Expected sales 700, 560, 800, and 680 for the months of January through April, respectively. The firm collects 50% of sales in the month of sale. 28% in the month following. 20% two months later. The remaining 2% is never collected. How much money does the firm expect to collect in the month of April?

The density of X+Y is e^(z+y), where z is the sum of X and Y. This is found by convolving the individual densities e^-x and e^y.



The density of the random variable X+Y can be determined by finding the convolution of the densities of X and Y.

To find the density of X+Y, we can use the convolution formula:

fz(z) = ∫[−∞,∞] fx(z−y) * fy(y) dy

Substituting the given densities:

fz(z) = ∫[−∞,∞] e^(−(z−y)) * e^y dy

Simplifying and solving the integral, we get:

fz(z) = ∫[−∞,∞] e^y * e^z dy = e^z * ∫[−∞,∞] e^y dy

The integral of e^y with respect to y is simply e^y, so:

fz(z) = e^z * e^y = e^(z+y)

Therefore, the density of X+Y is fz(z) = e^(z+y), where z represents the sum of the values of X and Y.

By solving the integral, we find that the density of X+Y is given by fz(z) = e^(z+y), where z represents the sum of the values of X and Y. This means that the density of X+Y is simply the exponential function with a parameter equal to the sum of the values of X and Y.

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The probability of getting exactly half heads when a fair coin is tossed 12 times is relatively low and is not equal to 50%. The probability that a coin will come up heads exactly half the time when tossed 12 times is approximately 0.2256 or about 22.56%.

When a fair coin is tossed, there are two possible outcomes: heads or tails.

Each toss is considered an independent event, and the probability of getting heads or tails is 0.5 for each toss.

In this scenario, we want to determine the probability of obtaining exactly half heads in a series of 12 coin tosses.

To calculate this probability, we can use the binomial distribution formula.

The formula for the probability mass function (PMF) of the binomial distribution is given by P(X = k) = C(n, k) × [tex]p^k[/tex] × [tex](1-p)^{n-k}[/tex], where n is the number of trials (coin tosses), k is the number of successful outcomes (heads), p is the probability of success (0.5 for a fair coin), and C(n, k) is the binomial coefficient.

In the given case, we want to find the probability of getting exactly 6 heads (half the time) in 12 coin tosses.

Using the binomial distribution formula, we have P(X = 6) = C(12, 6) × [tex](0.5)^6[/tex] × [tex](1-0.5)^{12-6}[/tex].

Evaluating this expression, we find the probability to be approximately 0.2256.

Therefore, the probability that a coin will come up heads exactly half the time when tossed 12 times is approximately 0.2256 or about 22.56%.

This probability is lower than 50%, indicating that it is less likely to obtain exactly half heads in 12 tosses of a fair coin.

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An equation of the plane through the point (-5, -5, -2) that is parallel to the plane 4x - 5y + 3z - 6 = 0 and has a coefficient of x as 4 is 4x - 5y + 3z + 1 = 0.

To find an equation of a plane through the point (-5, -5, -2) that is parallel to the plane 4x - 5y + 3z - 6 = 0 and has a coefficient of x as 4, we can use the concept that parallel planes have the same normal vectors.

The given plane has a normal vector (4, -5, 3) since the coefficients of x, y, and z represent the components of the normal vector. To find an equation of a parallel plane, we can use the same normal vector.

Using the point-normal form of the equation of a plane, the equation can be written as:

4(x - x₁) - 5(y - y₁) + 3(z - z₁) = 0

Substituting the coordinates of the given point (-5, -5, -2) as (x₁, y₁, z₁):

4(x + 5) - 5(y + 5) + 3(z + 2) = 0

Expanding and simplifying the equation:

4x + 20 - 5y - 25 + 3z + 6 = 0

4x - 5y + 3z + 1 = 0

Therefore, an equation of the plane through the point (-5, -5, -2) that is parallel to the plane 4x - 5y + 3z - 6 = 0 and has a coefficient of x as 4 is 4x - 5y + 3z + 1 = 0.

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The production levels of 50 thousand, 100 thousand, and 150 thousand calculators, the average costs per calculator are $23.67, $17.15, and $14.50, respectively.

To find the average cost per calculator for different production levels, we divide the total cost (C) by the number of calculators produced.

The given equation for the cost is C = -14.4x² + 12,790x + 580,000, where x represents the production level in thousands (x ≤ 175).

Let's calculate the average cost per calculator for the following production levels:

1. Production level: x = 50 (thousand calculators)

  Total cost (C) = -14.4(50)² + 12,790(50) + 580,000

                = -36,000 + 639,500 + 580,000

                = 1,183,500

  Number of calculators = 50,000

  Average cost per calculator = Total cost / Number of calculators

                             = 1,183,500 / 50,000

                             = $23.67

2. Production level: x = 100 (thousand calculators)

  Total cost (C) = -14.4(100)² + 12,790(100) + 580,000

                = -144,000 + 1,279,000 + 580,000

                = 1,715,000

  Number of calculators = 100,000

  Average cost per calculator = Total cost / Number of calculators

                             = 1,715,000 / 100,000

                             = $17.15

3. Production level: x = 150 (thousand calculators)

  Total cost (C) = -14.4(150)² + 12,790(150) + 580,000

                = -324,000 + 1,918,500 + 580,000

                = 2,174,500

  Number of calculators = 150,000

  Average cost per calculator = Total cost / Number of calculators

                             = 2,174,500 / 150,000

                             = $14.50

Therefore, for the production levels of 50 thousand, 100 thousand, and 150 thousand calculators, the average costs per calculator are $23.67, $17.15, and $14.50, respectively.

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A binomial experiment refers to a statistical test that analyses the outcomes of two distinct categories. The experiment has n trials and a probability of success p. The binomial distribution is used to identify the likelihood of a specific number of successes over these trials.

A binomial experiment has 2 probabilities, the probability of success, p, and the probability of failure, q.  

The formula for the binomial distribution is

P ( X = x ) = ( n x ) px q(n-x)

where n is the number of trials, x is the number of successful trials, p is the probability of success, and q is the probability of failure. In this case,

n = 10, and p = 0.20.

The probability of at least 5 successes is 0.5922.

Summary, The probability of getting 5 successes in this experiment is 0.0264, and the probability of at least 5 successes is 0.5922.

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These are the critical numbers of the given function f(x)Hence, the critical numbers of the function f(x) = 12r − 15x + 80x³ are x = ±1/4.

The given function is f(x) = 12r − 15x + 80x³To find the critical numbers of the given function, we need to follow the following steps:Step 1: Find the derivative of the function f(x)Step 2: Set the derivative equal to zero and solve for xStep 3: The solutions obtained in Step 2 are the critical numbers of the function f(x)Step 1: Differentiating the function f(x) w.r.t. xWe have, f(x) = 12r − 15x + 80x³Let us differentiate this function w.r.t. x, we getf'(x) = 0 - 15 + 240x²15 and 240x² can be written as 3 × 5 and 3 × 80x² respectivelyf'(x) = -15 + 3 × 5 × 16x² = -15 + 240x²Step 2: Setting f'(x) = 0 and solving for xf'(x) = -15 + 240x² = 0Adding 15 to both sides240x² = 15Dividing by 15 on both sides16x² = 1Taking the square root on both sides, we get4x = ±1x = ±1/4Step 3: Finding the critical numbers of the function f(x)From Step 2, we have obtained the solutions x = ±1/4.

These are the critical numbers of the given function f(x)Hence, the critical numbers of the function f(x) = 12r − 15x + 80x³ are x = ±1/4.

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The spot exchange rate that should prevail three years from now, considering the expected inflation rates, is €1.00 - $1.2379.

To determine the spot exchange rate three years in the future, we need to account for the inflation rates in both the U.S. and the euro zone. Inflation erodes the purchasing power of a currency over time. Given that the U.S. is expected to have an inflation rate of 2 percent and the euro zone is expected to have an inflation rate of 3 percent, the euro is likely to depreciate relative to the U.S. dollar.

The inflation differential between the two regions implies that the euro will experience higher inflation compared to the U.S. dollar. As a result, the purchasing power of the euro will decline, leading to a decrease in its value relative to the U.S. dollar. Consequently, the spot exchange rate of €1.00 - $1.25 is expected to change in favor of the U.S. dollar.

To calculate the future spot exchange rate, we can multiply the current exchange rate by the ratio of the expected purchasing power parity (PPP) values of the two currencies after accounting for inflation. Considering the inflation rates, the future spot exchange rate is €1.00 - $1.2379, indicating a decrease in the value of the euro against the U.S. dollar.

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The probability density function (pdf) is given by f(x) = 0 if x < 20 and f(x) = 1 if x ≥ 20. The probability P(X > 36) is 1, the cumulative distribution function (CDF) is F(x) = 0 for x < 20 and F(x) = x - 20 for x ≥ 20, and the probability that at least one out of 8 devices functions for at least 37 months is 0.83222784.

To find the probability P(X > 36), we need to integrate the probability density function (pdf) from 36 to infinity:

P(X > 36) = ∫[36, ∞] f(x) dx

Since the pdf is given as 0 for x < 20 and 1 for x > 20, we can split the integral into two parts:

P(X > 36) = ∫[36, 20] 0 dx + ∫[20, ∞] 1 dx

The first integral evaluates to 0, and the second integral evaluates to:

P(X > 36) = ∫[20, ∞] 1 dx = [x] [20, ∞] = ∞ - 20 = 1

So, P(X > 36) = 1.

The cumulative distribution function (CDF) of X can be calculated as follows:

If x < 20, F(x) = ∫[-∞, x] f(t) dt = ∫[-∞, x] 0 dt = 0 (since the pdf is 0 for x < 20)

If x ≥ 20, F(x) = ∫[-∞, 20] 0 dt + ∫[20, x] 1 dt = 0 + (x - 20) = x - 20

Therefore, the CDF of X is given by:

F(x) = 0 for x < 20

F(x) = x - 20 for x ≥ 20

To find the probability that at least one out of 8 devices will function for at least 37 months, we can calculate the probability that all 8 devices fail before 37 months and subtract it from 1:

P(at least one device functions for at least 37 months) = 1 - P(all 8 devices fail before 37 months)

Since the lifetime of each device is independent, the probability that a single device fails before 37 months is given by P(X < 37). Therefore, the probability that all 8 devices fail before 37 months is:

P(all 8 devices fail before 37 months) = [P(X < 37)]^8

Substituting the values from the given pdf, we have:

P(all 8 devices fail before 37 months) = (0.8)^8 = 0.16777216

Finally, we can calculate the probability that at least one device functions for at least 37 months:

P(at least one device functions for at least 37 months) = 1 - P(all 8 devices fail before 37 months) = 1 - 0.16777216 = 0.83222784

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To calculate the probability that a company will have a stock price of at least $40, we can use the normal distribution with the given mean of $30 and standard deviation of $8.20.

Using Excel or R-Studio, we can calculate this probability by finding the area under the normal curve to the right of $40. We need to standardize the value of $40 using the z-score formula, which is (x - mean) / standard deviation. Substituting the values, we get (40 - 30) / 8.20 = 1.22.

From the standard normal distribution table or using Excel/R-Studio, we can find the probability corresponding to a z-score of 1.22. This probability represents the area to the right of $40 on the normal curve and gives us the probability that a company will have a stock price of at least $40.

Therefore, using the provided mean and standard deviation, the probability that a company will have a stock price of at least $40 can be determined using the standard normal distribution and the z-score.

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The solution of expression is,

⇒ 2.6

We have to given that,

An expression to solve is,

⇒ 3 - 4 ÷ 10

Now, We can simplify the expression by BODMAS rule as,

Which state that,

B = Brackets

O = Off

D = division

M = Multiplication

A = addition

S = subtraction

Hence, We can simplify as,

⇒ 3 - 4 ÷ 10

⇒ 3 - (4 / 10)

⇒ 3 - (2 /5)

⇒ (15 - 2) / 5

⇒ 13 / 5

⇒ 2.6

Therefore, The solution of expression is,

⇒ 2.6

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The correct property of equality to solve the equation 3x = 27 is the multiplication property of equality. The correct property of equality to solve the equation x/6 = 5 is the division property of equality.

In the equation 3x = 27, we want to find the value of x. To isolate the variable x, we can use the multiplication property of equality, which states that if we multiply both sides of an equation by the same non-zero number, the equality is preserved. In this case, we divide both sides of the equation by 3, since dividing by 3 is the inverse operation of multiplying by 3. By doing so, we have:

(3x)/3 = 27/3

Simplifying, we get:

x = 9

Therefore, the value of x that satisfies the equation 3x = 27 is x = 9.

Moving on to the equation x/6 = 5, we want to determine the value of x. To isolate x, we can use the division property of equality, which states that if we divide both sides of an equation by the same non-zero number, the equality remains true. In this case, we multiply both sides of the equation by 6, since multiplying by 6 is the inverse operation of dividing by 6. By doing so, we have:

(x/6) * 6 = 5 * 6

Simplifying, we obtain:

x = 30Therefore, the value of x that satisfies the equation x/6 = 5 is x = 30.

conclusion, the multiplication property of equality is used to solve 3x = 27, and the division property of equality is used to solve x/6 = 5. Applying these properties correctly allows us to isolate the variable and find the values that satisfy the given equations.

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In the given scenario, the probability that a person is served in less than 2 minutes on at least 3 times is 0.2445.

Given, waiting time for a customer to be served in a cafeteria is distributed exponentially with a mean of 3 minutes.We have to find the probability that a person is served in less than 2 minutes on at least 3 times.

Let X be the waiting time for a customer to be served in a cafeteria. Then X follows an exponential distribution with parameter

λ = 1/3

[Mean waiting time

= 1/λ = 3 minutes].

Then the probability density function of X is given by;

f(x) = λe^(-λx) for x ≥ 0.

Now, the probability that a person is served in less than 2 minutes is;

P(X < 2)

= ∫(0 to 2) λe^(-λx) dx

= [-e^(-λx)](0 to 2)

= 1 - e^(-2/3)

≈ 0.4866

Thus, the probability that a person is served in less than 2 minutes on at least 3 times;P(X < 2) on at least 3 times = 1 - P(X < 2) not more than 2 times

= 1 - [(0.5134)^0 + (0.5134)^1 + (0.5134)^2]

≈ 0.2445

Therefore, the probability that a person is served in less than 2 minutes on at least 3 times is 0.2445.

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The marginal pmf of Y, calculated from the given joint pmf, is as follows:

P(Y = 1) = 0.5

P(Y = 2) = 0.25

P(Y = 3) = 0.25

To compute the marginal pmf of Y, we need to sum up the probabilities of all possible values of Y, while keeping X fixed. In the given joint pmf, we have the following probabilities:

P(0, 1) = 1/36

P(1, 1) = 2/36

P(2, 1) = 3/36

P(0, 2) = 2/36

P(1, 2) = 4/36

P(2, 2) = 6/36

P(0, 3) = 3/36

P(1, 3) = 6/36

P(2, 3) = 9/3

To calculate the marginal pmf of Y, we sum up the probabilities for each value of Y.

For Y = 1:

P(Y = 1) = P(0, 1) + P(1, 1) + P(2, 1) = 1/36 + 2/36 + 3/36 = 6/36 = 0.5

For Y = 2:

P(Y = 2) = P(0, 2) + P(1, 2) + P(2, 2) = 2/36 + 4/36 + 6/36 = 12/36 = 0.2

For Y = 3:

P(Y = 3) = P(0, 3) + P(1, 3) + P(2, 3) = 3/36 + 6/36 + 9/36 = 18/36 = 0.25

Thus, the marginal pmf of Y is given by:

P(Y = 1) = 0.5

P(Y = 2) = 0.25

P(Y = 3) = 0.25

This provides the complete pmf for Y, listing the probabilities of all possible values of Y in the given joint pmf.

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Two angles is not enough information to solve a right triangle.Each right triangle is unique and distinct.

A right triangle is any triangle with a right angle, which is an angle that measures exactly 90 degrees or π / 2 radians.

Right triangles are essential in mathematics, engineering, and science, and they are commonly used to resolve problems involving distances, heights, and angles.

Therefore, option c) Two angels is not enough information to solve a right triangle.

It is because to solve a right triangle, we need to have the measure of one acute angle or two sides of the triangle or one side and a trigonometric ratio, but not two angles.

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The probability density function (pdf) of the largest of the five waiting times is given by: f(x) = 4/10^5 * x^4, where x is a real number between 0 and 10. The expected value of the largest of the five waiting times is 8.33 minutes.

The pdf of the largest of the five waiting times can be found by considering the order statistics of the waiting times. The order statistics are the values of the waiting times sorted from smallest to largest.

In this case, the order statistics are X1, X2, X3, X4, and X5. The largest of the five waiting times is X5.

The pdf of X5 can be found by considering the cumulative distribution function (cdf) of X5. The cdf of X5 is given by: F(x) = (x/10)^5

where x is a real number between 0 and 10. The pdf of X5 can be found by differentiating the cdf of X5. This gives: f(x) = 4/10^5 * x^4

The expected value of X5 can be found by integrating the pdf of X5 from 0 to 10. This gives: E[X5] = ∫_0^10 4/10^5 * x^4 dx = 8.33

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(a) We get (1/2)x² sin(2x) - ∫x sin(2x) dx,  (b) we get ∫e^u u² du , (c) ∫(1/2) cos(x) cos²(x) dx - ∫(1/2) cos(2x) cos²(x) dx , (d)  ∫(1/4) - (1/4) cos²(2x) dx.

(a) To compute ∫x₀ x² cos(2x) dx, we can apply integration by parts. (b) To compute ∫x (ln(x))² dx, we can use integration by substitution.

(c) To compute ∫sin²(x) cos³(x) dx, we can use trigonometric identities to simplify the integral. (d) To compute ∫sin²(x) cos²(x) dx, we can use trigonometric identities to rewrite the integral in terms of a single trigonometric function.

(a) To compute the integral ∫x₀ x² cos(2x) dx, we can use integration by parts. Let u = x² and dv = cos(2x) dx. By applying the integration by parts formula, we find that du = 2x dx and v = (1/2) sin(2x). The integral becomes ∫x₀ x² cos(2x) dx = uv - ∫v du = (1/2)x² sin(2x) - ∫(1/2) sin(2x) (2x) dx. Simplifying further, we get (1/2)x² sin(2x) - ∫x sin(2x) dx.

(b) To compute the integral ∫x (ln(x))² dx, we can use integration by substitution. Let u = ln(x), then du = (1/x) dx. Rearranging, we have x = e^u. Substituting into the integral, we get ∫e^u u² du. This integral can be evaluated using the power rule for integration.

(c) To compute the integral ∫sin²(x) cos³(x) dx, we can use trigonometric identities to simplify the integral. We know that sin²(x) = (1/2) - (1/2) cos(2x) and cos³(x) = cos(x) cos²(x). Substituting these identities into the integral, we obtain ∫[(1/2) - (1/2) cos(2x)] [cos(x) cos²(x)] dx. Expanding and rearranging, we get ∫(1/2) cos(x) cos²(x) dx - ∫(1/2) cos(2x) cos²(x) dx.

(d) To compute the integral ∫sin²(x) cos²(x) dx, we can use trigonometric identities to rewrite the integral in terms of a single trigonometric function. We know that sin²(x) = (1/2) - (1/2) cos(2x) and cos²(x) = (1/2) + (1/2) cos(2x). Substituting these identities into the integral, we obtain ∫[(1/2) - (1/2) cos(2x)][(1/2) + (1/2) cos(2x)] dx. Expanding and simplifying, we get ∫(1/4) - (1/4) cos²(2x) dx.

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To find the volume of the solid obtained by rotating the region bounded by the curves y = x - 1, y = 0, and x = 5 about the x-axis, we can use the method of cylindrical shells.

First, let's sketch the region bounded by the curves:

Copy code

  |\

  | \

  |  \      y = x - 1

  |   \

  |____\______  x = 5

  0     5

To find the volume using cylindrical shells, we divide the region into vertical strips of thickness Δx and consider each strip as a cylindrical shell with a height (y-value) equal to the difference between the two curves and a small width Δx.

The volume of each cylindrical shell is given by:

dV = 2πrhΔx

In this case, the radius (r) is equal to x since we are rotating around the x-axis, and the height (h) is the difference between the curves y = x - 1 and y = 0, which is (x - 1) - 0 = x - 1.

To find the total volume, we integrate the expression for dV over the interval [0, 5]:

V = ∫(0 to 5) 2π(x)(x - 1) dx

Therefore, the volume of the solid is (175/3)π cubic units.

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In the given Markov chain, State 1 is absorbing, State 4 is periodic, State 1 is recurrent, and States 3, 4, and 5 are recurrent.

A Markov chain is a stochastic model that represents a sequence of states where the probability of transitioning from one state to another depends only on the current state. Let's analyze the given Markov chain to determine the properties of each state.

State 1: This state has a probability of 1 in the first row, indicating that it is an absorbing state. An absorbing state is one from which there is no possibility of leaving once it is reached. Therefore, statement a) is correct, and State 1 is absorbing.

State 2: There are no transitions from State 2 to any other state, which means it is an absorbing state as well. However, since it is not explicitly mentioned in the question, we cannot determine its status based on the given information.

State 3: This state has non-zero probabilities to transition to other states, indicating that it is not absorbing. Furthermore, it has a loop back to itself with a probability of 1/6, making it recurrent. Hence, statements c) and e) are incorrect, while statement f) is correct. State 3 is recurrent.

State 4: State 4 has a transition probability of 1/3 to State 3, which means there is a possibility of leaving this state. However, there are no outgoing transitions from State 4, making it an absorbing state. Moreover, since there is a loop back to itself with a probability of 2/3, it is also recurrent. Therefore, statement b) is correct, and State 4 is periodic and recurrent.

State 5: Similar to State 4, State 5 has a transition probability of 2/3 to State 3 and no outgoing transitions. Hence, State 5 is also an absorbing and recurrent state. Consequently, statement e) is correct.

To summarize, State 1 is absorbing and recurrent, State 4 is periodic and recurrent, and States 3 and 5 are recurrent.

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the inverse of B is (C^(-1))^3, which gives us the answer (C) 21 - 2B³ + B².

Given that CB^(-1)³ = 0, we can rewrite it as [tex]C({B^(-1)})^3 = 0[/tex]. Since C is a square matrix and (B^(-1))^3 is the inverse of B cubed, we can conclude that B^(-1) exists. Therefore, we can find the inverse of B.

To find the inverse of B, we can use the formula (AB)^(-1) = B^(-1)A^(-1). In this case, we have C(B^(-1))^3 = 0, which can be rearranged as (B^(-1))^3C = 0. Taking the inverse of both sides, we get ((B^(-1))^3C)^(-1) = 0^(-1), which simplifies to (B^(-1))^(-1)(C^(-1))^3 = 0. Since C^(-1) and (B^(-1))^(-1) are both valid inverses, we can further simplify it to (B^(-1))^(-1) = (C^(-1))^3.

Therefore, the inverse of B is (C^(-1))^3, which gives us the answer (C) 21 - 2B³ + B².

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To calculate the company's annual holding cost, we need to multiply the annual average inventory by the holding cost per unit.

First, we need to calculate the annual average inventory. The formula for the average inventory is (Q/2), where Q represents the order quantity.

Given:

Annual requirements (Demand) = 7500 units

Ordering cost = BD 12

Order quantity (Q) = 150, 300, 45000 (Assuming these are different order quantities)

Holding cost per unit = BD 0.5

For each order quantity, we can calculate the annual average inventory using the formula (Q/2). Then, we multiply the average inventory by the holding cost per unit.

For order quantity Q = 150:

Average Inventory = Q/2 = 150/2 = 75 units

Holding Cost = Average Inventory * Holding cost per unit = 75 * 0.5 = BD 37.5

For order quantity Q = 300:

Average Inventory = Q/2 = 300/2 = 150 units

Holding Cost = Average Inventory * Holding cost per unit = 150 * 0.5 = BD 75

For order quantity Q = 45000:

Average Inventory = Q/2 = 45000/2 = 22500 units

Holding Cost = Average Inventory * Holding cost per unit = 22500 * 0.5 = BD 11250. Now, we sum up the holding costs for each order quantity:

Annual Holding Cost = BD 37.5 + BD 75 + BD 11250 = BD 11362.5 Therefore, the company's annual holding cost is BD 11362.5.

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The angle v makes with the positive x-axis can be found using the inverse tangent function as:θ = tan⁻¹(v_y/v_x) = tan⁻¹(5/(-5√3)) = 330°.

To find the component form of v, given its magnitude and the angle it makes with the positive x-axis, follow the steps below:

Step 1: Use the given information to find the values of v's horizontal and vertical components.

The horizontal component of v is given by v_x = v cos θ.

The vertical component of v is given by v_y = v sin θ.

Step 2: Substitute the values of v and θ into the equations for the horizontal and vertical components of v to find their values. For

v = 5/4 and θ = 150°,

we get:v_

x = v cos θ

= (5/4) cos 150°

= - (5/8) √3v_y

= v sin θ = (5/4) sin 150° = (5/8)

Therefore, the component form of v is (- (5/8) √3, 5/8). The magnitude of v can be found using the Pythagorean theorem as:v = √(v_x² + v_y²) = √((-(5/8)√3)² + (5/8)²) = 5/4.  Therefore, v can be written in polar form as:v = (5/4, 330°).

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Yes, the sampling distribution is expected to be approximately normally distributed.

According to the Central Limit Theorem, the sampling distribution of the sample means will be approximately normally distributed if the sample size is sufficiently large.

In this case, a sample size of 65 is obtained from the population.

The Central Limit Theorem states that as the sample size increases, the sampling distribution of the sample means will approach a normal distribution, regardless of the shape of the population distribution.

Since the sample size is reasonably large (greater than 30), we can expect the sampling distribution of the sample means to be approximately normally distributed, even if the population distribution is not normally distributed.

The Central Limit Theorem is based on the idea that as the sample size increases, the sampling distribution becomes less affected by the specific characteristics of the population distribution and more influenced by the sample size itself.

Therefore, even though the population distribution may not be normally distributed, the sampling distribution of the sample means is expected to be approximately normally distributed due to the Central Limit Theorem.

This allows for the application of statistical techniques that assume a normal distribution in inferential statistics, such as constructing confidence intervals or performing hypothesis testing based on the sample means.

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To express the column matrix b as a linear combination of the columns of A, we found the coefficients c₁, c₂, and c₃ by solving a system of equations. The solution was c₁ = 5/3, c₂ = 10/3, and c₃ = 2/3. Thus, the linear combination of the columns of A that yields b is given by (5/3)A₁ + (10/3)A₂ + (2/3)A₃.

To express the column matrix b as a linear combination of the columns of A, we need to find coefficients such that:

b = c₁A₁ + c₂A₂ + c₃A₃

Let's denote the columns of A as A₁, A₂, and A₃:

A₁ = [1 1 8]

A₂ = [-4 0 -1]

A₃ = [1 -1 -1]

Now we can write the equation as:

[b₁] [1 1 8] [c₁]

[b₂] = [-4 0 -1] * [c₂]

[b₃] [1 -1 -1] [c₃]

Expanding the equation, we have:

[b₁] [c₁ + c₂ + 8c₃]

[b₂] = [-4c₁ - c₃]

[b₃] [c₁ - c₂ - c₃]

We can set up a system of equations to solve for c₁, c₂, and c₃:

c₁ + c₂ + 8c₃ = b₁

-4c₁ - c₃ = b₂

c₁ - c₂ - c₃ = b₃

Substituting the values of b₁ = 9, b₂ = 1, and b₃ = 0, we have:

c₁ + c₂ + 8c₃ = 9

-4c₁ - c₃ = 1

c₁ - c₂ - c₃ = 0

Solving this system of equations will give us the coefficients c₁, c₂, and c₃, which represent the linear combination of the columns of A that results in b.

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The given homogeneous system has nontrivial solutions. The solutions are expressed as X₁ = X₃ + X₄ - 1 and X₂ = X₃ + X₄ - 2, where X₃ and X₄ can take any real values.

The given homogeneous system is:

{ X₁ - X₂ - X₃ + X₄ = 0

{ X₁ - X₂ + X₃ + 3X₄ = 0

{ X₁ - X₂ - 2X₃ = 0

To determine if there are nontrivial solutions, we can rewrite the system in matrix form as AX = 0, where A is the coefficient matrix and X is the vector of variables:

A = [[1, -1, -1, 1],

    [1, -1, 1, 3],

    [1, -1, -2, 0]]

To find nontrivial solutions, we need the matrix A to have a nontrivial null space, meaning the matrix A must be singular, i.e., its determinant must be zero.

Calculating the determinant of A, we have:

det(A) = 0

Since the determinant is zero, the matrix A is singular, indicating that there are nontrivial solutions to the homogeneous system.

To find the nontrivial solutions, we can row reduce the augmented matrix [A|0]:

[RREF(A|0)] = [[1, 0, -1, -1],

               [0, 1, -1, -2],

               [0, 0, 0, 0]]

The resulting row-reduced form shows that X₃ and X₄ are free variables, meaning they can take any value. Therefore, the nontrivial solutions can be expressed as:

X₁ = X₃ + X₄ - 1

X₂ = X₃ + X₄ - 2

In summary, the given homogeneous system has nontrivial solutions given by X₁ = X₃ + X₄ - 1 and X₂ = X₃ + X₄ - 2, where X₃ and X₄ can take any real values.

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Therefore,  the derivative of the function is 1. 4rx/ (x²+5)^1/22. 12 cos(3x)3. -8(cos(θ))⁷ * sin(θ)

In order to find the derivative of the given functions, we need to use differentiation. Let's use the following steps for each function:a) 2r y= √²+5Using the power rule of differentiation, we can find the derivative of the function as follows:dy/dx = 2r * d/dx (sqrt(x²+5))= 2r * 1/2(x²+5)^(-1/2) * d/dx(x²+5)= 2r/ sqrt(x²+5) * 2x= 4rx/ (x²+5)^1/2So, the derivative of the function is 4rx/ (x²+5)^1/2.b) y = 4 sin(3x)Using the chain rule of differentiation, we can find the derivative of the function as follows:y' = 4 * d/dx(sin(3x)) * d/dx(3x)= 4 * cos(3x) * 3= 12 cos(3x)So, the derivative of the function is 12 cos(3x).c) g(θ) = (cos(θ))⁸Using the chain rule of differentiation, we can find the derivative of the function as follows:g'(θ) = 8 * (cos(θ))⁷ * (-sin(θ))= -8(cos(θ))⁷ * sin(θ)So, the derivative of the function is -8(cos(θ))⁷ * sin(θ).

Therefore,  the derivative of the function is 1. 4rx/ (x²+5)^1/22. 12 cos(3x)3. -8(cos(θ))⁷ * sin(θ).

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The statements that must be true are (i) f is 1-to-1 (injective) and (iii) if y is a value between f(a) and f(b) for some a, b in I, then y = f(c) for some c in I. However, statement (ii) f'(2) > 0 for all x is not necessarily true.

The first statement (i) states that f is one-to-one. Since f is strictly increasing, it means that if x and y are distinct points in I, then f(x) and f(y) will also be distinct. This follows from the definition of strictly increasing functions, where if x < y, then f(x) < f(y). Therefore, f is injective or one-to-one.

The third statement (iii) asserts that if y is a value between f(a) and f(b) for some a, b in I, then there exists a point c in I such that y = f(c). This is also true because of the intermediate value theorem for continuous functions. Since f is differentiable, it is also continuous. The intermediate value theorem guarantees that for any value between f(a) and f(b), there exists a point c in the interval [a, b] (which is a subset of I) such that f(c) = y.

However, the second statement (ii) f'(2) > 0 for all x is not necessarily true. The fact that f is strictly increasing does not guarantee that the derivative f'(x) is positive for all x. The derivative measures the rate of change of the function, and while f is increasing, it could have points where the derivative is zero or negative. Therefore, statement (ii) is not necessarily true.

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To construct a 99% confidence interval for the mean amount spent per owner for an obedience class, we can use the formula: CI = X± Z * (σ / √n).

Where : CI is the confidence interval. X is the sample mean ($109.33). Z is the critical value (corresponding to the desired confidence level of 99%) σ is the population standard deviation ($28.17) n is the sample size (50). First, we need to find the critical value Z. Since the confidence level is 99%, we want to find the Z-value that leaves 0.5% in the tails (0.5% on each side). Looking up this value in a standard normal distribution table, the Z-value is approximately 2.576. Now we can calculate the confidence interval: CI = 109.33 ± 2.576 * (28.17 / √50). Calculating this expression, we get: CI ≈ 109.33 ± 7.865.  The confidence interval is approximately (101.465, 117.195).

Interpretation: We are 99% confident that the true mean amount spent per owner for an obedience class falls within the range of $101.465 and $117.195. This means that if we were to take multiple random samples and construct confidence intervals, 99% of those intervals would contain the true population mean.

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Let's begin the problem solving process one by one. The given series are∑n=1[infinity]n5+3n2+4 ∑n=1[infinity]5nn ∑n=1[infinity]2n−122n+1Part 1: ∑n=1[infinity]n5+3n2+4The given series is a positive series since all its terms are positive, so the Comparison Test can be used to show that the series diverges since the series ∑n=1[infinity]n5 is a p-series with p=5 > 1 and thus, it diverges.

Hence, by the Comparison Test, the given series also diverges.Part 2: ∑n=1[infinity]5nnWe can use the Ratio Test to determine the convergence or divergence of the given series. Let's apply the Ratio Test to the given series.Let a_n = 5/n^n∴ a_(n+1) = 5/(n+1)^(n+1)∴ |a_(n+1)/a_n| = [5/(n+1)^(n+1)] * [n^n/5] = (n/(n+1))^n/5On taking the limit, lim_(n→∞) [(n/(n+1))^n/5] = 1/e < 1, we get that the given series converges by the Ratio Test.Part 3: ∑n=1[infinity]2n−122n+1We can use the Limit Comparison Test with the series ∑n=1[infinity]2^n since 2n-1 > 2^n for n ≥ 2.Let a_n = 2^n and b_n = 2n-1∴ lim_(n→∞) (a_n/b_n) = lim_(n→∞) [2^n/(2n-1)] = ∞Therefore, by the Limit Comparison Test.

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Answer:

  120 customers per hour

Step-by-step explanation:

You want to know the processing rate in customers per hour if there are an average of 6 customers waiting, and the average service time is 3 minutes.

Little's law relates the average queue depth to the response time and the average throughput:

  mean response time = mean number in system / mean throughput

Solving for the throughput, we find ...

  throughput = (number in the system)/(response time)

  throughput = (6 customers)/(3/60 hours) = 120 customers/hour

The average rate of processing is 120 customers per hour.

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The expected value of job satisfaction for senior executives is 4.05

Given the following probabilities and scores for senior executives:

Score 1: Probability = 0.05

Score 2: Probability = 0.09

Score 3: Probability = 0.03

Score 4: Probability = 0.42

Score 5: Probability = 0.41

The expected value (E[X]) can be calculated as:

E[X] = Σ (xi * Pi)

where xi represents the scores and Pi represents the corresponding probabilities.

E[X] = (1 * 0.05) + (2 * 0.09) + (3 * 0.03) + (4 * 0.42) + (5 * 0.41)

E[X] = 0.05 + 0.18 + 0.09 + 1.68 + 2.05

E[X] = 4.05

Therefore, the expected value of the job satisfaction score for senior executives is 4.05.

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