Find the flux of the vector field F across the surface S in the indicated direction.
F = 8x i + 8y j + 6 k; S is "nose" of the paraboloid z = 6x 2 + 6y 2 cut by the plane z = 2; direction is outward

Answers

Answer 1

The flux of the vector field F across the surface S in the indicated direction is -384π/√145.

The given vector field F is: F = 8x i + 8y j + 6 k

To find the flux of the vector field F across the surface S in the indicated direction, follow these steps:

Step 1: Find the normal vector of the surface S

The equation of the paraboloid "nose" is given as: z = 6x² + 6y²

When the plane z = 2 cuts the paraboloid, we get:2 = 6x² + 6y²

Dividing throughout by 2, we get:x² + y² = 1

This is the equation of the unit circle centered at the origin in the xy-plane and lying in the plane z = 2.

The normal vector at any point (x, y, z) on the surface S is given by the gradient of the function f(x, y, z) = z - 6x² - 6y² which is: grad f(x, y, z) = (-12x i - 12y j + 1 k)So at any point (x, y, z) on S, the unit normal vector is: n = (-12x i - 12y j + 1 k)/√(144x² + 144y² + 1)

Since we want the direction to be outward, we choose the direction of the normal vector to be outward.

Therefore: n = (12x i + 12y j - k)/√(144x² + 144y² + 1)

Step 2: Find the surface area of STo find the surface area of the surface S, we use the formula for the surface area of a parametric surface which is given by:S = ∫∫|rₓ × r_y| dA

where r(x, y) = (x, y, 6x² + 6y²) is the parametric equation of the surface S. To find the bounds of integration for the double integral, we note that the projection of the surface S onto the xy-plane is the unit circle centered at the origin.

Therefore, we use polar coordinates to evaluate the double integral. The parametric equation in polar coordinates is: r(θ) = (cos θ, sin θ, 6 cos² θ + 6 sin² θ) = (cos θ, sin θ, 6)

Therefore: rₓ = (-sin θ, cos θ, 0)r_y = (-cos θ, -sin θ, 0)|rₓ × r_y| = |(0, 0, 1)| = 1So:S = ∫₀²π ∫₀¹ 1 r dr dθ= π ∫₀¹ r dr= π/2

So the surface area of the surface S is π/2.

Step 3: Evaluate the flux of F across S using the formula:∫∫S F.n dS

We have: n = (12x i + 12y j - k)/√(144x² + 144y² + 1)F = 8x i + 8y j + 6 k

So: F.n = (8x i + 8y j + 6 k).(12x i + 12y j - k)/√(144x² + 144y² + 1)= (96x + 96y - 6)/√(144x² + 144y² + 1)

Therefore:∫∫S F.n dS = ∫₀²π ∫₀¹ (96r cos θ + 96r sin θ - 6)/√(144r² + 1) r dr dθ= 48π ∫₀¹ (12 cos θ + 12 sin θ - 1)/√(144r² + 1) drdθ= 48π ∫₀²π (12 cos θ + 12 sin θ - 1)/√145 dθ= 48π/√145 [12 sin θ - 12 cos θ - θ]₀²π= 48π/√145 (-24) = -384π/√145

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Related Questions

The range of a projectile that is launched with an initial velocity v at an angle of a with the horizontal is given by R

sin

where g is the acceleration due to gravity or 9.8 meters per second squared. If a projectile is launched with an initial velocity of 1

meters per second, what angle is required to achieve a range of 20 meters? Round answers to the nearest whole number.

Answers

Answer:

[tex]\theta=30.285^{\circ}[/tex]

Step-by-step explanation:

The range of a projectile is given by :

[tex]R=\dfrac{u^2\sin2\theta}{g}[/tex]

Put R = 20 m, u = 15 m/s and finding the value of angle of projection

So,

[tex]R=\dfrac{u^2\sin2\theta}{g}\\\\\sin2\theta=\dfrac{Rg}{u^2}\\\\\sin2\theta=\dfrac{20\times 9.8}{15^2}\\\\\sin2\theta=0.871\\\\2\theta=\sin^{-1}(0.871)\\\\2\theta=60.57\\\\\theta=30.285^{\circ}[/tex]

So, the required angle of projection is equal to [tex]30.285^{\circ}[/tex].

Assume that all components of three panels, randomly selected and with 5, 5 and 5 components respectively, were examined. Assume that a component chosen at random is defective with probability 0.09 , independently of the other components.
What is the probability of detecting at most one defective component, when all components of these three panels are examined?

Answers

The probability of detecting at most one defective component when all components of the three panels are examined is approximately 0.78136 or 78.14%.

To calculate the probability of detecting at most one defective component when all components of the three panels are examined, we need to consider the possible combinations of defective components in each panel.

Let's break down the problem step by step:

Panel 1:

- There are 5 components in Panel 1.

- The probability of a component being defective is 0.09.

- We want to calculate the probability of detecting at most one defective component.

The probability of detecting no defective components in Panel 1 is:

P(0 defective) = (1 - 0.09)^5 = 0.52201

The probability of detecting exactly one defective component in Panel 1 is:

P(1 defective) = 5 * 0.09 * (1 - 0.09)^4 = 0.40408

The probability of detecting at most one defective component in Panel 1 is:

P(at most 1 defective) = P(0 defective) + P(1 defective) = 0.52201 + 0.40408 = 0.92609

Panel 2 and Panel 3 have the same probabilities as Panel 1 since they also have 5 components and the same probability of a component being defective.

Now, to calculate the probability of detecting at most one defective component when examining all three panels, we multiply the probabilities of each panel:

P(at most 1 defective in all three panels) = P(at most 1 defective in Panel 1) * P(at most 1 defective in Panel 2) * P(at most 1 defective in Panel 3)

                                          = 0.92609 * 0.92609 * 0.92609

                                          = 0.78136

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Alinear trendline used to forecast sales for a given time period takes the form y = b+ bil. increases by , then the estimated y value all else e tone period, increases, b1; constant o tone period, increases, bo, constant bione period, increases; bo constant bi: one period, increases bi: constant

Answers

The linear trendline used to forecast sales for a given time period takes the form y = b0 + b1t, where y represents the estimated sales, b0 is the constant term, b1 is the coefficient of the time period variable (t), and t is the time period.

In this equation, the coefficient b1 determines the relationship between the time period and the estimated sales. If b1 increases, it means that for each additional time period, the estimated sales will also increase. On the other hand, if b1 is constant, it implies that the estimated sales do not change with each additional time period.

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Iodine-131 has a half-life of days. How much would be left of an original g sample after days?

Answers

Answer:

I will suppose that the actual question is:

Iodine-131 has a half-life of 8 days. How much would be left of an original g sample after x days?

Ok, a half-life means that after that time, the mass of the original sample is reduced to half.

So if we start it a quantity g of iodine-131, after 8 days, we will have g/2.

Also, remember that the decay is written as an exponential decay, then we will have:

A(x) = g*(r)^x

where:

A is the amount of the sample after x days, g is the initial amount of the material (such that A(0) = g) and r is the rate of decay.

We know that:

A(8) = g/2 = g*(r)^8

Now we can solve this for r:

g/2 = g*(r)^8

1/2 = r^8

(1/2)^(1/8) = r = 0.917

Then the amount of material after x days is given by:

A(x) = g*(0.917)^x

Use the image provided to answer please​

Answers

B? I’m not quite sure but I think it’s that.

What is the slide e of the line shown below?

Answers

Answer:

13/6

Step-by-step explanation:

slope = (y2-y1)/(x2-x1) where the variables indicate the coordinates of the two points

slope = (-7-6)/(-5-1) = -13/-6 = 13/6

Claim: the average age of online students is 32 years old. Can you prove it is not? What is the null hypothesis? o What is the alternative hypothesis? What distribution should be used? o What is the test statistic? o What is the p-value? o What is the conclusion? o How do we interpret the results, in context of our study? • Claim: the proportion of males in online classes is 35%. Can you prove it is not? o What is the null hypothesis? o What is the alternative hypothesis? o What distribution should be used? o What is the test statistic? o What is the p-value? o What is the conclusion? o How do we interpret the results, in context of our study?

Answers

To predict a linear regression score, you first need to train a linear regression model using a set of training data.

Once the model is trained, you can use it to make predictions on new data points. The predicted score will be based on the linear relationship between the input variables and the target variable,

A higher regression score indicates a better fit, while a lower score indicates a poorer fit.

To predict a linear regression score, follow these steps:

1. Gather your data: Collect the data p

points (x, y) for the variable you want to predict (y) based on the input variable (x).

2. Calculate the means: Find the mean of the x values (x) and the mean of the y values (y).

3. Calculate the slope (b1): Use the formula b1 = Σ[(xi - x)(yi - y)]  Σ(xi - x)^2, where xi and yi are the individual data points, and x and y are the means of x and y, respectively.

4. Calculate the intercept (b0): Use the formula b0 = y - b1 * x, where y is the mean of the y values and x is the mean of the x values.

5. Form the linear equation: The linear equation will be in the form y = b0 + b1 * x, where y is the predicted value, x is the input variable, and b0 and b1 are the intercept and slope, respectively.

6. Predict the linear regression score: Use the linear equation to predict the value of y for any given value of x by plugging in the x value into the equation. The resulting y value is your predicted linear regression score.

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Please can someone help me?

Answers

Answer:

Step-by-step explanation:

Consider the first order differential equation t et y'+ = , y' + t2 – 25 y t-99 For each of the initial conditions below, determine the largest interval a

Answers

For the given first-order differential equation, we need to determine the largest interval on which a unique solution exists for each initial condition. The interval will depend on the specific initial condition and the behavior of the differential equation.

The first-order differential equation is given as:

t^et y' + y' + t^2 – 25yt - 99

To determine the largest interval on which a unique solution exists for each initial condition, we need to consider the behavior of the equation and any possible singularities or discontinuities.

For each initial condition, we can use standard techniques such as separation of variables or integrating factors to solve the differential equation and find the solution. The solution will depend on the initial condition and may have different behaviors based on the values of t and y.

It's important to note that the existence and uniqueness of solutions are generally guaranteed within a certain interval as long as the equation and initial condition satisfy certain conditions, such as Lipschitz continuity. However, without specific initial conditions, it is not possible to determine the exact intervals on which a unique solution exists.

Therefore, to determine the largest interval on which a unique solution exists for each initial condition, further analysis and specific initial conditions are required to assess the behavior of the equation and identify any constraints or limitations on the solution.

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Reflex angle of 52 degrees

Answers

The answer is 14 degrees

Poease help! Thank you

Answers

Answer:

28 and 12t

Step-by-step explanation:

4 x 7

4 x 3t

Answer:

28+12t

Step-by-step explanation:

Simplify the expression :)

btw you spelled please wrong

not sure how to do this. need help

Answers

Answer:

a) 25/2 or 12.5

b) 78,125

c) 625

d) 30,517,578,125

2, 3, 1, 6, 4, 5, 3, 2, 3, 4 is the set

Answers

It’s the first one because if you look at the 4s there are only two and it would have been either the first or third one but it’s the first one

Answer: A

because It has 1 one 2 twos 3 threes 2 fours 1 five And 1 six

Work out
1/8
of 760

please help​

Answers

Answer: 95

Step-by-step explanation:

Think of 1/8 times 760 as 760/8 because it’s the same thing.

Write the Central Limit Theorem for sample means. 3. The average time taken to complete a project in a real estate company is 18 months, with a standard deviation of 3 months. Assuming that the project completion time approximately follows a normal distribution, find the probability that the mean completion time of 4 such projects falls between 16 and 19 months.

Answers

The probability that the mean completion time of 4 projects falls between 16 and 19 months is approximately 0.6568 or 65.68%.

The Central Limit Theorem states that for a sufficiently large sample size, the distribution of sample means will approach a normal distribution regardless of the shape of the population distribution.

Specifically, if we have a random sample of n observations drawn from a population with mean μ and standard deviation σ, then the distribution of the sample means will have a mean equal to the population mean μ and a standard deviation equal to the population standard deviation σ divided by the square root of the sample size n.

In this case, the average time taken to complete a project in the real estate company is 18 months, with a standard deviation of 3 months.

Assuming that the project completion time approximately follows a normal distribution, we can use the Central Limit Theorem to find the probability that the mean completion time of 4 such projects falls between 16 and 19 months.

First, we need to calculate the standard deviation of the sample mean. Since we have 4 projects, the sample size is n = 4.

Therefore, the standard deviation of the sample mean is σ/√n = 3/√4 = 3/2 = 1.5 months.

Next, we can standardize the values of 16 and 19 months using the formula z = (x - μ) / (σ/√n), where x is the value, μ is the population mean, σ is the population standard deviation, and n is the sample size.

For 16 months: z1 = (16 - 18) / (1.5) = -2/1.5 = -1.33

For 19 months: z2 = (19 - 18) / (1.5) = 1/1.5 = 0.67

Using a standard normal distribution table, we can look up the probabilities corresponding to the z-scores -1.33 and 0.67.

The table provides the cumulative probabilities for values up to a certain z-score.

For -1.33, the cumulative probability is approximately 0.0918.

For 0.67, the cumulative probability is approximately 0.7486.

To find the probability between these two z-scores, we subtract the cumulative probability associated with -1.33 from the cumulative probability associated with 0.67:

P(-1.33 < Z < 0.67) = 0.7486 - 0.0918 = 0.6568

Therefore, the probability that the mean completion time of 4 projects falls between 16 and 19 months is approximately 0.6568 or 65.68%.

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PLEASE HELP ALGEBRA!!

Answers

Answer:

The very first one is decay and the rest are growth

Step-by-step explanation:

Im SO sorry if i got it wrong

I REALLY hope this helped

Best of luck

What figure is a dilation of Figure A by a factor of 3?

Please help :)

Answers

Answer:

36×18×18×27

Step-by-step explanation:

Assuming the picture is Figure A you would multiply value from figure A by 3 to get corresponding value for dilated figure.

So if figure A is

12 × 6 × 6 × 9

the dilated figure would be

36 × 18 × 18 × 27

Please help, Im stuck on this part of a review and Im really confused asap

Answers

Answer:

( 6, -1 )

Step-by-step explanation:

When you rotate 1 from the x axis by 90° it becomes -1 from the y axis.

When you rotate 6 by 9° from thr y axis, it becomes again 6 on the x axis

Your new x value is 6 and y is -1

So (6,-1)

Answer:

(-6, 1)

Step-by-step explanation:

To find the point obtained by rotating point P = (1, 6) counterclockwise by an angle of 90 degrees (r₉₀°), we can use the rotation formula:

x' = x * cos(θ) - y * sin(θ)

y' = x * sin(θ) + y * cos(θ)

In this case, θ is 90 degrees.

Substituting the values into the formula:

x' = 1 * cos(90°) - 6 * sin(90°)

y' = 1 * sin(90°) + 6 * cos(90°)

cos(90°) = 0 and sin(90°) = 1, so we have:

x' = 1 * 0 - 6 * 1 = -6

y' = 1 * 1 + 6 * 0 = 1

Therefore, r₉₀°(P) = (-6, 1). The point P = (1, 6) rotates counterclockwise by 90 degrees to the point (-6, 1).

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The population of a city is 218720.
The population has been increasing at the rate of 2% per year.
What was the population 3 years ago?​

Answers

Correct Answer is 205,857

HELPPP PLSSS IF YOUR A BOT I WILL REPORT !! A(b) is a function

Answers

False not a function

The sum of two nonnegative numbers is 20. Find the numbers if the sum of their squares is as large as possible; as small as possible.
a. The numbers are 10 and 10.
b. The numbers are 0 and 20.
c. The numbers are 1 and 19.
d. The numbers are 20 and 0.

Answers

Option D. The numbers are 20 and 0.

Let the two nonnegative numbers be x and y such that x + y = 20. We know that the sum of the squares of the two nonnegative numbers x and y is as large as possible and as small as possible.

x + y = 20, or y = 20 - x (Since the numbers are non-negative, x, y ≥ 0)

Substituting y = 20 - x into x² + y² = P (for the sake of simplicity), we get x² + (20 - x)² = Px² + 400 - 40x + x² = P

We will take the first derivative with respect to x now: 2x - 40 = 0x = 20

Therefore, one of the nonnegative numbers is 20, and the other is zero. Consequently, the smallest possible sum of squares is 400 (since 20² + 0² = 400).Option D. The numbers are 20 and 0.

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Given, the sum of two nonnegative numbers is 20.

The problem asks us to find the numbers if the sum of their squares is as large as possible; as small as possible.

Therefore, let's find the sum of their squares at first.If 'x' and 'y' are two numbers, then the sum of their squares is given by:

[tex]x^2 + y^2[/tex]

If the sum of two nonnegative numbers is 20, then one number can be written as x and the other number can be written as y in terms of x.

Thus,y = 20 − xNow, the sum of their squares:

[tex]x^2 + y^2 = x^2 + (20 - x)^2[/tex]
= [tex]x^2 + 400 + x^2 - 40x[/tex]
= [tex]2x^2 - 40x + 400[/tex]
The above expression represents a parabola which opens upward because the coefficient of x^2 is positive.

Therefore, the sum of the squares of the two numbers will be maximum at the vertex of the parabola.

The x-coordinate of the vertex can be found as

:−b/2a = −(−40)/(2.2) = 10Hence, x = 10 and y = 10.

Substituting x = 10 and y = 10, we get

[tex]x^2 + y^2 = 200.[/tex]

Now, to find the smallest value of the sum of their squares, we can observe that the smallest value of x is 0, and the largest value of y is 20.

Thus, if x = 0 and y = 20, we get x^2 + y^2 = 400.

Answer:  The numbers are 10 and 10. The numbers are 0 and 20.

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These box plots show daily low temperatures for a sample of days in two different towns

Answers

A is the correct answer. The other choices don’t match the box plots.

Answer:

A. The median for town A, 30 degrees, is less than the median for town B, 40 degrees.

Step-by-step explanation:

I’ll mark you brainlieist

Answers

1. Divide by 4
x < 5

2. Subtract 4
x < 21

3. Add 8
x > 40

4. divide by -4( flip inequality sign b/c dividing by negative) so > turns into >
x < -6

The rest using the same concept. Try them yourself and ask for help if you need it

Let {N(t),t > 0} be a renewal process. Derive a renewal-type equation for E[SN (1)+1).

Answers

The renewal-type equation for E[SN(1)+1] is E[SN(1)+1] = 2, indicating that the expected value of the sum of the number of renewals by time 1 plus 1 is equal to 2.

To derive a renewal-type equation for E[SN(1)+1], we can use the renewal-reward theorem.

Let Tn be the interarrival times of the renewal process, where n represents the nth renewal. The random variable N(t) represents the number of renewals that occur by time t.

Using the renewal-reward theorem, we have:

E[SN(1)+1] = E[T1 + T2 + ... + TN(1) + 1]

Since the interarrival times are independent and identically distributed (i.i.d.), we can express this as:

E[SN(1)+1] = E[T] * E[N(1)] + 1

Now, we need to compute the expressions for E[T] and E[N(1)].

E[T] represents the expected interarrival time, which is equal to the reciprocal of the renewal rate. Let λ be the renewal rate, then E[T] = 1/λ.

E[N(1)] represents the expected number of renewals by time 1. This can be calculated using the renewal equation:

E[N(t)] = λ * t

Therefore, E[N(1)] = λ * 1 = λ.

Substituting these expressions back into the renewal-type equation, we have:

E[SN(1)+1] = (1/λ) * λ + 1 = 1 + 1 = 2

Hence, the renewal-type equation for E[SN(1)+1] is E[SN(1)+1] = 2.

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A local U-Move moving truck rental company provides the following probability distribution regarding the number of rental trucks that will be rented in a given week. Find the number of rental trucks the company can expect to rent during a given week.
Number of Rented Trucks Probability
0 0.23
1 0.18
4 0.27
5 0.32
a) 2.6800
b) 2.8600
c) 0.6700
d) 2.3100
e) 0.7150
f) None of the above.

Answers

Option (b) 2.8600 is the correct answer.

To find the number of rental trucks that a local U-Move moving truck rental company can expect to rent during a given week, we need to find the expected value of the probability distribution.

The expected value of a probability distribution is given by:

Expected Value = Sum of (Number of Rented Trucks × Probability)

Therefore, Expected Value = (0 × 0.23) + (1 × 0.18) + (4 × 0.27) + (5 × 0.32)

Expected Value = 0 + 0.18 + 1.08 + 1.6Expected Value = 2.86

Therefore, the company can expect to rent 2.86 rental trucks during a given week. Option (b) 2.8600 is the correct answer.

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Based on the Pythagorean theorem, select all of the following statements that must be true

Answers

Answer:

The 1st and 4th statements are true.

Find the least common multiple of 18, 24, 42

Answers

Answer: 504. Multiple for : 18, 24 and 42. Factorize of the above numbers : 18 = 2 • 32 24 = 23 • 3. 42 = 2 • 3 • 7

bro I NEED HELP FAST

Answers

It’s D 2 1/3 because 1/3 each 3 days is 3/3 and then plus another one is 6/3 and plus one more is 9/3

Set up fitting the least squares line through the points (1, 1), (2, 1), and (3, 3). Find R of the fitted line.

Answers

The coefficient of determination (R²) for the fitted least squares line is 0.75.

To fit the least squares line through the given points and find the coefficient of determination (R²), we can follow these steps:

Let's perform these calculations:

Step 1: Calculate the mean values of x and y.

x' = (1 + 2 + 3) / 3 = 2

y' = (1 + 1 + 3) / 3 = 5/3 ≈ 1.6667

Step 2: Calculate the sums of squares: SSxx, SSyy, and SSxy.

SSxx = Σ((xi - x')²) = (1 - 2)² + (2 - 2)² + (3 - 2)² = 2

SSyy = Σ((yi - y')²) = (1 - 5/3)² + (1 - 5/3)² + (3 - 5/3)² = 8/3 ≈ 2.6667

SSxy = Σ((xi - x')(yi - y')) = (1 - 2)(1 - 5/3) + (2 - 2)(1 - 5/3) + (3 - 2)(3 - 5/3) = 4/3 ≈ 1.3333

Step 3: Calculate the slope (m) and y-intercept (b) of the least squares line.

m = SSxy / SSxx = 1.3333 / 2 = 2/3 ≈ 0.6667

b = y' - mx' = 5/3 - (2/3)(2) = 5/3 - 4/3 = 1/3 ≈ 0.3333

Therefore, the equation of the least squares line is y = 0.6667x + 0.3333.

Step 4: Calculate the predicted y-values (y_pred) using the least squares line equation.

For (1, 1):

y_pred = 0.6667 × 1 + 0.3333 = 0.6667 + 0.3333 = 1

For (2, 1):

y_pred = 0.6667 × 2 + 0.3333 = 1.3334 + 0.3333 ≈ 1.6667

For (3, 3):

y_pred = 0.6667 × 3 + 0.3333 = 2 + 0.3333 ≈ 2.3333

The predicted y-values are (1, 1), (2, 1.6667), and (3, 2.3333).

Step 5: Calculate the residual sum of squares (RSS) and the total sum of squares (TSS).

RSS = Σ((yi - y_pred)²) = (1 - 1)² + (1 - 1.6667)² + (3 - 2.3333)² ≈ 0.6667

TSS = SSyy = 8/3 ≈ 2.6667

Step 6: Calculate the coefficient of determination (R²) using the formula: R² = 1 - (RSS / TSS).

R² = 1 - (0.6667 / 2.6667) = 1 - 0.25 = 0.75

Therefore, the coefficient of determination (R²) for the fitted least squares line is 0.75.

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Help Please! Find The Circumference Of A Circle With R=12.3.

Answers

Answer:

77.28

Step-by-step explanation:

c=π2r

12.3 times 2 =

24.6π

=77.28317928

=77.28

Answer:

77.3

Step-by-step explanation:

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a teacher gives pens and pencils to elementary students at an equal rate. pencils pens 18 72 29 a 35 140 b 168 determine the missing value for the letter b. 38 42 63 70 In the following code that uses recursion to find the factorial of a number, what is the base case?private static int factorial(int n){if (n == 0)return 1;elsereturn n * factorial(n - 1);}A. if (n == 0)return 1;B. elsereturn n * factorial(n-1);C. factorial(int n)D. Cannot tell from this code You have the best chance of getting your money back fromhappened?You didn't authorize the payment.You called the police..You were using a secure connection.You did authorize the payment. Behavioural finance:The year is 1985. You are a researcher who has just discovered before anyone else the following pattern in the historical data: stocks that performed well over the past 6 months have higher returns on average over the next 6 months than stocks that performed poorly over the past 6 months.a) Describe an investment strategy exploiting this pattern that yields a positive profit on average. . b) In the research paper you are writing to publicise this discovery, what concerns do you need to point out for investors to keep in mind before rushing to exploit this pattern? c) Fast-forward to 2021. Given the knowledge that we now have in 2021, which of the concerns in b) are less of a concern today? Read the excerpts below from The Devils Arithmetic and Refugee. Then, write about a similarity or difference between Jane Yolens and Alan Gratzs perspectives. Explain your answer in a paragraph using details from the texts. the author of a source possesses a particular _______ shaped by his or Consider a branching process whose offspring generating function is (s) = (1/6) + (5/6)s^2. Obtain the probability of ultimate extinction. Enter your answer as an integer of the form m or a fraction of the form m/n. Do not include spaces. Amazon wants to perfect their new drone deliveries. To do this, they collect data and figure out the probability of a package arriving damaged to the consumer's house is 0.23. If your first package arrived undamaged, the probability the second package arrives damaged is 0.13. If your first package arrived damaged, the probability the second package arrives damaged is 0.04. In order to entice customers to use their new drone service, they are offering a $10 Amazon credit if your first package arrives damaged and a $30 Amazon credit if your second package arrives damaged. What is the expected value of your Amazon credit? The three layers that make up the ______ architecture are the backend, the artist,and the scripting layers Imagine that Stella deposits $25,000 in currency (which she had been storing in her closet) into her checking account at the bank. Assume that this institution and others like it have a required reserve ratio of 25%. How much of this deposit can the bank turn around and lend out to borrowers?A. $12,500B. $0C. $18,750D. $25,000E. $6,250 Consider the function f(x) = x^24 / x-2 (a) Fill in the following table of values for f(x):X= 1.9 1.99 1.999 1.9999 2.0001 2.001 2.01 2.1 f(x) = = 3.9 3.99 3.999 3.9999 4.0001 4.001 4.01 4.1 (b) Based on your table of values, what would you expect the limit of f(x) as x approaches 2 to be?lim_x--> 2 x^2/4 / x-2 = ___(c) Graph the function to see if it is consistent with your answers to parts (a) and (b). By graphing, find an interval for x near 2 such that the difference between your conjectured limit and the value of the function is less than 0.01. In other words, find a window of height 0.02 such that the graph exits the sides of the window and not the top or bottom. What is the window? ____ Select ALL of the choice options that would NOT bind directly to metabotropic taste receptors O Spices (ex. garlic ) O Capsaicin O Glycine O All of the choice options would bind directly to metabotropic taste receptors O L-Glutamate 6. Consider the following data for a particular sample period Portfolio P 35% 1.2 42% Market M 28% 1.0 30% Average return Beta Standard deviation Non-systematic risk 18% Calculate the following performance measures for portfolio P and the market: Sharpe, Jensen, and Treynor. The T -bill rate during the period was 6%. By which measures did portfolio P outperform the market? Given the differential equation: dy/dx + y=xy with the initial condition y(0) = 1, find the values of y corresponding to the values of xo+0.2 and Xo+0.4 correct to four decimal places using Heun's method Chris manages Cookie Monster's a commercial bakery that operates 12 hours per day 260 days per year. He needs to meet a daily demand of 22,000 cookies per day. He is currently implementing lean techniques in the kitchen. Chris intends to use "work-in-process" shelves as a kanban signal in the kitchen area. Each shelf can hold one cookie tray. Since the standard industrial cookie tray holds 10 dozen cookies, he assumes a "kanban container size" of 120 units. Chris performed a time study on the cookie packaging workstation and discovered the following: average wait time is 3 minutes - average handling time is 2 miutes average processing time is 4 minutes. In addition, management has established a safety stock policy of 120 seconds. What is the demand rate per minute for cookies? cookies per minute (Please round to one decimal place) How many kanban shelves should Chris place in front of the packaging workstation? shelves (Please round up to the next whole number) Consider the case of the International Islamic Fund (IF) which invests only in sukuks. Below are the details of its investments and return on the investments. The fund manager invested in 152 Mudaraba Sukuks with a profit share of 69%. The value of each Mudaraba Sukuks is AED 70,063. Furthermore, the fund manaegr holds 30% share in 502 Musharaka Sukuks. The profit share of the mushsaraka suku is 11% and each sukuk is valued AED 42,025. Suppose, each of the Mudaraba Sukuks generated a profit of AED 26,114 over the holding period, whereas, the value of Musharaka Sukuks went down by 46 % over the holding period. What is the percentage return for IIF over the holding period? Let X and Y be random variables with density functions f and g, respectively, and be a Bernoulli distributed random variable with success probability p, which is independent of X and Y . Compute the probability density function of X + (1 )Y . Why does Philip McMichael consider biofuels as a business as usual response to climate change?a. Biofuels use crops already grown by farmers.b. Biofuels are a low carbon alternative to burning fossil fuels.c. Biofuels compete with solar panels and wind mills as a source of sustainable energy.d. Biofuels are compatible with corporate profit and continued consumption growth. Pierce Company sold merchandise to Stanton Company on account FOB shipping point, 2/10, net 30, for $10,900. Pierce prepaid the $291 shipping charge. Which of the following entries does Pierce make for this sale?a.Accounts ReceivableStanton, debit $10,900; Sales, credit $10,900b.Accounts ReceivableStanton, debit $10,900; Sales, credit $10,900, and Delivery Expense, debit $291; Cash, credit $291c.Accounts ReceivableStanton, debit $10,682; Sales, credit $10,682, and Accounts ReceivableStanton, debit $291; Cash, credit $291d.Accounts ReceivableStanton, debit $11,191; Sales, credit $11,191 All parts of this problem refer to the integral x sin(x) d x. (a) Explain briefly why neither substitution nor integration by parts will work on this integral. (b) Use a midpoint approximation with n = 4 to estimate this integral. (c) Use three terms of a Maclaurin series to estimate this integral, and predict your error using the Alternating Series Estimation Theorem.