of the event, including live streaming of games, analysis, and commentary. Additionally, CBS and Turner Sports work closely with the NCAA to promote the tournament and its related events to audiences worldwide, which helps to enhance the overall viewing experience. Overall, CBS and Turner Sports have established themselves as key players in the broadcasting industry, providing quality sports programming to audiences worldwide.

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Thus, it is important to interpret the F-ratio in the context of the research question and to consider other factors, such as effect size and practical significance, when drawing conclusions from an ANOVA analysis.

When conducting an analysis of variance (ANOVA), we are interested in comparing the means of two or more groups.

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Source of Variation Sum of Squares Degrees of Freedom Mean Squares ​F-Test Statistic Treatment 400 2 200 1.333 Error 5699 22 259.045 Total 6099 24.

To complete the ANOVA table, we'll calculate the missing values using the given information.
1. Calculate the Total Sum of Squares:
Total Sum of Squares = Treatment Sum of Squares + Error Sum of Squares
Total Sum of Squares = 400 + 5699 = 6099
2. Calculate the Total Degrees of Freedom:
Total Degrees of Freedom = Treatment Degrees of Freedom + Error Degrees of Freedom
Total Degrees of Freedom = 2 + 22 = 24
3. Calculate the Mean Squares for Treatment and Error:
Mean Squares for Treatment = Treatment Sum of Squares / Treatment Degrees of Freedom
Mean Squares for Treatment = 400 / 2 = 200
Mean Squares for Error = Error Sum of Squares / Error Degrees of Freedom
Mean Squares for Error = 5699 / 22 = 259
4. Calculate the F-Test Statistic:
F-Test Statistic = Mean Squares for Treatment / Mean Squares for Error
F-Test Statistic = 200 / 259 = 0.772
Now, we can fill in the ANOVA table:
Source of Variation | Sum of Squares | Degrees of Freedom | Mean Squares | F-Test Statistic
Treatment          |      400       |          2         |     200      |      0.772
Error              |     5699       |         22         |     259      |
Total              |     6099       |         24         |              |

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Answer:

Charlie's diagram: 15 inches by 6 inches

Zach's diagram: 60 inches by 24 inches

let s = {−1, 0, 2, 4, 7}. f(s) = {1}, f(s) = {-1, 1, 5, 9, 15} and f(s) = {0, 1, 2}.

Given the set s = {−1, 0, 2, 4, 7}, I will find f(s) for each of the provided functions:

a) f(x) = 1
For every x in s, f(x) is always 1.

b) f(x) = 2x + 1
Applying this function to each element of s:
f(-1) = -1
f(0) = 1
f(2) = 5
f(4) = 9
f(7) = 15


c) f(x) = ⌈x/5⌉ (the ceiling function)
Applying this function to each element of s:
f(-1) = 0
f(0) = 0
f(2) = 1
f(4) = 1
f(7) = 2


d) f(x) = ⌊((x^2 + 1))/3⌋ (the floor function)
Applying this function to each element of s:
f(-1) = 0
f(0) = 0
f(2) = 1
f(4) = 5
f(7) = 16
So, f(s) = {0, 1, 5, 16}.

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Answer:

because, for any n by n matrix, the sum of the dimension of the column space and the dimension of the null space must equal n. If the two dimensions are the same, their sum is an even number.

Step-by-step explanation:

It is impossible for an n-by-n matrix, where n is odd, to have a null space equal to its column space because the dimensions of the two spaces cannot be the same.

The null space of a matrix A is the set of all solutions to the equation Ax=0, where x is a column vector of appropriate dimensions. The column space of A is the span of the columns of A, which is the set of all linear combinations of the columns of A.

If the null space and column space of A are equal, then the dimension of the null space must be equal to the dimension of the column space. By the Rank-Nullity Theorem, the sum of the dimensions of the null space and the column space is equal to the number of columns in A.

Therefore, if n is odd, the dimensions of the null space and column space cannot be equal since their sum is even. Therefore, it is impossible for an n-by-n matrix, where n is odd, to have a null space equal to its column space.

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The base and the exponent in the expression √5 are base = 5 and exponent = 1/2

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

√5

The above expression is a square root expression

This expression can be expressed using the base-exponent format

To do this, we apply the law of indices

Applying the law of indices, we have

√5 = 5^1/2

As a general rule, we have

base^exponent

So, we have

base = 5 and exponent = 1/2

Hence, the base is 5 and theexponent is 1/2

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The radius of the right circular cylinder is [tex]$\boxed{\sqrt{2}}$[/tex] inches.

Let's start by recalling the formulas for the lateral surface area and volume of a right circular cylinder.

The lateral surface area of a right circular cylinder with radius r and height h is given by:

[tex]$L = 2\pi rh$[/tex]

The volume of a right circular cylinder with radius r and height h is given by:

[tex]$V = \pi r^2h$[/tex]

We are given that the lateral surface area of the cylinder is [tex]$24\pi$[/tex]square inches, and the volume is[tex]$24\pi$[/tex] cubic inches. Therefore, we have:

[tex]$2\pi rh = 24\pi$[/tex] (1)

[tex]$\pi r^2h = 24\pi$[/tex] (2)

We can solve for h from equation (1):

[tex]$2\pi rh = 24\pi$[/tex]

[tex]$h = \frac{24}{2\pi r}$[/tex]

Substituting this value of h into equation (2), we get:

[tex]$\pi r^2 \left(\frac{24}{2\pi r}\right) = 24\pi$[/tex]

Simplifying this equation, we get:

[tex]$r = \sqrt{2}$[/tex]

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The probability can be found using the formula for a continuous uniform distribution: P(50.2 ≤ X ≤ 50.7) = (50.7 - 50.2) / (52.0 - 50.0).

P(50.2 ≤ X ≤ 50.7) = 0.5
Therefore, the probability that the class length is between 50.2 and 50.7 min is 0.5. This means that the likelihood of selecting a class length within this range is 50%, which is relatively high given the range of possible lengths.

The lengths of the professor's classes follow a continuous uniform distribution between 50.0 minutes and 52.0 minutes. To find the probability that the class length is between 50.2 and 50.7 minutes, we can use the following formula for a continuous uniform distribution:

P(a ≤ X ≤ b) = (b - a) / (B - A)

Here, A = 50.0 min (lower bound), B = 52.0 min (upper bound), a = 50.2 min, and b = 50.7 min.

Plugging in the values:

P(50.2 ≤ X ≤ 50.7) = (50.7 - 50.2) / (52.0 - 50.0)
P(50.2 ≤ X ≤ 50.7) = 0.5 / 2
P(50.2 ≤ X ≤ 50.7) = 0.25, So, the probability that the class length is between 50.2 and 50.7 minutes is 0.25 or 25%.

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