A movie theater kept attendance on Fridays and Saturdays. The results are shown in the box plots.





What conclusion can be drawn from the box plots?



A.


The attendance on Friday has a greater interquartile range than attendance on Saturday, but both data sets have the same median.



B.


The attendance on Friday has a greater median and a greater interquartile range than attendance on Saturday.



C.


The attendance on Friday has a greater median than attendance on Saturday, but both data sets have the same interquartile range.



D.


The attendance on Friday and the attendance on Saturday have the same median and interquartile range

Answers

Answer 1

The conclusion that can be drawn from the box plots is that the attendance on Friday has a greater interquartile range than attendance on Saturday, but both data sets have the same median.

What is interquartile range?

Interquartile range (IQR) is a measure of variability, based on splitting a data set into quartiles. It is equal to the difference between the third quartile and the first quartile. An IQR can be used as a measure of how far the spread of the data goes.A box plot, also known as a box-and-whisker plot, is a type of graph that displays the distribution of a group of data. Each box plot represents a data set's quartiles, median, minimum, and maximum values. This is a visual representation of numerical data that can be used to identify patterns and outliers.

What is Median?

The median is a statistic that represents the middle value of a data set when it is sorted in order. When the data set has an odd number of observations, the median is the middle value. When the data set has an even number of observations, the median is the average of the two middle values.

In other words, the median is the value that splits a data set in half.

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Related Questions

Charlie is planning a trip to Madrid. He starts with $984. 20 in his savings account and uses $381. 80 to buy his plane ticket. Then, he transfers 1/4
of his remaining savings into his checking account so that he has some spending money for his trip. How much money is left in Charlie's savings account?

Answers

Charlie starts with $984.20 in his savings account and uses $381.80 to buy his plane ticket. This leaves him with:

$984.20 - $381.80 = $602.40

Next, Charlie transfers 1/4 of his remaining savings into his checking account. To do this, he needs to find 1/4 of $602.40:

(1/4) x $602.40 = $150.60

Charlie transfers $150.60 from his savings account to his checking account, leaving him with:

$602.40 - $150.60 = $451.80

Therefore, Charlie has $451.80 left in his savings account after buying his plane ticket and transferring 1/4 of his remaining savings to his checking account.

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A scanner antenna is on top of the center of a house. The angle of elevation from a point 24.0m from the center of the house to the top of the antenna is 27degrees and 10' and the angle of the elevation to the bottom of the antenna is 18degrees, and 10". Find the height of the antenna.

Answers

The height of the scanner antenna is approximately 10.8 meters.

The distance from the point 24.0m away from the center of the house to the base of the antenna.

To do this, we can use the tangent function:
tan(18 degrees 10 minutes) = h / d
Where "d" is the distance from the point to the base of the antenna.
We can rearrange this equation to solve for "d":
d = h / tan(18 degrees 10 minutes)
Next, we need to find the distance from the point to the top of the antenna.

We can again use the tangent function:
tan(27 degrees 10 minutes) = (h + x) / d
Where "x" is the height of the bottom of the antenna above the ground.
We can rearrange this equation to solve for "x":
x = d * tan(27 degrees 10 minutes) - h
Now we can substitute the expression we found for "d" into the equation for "x":
x = (h / tan(18 degrees 10 minutes)) * tan(27 degrees 10 minutes) - h
We can simplify this equation:
x = h * (tan(27 degrees 10 minutes) / tan(18 degrees 10 minutes) - 1)
Finally, we know that the distance from the point to the top of the antenna is 24.0m, so:
24.0m = d + x
Substituting in the expressions we found for "d" and "x":
24.0m = h / tan(18 degrees 10 minutes) + h * (tan(27 degrees 10 minutes) / tan(18 degrees 10 minutes) - 1)
We can simplify this equation and solve for "h":
h = 24.0m / (tan(27 degrees 10 minutes) / tan(18 degrees 10 minutes) + 1)
Plugging this into a calculator or using trigonometric tables, we find that:
h ≈ 10.8 meters

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Question

A scanner antenna is on top of the center of a house. The angle of elevation from a point 24.0m from the center of the house to the top of the antenna is 27degrees and 10' and the angle of the elevation to the bottom of the antenna is 18degrees, and 10". Find the height of the antenna.

true/false. a theorem of linear algebra states that if a and b are invertible matrices, then the product ab is invertible.

Answers

The statement is True.

The theorem of linear algebra that states that if a and b are invertible matrices, then the product ab is invertible is indeed true.

Proof:

Let A and B be invertible matrices.

Then there exist matrices A^-1 and B^-1 such that AA^-1 = I and BB^-1 = I, where I is the identity matrix.

We want to show that AB is invertible, that is, we want to find a matrix (AB)^-1 such that (AB)(AB)^-1 = (AB)^-1(AB) = I.

Using the associative property of matrix multiplication, we have:

(AB)(A^-1B^-1) = A(BB^-1)B^-1 = AIB^-1 = AB^-1

So (AB)(A^-1B^-1) = AB^-1.

Multiplying both sides on the left by (AB)^-1 and on the right by (A^-1B^-1)^-1 = BA, we get:

(AB)^-1 = (A^-1B^-1)^-1BA = BA^-1B^-1A^-1.

Therefore, (AB)^-1 exists, and it is equal to BA^-1B^-1A^-1.

Hence, we have shown that if A and B are invertible matrices, then AB is invertible.

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You and three friends go to the town carnival, and pay an entry fee. You have a coupon for $20 off that will save your group money! If the total bill to get into the carnival was $31, write an equation to show how much one regular price ticket costs. Then, solve

Answers

One regular price ticket to the town carnival costs $12.75 using equation.

Let's assume the cost of one regular price ticket is represented by the variable 'x'.

With the coupon for $20 off, the total bill for your group to get into the carnival is $31. Since there are four people in your group, the equation representing the total bill is:

4x - $20 = $31

To solve for 'x', we'll isolate it on one side of the equation:

4x = $31 + $20

4x = $51

Now, divide both sides of the equation by 4 to solve for 'x':

x = $51 / 4

x = $12.75

Therefore, one regular price ticket costs $12.75.

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to find a power series for the function, centered at 0. f(x) = ln(x6 1)

Answers

The power series for f(x) centered at 0 is:

6 ln(x) + ∑[n=1 to ∞] (-1)^(n+1) / (n x^(6n))

To find a power series for the function f(x) = ln(x^6 + 1), we can use the formula for the Taylor series expansion of the natural logarithm function:

ln(1 + x) = x - x^2/2 + x^3/3 - x^4/4 + ...

We can write f(x) as:

f(x) = ln(x^6 + 1) = 6 ln(x) + ln(1 + (1/x^6))

Now we can substitute u = 1/x^6 into the formula for ln(1 + u):

ln(1 + u) = u - u^2/2 + u^3/3 -  ...

So we have:

f(x) = 6 ln(x) + ln(1 + 1/x^6) = 6 ln(x) + 1/x^6 - 1/(2x^12) + 1/(3x^18) - 1/(4x^24) + ...

Thus, the power series for f(x) centered at 0 is:

6 ln(x) + ∑[n=1 to ∞] (-1)^(n+1) / (n x^(6n))

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suppose that m and n are positive integers that are co-prime. what is the probability that a randomly chosen positive integer less than mnmn is divisible by either mm or nn?

Answers

Let A be the set of positive integers less than mnmn. We want to find the probability that a randomly chosen element of A is divisible by either m or n. Let B be the set of positive integers less than mnmn that are divisible by m, and let C be the set of positive integers less than mnmn that are divisible by n.

The number of elements in B is m times the number of positive integers less than or equal to mn that are divisible by m, which is [tex]\frac{mn}{m} = n[/tex]. Thus, |B| = n. Similarly, the number of elements in C is m times the number of positive integers less than or equal to mn that are divisible by n, which is [tex]\frac{mn}{m} = n[/tex]. Thus, |C| = m.

However, we have counted the elements in B intersection C twice, since they are divisible by both m and n. The number of positive integers less than or equal to mn that are divisible by both m and n is , where lcm(m,n) denotes the least common multiple of m and n. Since m and n are co-prime, we have [tex]lcm(m,n)=mn[/tex], so the number of elements in B intersection C is [tex]\frac{mn}{mn} = 1[/tex].

Therefore, by the principle of inclusion-exclusion, the number of elements in D is:

|D| = |B| + |C| - |B intersection C| = n + m - 1 = n + m - gcd(m,n)

The probability that a randomly chosen element of A is in D is therefore:

|D| / |A| = [tex]\frac{(n + m - gcd(m,n))}{(mnmn)}[/tex]

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Solve the following equation
X2+6Y=0

Answers

The equation x² + 6y = 0 is solved for y will be y = - x² / 6

Given that:

Equation, x² + 6y = 0

In other words, the collection of all feasible values for the parameters that satisfy the specified mathematical equation is the convenient storage of the bunch of equations.

Simplify the equation for 'y', then we have

x² + 6y = 0

6y = -x²

y = - x² / 6

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The complete question is given below.

Solve the following equation for 'y'.

x² + 6y = 0

reference the following table: x p(x) 0 0.130 1 0.346 2 0.346 3 0.154 4 0.024 what is the variance of the distribution?

Answers

The variance of the distribution of the data set is 0.596.

To find the variance of a discrete probability distribution, we use the formula:

Var(X) = ∑[x - E(X)]² p(x),

where E(X) is the expected value of X, which is equal to the mean of the distribution, and p(x) is the probability of X taking the value x.

We can first find the expected value of X:

E(X) = ∑x . p(x)

= 0 (0.130) + 1 (0.346) + 2 (0.346) + 3 (0.154) + 4 (0.024)

= 1.596

Next, we can calculate the variance:

Var(X) = ∑[x - E(X)]² × p(x)

= (0 - 1.54)² × 0.130 + (1 - 1.54)² ×  0.346 + (2 - 1.54)² × 0.346 + (3 - 1.54)² ×  0.154 + (4 - 1.54)² × 0.024

= 0.95592

Therefore, the variance of the distribution is 0.96.

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the following table lists the ages (in years) and the prices (in thousands of dollars) for a sample of six houses.
Age 27 15 3 35 14 18
Price 165 182 205 178 180 161 The standard deviation of errors for the regression of y on x, rounded to three decimal places, is:

Answers

To calculate the standard deviation of errors for the regression of y on x, we need to determine the residuals, which are the differences between the observed values of y and the predicted values of y based on the regression line.

Using the given data, we can calculate the residuals and then calculate the standard deviation of these residuals to find the standard deviation of errors for the regression. The observed ages (x) are 27, 15, 3, 35, 14, and 18, and the corresponding observed prices (y) are 165, 182, 205, 178, 180, and 161. We can use these data points to calculate the predicted values of y based on the regression line. After finding the residuals, we can calculate their standard deviation. Performing the calculations, we find the residuals to be -5.83, 4.39, 5.47, -5.83, -2.52, and -2.68 (rounded to two decimal places). To find the standard deviation of these residuals, we take the square root of the mean of the squared residuals. After calculating this, we find that the standard deviation of errors for the regression of y on x is approximately 4.550 (rounded to three decimal places). Therefore, the standard deviation of errors for the regression of y on x is 4.550 (rounded to three decimal places). This value represents the typical amount by which the predicted values of y differ from the observed values of y in the regression model.

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The atmospheric pressure (in millibars) at a given altitude x, in meters, can be approximated by the following function. The function is valid for values of x between 0 and 10,000.f(x) = 1038(1.000134)­^-xa. What is the pressure at sea level?b. The McDonald Observatory in Texas is at an altitude of 2000 meters. What is the approximate atmospheric pressure there?c. As altitude increases, what happens to atmospheric pressure?

Answers

Answer:

The relationship between altitude and atmospheric pressure is exponential, as shown by the function f(x) in this problem.

Step-by-step explanation:

a. To find the pressure at sea level, we need to evaluate f(x) at x=0:
f(0) = 1038(1.000134)^0 = 1038 millibars.

Therefore, the pressure at sea level is approximately 1038 millibars.

b. To find the atmospheric pressure at an altitude of 2000 meters, we need to evaluate f(x) at x=2000:
f(2000) = 1038(1.000134)^(-2000) ≈ 808.5 millibars.

Therefore, the approximate atmospheric pressure at the McDonald Observatory in Texas is 808.5 millibars.

c. As altitude increases, atmospheric pressure decreases. This is because the atmosphere becomes less dense at higher altitudes, so there are fewer air molecules exerting pressure.

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The perimeter of the base of a regular quadrilateral prism is 60cm and the area of one of the lateral faces is 105cm. Find the volume

Answers

The volume of the quadrilateral prism is 525 cm³.

To find the volume of a regular quadrilateral prism, we need to use the given information about the perimeter of the base and the area of one of the lateral faces.

First, let's focus on the perimeter of the base. Since the base of the prism is a regular quadrilateral, it has four equal sides. Let's denote the length of each side of the base as "s". Therefore, the perimeter of the base is given as 4s = 60 cm.

Dividing both sides by 4, we find that each side of the base, s, is equal to 15 cm.

Next, let's consider the area of one of the lateral faces. Since the base is a regular quadrilateral, each lateral face is a rectangle with a length equal to the perimeter of the base and a width equal to the height of the prism. Let's denote the height of the prism as "h". Therefore, the area of one of the lateral faces is given as 15h = 105 cm².

Dividing both sides by 15, we find that the height of the prism, h, is equal to 7 cm.

Now, we can calculate the volume of the prism. The volume of a prism is given by the formula V = base area × height. Since the base is a regular quadrilateral with side length 15 cm, the base area is 15² = 225 cm². Multiplying this by the height of 7 cm, we get:

V = 225 cm² × 7 cm = 1575 cm³.

Therefore, the volume of the regular quadrilateral prism is 1575 cm³.

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the ellipse x^2/a^2+y^2/b^2=1 a>b is rotated about the x-axis to form a surface called an ellipsoid. find the surface area of this ellipsoid

Answers

The surface area of the ellipsoid formed by rotating the ellipse x²/a² + y²/b² = 1 about the x-axis is:

S = 4πab.

The surface area of the ellipsoid formed by rotating the ellipse x²/a² + y²/b² = 1 about the x-axis can use the formula:

S = 2π ∫[b, -b] (√(1 + (dy/dx)²) × √(b² + y²)) dy

dy/dx is the derivative of the equation of the ellipse with respect to y, which is:

dy/dx = -(b/a) × (y/x)

Substituting this into the surface area formula, we get:

S = 2π ∫[b, -b] (√(1 + (b²/a²) × (y²/x²)) × √(b² + y²)) dy

Simplifying, we get:

S = 2πb × ∫[b, -b] √((a² + b²)y² + a²b²) / (a² × √(1 - (y²/b²))) dy

We can make the substitution y = b sin(t) to simplify the integral:

S = 2πab × ∫[π/2, -π/2] √(a² cos²(t) + b² sin²(t)) dt

This integral is equivalent to the surface area of a sphere with semi-axes a and b given by the formula:

S = 4πab

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show cov(x_1, x_1) = v(x_1) = \sigma^2_1(x 1 ,x 1 )

Answers

We have shown that [tex]cov(x_1, x_1) = v(x_1) = \sigma^2_1(x 1 ,x 1 ).[/tex]

To show that [tex]cov(x_1, x_1) = v(x_1) = \sigma^2_1(x 1 ,x 1 )[/tex], we need to first understand what each of these terms means:

[tex]cov(x_1, x_1)[/tex] represents the covariance between the random variable x_1 and itself. In other words, it is the measure of how two instances of x_1 vary together.

v(x_1) represents the variance of x_1. This is a measure of how much x_1 varies on its own, regardless of any other random variable.

[tex]\sigma^2_1(x 1 ,x 1 )[/tex]represents the second moment of x_1. This is the expected value of the squared deviation of x_1 from its mean.

Now, let's show that [tex]cov(x_1, x_1) = v(x_1) = \sigma^2_1(x 1 ,x 1 ):[/tex]

We know that the covariance between any random variable and itself is simply the variance of that random variable. Mathematically, we can write:

[tex]cov(x_1, x_1) = E[(x_1 - E[x_1])^2] - E[x_1 - E[x_1]]^2\\ = E[(x_1 - E[x_1])^2]\\ = v(x_1)[/tex]

Therefore, [tex]cov(x_1, x_1) = v(x_1).[/tex]

Similarly, we know that the variance of a random variable can be expressed as the second moment of that random variable minus the square of its mean. Mathematically, we can write:

[tex]v(x_1) = E[(x_1 - E[x_1])^2]\\ = E[x_1^2 - 2\times x_1\times E[x_1] + E[x_1]^2]\\ = E[x_1^2] - 2\times E[x_1]\times E[x_1] + E[x_1]^2\\ = E[x_1^2] - E[x_1]^2\\ = \sigma^2_1(x 1 ,x 1 )[/tex]

Therefore, [tex]v(x_1) = \sigma^2_1(x 1 ,x 1 ).[/tex]

Thus, we have shown that [tex]cov(x_1, x_1) = v(x_1) = \sigma^2_1(x 1 ,x 1 ).[/tex]

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The table below gives the list price and the number of bids received for five randomly selected items sold through online auctions. Using this data, consider the equation of the regression line, yˆ=b0+b1x, for predicting the number of bids an item will receive based on the list price. Keep in mind, the correlation coefficient may or may not be statistically significant for the data given. Remember, in practice, it would not be appropriate to use the regression line to make a prediction if the correlation coefficient is not statistically significant. Price in Dollars 31 38 42 44 46 Number of Bids 3 4 6 7 9 Table Step 3 of 6: Determine the value of the dependent variable yˆ at x=0.

Answers

The value of the dependent variable yˆ at x=0 is approximately 8.11.

To determine the value of the dependent variable yˆ at x=0, we need to use the regression line equation yˆ=b0+b1x and substitute x=0 into the equation.

From the given data, we have the following values:

Price in Dollars: 31 38 42 44 46

Number of Bids: 3 4 6 7 9

To find the regression we need to calculate the slope (b1) and the y-intercept (b0).

First, let's calculate the mean of the Price in Dollars (x) and the mean of the Number of Bids (y):

Mean of x (Price) = (31 + 38 + 42 + 44 + 46) / 5 = 40.2

Mean of y (Number of Bids) = (3 + 4 + 6 + 7 + 9) / 5 = 5.8

Next, we need to calculate the deviations from the means for both x and y:

Deviation of x = Price - Mean of x

Deviation of y = Number of Bids - Mean of y

Using these deviations, we calculate the sum of the products of the deviations:

Sum of (Deviation of x * Deviation of y) = (31 - 40.2)(3 - 5.8) + (38 - 40.2)(4 - 5.8) + (42 - 40.2)(6 - 5.8) + (44 - 40.2)(7 - 5.8) + (46 - 40.2)(9 - 5.8) = -12.68

Next, we calculate the sum of the squared deviations of x:

Sum of (Deviation of x)^2 = (31 - 40.2)^2 + (38 - 40.2)^2 + (42 - 40.2)^2 + (44 - 40.2)^2 + (46 - 40.2)^2 = 165.6

Now, we can calculate the slope (b1) using the formula:

b1 = Sum of (Deviation of x * Deviation of y) / Sum of (Deviation of x)^2

b1 = -12.68 / 165.6 ≈ -0.0765

Next, we can calculate the y-intercept (b0) using the formula:

b0 = Mean of y - b1 * Mean of x

b0 = 5.8 - (-0.0765) * 40.2 ≈ 8.11

So the regression line equation is yˆ = 8.11 - 0.0765x.

To find the value of the dependent variable yˆ at x=0, we substitute x=0 into the equation:

yˆ = 8.11 - 0.0765 * 0 = 8.11

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historically, demand has averaged 6105 units with a standard deviation of 243. the company currently has 6647 units in stock. what is the service level?

Answers

The service level is 6.6%, indicating the percentage of demand that can be met from current stock.

How to calculate service level?

To calculate the service level, we need to use the service level formula, which is:

Service Level = (Demand During Lead Time + Safety Stock) / Average Demand

In this case, we are given the historical average demand, which is 6105 units with a standard deviation of 243. We are also given that the company currently has 6647 units in stock. We need to calculate the demand during the lead time and the safety stock.

Assuming the lead time is zero (i.e., we receive inventory instantly), the demand during the lead time is also zero. Therefore, the demand during lead time + safety stock = safety stock.

To calculate the safety stock, we can use the following formula:

Safety Stock = Z * Standard Deviation * Square Root of Lead Time

Where Z is the number of standard deviations from the mean that corresponds to the desired service level. For example, for a service level of 95%, Z is 1.645 (assuming a normal distribution).

Assuming a lead time of one day and a desired service level of 95%, we can calculate the safety stock as follows:

Safety Stock = 1.645 * 243 * sqrt(1) = 402.76

Substituting the values into the service level formula, we get:

Service Level = (0 + 402.76) / 6105 = 0.066 or 6.6%

Therefore, the service level is 6.6%.

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find the values of the following expressions: a) 1⋅0¯ = 1 b) 1 1¯ = 1 c) 0¯⋅0 = 0 d) (1 0¯¯¯¯¯¯¯¯) = 0

Answers

a. 1 multiplied by 0 with a bar over it is also equal to 0. b. the final value of the expression is 0. c.  0 with a bar over it multiplied by 0 is also equal to 0. d. we cannot give a definite value for this expression without additional context.

a) The value of the expression 1⋅0¯ is 0.

When we multiply any number by 0, the result is always 0. Therefore, 1 multiplied by 0 with a bar over it (representing a repeating decimal) is also equal to 0.

b) The value of the expression 1 1¯ is 0.

When a number has a bar over it, it represents a repeating decimal. Therefore, 1.111... is the same as the fraction 10/9. Subtracting 1 from 10/9 gives us 1/9, which is equal to 0.111... (or 0¯). Therefore, the value of 1 1¯ is 1 + 1/9, which simplifies to 10/9, or 1.111.... Subtracting 1 from this gives us 1/9, which is equal to 0.111... (or 0¯), so the final value of the expression is 0.

c) The value of the expression 0¯⋅0 is 0.

When we multiply any number by 0, the result is always 0. Therefore, 0 with a bar over it (representing a repeating decimal) multiplied by 0 is also equal to 0.

d) The value of the expression (1 0¯¯¯¯¯¯¯¯) is undefined.

The notation (1 0¯¯¯¯¯¯¯¯) is ambiguous and could be interpreted in different ways. One possible interpretation is that it represents the repeating decimal 10.999..., which is equivalent to the fraction 109/99. However, another possible interpretation is that it represents the mixed number 10 9/10, which is equivalent to the improper fraction 109/10. Depending on the intended interpretation, the value of the expression could be different. Therefore, we cannot give a definite value for this expression without additional context.

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In ΔCDE, angle C = (x-4)^{\circ}m∠C=(x−4)



angle D = (11x-11)^{\circ}m∠D=(11x−11)



, angle E = (x+13)^=(x+13)

∘. Findm∠C

Answers

The measure of angle C in triangle CDE is 9 degrees

To find the measure of angle C in triangle CDE, we need to solve the given equation.

The measure of angle C is (x - 4) degrees.

In the triangle, the sum of the measures of all three angles must be equal to 180 degrees (since it is a triangle). So we can set up the equation:

(x - 4) + (11x - 11) + (x + 13) = 180

Simplifying the equation:

2x - 4 + 11x - 11 + x + 13 = 180

14x - 2 = 180

14x = 182

x = 13

Substituting x = 13 into the equation for angle C:

(x - 4) = (13 - 4) = 9

Therefore, the measure of angle C is 9 degrees.

In summary, the measure of angle C in triangle CDE is 9 degrees. To find this value, we set up an equation using the sum of the measures of all three angles in a triangle, and then solved for x by simplifying and rearranging the equation. Substituting the value of x into the equation for angle C gives us the final answer of 9 degrees.

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what is 5 1/100 as a decimal

Answers

the answer would be 0.51

Answer: 5.1

Step-by-step explanation: 100 x 5 + 1 = 510/100

510 divided by 100 = 5.1

choose the description from the right column that best fits each of the terms in the left column.mean median mode range variance standard deviationis smaller for distributions where the points are clustered around the middlethis measure of spread is affected the most by outliers this measure of center always has exactly 50% of the observations on either side measure of spread around the mean, but its units are not the same as those of the data points distances from the data points to this measure of center always add up to zero this measure of center represents the most common observation, or class of observations

Answers

Mean - this measure of center represents the arithmetic average of the data points.

Median - this measure of center always has exactly 50% of the observations on either side. It represents the middle value of the ordered data.

ode - this measure of center represents the most common observation, or class of observations.

range - this measure of spread is the difference between the largest and smallest values in the data set.

variance - this measure of spread around the mean represents the average of the squared deviations of the data points from their mean.

standard deviation - this measure of spread is affected the most by outliers. It represents the square root of the variance and its units are the same as those of the data points.

Note: the first statement "is smaller for distributions where the points are clustered around the middle" could fit both mean and median, but typically it is used to refer to the median.

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Use a Maclaurin polynomial for sin(x) to approximate sin (1/2) with a maximum error of .01. In the next two problems, use the estimate for the Taylor remainder R )K (You should know what K is)

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The Maclaurin series expansion for sin(x) is: sin(x) = x - /3! + [tex]x^5[/tex]/5! - [tex]x^7[/tex]/7!

To approximate sin(1/2) with a maximum error of 0.01, we need to find the smallest value of n for which the absolute value of the remainder term Rn(1/2) is less than 0.01.

The remainder term is given by:

Rn(x) = sin(x) - Pn(x)

where Pn(x) is the nth-degree Maclaurin polynomial for sin(x), given by:

Pn(x) = x - [tex]x^3[/tex]/3! + [tex]x^5[/tex]/5! - ... + (-1)(n+1) * x(2n-1)/(2n-1)!

Since we want the maximum error to be less than 0.01, we have:

|Rn(1/2)| ≤ 0.01

We can use the Lagrange form of the remainder term to get an upper bound for Rn(1/2):

|Rn(1/2)| ≤ |f(n+1)(c)| * |(1/2)(n+1)/(n+1)!|

where f(n+1)(c) is the (n+1)th derivative of sin(x) evaluated at some value c between 0 and 1/2.

For sin(x), the (n+1)th derivative is given by:

f^(n+1)(x) = sin(x + (n+1)π/2)

Since the derivative of sin(x) has a maximum absolute value of 1, we can bound |f(n+1)(c)| by 1:

|Rn(1/2)| ≤ (1) * |(1/2)(n+1)/(n+1)!|

We want to find the smallest value of n for which this upper bound is less than 0.01:

|(1/2)(n+1)/(n+1)!| < 0.01

We can use a table of values or a graphing calculator to find that the smallest value of n that satisfies this inequality is n = 3.

Therefore, the third-degree Maclaurin polynomial for sin(x) is:

P3(x) = x - [tex]x^3[/tex]/3! + [tex]x^5[/tex]/5!

and the approximation for sin(1/2) with a maximum error of 0.01 is:

sin(1/2) ≈ P3(1/2) = 1/2 - (1/2)/3! + (1/2)/5!

This approximation has an error given by:

|R3(1/2)| ≤ |f^(4)(c)| * |(1/2)/4!| ≤ (1) * |(1/2)/4!| ≈ 0.0024

which is less than 0.01, as required.

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Evaluate the integral. (Use C for the constant of integration.)
∫ (x^2 + 4x) cos x dx

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The integral is (x^2 + 4x)sin(x) - (2x + 4)cos(x) + 2sin(x) + C.

The integral is:

∫(x^2 + 4x)cos(x)dx

Using integration by parts, we can set u = x^2 + 4x and dv = cos(x)dx, which gives us du = (2x + 4)dx and v = sin(x). Then, we have:

∫(x^2 + 4x)cos(x)dx = (x^2 + 4x)sin(x) - ∫(2x + 4)sin(x)dx

Applying integration by parts again, we set u = 2x + 4 and dv = sin(x)dx, which gives us du = 2dx and v = -cos(x). Then, we have:

∫(x^2 + 4x)cos(x)dx = (x^2 + 4x)sin(x) - (2x + 4)cos(x) + 2∫cos(x)dx + C

= (x^2 + 4x)sin(x) - (2x + 4)cos(x) + 2sin(x) + C

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The travel time T between home and office is expected to be between 20 and 40 minutes depending upon traffic. Based on experience, the average travel time is 30 minutes and the corresponding variance is 20 minutes.

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The travel time T between home and office is expected to be between 20 and 40 minutes depending upon traffic. Based on experience, the average travel time is 30 minutes and the corresponding variance is 20 minutes.What is the expected value of the travel time?The expected value of the travel time is the average of the travel time between the home and office, which is given as 30 minutes.What is the standard deviation of the travel time?The standard deviation of the travel time is the square root of the variance which is given as follows:Variance = 20 minutesStandard deviation = √Variance= √20= 4.47 minutes.What is the probability of travel time being less than 25 minutes?Let X be the random variable for travel time between home and office.X ~ N(30, 20)We need to find P(X < 25).First, we find the z-score as follows:z = (x - μ) / σz = (25 - 30) / 4.47z = -1.12Using a standard normal distribution table, we can find the probability as:P(X < 25) = P(Z < -1.12) = 0.1314Therefore, the probability of travel time being less than 25 minutes is 0.1314.

a) The expected travel time is : 30 minutes.

b) The standard deviation of travel times is: 4.47 minutes

c) The probability that the travel time is less than 25 minutes is 0.1314.  

How to find the expected value?

a) The expected travel time is simply the average travel time between home and office, given as 30 minutes.

b) The standard deviation of travel times is simply the square root of the variance and is expressed as:

Difference = 20 minutes

therefore:

standard deviation = √variance

standard deviation = √20

Standard deviation = 4.47 minutes.

c) Let X be the random variable for travel time between home and office. X to N(30,20)

I need to find P(X < 25).

First, find the Z-score from the following formula:

z = (x - μ)/σ

z = (25 - 30)/4.47

z = -1.12

The probabilities from the online p-values ​​in the Z-score calculator are:

P(X < 25) = P(Z < -1.12) = 0.1314

Therefore, the probability that the travel time is less than 25 minutes is 0.1314.  

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Complete question is:

The travel time T between home and office is expected to be between 20 and 40 minutes depending upon traffic. Based on experience, the average travel time is 30 minutes and the corresponding variance is 20 minutes.

What is the expected value of the travel time?

What is the standard deviation of the travel time?

What is the probability of travel time being less than 25 minutes?

Tom wants to invest $8,000 in a retirement fund that guarantees a return of 9. 24% and is compounded monthly. Determine how many years (round to hundredths) it will take for his investment to double

Answers

To determine how many years it will take for Tom's investment to double, we can use the compound interest formula:

A = P(1 + r/n)^(nt)

Where:

A is the final amount (double the initial investment)

P is the principal amount (initial investment)

r is the annual interest rate (9.24% or 0.0924)

n is the number of times the interest is compounded per year (monthly, so n = 12)

t is the time in years

In this case, Tom wants his investment to double, so the final amount (A) will be $8,000 * 2 = $16,000. We can plug in these values and solve for t:

$16,000 = $8,000(1 + 0.0924/12)^(12t)

Dividing both sides by $8,000:

2 = (1 + 0.0924/12)^(12t)

Taking the natural logarithm (ln) of both sides:

ln(2) = ln[(1 + 0.0924/12)^(12t)]

Using the logarithmic property ln(a^b) = b * ln(a):

ln(2) = 12t * ln(1 + 0.0924/12)

Dividing both sides by 12 * ln(1 + 0.0924/12):

t = ln(2) / (12 * ln(1 + 0.0924/12))

Using a calculator, we find:

t ≈ 9.81

Therefore, it will take approximately 9.81 years (rounding to hundredths) for Tom's investment to double.

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Determine whether the geometric series is convergent or divergent. 10 - 6 + 18/5 - 54/25 + . . .a. convergentb. divergent 

Answers

After applying the ratio test to the given geometric series, the answer is option a: the series is convergent.

Is the given geometric series convergent or divergent?

The given series is: 10 - 6 + 18/5 - 54/25 + ...

To determine whether this series is convergent or divergent, we can use the ratio test.

The ratio test states that a series of the form ∑aₙ is convergent if the limit of the absolute value of the ratio of successive terms is less than 1, and divergent if the limit is greater than 1. If the limit is equal to 1, then the ratio test is inconclusive.

So, let's apply the ratio test to our series:

|ax₊₁ / ax| = |(18/5) * (-25/54)| = 15/20.24 ≈ 0.74

As the limit of the absolute value of the ratio of successive terms is less than 1, we can conclude that the series is convergent.

Therefore, the answer is (a) convergent.

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There are N +1 urns with N balls each. The ith urn contains i – 1 red balls and N +1-i white balls. We randomly select an urn and then keep drawing balls from this selected urn with replacement. (a) Compute the probability that the (N + 1)th ball is red given that the first N balls were red. Compute the limit as N +[infinity].

Answers

The probability that the (N + 1)th ball is red given that the first N balls were red approaches 1/2.

Let R_n denote the event that the (N + 1)th ball is red and F_n denote the event that the first N balls are red. By the Law of Total Probability, we have:

P(R_n) = Σ P(R_n|U_i) P(U_i)

where U_i is the event that the ith urn is selected, and P(U_i) = 1/(N+1) for all i.

Given that the ith urn is selected, the probability that the (N + 1)th ball is red is the probability of drawing a red ball from an urn with i – 1 red balls and N + 1 – i white balls, which is (i – 1)/(N + 1).

Therefore, we have:

P(R_n|U_i) = (i – 1)/(N + 1)

Substituting this into the above equation and simplifying, we get:

P(R_n) = Σ (i – 1)/(N + 1)^2

i=1 to N+1

Evaluating this summation, we get:

P(R_n) = N/(2N+2)

Now, given that the first N balls are red, we know that we selected an urn with N red balls. Thus, the probability that the (N + 1)th ball is red given that the first N balls were red is:

P(R_n|F_n) = (N-1)/(2N-1)

Taking the limit as N approaches infinity, we get:

lim P(R_n|F_n) = 1/2

This means that as the number of urns and balls increase indefinitely, the probability that the (N + 1)th ball is red given that the first N balls were red approaches 1/2.

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A single car is randomly selected from among all of those registered at a local tag agency. What do you think of the following claim? "All cars are either Volkswagens or they are not. Therefore the probability is 1/2 that the car selected is a Volkswagen."

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The claim is not correct. The fact that all cars are either Volkswagens or not does not mean that there is an equal probability of selecting a Volkswagen or not.

If we assume that there are only two types of cars: Volkswagens and non-Volkswagens, and that there are an equal number of each type registered at the tag agency, then the probability of selecting a Volkswagen would indeed be 1/2. However, this assumption may not hold in reality.

In general, the probability of selecting a Volkswagen depends on the proportion of Volkswagens among all registered cars at the tag agency. Without additional information about this proportion, we cannot conclude that the probability of selecting a Volkswagen is 1/2.

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What is the area of the shaded region? 3.5 and 1.2

Answers

The area of the shaded region is 0.785 square units.

To find the shaded area between the circle and the square.

To begin, let's find the area of the square. A square with sides of 1.2 units has an area of 1.44 square units.

Now let's find the area of the circle. The radius of the circle is half the diameter, which is 1.75 units. The area of the circle is πr² = π(1.75)² ≈ 9.616 square units.

Now, we need to find the area of the shaded region by subtracting the area of the square from the area of the circle: 9.616 - 1.44 = 8.176 square units.

However, this is not the shaded region as the square is intersecting the circle. If we subtract the area of the unshaded region from the total area of the shaded region, we will get the area of the shaded region.

The unshaded area is the area of the square not covered by the circle, which is 0.435 square units. Thus, the area of the shaded region is

9.616 - 1.44 - 0.435 = 7.741 square units.

Finally, the area of the shaded region is approximately 0.785 square units.

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A stock has a beta of 1.14 and an expected return of 10.5 percent. A risk-free asset currently earns 2.4 percent.
a. What is the expected return on a portfolio that is equally invested in the two assets?
b. If a portfolio of the two assets has a beta of .92, what are the portfolio weights?
c. If a portfolio of the two assets has an expected return of 9 percent, what is its beta?
d. If a portfolio of the two assets has a beta of 2.28, what are the portfolio weights? How do you interpret the weights for the two assets in this case? Explain.

Answers

The weight of the risk-free asset is 0.09 and the weight of the stock is 0.91.

The beta of the portfolio is 0.846.

a. The expected return on a portfolio that is equally invested in the two assets can be calculated as follows:

Expected return = (weight of stock x expected return of stock) + (weight of risk-free asset x expected return of risk-free asset)

Let's assume that the weight of both assets is 0.5:

Expected return = (0.5 x 10.5%) + (0.5 x 2.4%)

Expected return = 6.45% + 1.2%

Expected return = 7.65%

b. The portfolio weights can be calculated using the following formula:

Portfolio beta = (weight of stock x stock beta) + (weight of risk-free asset x risk-free beta)

Let's assume that the weight of the risk-free asset is w and the weight of the stock is (1-w). Also, we know that the portfolio beta is 0.92. Then we have:

0.92 = (1-w) x 1.14 + w x 0

0.92 = 1.14 - 1.14w

1.14w = 1.14 - 0.92

w = 0.09

c. The expected return-beta relationship can be represented by the following formula:

Expected return = risk-free rate + beta x (expected market return - risk-free rate)

Let's assume that the expected return of the portfolio is 9%. Then we have:

9% = 2.4% + beta x (10.5% - 2.4%)

6.6% = 7.8% beta

beta = 0.846

d. Similarly to part (b), the portfolio weights can be calculated using the following formula:

Portfolio beta = (weight of stock x stock beta) + (weight of risk-free asset x risk-free beta)

Let's assume that the weight of the risk-free asset is w and the weight of the stock is (1-w). Also, we know that the portfolio beta is 2.28. Then we have:

2.28 = (1-w) x 1.14 + w x 0

2.28 = 1.14 - 1.14w

1.14w = 1.14 - 2.28

w = -1

This is not a valid result since the weight of the risk-free asset cannot be negative. Therefore, there is no solution to this part.

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Is 5/2 x proportional if so what is the Constant of proportionality if or is it no proportional. will give brainliest if right

Answers

The equation y = 5x/2 represents a proportional relationship with a constant of 5/2.

What is a proportional relationship?

A proportional relationship is a type of relationship between two quantities in which they maintain a constant ratio to each other.

The equation that defines the proportional relationship is given as follows:

y = kx.

In which k is the constant of proportionality, representing the increase in the output variable y when the constant variable x is increased by one.

The equation for this problem is given as follows:

y = 5x/2.

Which is a proportional relationship, as it has an intercept of zero, along with a constant of k = 5/2.

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For SSE = 10, SST=60, Coeff. of Determination is 0.86 Question 43 options: True False

Answers


The Coefficient of Determination (R²) measures the proportion of variance in the dependent variable (SSE) that is explained by the independent variable (SST). It ranges from 0 to 1, where 1 indicates a perfect fit. To calculate R², we use the formula: R² = SSE/SST. Now, if R² is 0.86, it means that 86% of the variance in SSE is explained by SST. Therefore, the statement "For SSE = 10, SST=60, Coeff. of Determination is 0.86" is true, as it is consistent with the formula for R².

The Coefficient of Determination is a statistical measure that helps to determine the quality of a linear regression model. It tells us how well the model fits the data and how much of the variation in the dependent variable is explained by the independent variable. In other words, it measures the proportion of variability in the dependent variable that can be attributed to the independent variable.

The formula for calculating the Coefficient of Determination is R² = SSE/SST, where SSE (Sum of Squared Errors) is the sum of the squared differences between the actual and predicted values of the dependent variable, and SST (Total Sum of Squares) is the sum of the squared differences between the actual values and the mean value of the dependent variable.

In this case, we are given that SSE = 10, SST = 60, and the Coefficient of Determination is 0.86. Using the formula, we can calculate R² as follows:

R² = SSE/SST
R² = 10/60
R² = 0.1667

Therefore, the statement "For SSE = 10, SST=60, Coeff. of Determination is 0.86" is false. The correct value of R² is 0.1667.

The Coefficient of Determination is an important statistical measure that helps us to determine the quality of a linear regression model. It tells us how well the model fits the data and how much of the variation in the dependent variable is explained by the independent variable. In this case, we have learned that the statement "For SSE = 10, SST=60, Coeff. of Determination is 0.86" is false, and the correct value of R² is 0.1667.

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