Use the Pythagorean Theorem to find the length of the missing side. Then find cos 0. Give an exact answer with a rationalized denominator. 3 3√73 73 OB. √73 8 √73 O D. 8√√73 73 O A. O c.

Answer : The probability that a randomly selected teacher earns more than $60,000 is 0.039.

Explanation :

Given data: The average annual salary for all U.S. teachers is $47,750 and standard deviation is $5680.  Now we need to find the following probabilities:

1. The probability that a randomly selected teacher earns less than $42,000.

2. The probability that a randomly selected teacher earns between $40,000 and $50,000.

3. The probability that a randomly selected teacher earns at least $52,000.

4. The probability that a randomly selected teacher earns more than $60,000.

We can find these probabilities by performing the following steps:

Step 1: Press the STAT button from the calculator.

Step 2: Now choose the option “2: normal cdf(” to compute probabilities for normal distribution.

Step 3: For the first probability, we need to find the area to the left of $42,000.

To do that, enter the following values: normal cdf(-10^99, 42000, 47750, 5680)

The above command will give the probability that a randomly selected teacher earns less than $42,000.

We get 0.133 for this probability. Therefore, the probability that a randomly selected teacher earns less than $42,000 is 0.133.

Step 4: For the second probability, we need to find the area between $40,000 and $50,000. To do that, enter the following values: normal cdf(40000, 50000, 47750, 5680) .The above command will give the probability that a randomly selected teacher earns between $40,000 and $50,000. We get 0.457 for this probability.

Therefore, the probability that a randomly selected teacher earns between $40,000 and $50,000 is 0.457.

Step 5: For the third probability, we need to find the area to the right of $52,000. To do that, enter the following values: normalcdf(52000, 10^99, 47750, 5680)The above command will give the probability that a randomly selected teacher earns at least $52,000. We get 0.246 for this probability. Therefore, the probability that a randomly selected teacher earns at least $52,000 is 0.246.

Step 6: For the fourth probability, we need to find the area to the right of $60,000. To do that, enter the following values: normalcdf(60000, 10^99, 47750, 5680)The above command will give the probability that a randomly selected teacher earns more than $60,000. We get 0.039 for this probability. Therefore, the probability that a randomly selected teacher earns more than $60,000 is 0.039.

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The probabilities are,

(a)  P(X ≤ 50) = 1

(b) P(X ≤ 40) = 0.75

(c) P(40 ≤ X ≤ 60) = 0.25

(d) P(X < 0) = 0

(e) P(0 ≤ X < 10) = 0.25

(f) P(-10 < X < 10) = 0.25

a) For P(X ≤ 50):

We have to add the probabilities of all the values of X that are less than or equal to 50.

Since F(x) = 1 when x is greater than or equal to 50, we have,

⇒ P(X ≤ 50) = P(X < -10) + P(-10 ≤ X < 30) + P(30 ≤ X < 50) + P(X ≥ 50)

⇒ P(X ≤ 50) = 0 + 0.25 + 0.75 + 1

⇒ P(X ≤ 50) = 2

Since, probabilities cannot be greater than 1.

Therefore, the correct answer is,

⇒ P(X ≤ 50) = P(X < -10) + P(-10 ≤ X < 30) + P(30 ≤ X < 50) + P(X ≤ 50)

⇒ P(X ≤ 50) = 0 + 0.25 + 0.75 + 0

⇒ P(X ≤ 50) = 1

So, the probability that X is less than or equal to 50 is 1.

b) For P(X ≤ 40):

We have to add the probabilities of all the values of X that are less than or equal to 40.

Since F(x) = 0.75 when x is greater than or equal to 30 and less than 50, and F(x) = 1 when x is greater than or equal to 50, we have,

⇒ P(X ≤ 40) = P(X < -10) + P(-10 ≤ X < 30) + P(30 ≤ X ≤ 40)

⇒ P(X ≤ 40) = 0 + 0.25 + 0.5

⇒ P(X ≤ 40) = 0.75

So, the probability that X is less than or equal to 40 is 0.75.

c) For P(40 ≤ X ≤ 60):

To find P(40 ≤ X ≤ 60), we have to subtract the probability of X being less than 40 from the probability of X being less than or equal to 60.

Since F(x) = 1 when x is greater than or equal to 50, we have,

⇒ P(40 ≤ X ≤ 60) = P(X ≤ 60) - P(X ≤ 40)

⇒ P(40 ≤ X ≤ 60) = 1 - 0.75

⇒ P(40 ≤ X ≤ 60) = 0.25

So, the probability that X is between 40 and 60 (inclusive) is 0.25.

d) For P(X < 0):

To find P(X < 0), we have to add the probabilities of all the values of X that are less than 0. Since F(x) = 0 when x is less than -10, we have,

⇒ P(X < 0) = P(X < -10)

⇒ P(X < 0) = 0

So, the probability that X is less than 0 is 0.

e) For P(0 ≤ X < 10):

To find P(0 ≤ X < 10), we have to subtract the probability of X being less than 0 from the probability of X being less than or equal to 10.

Since F(x) = 0.25 when x is greater than or equal to -10 and less than 30, we have,

⇒ P(0 ≤ X < 10) = P(X ≤ 10) - P(X < 0)

⇒ P(0 ≤ X < 10) = P(X ≤ 10)

⇒ P(0 ≤ X < 10) = F(10)

⇒ P(0 ≤ X < 10) = 0.25

So, the probability that X is between 0 (inclusive) and 10 (exclusive) is 0.25.

f) For P(-10 < X < 10):

To find P(-10 < X < 10), we have to subtract the probability of X being less than or equal to -10 from the probability of X being less than or equal to 10.

Since F(x) = 0.25 when x is greater than or equal to -10 and less than 30, we have,

⇒ P(-10 < X < 10) = P(X ≤ 10) - P(X ≤ -10)

⇒ P(-10 < X < 10) = F(10) - F(-10)

⇒ P(-10 < X < 10) = 0.25 - 0

⇒ P(-10 < X < 10) = 0.25

So, the probability that X is between -10 (exclusive) and 10 (exclusive) is 0.25.

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The complete question is attached below:

The researcher's collection of data from post graduate students through a questionnaire makes it primary data.

The data collected by the researcher are considered as primary data. Primary data refers to original data that is collected firsthand by the researcher for a specific research purpose.

In this case, the researcher collected the data directly from the post graduate students through the questionnaire for the purpose of studying their behaviors in mobile phone usage.

Primary data is considered more reliable and accurate than secondary data because it is collected specifically for the research question at hand.

The researcher has control over the data collection process and can ensure that the data is relevant and accurate. However, primary data collection can be time-consuming and expensive compared to using secondary data.

In contrast, secondary data refers to data that has already been collected by someone else for a different purpose. Examples of secondary data include government reports, academic journals, and market research studies.

While secondary data can be useful in research, it may not always be relevant or accurate for the specific research question.

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The correlation coefficient is 0.3161 (rounded to two decimal places).

Correlation is a statistical measure (expressed as a number) that describes the size and direction of a relationship between two or more variables.

To find the correlation coefficient using the given information xx=38,

yy=32

and xy=11, we need to use the formula for correlation coefficient:

[tex]r=\frac{S_{xy}}{\sqrt{S_{xx}}\sqrt{S_{yy}}}[/tex]

Where r is the correlation coefficient,

Sxy is the sum of the cross-products,

Sxx is the sum of squares of x deviations, and

Syy is the sum of squares of y deviations.

Substituting the given values in the above formula, we have

[tex]r=\frac{S_{xy}}{\sqrt{S_{xx}}\sqrt{S_{yy}}}[/tex]

[tex]r=\frac{11}{\sqrt{38}\sqrt{32}}$$$$[/tex]

[tex]r=\frac{11}{\sqrt{1216}}$$$$[/tex]

=[tex]0.3161$$[/tex]

Thus, the correlation coefficient is 0.3161 (rounded to two decimal places).

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Winona's average cost per visit C as a function of the number of visits when she has visited x times is C(x) = (115 + 1.95x) / x and when she visits the zoo 115 times, her average cost per visit will be $3 per visit.

Given, Winona paid $115 for a lifetime membership to the zoo, so that she could gain admittance to the zoo for $1.95 per visit.

Winona's average cost per visit C as a function of the number of visits when she has visited x times is given by;

C(x) = (115 + 1.95x) / xIf she has visited the zoo 115 times, then her average cost per visit is;

C(115) = (115 + 1.95(115)) / 115= 345 / 115= $3 per visit.

Graph of C(x) is shown below:

If Winona starts when she is young and visits the zoo every day, then she will visit the zoo 365 * n times, where n is the number of years she has visited the zoo.

Then, her average cost per visit C as a function of the number of visits when she has visited x times is given by;

C(x) = (115 + 1.95x) / x

If she starts when she is young and visits the zoo every day, then the number of times she visited will be;365n

Hence, her average cost per visit C as a function of the number of visits when she has visited 365n times is given by;C(365n) = (115 + 1.95(365n)) / (365n)= (115 + 711.75n) / (365n)

When she starts when she is young and visits the zoo every day, her average cost per visit as the number of times she visits increases will reduce.

Finally, Winona's average cost per visit C as a function of the number of visits when she has visited x times is;

C(x) = (115 + 1.95x) / x

When she visits the zoo 115 times, her average cost per visit will be $3 per visit.

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Here is the correct answer in LaTeX code:

The correct answer is [tex]$B[/tex]. [tex]R_n(x) = (-2)^{n+1} e^{-2c} (n+1)!$.[/tex] The remainder term, [tex]$R_n(x)$[/tex] , in the [tex]$n$th[/tex] order Taylor polynomial for the function [tex]$f(x) = e^{-2x}$[/tex] centered at [tex]$a = -2$[/tex] is given by the formula:

[tex]\[R_n(x) = \frac{f^{(n+1)}(c) \cdot (x-a)^{n+1}}{(n+1)!}\][/tex]

where [tex]$c$[/tex] is a value between [tex]$x$[/tex] and [tex]$a$[/tex]. In this case, [tex]$a = -2$.[/tex]

Taking the derivative of [tex]$f(x) = e^{-2x}$[/tex] , we have

[tex]$f'(x) = -2e^{-2x}$, $f''(x) = 4e^{-2x}$, $f'''(x) = -8e^{-2x}$[/tex] , and so on.

Substituting these derivatives into the remainder term formula, we get:

[tex]\[R_n(x) = (-2)^{n+1} e^{-2c} (n+1)! \cdot (x-(-2))^{n+1} / (n+1)!\][/tex]

Simplifying, we have:

[tex]\[R_n(x) = (-2)^{n+1} e^{-2c} \cdot (x+2)^{n+1}\][/tex]

So, the correct answer is [tex]$B[/tex]. [tex]R_n(x) = (-2)^{n+1} e^{-2c} (n+1)!$.[/tex]

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Thus, we can use the value 6.24 years as a single point estimate for the mean time required to graduate with a bachelor's degree based on the available data.

To estimate the mean time required to graduate with a bachelor's degree based on the given data, we can use the sample mean as a point estimate.

The sample mean is calculated as the sum of all the individual times divided by the total number of graduates:

Sample Mean = (sum of all individual times) / (total number of graduates)

In this case, the given data states that the mean time required to graduate is 6.24 years for 4400 college graduates. Therefore, the sample mean is:

Sample Mean = 6.24 years

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The t critical value varies based on the sample size, the confidence level, and the degrees of freedom (n-1). Therefore, the correct options are: Sample size, Confidence level, Degrees of freedom (n-1).

A t critical value is a statistic that is used in hypothesis testing. It is used to determine whether the null hypothesis should be rejected or not. The t critical value is determined by the sample size, the confidence level, and the degrees of freedom (n-1). In general, the larger the sample size, the smaller the t critical value. The t critical value also decreases as the level of confidence decreases. Finally, the t critical value increases as the degrees of freedom (n-1) increases.

A critical value delimits areas of a test statistic's sampling distribution. Both confidence intervals and hypothesis tests depend on these values. Critical values in hypothesis testing indicate whether the outcomes are statistically significant. They assist in calculating the upper and lower bounds for confidence intervals.

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Let g be a continuous, positive, decreasing function on [1,oo). We need to compare the values of the integral of the following options provided below:2.BCA3.ABC4.

ASince g is a decreasing function on [1, oo), we can show that ∫[n,n+1] g(x)dx ≥ g(n+1) for every positive integer n.Using this inequality and adding them all up gives us∫1n g(x)dx≥∑n=1∞ g(n)Therefore, the series ∑n=1∞ g(n) diverges (the terms are positive and do not go to zero), so the integral of option BCA is infinite.Option ABC is equal to∫1∞ g(x)dx=∫11g(x)dx+∫12g(x)dx+∫23g(x)dx+⋯+∫n,n+1g(x)dx+⋯

Since g is a positive function, we have 0 ≤∫n,n+1g(x)dx≤g(n)so the integral is bounded below by ∑n=1∞ g(n) which diverges. Thus the integral of option ABC is also infinite.Option A is equal to∫2∞g(x)dx=∫23g(x)dx+⋯+∫n,n+1g(x)dx+⋯and since g is a decreasing function, we have ∫n,n+1g(x)dx≤g(n+1)(n+1−n)=g(n+1)so the integral is bounded above by∑n=1∞g(n+1)(n+1−n)=∑n=1∞g(n+1)which converges since g is a positive, decreasing function. Hence the integral of option A is finite and less than infinity.Option A is less than option BCA and option ABC is infinite.

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The dot product of (-1, 2) and (3, 3) can be found by multiplying the corresponding elements together and then adding the products. So we have:$$(-1)(3) + (2)(3) = -3 + 6 = 3$$Therefore, the dot product of (-1, 2) and (3, 3) is 3. The dot product is an operation that takes two vectors and returns a scalar.

It is also known as the scalar product or inner product. It is useful in many areas of mathematics, physics, and engineering, including vector calculus, mechanics, and signal processing. The dot product has many applications, including computing the angle between two vectors, finding the projection of one vector onto another, and determining whether two vectors are orthogonal. It is an important concept in linear algebra, which is the branch of mathematics that deals with vectors, matrices, and linear transformations.

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The standard deviation of the given probability distribution is $23.45.

The correct answer is option B.

The standard deviation of the given probability distribution is determined as follows:

Calculate the expected value (mean) of the distribution:

Expected Value = (Probability1 * Value1) + (Probability2 * Value2) + (Probability3 * Value3)

Expected Value = (0.25 * (-30)) + (0.50 * 20) + (0.25 * 30)

Expected Value = -7.50 + 10 + 7.50

Expected Value = 10

The squared deviation for each value:

Squared Deviation1 = (Value1 - Expected Value)² * Probability1

Squared Deviation2 = (Value2 - Expected Value)² * Probability2

Squared Deviation3 = (Value3 - Expected Value)² * Probability3

Squared Deviation1 = (-30 - 10)² * 0.25 = 1600 * 0.25 = 400

Squared Deviation2 = (20 - 10)² * 0.50 = 100 * 0.50 = 50

Squared Deviation3 = (30 - 10)² * 0.25 = 400 * 0.25 = 100

Variance = Squared Deviation1 + Squared Deviation2 + Squared Deviation3

Variance = 400 + 50 + 100 = 550

Standard Deviation = √Variance

Standard Deviation = √550

Now, calculating the square root of 550 gives us an approximate value of 23.45.

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The formula for calculating P80 is given by:P80 = Mean + (Z score x Standard deviation). The length separating the shortest 20% from the rest of the lengths of the steel rods is 231.7 cm (approx.).

We have been given that a company produces steel rods with lengths that are normally distributed with a mean of 234.1-cm and a standard deviation of 2.3-cm. We need to find P80, which is the length separating the shortest 20% from the rest of the lengths of the steel rods. To find P80, we first need to find the z-score corresponding to the 80th percentile. The formula for the z-score is given by:z = (x - μ) / σwhere x is the percentile we want to find, μ is the mean, and σ is the standard deviation. For the 80th percentile, x = 0.8, μ = 234.1-cm, and σ = 2.3-cm. Therefore,z = (0.8 - 234.1) / 2.3z = -0.845We can use the standard normal distribution table to find the area corresponding to the z-score. The table gives the area under the standard normal curve for different z-values. For a given percentage value, we first find the corresponding z-value and then look up the area corresponding to this z-value in the table. For the 80th percentile, the z-score is -0.845, and the area corresponding to this z-score is 0.1977. This means that 19.77% of the lengths of the steel rods are shorter than the 80th percentile length. To find the length separating the shortest 20% from the rest, we subtract the 80th percentile length from the mean and multiply the result by the z-score:P80 = 234.1-cm + (-0.845) × 2.3-cmP80 = 231.7-cm (approx.)

Therefore, the length separating the shortest 20% from the rest of the lengths of the steel rods is approximately 231.7 cm.

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We are given a sample of size 67, the sample mean as 43.1 and the standard deviation as 13.6. The 98% confidence interval is [39.28, 46.92].

We need to find the 98% confidence interval.

The formula for the confidence interval for a population mean when the population standard deviation is known is as follows:

Confidence interval = sample mean ± z* (σ/√n)

where σ is the population standard deviation, n is the sample size, z* is the z-score associated with the desired level of confidence.

For 98% confidence interval, the z-value is 2.33 (from the z-table)

Substituting the given values, we get:

Confidence interval = 43.1 ± 2.33 * (13.6/√67)≈ 43.1 ± 3.82

Therefore, the correct answer is [39.28, 46.92].

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The value of sin(∅) is 12/13.

To find the value of sin(∅), we can use the given measurements of a right triangle.

In a right triangle, sin(∅) is defined as the ratio of the length of the side opposite the angle (∅) to the length of the hypotenuse.

p = 5 cm (length of the side adjacent to ∅)

b = 12 cm (length of the side opposite ∅)

To find the value of h (length of the hypotenuse), we can use the Pythagorean theorem, which states that in a right triangle, the square of the hypotenuse is equal to the sum of the squares of the other two sides.

Using the Pythagorean theorem:

h² = p² + b²

h² = 5² + 12²

h² = 25 + 144

h² = 169

Taking the square root of both sides:

h = √169

h = 13 cm

Now that we have the lengths of the sides of the right triangle, we can find the value of sin(∅) using the ratio mentioned earlier:

sin(∅) = b/h

sin(∅) = 12/13.

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The radius of convergence, R = 11 is found for the given function using the power series.

The given function is F(X) = ln(11 - X).

Find the power series representation for the function F(X).

We have:

F(X) = ln(11 - X)

F(X) = ln 11 + ln(1 - X/11)

Using the formula for ln(1 + x), we get:

F(X) = ln 11 - Σn=1∞ (-1)n-1 * (x/11)n/n

We can write the series using the sigma notation as:

∑n=1∞ (-1)n-1 * (x/11)n/n + ln 11

Thus, the power series representation of

F(x) is Σn=1∞ (-1)n-1 * (x/11)n/n + ln 11.

Determine the radius of convergence, R.

The power series converges absolutely whenever:

|x/11| < 1|x| < 11

Thus, the radius of convergence is 11.

In other words, the series converges absolutely for all values of x within a distance of 11 from the center x = 0.

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The correct option is (C). If the coefficient of the added regressor is exactly 0, the Rf increases and the SSR decreases.Rf is the F-statistic, which tests if there is a statistically significant relationship between the dependent and independent variables.

SSR is the sum of squared residuals, which measures the differences between the actual and predicted values of the dependent variable.When an additional variable is added to a regression model, the R-squared value (R²) increases, indicating that the new variable explains some of the variation in the dependent variable. The F-statistic, which tests the null hypothesis that all the coefficients of the independent variables are zero, also increases because of the additional variable.The coefficient of determination (R²) increases when the added variable is statistically significant. When a non-significant variable is included in a regression model, the R² does not change, but the F-statistic decreases.

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Therefore, the area of the region R is A = -10.5/3 square units.

To find the area of the region bounded by the functions[tex]f(x) = x^2 - 3x - 3[/tex] and g(x) = -2x + 3, we need to determine the points of intersection between the two functions.

Setting f(x) equal to g(x), we have:

[tex]x^2 - 3x - 3 = -2x + 3[/tex]

Rearranging the equation and simplifying:

[tex]x^2 - x - 6 = 0[/tex]

Factoring the quadratic equation:

(x - 3)(x + 2) = 0

This gives us two solutions: x = 3 and x = -2.

To find the area, we integrate the difference between the two functions over the interval [x = -2, x = 3]:

A = ∫[from -2 to 3] (f(x) - g(x)) dx

Substituting the functions:

A = ∫[from -2 to 3] [tex]((x^2 - 3x - 3) - (-2x + 3)) dx[/tex]

Simplifying:

A = ∫[from -2 to 3] [tex](x^2 + x - 6) dx[/tex]

Integrating the polynomial:

A =[tex][(1/3)x^3 + (1/2)x^2 - 6x][/tex] [from -2 to 3]

Evaluating the integral:

[tex]A = [(1/3)(3^3) + (1/2)(3^2) - 6(3)] - [(1/3)(-2^3) + (1/2)(-2^2) - 6(-2)][/tex]

Simplifying further:

A = [(1/3)(27) + (1/2)(9) - 18] - [(1/3)(-8) + (1/2)(4) + 12]

A = [9 + 4.5 - 18] - [-8/3 - 2 + 12]

A = 4.5 - (8/3) + 2 - 12

A = -3.5 - (8/3)

A = -10.5/3

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Operating cash flows, also known as OCFs, show the total inflows and outflows of cash that come from the operations of a company. It is used to evaluate a company's ability to produce enough cash to pay for its expenses and debt. To calculate the percentage change in operating cash flows, you can use the following formula:Percentage change in operating cash flows = [(Current operating cash flows - Previous operating cash flows) ÷ Previous operating cash flows] x 100%For example, if a company had operating cash flows of $100,000 in the previous year and $80,000 in the current year, the percentage change in operating cash flows would be:Percentage change in operating cash flows = [($80,000 - $100,000) ÷ $100,000] x 100%Percentage change in operating cash flows = [-0.20] x 100%Percentage change in operating cash flows = -20.00%Therefore, in this example, the percentage change in operating cash flows is a decrease of 20.00%.

The percentage change in operating cash flows is obtained by subtracting the present cash flow with the initial cash flow, dividing this by the initial cashflow and multiplying the result by 100.

To calculate the percentage change in operating cash flows, we have to first obtain the present operating cash flow.

Next we subtract this from the inital operating cash flow, divide the result by the initial operating cash flow and multiply the result by 100. As the question requires, we will round the result obtained to 2 decimal places.

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To find the covariance between X and Y, we need to use the joint moment generating function (MGF) and the properties of MGFs.

The joint MGF MX,Y(t1, t2) is given as:

[tex]MX,Y(t1, t2) = \frac{1}{3}(1 + e^{t1 + 2t2} + e^{2t1 + t2})[/tex]

To find the covariance, we need to differentiate the joint MGF twice with respect to t1 and t2, and then evaluate it at t1 = 0 and t2 = 0.

First, let's differentiate MX,Y(t1, t2) with respect to t1:

[tex]\frac{\partial^2(MX,Y(t1, t2))}{\partial t1^2} = \frac{\partial}{\partial t1}\left(\frac{\partial(MX,Y(t1, t2))}{\partial t1}\right)\\\\= \frac{\partial}{\partial t_1} \left(\frac{\partial}{\partial t_1} \left(\frac{1}{3} (1 + e^{t_1 + 2t_2} + e^{2t_1 + t_2})\right)\right)\\\\= \frac{\partial}{\partial t1}\left(\frac{1}{3}(2e^{t1 + 2t2} + 2e^{2t1 + t2})\right)\\\\= \frac{2}{3}(2e^{t1 + 2t2} + 4e^{2t1 + t2})[/tex]

Now, let's differentiate MX,Y(t1, t2) with respect to t2:

[tex]\frac{\partial^2(MX,Y(t1, t2))}{\partial t2^2} = \frac{\partial}{\partial t2}\left(\frac{\partial(MX,Y(t1, t2))}{\partial t2}\right)\\\\= \frac{\partial}{\partial t_2} \left(\frac{\partial}{\partial t_2} \left(\frac{1}{3} (1 + e^{t_1 + 2t_2} + e^{2t_1 + t_2})\right)\right)\\\\= \frac{\partial}{\partial t2}\left(\frac{1}{3}(4e^{t1 + 2t2} + 2e^{2t1 + t2})\right)\\\\= \frac{2}{3}(4e^{t1 + 2t2} + 2e^{2t1 + t2})[/tex]

Now, we can evaluate the second derivatives at t1 = 0 and t2 = 0:

[tex]\frac{\partial^2(MX,Y(t1, t2))}{\partial t1^2} = \frac{2}{3}(2e^{0 + 2(0)} + 4e^{2(0) + 0})\\\\= \frac{2}{3}(2 + 4)\\\\= 2\\\\\\\frac{\partial^2(MX,Y(t1, t2))}{\partial t2^2} = \frac{2}{3}(4e^{0 + 2(0)} + 2e^{2(0) + 0})\\\\= \frac{2}{3}(4 + 2)\\\\= \frac{4}{3}[/tex]

Finally, the covariance between X and Y is given by:

[tex]Cov(X, Y) = \frac{\partial^2(MX,Y(t1, t2))}{\partial t1^2} - \frac{\partial^2(MX,Y(t1, t2))}{\partial t2^2}\\\\= 2 - \frac{4}{3}\\\\= \frac{6}{3} - \frac{4}{3}\\\\= \frac{2}{3}[/tex]

Therefore, the covariance between X and Y is [tex]\frac{2}{3}[/tex].

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To calculate the volume of a right circular cylinder, we can use the formula:

Volume = π * r^2 * h

Where:

π is the mathematical constant pi (approximately 3.14159)

r is the radius of the base of the cylinder (half the diameter)

h is the height of the cylinder

Given:

Base diameter = 6 m

Radius (r) = (base diameter) / 2 = 6 m / 2 = 3 m

Height (h) = 5 m

Substituting the values into the formula, we have:

Volume = π * (3 m)^2 * 5 m

= π * 9 m^2 * 5 m

= π * 45 m^3

Therefore, the volume of the cylinder is 45π cubic meters.

the volume of the right circular cylinder with a base diameter of 6 m and a height of 5 m is 45π m³ By using formula of

V = πr²h

The volume of a right circular cylinder with a base diameter of 6 m and a height of 5 m is given by:V = πr²hwhere r is the radius of the cylinder and h is the height of the cylinder. Since the base diameter of the cylinder is given as 6 m, we can find the radius by dividing it by 2:r = d/2 = 6/2 = 3 m Therefore, the volume of the cylinder is:V = π(3 m)²(5 m)V = π(9 m²)(5 m)V = 45π m³Therefore, the volume of the right circular cylinder with a base diameter of 6 m and a height of 5 m is 45π m³.

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f(x) is not a valid PDF. Therefore, we can't compute E(Y) in this case.

Given X is a continuous random variable where X ∈ [3, 2] and f(2) = ? We have to find E(Y) where 1 ≤ X ≤ 2 and Y = (1/2)X otherwise Y = 0.

Since we don't have the PDF of the continuous random variable X, we can't compute the expected value E(Y) directly using the formula E(Y) = ∫yf(y)dy. However, we can use the Law of Total Probability to get the conditional PDF of Y given X and then use it to find E(Y).

So, let's find the conditional PDF f(Y|X) of Y given X. Since Y is a function of X, we have Y = g(X), where g(X) = (1/2)X for 1 ≤ X ≤ 2 and g(X) = 0 otherwise. Now, the conditional PDF f(Y|X) is given by: f(Y|X) = f(X,Y) / f(X)where f(X,Y) is the joint PDF of X and Y and f(X) is the marginal PDF of X.

The joint PDF f(X,Y) is given by: f(X,Y) = f(Y|X) * f(X)where f(Y|X) is given by: f(Y|X) = δ(Y - g(X)), where δ() is the Dirac delta function. Thus, f(X,Y) = δ(Y - g(X)) * f(X) Now, we need to find f(X). Since X is a continuous random variable, we have: f(X) = ∫f(X,Y)dy = ∫δ(Y - g(X))dy

Using the property of the Dirac delta function, we get: f(X) = δ(Y - g(X))|y=g(X) = δ(Y - (1/2)X) Therefore, f(Y|X) = δ(Y - g(X)) / δ(Y - (1/2)X) for 1 ≤ X ≤ 2 and f(Y|X) = 0 otherwise.

Now, we can use the formula for the conditional expected value to get E(Y|X = x):E(Y|X = x) = ∫yf(y|x)dy= ∫y * δ(Y - g(x)) / δ(Y - (1/2)x) dy= g(x) = (1/2)x for 1 ≤ x ≤ 2and E(Y|X = x) = 0 otherwise. Then, we can use the formula for the Law of Total Probability to get E(Y):E(Y) = ∫E(Y|X = x)f(x)dx = ∫(1/2)x * f(x) dx for 1 ≤ x ≤ 2and E(Y) = 0 otherwise.

Since we don't have the PDF of X, we can't compute E(Y) directly. However, we can use the fact that the integral of a PDF over its domain is equal to 1.

Therefore, we have:1 = ∫f(x)dx from which we can solve for f(x):f(x) = 1 / ∫dx from which we get: f(x) = 1 / [2 - 3] = 1/-1 = -1

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"The given statement is False." The wheels on an automobile are not classified as a variable cost with respect to the volume of cars produced in an automobile assembly plant.

The statement is incorrect. The wheels on an automobile are not typically classified as a variable cost with respect to the volume of cars produced in an automobile assembly plant.

Variable costs are costs that vary in direct proportion to the level of production or activity. They increase or decrease as the volume of production changes.

Examples of variable costs in automobile manufacturing would include items such as raw materials, direct labor, and electricity costs.

On the other hand, the cost of wheels for an automobile assembly plant would typically be considered a fixed cost. Fixed costs are costs that do not vary with the level of production. These costs remain constant regardless of the number of cars produced.

Fixed costs in automobile manufacturing may include expenses like the purchase or lease of manufacturing equipment, facility rental, and salaries of administrative staff.

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The probability of the shuttle being left with no computer control systems on a mission is 0.000001.

The probability of failure for any one system on any one mission is known to be 0.01.

Since a failure of one system is independent of a failure of another system, the probability that the shuttle is left with no computer control system on a mission is 0.01 × 0.01 × 0.01 = 0.000001, or 1 in 1,000,000.

This is because the probability of three independent events occurring is the product of the individual probabilities.

Therefore, the probability of the shuttle being left with no computer control systems on a mission is 0.000001.

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-0.776 is the correlation coefficient that can be reported accurately to three decimal places for the given data set.

The correlation coefficient that can be reported accurately to three decimal places for the given data set is -0.776.

The formula for the correlation coefficient of a bivariate data set is:

r = (nΣxy - ΣxΣy) / (√(nΣx^2 - (Σx)^2) * √(nΣy^2 - (Σy)^2))

Where:

n is the number of data pairs,

x and y are the two variables,

Σxy is the sum of the products of the corresponding x and y values,

Σx is the sum of the x values,

Σy is the sum of the y values,

Σx^2 is the sum of the squares of the x values, and

Σy^2 is the sum of the squares of the y values.

Plugging in the given values into the formula, we get:

r = (6(13.5 * 114 + 46.2 * 50.5 + 14.4 * 95.4 + 37.3 * 70 + 31.5 * 37 + 29.2 * 42.8) - (13.5 + 46.2 + 14.4 + 37.3 + 31.5 + 29.2)(114 + 50.5 + 95.4 + 70 + 37 + 42.8)) / (√(6(13.5^2 + 46.2^2 + 14.4^2 + 37.3^2 + 31.5^2 + 29.2^2) - (13.5 + 46.2 + 14.4 + 37.3 + 31.5 + 29.2)^2) * √(6(114^2 + 50.5^2 + 95.4^2 + 70^2 + 37^2 + 42.8^2) - (114 + 50.5 + 95.4 + 70 + 37 + 42.8)^2))

r ≈ -0.776

Therefore, the correlation coefficient that can be reported accurately to three decimal places for the given data set is -0.776.

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Both of these angles are possible, and there are two triangles that can be formed with the given data. Hence, option C, A- 50°, b=21, a = 19, does not determine a unique triangle.

Among the given options, the set of data that does not determine a unique triangle is option C, A- 50°, b=21, a = 19. Let's look at why this is the case. We use the Sine rule to find the missing side of a triangle when two sides and an angle are given, or two angles and a side are given. It is not possible to form a unique triangle with the given data in option C.

Let's see why!b/sin(B) = a/sin(A)We know angle A is -50 degrees (angle can never be negative, but it doesn't matter in this context because sin(-50) = sin(50)).b = 21a = 19Using these values, we get,b/sin(B) = 19/sin(50)This will result in two values of angle B: 112.14° and 67.86°.Therefore, both of these angles are possible, and there are two triangles that can be formed with the given data. Hence, option C, A- 50°, b=21, a = 19, does not determine a unique triangle.

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a.) The area of the shaded face would be =54cm²

b.) The number of rectangular faces that the prism has =3

c.) The total area of the rectangular faces would be=162cm².

To calculate the area of the shaded face, the formula that should be used = length×width.

where;

Length = 9cm

width = 6cm

Area = 9×6 = 54cm²

The total number of rectangular faces = 3

The total area of these rectangular face would be area of one rectangular face multiplied by 3.

That is;

54×3 = 162cm²

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The given parabolic equation is y = 4x - x² and the point is (1, 3). We are to determine the slope of the tangent line at (1, 3) and then obtain an equation of the tangent line.  we must first calculate the derivative of the given equation.

We can do this by using the power rule of differentiation. The derivative of x² is 2x. So the derivative of y = 4x - x² is dy/dx = 4 - 2x.Since we want to find the slope of the tangent line at (1, 3), we need to substitute x = 1 into the equation we just obtained. dy/dx = 4 - 2x = 4 - 2(1) = 2. Therefore, the slope of the tangent line at (1, 3) is 2.We can now write the equation of the tangent line. We know the slope of the tangent line, m = 2, and we know the point (1, 3).

We can use the point-slope form of the equation of a line to obtain the equation of the tangent line. The point-slope form of the equation of a line is given as: y - y₁ = m(x - x₁)where m is the slope, (x₁, y₁) is a point on the line.Substituting in the values we have, we get:y - 3 = 2(x - 1)We can expand this equation to obtain the slope-intercept form of the equation of the tangent line:y = 2x + 1Therefore, the equation of the tangent line to the parabola y = 4x - x² at the point (1, 3) is y = 2x + 1.

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By analyzing the given sample, we find that the mean age of the stock-brokers is approximately 52.6, the median age is 51, and there is no mode since no age appears more than once.

To review the distribution of the ages of the stock-brokers, we can analyze the given sample of ages: 53, 42, 63, 70, 35, 47, 55, 58, 41, 49, 44, 61.

One way to analyze the distribution is by calculating measures of central tendency, such as the mean, median, and mode.

Mean:

To find the mean, we sum up all the ages and divide by the total number of brokers (25 in this case):

Mean = (53 + 42 + 63 + 70 + 35 + 47 + 55 + 58 + 41 + 49 + 44 + 61) / 25 = 52.6

Median:

The median is the middle value when the ages are arranged in ascending order. In this case, the ages in ascending order are: 35, 41, 42, 44, 47, 49, 53, 55, 58, 61, 63, 70.

Since there are 12 values, the median is the average of the 6th and 7th values:

Median = (49 + 53) / 2 = 51

Mode:

The mode is the value that appears most frequently in the data. In this case, there is no value that appears more than once, so there is no mode.

These measures help provide an understanding of the central tendency and distribution of the ages in the sample.

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Note: The complete question is - A large investment firm wants to review the distribution of the ages of its stock-brokers. The ages of a sample of 25 brokers are as follows: 53 42 63 70 35 47 55 58 41 51 44 61 20 57 46 49 58 29 48 42 36 39 52 45 56. a/ Construct a relative frequency histogram for the data, using five class intervals and the value 20 as the lower limit of the 1st class, the value 70 as the upper limit of the 5th class. b/ What proportion of the total area under the histogram fall between 30 and 50, inclusive?

A) Average number of children per household= Sum of all the number of children/number of households=> 2.35 children per household.B) The central measure calculated in the task is mean or the average number of children per household. C) the median of the data set is  3. The mode is 2.

a) Average number of children per household is calculated by summing up all the number of children per household and dividing it by the number of households.

Here,Sum of all the number of children = 1+2+4+1+1+3+2+3+6+2+5+3+2+1+3+1+4+2+5+2=47

Average number of children per household= Sum of all the number of children/number of households=> 47/20= 2.35 children per household.

b) The central measure calculated in the task is mean or the average number of children per household.

c) There are two other central measurements called the median and mode that exist.Median:

To calculate the median, we need to arrange the given data in the order of increasing magnitude. 1, 1, 1, 1, 2, 2, 2, 2, 3, 3, 3, 3, 4, 4, 5, 5, 6.

The median is the middle value in the data set. Since we have an even number of data points, the median is the average of the two middle values.

Therefore, the median of the data set is (3+3)/2= 3.

Mode: The mode is the value that appears most frequently in a data set. Here, the mode is 2 because it appears the most number of times.

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The height of the tree, considering the similar triangles in this problem, is given as follows:

32.5 feet.

Two triangles are defined as similar triangles when they share these two features listed as follows:

The proportional relationship for the side lengths in this problem is given as follows:

25/5 = h/6.5

5 = h/6.5.

Hence the height of the tree is obtained applying cross multiplication as follows:

h = 6.5 x 5

h = 32.5 feet.

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