A and b are two disjoint set . If n(A)= y, find n(A U B)​

If x and y are independent, then the covariance between x and y, cov(x, y), is equal to 0.

Covariance measures the linear relationship between two random variables. If x and y are independent, it means that the occurrence of one variable does not affect the occurrence of the other. In other words, there is no linear relationship between x and y.

The computational formula for covariance is given by:

cov(x, y) = E[(x - E[x])(y - E[y])],

where E[x] and E[y] are the expected values of x and y, respectively.

If x and y are independent, it implies that E[x] and E[y] are also independent, and therefore the term (x - E[x])(y - E[y]) will equal 0 for all possible values of x and y. Consequently, the expected value of this term will also be 0.    

Since cov(x, y) is defined as the expected value of (x - E[x])(y - E[y]), and this term is 0, it follows that cov(x, y) must be equal to 0.

Hence, if x and y are independent, their covariance cov(x, y) is always 0, indicating that there is no linear relationship between the variables.

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The domain of the given function is [6, ∞) in interval notation. The above domain of f(x) ensures that the expression inside the square root is non-negative.

The given function is f(x) = √4x - 24. The domain of a function is the set of all possible values of x for which the function is defined and gives real outputs.

Since f(x) is a square root function, its argument must be greater than or equal to 0.

Thus,4x - 24 ≥ 0 ⇒ 4x ≥ 24 ⇒ x ≥ 6 .

Hence, the domain of the given function is [6, ∞) in interval notation.

The above domain of f(x) ensures that the expression inside the square root is non-negative.

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Based on a 95% confidence interval for the proportion of American adults who believe in life after death, we can infer that option f, which states that between 85% and 95% of Americans believe in life after death, is the most accurate inference from the given options.

Given that we have a sample size of 1,787 participants and 1,455 answered yes, we can calculate the proportion of Americans who believe in life after death. The proportion is calculated by dividing the number of individuals who answered yes by the total number of participants:

Proportion = Number of "Yes" responses / Total number of participants

Proportion = 1,455 / 1,787 ≈ 0.814

This means that approximately 81.4% of the surveyed American adults believe in life after death.

Now, let's interpret the given options using a 95% confidence interval. A 95% confidence interval means that if we were to repeat this survey multiple times and calculate confidence intervals for each survey, approximately 95% of those intervals would contain the true population proportion.

Options a, b, c, e, g, i, j, and k can be ruled out based on their statements, as they don't align with the calculated proportion of 81.4%.

Option f suggests that between 85% and 95% of Americans believe in life after death. This range includes the calculated proportion of 81.4%, so it's a plausible inference. However, we cannot say with certainty that it is the correct answer since it falls short of the 95% confidence level.

The only option left is option h, which states that between 45% and 55% of Americans believe in life after death. This range does not include the calculated proportion of 81.4%, so it contradicts the data we have. Therefore, option h is not a valid inference.

Hence the correct option is f.

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To sketch the curve, we can analyze the equation y = 3x^2 - 25. This is a quadratic function with a coefficient of 3 for the x^2 term and a constant term of -25.

Determine the vertex: The vertex of the parabolic curve can be found using the formula x = -b / (2a). In this case, a = 3 and b = 0. Therefore, the x-coordinate of the vertex is 0.

Determine the y-intercept: Substitute x = 0 into the equation to find the y-intercept. y = 3(0)^2 - 25 = -25. Hence, the y-intercept is (0, -25).

Plot the vertex and y-intercept: Plot the point (0, -25) for the y-intercept and mark the vertex at (0, 0).

Find additional points: To draw the curve, choose a few more x-values and calculate the corresponding y-values. For example, you can choose x = -2, -1, 1, and 2. Substitute these values into the equation to find the corresponding y-values.

Plot the points and sketch the curve: Use the obtained points to plot them on the graph and connect them smoothly to sketch the curve. Since the coefficient of x^2 is positive, the curve opens upward.

By following these steps, you can sketch the curve represented by the equation y = 3x^2 - 25.

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If a two-factor analysis of variance produces a statistically significant interaction, it means that the effect of one factor on the response variable is dependent on the level of the other factor.

This suggests that the two factors do not have independent effects on the response variable, and their combined effect cannot be explained by simply adding the main effects.
Therefore, we cannot draw any conclusions about the main effects of the two factors without further analysis. It is possible that the main effects are also significant, but their interpretation would be confounded by the interaction effect. Alternatively, the main effects may not be significant at all, suggesting that the interaction effect is the primary determinant of the response variable.
In conclusion, when a significant interaction is observed in a two-factor analysis of variance, it is important to investigate and interpret the main effects with caution, as their significance may be influenced by the interaction effect. A deeper understanding of the relationship between the two factors and their impact on the response variable is required to draw meaningful conclusions.
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The curve given by r = sin(10) is a polar curve with one loop.

To find the area enclosed by one loop of the curve, we can use the formula for the area of a polar region, which is given by:

A = (1/2)∫θ2θ1 [r(θ)]^2 dθ

Since the curve has one loop, we need to find the values of θ that correspond to one complete revolution around the origin. Since sin(θ) has period 2π, we have:

r = sin(10) = sin(10 + 2π) for all values of θ

So, one complete revolution occurs when θ increases from 0 to 2π. Thus, the area enclosed by one loop of the curve is:

A = (1/2)∫02π [sin(10)]^2 dθ

Using the identity sin^2(θ) = (1/2)(1 - cos(2θ)), we can simplify this integral to:

A = (1/2)∫02π (1/2)(1 - cos(20θ)) dθ

Simplifying further, we get:

A = (1/4)∫02π (1 - cos(20θ)) dθ

Evaluating this integral gives:

A = (1/4) [θ - (1/20)sin(20θ)]02π

A = (1/4) (2π)

A = π/2

Therefore, the area enclosed by one loop of the curve r = sin(10) is π/2 square units.

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The answer closest to the margin of error is option b: 4.2%.

To determine the margin of error at the 95% confidence level for the proportion of likely voters who prefer the incumbent candidate, we can use the formula:

Margin of Error = (Z * √(p*(1-p))/√n)

Where:

Z is the Z-score corresponding to the desired confidence level (95% corresponds to approximately 1.96)

p is the proportion of voters who prefer the incumbent candidate (42% or 0.42)

n is the sample size (350)

Calculating the margin of error:

Margin of Error = (1.96 * √(0.42*(1-0.42))/√350)

Using a calculator, the closest value to the margin of error is approximately 4.2%. Therefore, the answer closest to the margin of error is option b: 4.2%.

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The correct answer is option (c) 131.29. To find the sample mean, we need to calculate the average of the given cholesterol levels. The sample mean is computed by summing up all the values and dividing by the total number of values.

In this case, the cholesterol levels of the 7 patients are given as follows: 128, 127, 153, 144, 132, 120, 115.

To find the sample mean:

Sample mean = (Sum of all values) / (Total number of values)

Sum of all values = 128 + 127 + 153 + 144 + 132 + 120 + 115 = 919

Total number of values = 7

Sample mean = 919 / 7 = 131.29

Therefore, the sample mean of the given cholesterol levels is 131.29.

Hence, the correct answer is option (c) 131.29.

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(A) The function f(x) = -6x² + 15x when x = 3, f(x) = -9

(B) The solution to the equation fx + 4x + 2 = 2 is x = 0.

To evaluate the function f(x) = -6x² + 15x, we need to substitute the given values of x into the function and simplify the expression.

Let's evaluate f(x) at x = 3:

f(3) = -6(3)² + 15(3)

= -6(9) + 45

= -54 + 45

= -9

Therefore, when x = 3, f(x) = -9.

To solve the equation fx + 4x + 2 = 2, we need to isolate the variable x.

fx + 4x + 2 = 2

First, let's simplify the equation:

fx + 4x = 0

Combine like terms:

5x = 0

Divide both sides by 5:

x = 0

Therefore, the solution to the equation fx + 4x + 2 = 2 is x = 0.

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the distance between x = 1 and y = √2 is √3.

To find the distance between two points (x1, y1) and (x2, y2) in a two-dimensional coordinate system, we can use the distance formula:

Distance = sqrt((x2 - x1)^2 + (y2 - y1)^2)

In this case, we want to find the distance between x = 1 and y = √2.

Let's consider the points (1, 0) and (0, √2) as the coordinates (x1, y1) and (x2, y2), respectively.

Using the distance formula:

Distance = sqrt((0 - 1)^2 + (√2 - 0)^2)

= sqrt((-1)^2 + (√2)^2)

= sqrt(1 + 2)

= sqrt(3)

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c) You travel about 50 miles per hour.

d) You were 15 miles from home when you started.

e) After 7 hours, you will be 365 miles away from home.

The slope-intercept representation of a linear function is given by the equation shown as follows:

y = mx + b

The coefficients m and b have the meaning presented as follows:

When x = 0, y = 15, hence the intercept b is given as follows:

b = 15.

In six hours, the distance increased by 300 miles, hence the slope m is given as follows:

m = 300/6 = 50.

Hence the equation is:

y = 50x + 15.

After seven hours, the predicted distance is given as follows:

y = 50(7) + 15 = 365 miles.

The points on the line are:

(0,15) and (6, 315).

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the value of dy/dx at x = 0 is 41/972.

Given, y = (x - 2)³ - (2x + 1)4² √x + 8.

To find: dy/dx at x = 0.Using logarithmic differentiation to find the derivative,Firstly, take natural logarithms on both sides of the given equation ln

y = ln [(x - 2)³ - (2x + 1)4² √x + 8].

ln y = ln [(x - 2)³ - (2x + 1)4² √x + 8].

ln y = ln [(x - 2)³ - (2x + 1)16 (x + 8)¹/²].

Differentiating with respect to x ln

y = ln [(x - 2)³ - (2x + 1)16 (x + 8)¹/²].1/y dy/dx

= d/dx ln [(x - 2)³ - (2x + 1)16 (x + 8)¹/²].1/y dy/dx

= [3(x - 2)² - 32(2x + 1)(x + 8)¹/²]/[(x - 2)³ - (2x + 1)16 (x + 8)¹/²].

Now, put x = 0 in the above equation,

1/y dy/dx = [3(-2)² - 32(2 × 0 + 1)(0 + 8)¹/²]/[(-2)³ - (2 × 0 + 1)16 (0 + 8)¹/²].1/y dy/dx

= -82/80 y

= (x - 2)³ - (2x + 1)4² √x + 8.

Then, at x = 0,

y = (-1)⁴ (2)³ - (2 × 0 + 1)4² √0 + 8.y

= -27.

Substituting the value of y and dy/dx in the first equation, we get,

-27 dy/dx

= -82/80.dy/dx

= 82/80 * 1/27.dy/dx

= 41/972.So, the value of dy/dx at

x = 0 is 41/972.

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The scale factor is found dividing one side length of the right triangle on the right by the equivalent side length on the right triangle on the left.

We have,

A dilation happens when the coordinates of the vertices of an image are multiplied by the scale factor, changing the side lengths of a figure.

For this problem, we have that the original and the dilated figures are given as follows:

Original: right triangle on the left.

Dilated: right triangle on the right.

Hence the scale factor is found dividing one side length of the right triangle on the right by the equivalent side length on the right triangle on the left.

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complete question:

The problem is incomplete,

The right triangle on the right is a scaled copy of the right triangle on the left. Identify the scale factor. Express your answer as a fraction in simplest form.

hence the general procedure to obtain the scale factor was presented.

A 2×2 matrix with non zero entries that has no inverse is:
[1 2]
[2 4]

To find the inverse of a matrix, we need to calculate its determinant. The determinant of this matrix is 0 because the second row is a multiple of the first row. Therefore, this matrix does not have an inverse.

Another way to explain why this matrix has no inverse is to use the formula for the inverse of a 2×2 matrix. If A is a 2×2 matrix with non zero entries, its inverse is given by:
A^-1 = 1/det(A) × [d -b]
                         [-c a]
where det(A) is the determinant of A, and a, b, c, and d are the entries of A.
For the matrix [1 2] [2 4], we have det(A) = 1×4 - 2×2 = 0. Therefore, the formula for the inverse is not defined, and this matrix has no inverse.
In general, a matrix with determinant 0 is called singular, and it does not have an inverse. Such matrices can arise in many contexts, including linear systems of equations, transformations in geometry, and quantum mechanics. It is important to identify singular matrices and handle them appropriately, as they can lead to numerical instability and incorrect results.

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Answer: Divide by [tex]\pi[/tex], then divide it by 2

Step-by-step explanation:

Circumference formula: [tex]\pi[/tex]*(r*2)

[tex]\pi[/tex]*(r*2)/[tex]\pi[/tex]=r*2

(r*2)/2=r

So, divide by exactly pi (or 3.14), then divide by 2. DON'T divide by 2 first, then pi because you won't end up with the same answer.

In summary, the quadratic function f whose graph matches the points (-7,0) and (-3,4) is:
f(x) = -0.5x^2 + 2.5x + 14

To find the quadratic function f whose graph matches the given points (-7,0) and (-3,4), we can start by using the standard form of a quadratic equation, y = ax^2 + bx + c.
We can use the two given points to form a system of equations:
0 = a(-7)^2 + b(-7) + c
4 = a(-3)^2 + b(-3) + c
Simplifying these equations, we get:
49a - 7b + c = 0
9a - 3b + c = 4
We can then solve for one of the variables, such as c:
c = -49a + 7b
c = -9a + 3b - 4
Setting these two equations equal to each other, we get:
-49a + 7b = -9a + 3b - 4
Simplifying, we get:
40a = 4b - 4
10a = b - 1
We can substitute this value of b into one of our original equations, such as:
0 = a(-7)^2 + b(-7) + c
0 = 49a - 7(10a + 1) + c
0 = 29a - 7 + c
c = 7 - 29a
So now we have the values of a, b, and c, and we can write the equation for f:
f(x) = ax^2 + bx + c
f(x) = a(x^2) + (b - 1)x + (7 - 29a)

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Option B  Hθ:ն≥1007.24;HAն≤1007.24  represents the null hypothesis (H₀) stating that the average expenditure is equal to or greater than $1,007.24, and the alternative hypothesis (Hₐ) stating that the average expenditure is less than $1,007.24.

The null hypothesis (H₀) and alternative hypothesis (Hₐ) for the given scenario can be determined as follows:

Null Hypothesis (H₀): The average shopper will spend an amount equal to or greater than $1,007.24 during the holiday shopping season.

Alternative Hypothesis (Hₐ): The average shopper will spend an amount less than $1,007.24 during the holiday shopping season.

Based on the given options, the correct choice is:

b. Hθ:ն≥1007.24;HAն≤1007.24

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Aaron has $53 in his account and he spends $3.25 per lunch.

After spending money the balance reflects the amount left in account.

So after paying for 4 lunches the balance is:

After paying for 6 lunches the balance is:

After paying for n lunches the balance is:

A graphical representation of a decision-making process that resembles a tree structure is called a decision tree.

a) The bare decision tree for this scenario can be labelled as follows:

                 Start

               /       \

            Cherry   Lemon-honey

             /           \

      Cherry      Lemon-honey

       /                \

  Cherry            Lemon-honey

The conditional probabilities for each branch are as follows:

P(Cherry|Start) = 10/18 (since there are 10 Cherry cough drops out of 18 total)

P(Lemon-honey|Start) = 8/18 (since there are 8 Lemon-honey cough drops out of 18 total)

P(Cherry|Cherry) = 9/17 (since after taking out one Cherry cough drop, there are 9 Cherry cough drops out of the remaining 17)

P(Lemon-honey|Cherry) = 8/17 (since after taking out one Cherry cough drop, there are still 8 Lemon-honey cough drops out of the remaining 17)

P(Cherry|Lemon-honey) = 10/17 (since after taking out one Lemon-honey cough drop, there are still 10 Cherry cough drops out of the remaining 17)

P(Lemon-honey|Lemon-honey) = 7/17 (since after taking out one Lemon-honey cough drop, there are 7 Lemon-honey cough drops out of the remaining 17)

b) Multiplying down each path, we can determine the corresponding marginal probabilities:

P(Cherry, Cherry, Cherry) = P(Cherry|Start) * P(Cherry|Cherry) * P(Cherry|Cherry) = (10/18) * (9/17) * (9/17) = 405/1734

P(Cherry, Cherry, Lemon-honey) = P(Cherry|Start) * P(Cherry|Cherry) * P(Lemon-honey|Cherry) = (10/18) * (9/17) * (8/17) = 360/1734

P(Cherry, Lemon-honey, Cherry) = P(Cherry|Start) * P(Lemon-honey|Cherry) * P(Cherry|Lemon-honey) = (10/18) * (8/17) * (10/17) = 400/1734

P(Lemon-honey, Cherry, Cherry) = P(Lemon-honey|Start) * P(Cherry|Lemon-honey) * P(Cherry|Lemon-honey) = (8/18) * (10/17) * (9/17) = 360/1734

P(Lemon-honey, Lemon-honey, Cherry) = P(Lemon-honey|Start) * P(Lemon-honey|Lemon-honey) * P(Cherry|Lemon-honey) = (8/18) * (7/17) * (10/17) = 280/1734

c) The probability that none of the three cough drops is Cherry is:

P(None Cherry) = P(Lemon-honey, Lemon-honey, Lemon-honey) = P(Lemon-honey|Start) * P(Lemon-honey|Lemon-honey) * P(Lemon-honey|Lemon-honey) = (8/18) * (7/17) * (7/17) = 196/1734

d) The probability that there is at least one cough drop of either flavour (Cherry or Lemon-honey) is equal to 1 minus the probability that none of the cough drops is Cherry.

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Answer:

False

explain:

The statement "The best line is the Least Squares Line because it has the largest sum of squares error (SSE)" is false.In fact, the Least Squares Line is chosen to minimize the sum of squared errors (SSE), which is the sum of the squared differences between the predicted values and the actual values of the response variable. This line is obtained by finding the line that minimizes the sum of the squared residuals, which is also known as the sum of squared errors or SSE.The SSE represents the amount of variability in the response variable that is not explained by the regression model. Therefore, the goal of regression analysis is to find the line that minimizes this variability, and the least squares line is the line that achieves this goal.Therefore, the statement that the best line is the Least Squares Line because it has the largest sum of squares error (SSE) is false. In fact, the Least Squares Line is the line that minimizes the SSE, and it is considered to be the best line for fitting a linear regression model to a set of data points.

For any value of h that is not equal to 3, the matrix represents the augmented matrix of a consistent linear system.

To determine the value(s) of h such that the matrix represents the augmented matrix of a consistent linear system, we need to check if the matrix can be row reduced to the form [A | B] where A is a non-singular matrix (has full rank) and B is a column vector.

Let's perform row reduction on the given matrix:

[1  h   5]

[4  12  15]

Row 2 minus 4 times Row 1:

[1   h    5]

[0   12-4h  -5]

We need to ensure that the second row is not all zeros, which would make the system inconsistent.

Therefore, we set 12-4h ≠ 0.

Solving for h:

12 - 4h ≠ 0

-4h ≠ -12

h ≠ 3

Thus, for any value of h that is not equal to 3, the matrix represents the augmented matrix of a consistent linear system.

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The total amount of interest Cody gets on £6500 by the end of the 5 years is equal to £520.

Amount invest by Cody in saving account =  £6500

Time period = 5 years

Rate of interest = 1.6% per year

To calculate the total amount of interest Cody gets by the end of the 5 years,

Use the formula for simple interest:

Interest = Principal × Rate × Time

Where,

Initial investment 'Principal' = £6500

Rate = 1.6%

       = 0.016 (converted to decimal)

Time = 5 years

Plugging in the values, calculate the interest we get,

Interest = £6500 × 0.016 × 5

⇒ Interest = £520

Therefore, Cody will receive a total amount of £520 as interest by the end of the 5 years.

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The solution for this question is (e) unknown is not the estimated difference in means.

6. The difference in the population means is estimated to be between -2.0 and 8.0 with a 95% confidence interval. The midpoint of this interval gives us the estimate of the difference in means.

Midpoint = (Upper bound + Lower bound) / 2

Midpoint = (8.0 + (-2.0)) / 2

Midpoint = 6.0 / 2

Midpoint = 3.0

Therefore, the estimated difference in the population means is 3.0.

(a) 0 is not the estimated difference in means.

(b) 5 is not the estimated difference in means.

(c) 7 is not the estimated difference in means.

(d) 8 is not the estimated difference in means.

(e) unknown is not the estimated difference in means.

The correct answer is (e) unknown.

8. The question about the comparison of two population means is incomplete. Please provide the complete question, and I'll be happy to help you with it.

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According to the statement the correct answer is option C - yes, the data are distributed evenly around the line of fit.

To determine if a model is a good fit for a data set, one needs to evaluate how closely the data points align with the line of fit. The line of fit represents the best possible straight line that can be drawn through the data points. If the data points are too far from the line of fit or too close to the line of fit, then it is an indication that the model is not a good fit for the data.
Option A states that the data points are too far from the line of fit, indicating that the model is not a good fit for the data. Option B states that the data points are too close to the line of fit, which is not necessarily a good or bad thing as it depends on the level of accuracy required for the analysis. Option C states that the data points are evenly distributed around the line of fit, which indicates that the model is a good fit for the data. Lastly, option D states that the line of fit touches at least one point in the data set, which is not sufficient to determine if the model is a good fit for the entire data set.
Therefore, the correct answer is option C - yes, the data are distributed evenly around the line of fit.

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We need to find the sum of all numbers that are congruent to 1 (modulo 3) from 1 to 100. We can solve this problem by using an arithmetic series formula.

The formula to find the sum of the first n terms of an arithmetic series is Sn = n/2(a1 + an), where a1 is the first term, an is the nth term, and n is the number of terms. In this problem, the common difference between each term is 3, since we are looking at numbers congruent to 1 (modulo 3). Therefore, we can write the nth term as 3n - 2. To find the number of terms, we can divide 100 by 3 and round up to the nearest whole number, since we want to include the last term.

This gives us n = 34. Therefore, we can plug in these values to the formula to get: Sn = 34/2(1 + 99) = 34/2(100) = 1700. So the sum of all numbers that are congruent to 1 (modulo 3) from 1 to 100 is 1700.

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The counterexample that disproves the inequality n³ ≤ 3n² is n = 4.

To disprove the statement n³ ≤ 3n², we need to find a counterexample, which is a value of n for which the inequality is false.

Let's evaluate the inequality for the given options:

a. n = 0:

0³ ≤ 3(0)²

0 ≤ 0

The inequality holds for n = 0.

b. n = -1:

(-1)³ ≤ 3(-1)²

-1 ≤ 3

The inequality holds for n = -1.

c. n = 0.5:

(0.5)³ ≤ 3(0.5)²

0.125 ≤ 0.75

The inequality holds for n = 0.5.

d. n = 4:

4³ ≤ 3(4)²

64 ≤ 48

The inequality does not hold for n = 4.

Therefore, the counterexample that disproves the inequality n³ ≤ 3n² is n = 4.

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The terms of the series do not approach zero, and the series diverges.

To test for convergence or divergence of the given series, let's analyze the terms of the series and check for any patterns.

The given series is:

[tex]\dfrac{2n \times n!} { (1.3.5...(2n -1) . (2n + 1))}[/tex], with n starting from 1.

Let's simplify the terms:

[tex]2n \times n! = 2n \times n \times (n-1) \times (n-2) \times ... \times 3 \times 2 \times 1\\(1.3.5...(2n - 1) . (2n + 1)) = (2n + 1) \times (2n - 1) \times (2n - 3) \times ... \times 5 \times 3 \times 1[/tex]

Now, we can rewrite the given series as:

[tex]\dfrac{(2n \times n!)}{((2n + 1) \times (2n - 1) \times (2n - 3) \times ... \times 5 \times 3 \times 1)}[/tex]

Notice that each term in the numerator is twice the previous term, while each term in the denominator alternates between odd and even numbers. We can observe that the numerator grows much faster than the denominator.

As n approaches infinity, the numerator grows exponentially, while the denominator grows at a slower rate. Therefore, the terms of the series do not approach zero, and the series diverges.

In conclusion, the given series diverges.

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The probability that it landed on a multiple of four that is no greater than 10 is 0.3333.

If we know that the die landed on a number strictly greater than 10 only if it landed on a multiple of four, it means that if the dice landed on a number less than or equal to 10, it cannot be a multiple of four.

There are three multiples of four that are less than or equal to 10: 4, 8, and 12 (which we exclude since it's greater than 10).

Out of these three possibilities, only one satisfies the condition that the die landed on a number strictly greater than 10 only if it landed on a multiple of four, which is 8.

Therefore, the probability that the die landed on a multiple of four that is no greater than 10 is 1 out of 3, or 1/3.

In other words, the probability is approximately 0.3333.

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The equation for the line t is:

f(x) = -3x + 3

Let's say that line t can be written as:

f(x) = a*x + b

Remember that two lines are perpendicular if the product between the slopes is -1, then if our line is perpendicular to:

y = 1/3x - 5

Then we will have:

a*(1/3) = -1

a = -3

The line is:

f(x) = -3*x + b

And this line must pass through (-2, 9), then:

9 = -3*-2 + b

9 = 6 + b

9 - 6 = b

3 = b

The line t is:

f(x) = -3x + 3

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A positively skewed distribution means that the majority of the data is clustered toward the lower end of the range, with a long tail to the right indicating a smaller number of extreme values on the higher end. In the case of the distribution of leaves falling from trees in November, this suggests that most trees lose a similar number of leaves, but there are some trees that lose a very large number of leaves, resulting in a long tail to the right of the distribution.