A random sample of 100 customers at a local ice cream shop were asked what their favorite topping was. The following data was collected from the customers.


Topping Sprinkles Nuts Hot Fudge Chocolate Chips
Number of Customers 44 27 12 17


Which of the following graphs correctly displays the data?
a histogram titled favorite topping with the x axis labeled topping and the y axis labeled number of customers, with the first bar labeled chocolate chips going to a value of 17, the second bar labeled hot fudge going to a value of 12, the third bar labeled nuts going to a value of 27, and the fourth bar labeled sprinkles going to a value of 44
a histogram titled favorite topping with the x axis labeled topping and the y axis labeled number of customers, with the first bar labeled hot fudge going to a value of 17, the second bar labeled chocolate chips going to a value of 12, the third bar labeled sprinkles going to a value of 27, and the fourth bar labeled nuts going to a value of 44
a bar graph titled favorite topping with the x axis labeled topping and the y axis labeled number of customers, with the first bar labeled chocolate chips going to a value of 17, the second bar labeled hot fudge going to a value of 12, the third bar labeled nuts going to a value of 27, and the fourth bar labeled sprinkles going to a value of 44
a bar graph titled favorite topping with the x axis labeled topping and the y axis labeled number of customers, with the first bar labeled hot fudge going to a value of 17, the second bar labeled chocolate chips going to a value of 12, the third bar labeled sprinkles going to a value of 27, and the fourth bar labeled nuts going to a value of 44

The domain of the function [tex]h(x, y) = sin^{-1} (x^{2}+ y^{2} - 16)[/tex] is the area between two circles with radii √15 and √17, centered at the origin. The larger circle has a radius of √17 and the smaller circle has a radius of √15.

For the given function [tex]h(x, y) = sin^{-1} (x^{2}+ y^{2} - 16)[/tex] , we need to determine the domain of the function, which is the area between two circles.  To find the domain, we need to consider the range of the arcsine function, which is between -π/2 and π/2.

This means that the expression inside the arcsine function, [tex](x^{2} + y^{2} - 16)[/tex] , must be between -1 and 1.
[tex]-1 \leq x^{2}+ y^{2}- 16 \leq 1[/tex]

Adding 16 to all sides of the inequality, we get:
[tex]15 \leq x^{2} + y^{2}\leq 17[/tex]

This means that the domain of the function is the area between two circles with radii √15 and √17, centered at the origin.  The larger circle has a radius of √17, which is the maximum value of [tex]x^{2}+ y^{2}[/tex] in the domain of the function. To see why, assume that [tex]x^{2} + y^{2} > \sqrt{17}[/tex]. Then,

[tex]sin^{-1} (x^{2} + y^{2}- 16) > sin^{-1} (\sqrt{17}- 16) > \pi /2[/tex]
which is outside the range of the arcsine function. Therefore, the maximum radius of the larger circle is √17.

Similarly, the smaller circle has a radius of √15, which is the minimum value of [tex]x^{2}+ y^{2}[/tex] in the domain of the function. To see why, assume that[tex]x^{2}+ y^{2} < \sqrt{15}[/tex]. Then,

[tex]sin^{-1}(x^{2}+ y^{2} - 16) < sin^{-1}(\sqrt{15}- 16) < -\pi /2[/tex]
which is also outside the range of the arcsine function. Therefore, the minimum radius of the smaller circle is √15.

In conclusion, the domain of the function [tex]h(x, y) = sin^{-1} (x^{2}+ y^{2} - 16)[/tex]  is the area between two circles with radii √15 and √17, centered at the origin. The larger circle has a radius of √17 and the smaller circle has a radius of √15.

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Complete Question:

For [tex]h(x, y) = sin^{-1} (x^{2}+ y^{2} - 16)[/tex]

the domain of the function is the area between two circles.

The larger circle has a radius of __.

The smaller circle has a radius of __.

Answer:

To find the area of the rectangular floor, we need to multiply its length by its width.

First, we need to convert the mixed numbers to improper fractions.

16 3/4 = (4 x 16 + 3)/4 = 67/4

15 1/2 = (2 x 15 + 1)/2 = 31/2

So, the area of the floor is:

67/4 x 31/2 = (67 x 31)/(4 x 2) = 2077/8 square feet

Therefore, the area of the floor is 2077/8 square feet.

Option C is the correct answer: Select a row from the random number table. Read 20 single digits. Count the number of digits that are zeros.

Here's how you can use a random number table to simulate one trial of this situation:

By using a random number table, you can simulate this situation and get a sense of the likelihood of different outcomes. Keep in mind that the more trials you run, the more accurate your estimate of the actual distribution will be.

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Our estimate is that around 40,514 peas can fit inside a 1 gallon jar under these assumptions.

The number of peas that fit inside a 1 gallon jar can vary depending on a few factors, such as the size of the peas, the packing density, and the shape of the jar. However, we can make a rough estimate based on some assumptions and calculations.

Assuming that the peas are spherical and have an average diameter of 0.5 cm, we can calculate the volume of each pea using the formula for the volume of a sphere:

[tex]V = (4/3)πr^3[/tex]

where r is the radius of the sphere, which is half the diameter. Thus, for a pea with a diameter of 0.5 cm, the radius is 0.25 cm, and the volume is:

V = (4/3)π(0.25 cm)^3 ≈ 0.0654 [tex]cm^3[/tex]

Next, we need to estimate the volume of the 1 gallon jar. One gallon is equal to 3.78541 liters, or 3785.41 cubic centimeters (cc). However, the jar may not be filled to its full volume due to its shape and the presence of the peas, so we need to make an assumption about the packing density. Let's assume that the peas occupy 70% of the volume of the jar, leaving 30% as empty space. This gives us an estimated volume of:

V_jar = 0.7(3785.41 cc) ≈ 2650.79 cc

To find the number of peas that fit inside the jar, we can divide the estimated volume of the jar by the volume of each pea:

N = V_jar / V ≈ 40,514

Therefore, our estimate is that around 40,514 peas can fit inside a 1 gallon jar under these assumptions. It's important to note that this is only an approximation, and the actual number may vary depending on the factors mentioned earlier.

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Answer:

  RS = 38

Step-by-step explanation:

Given ∆XYZ ~ ∆RST with XY=5x-3, XZ=60, RS=3x+2, RT=40, you want the length of RS.

Corresponding sides of similar triangles have the same ratios:

  XY/XZ = RS/RT

  (5x -3)/60 = (3x +2)/40 . . . substitute given lengths

  2(5x -3) = 3(3x +2) . . . . . . . multiply by 120

  10x -6 = 9x +6 . . . . . . . . . . . eliminate parentheses

  x = 12 . . . . . . . . . . . . . . . add 6-9x to both sides

Using this value of x we can find RS:

  RS = 3x +2

  RS = 3(12) +2

  RS = 38

__

Additional comment

The value of XY is 5(12)-3 = 57, and the above ratio equation becomes ...

  57/60 = 38/40 . . . . . both ratios reduce to 19/20.

Answer:If Chloe rolls the number cube twice and flips the coin once, there are 2 possible outcomes for the coin flip (heads or tails) and 6 possible outcomes for each roll of the number cube.

To find the total number of possible outcomes, we can use the multiplication principle of counting. The total number of possible outcomes is given by the product of the number of outcomes for each event.

Therefore, the total number of possible outcomes is:

2 x 6 x 6 = 72

So, there are 72 possible outcomes when Chloe rolls the number cube twice and flips the coin once.

Step-by-step explanation:

The value of ∂z/∂r at r=1 and s=0 is -9.

To find ∂z/∂r at r=1 and s=0, we need to use the chain rule:

∂z/∂r = ∂z/∂w * ∂w/∂x * ∂x/∂r

First, let's find ∂z/∂w:

f'(w) = dz/dw

Since f'(7) = -1, we know that dz/dw = -1 when w = 7.

Next, let's find ∂w/∂x and ∂x/∂r:

[tex]w = g(x,y) = g(2r^3 - s^2, res)[/tex]

∂w/∂x = ∂g/∂x = g_x = -2 (given)

∂x/∂r = [tex]6r^2[/tex](chain rule)

Now we can put it all together:

∂z/∂r = ∂z/∂w * ∂w/∂x * ∂x/∂r
    [tex]= (-1) * (-2) * 6r^2[/tex]
      [tex]= 12r^2[/tex]
So, at r=1 and s=0, we have:

[tex]∂z/∂r|r=1,s=0 = 12(1)^2 = 12[/tex]
To find ∂z/∂r at r=1 and s=0, we need to apply the chain rule. First, let's find the derivatives of x and y with respect to r and s:

∂x/∂r = 6r, ∂x/∂s = -2s
[tex]∂y/∂r = e^s, ∂y/∂s = re^s[/tex]

Now, we'll use the chain rule to find ∂z/∂r:

∂z/∂r = ∂z/∂w * (∂w/∂x * ∂x/∂r + ∂w/∂y * ∂y/∂r)

We have the following information:

gx(2,1) = ∂w/∂x = -2
gy(2,1) = ∂w/∂y = 3
f'(7) = ∂z/∂w = -1
g(2,1) = 7

Now, substitute the values for r=1 and s=0:

∂x/∂r = 6(1) = 6
∂y/∂r = e^(0) = 1

Plug in the given values:

∂z/∂r = (-1) * ((-2) * 6 + 3 * 1)

Calculate the result:

∂z/∂r = (-1) * (9)

∂z/∂r = -9

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The total number of votes registered in all is 571289.

To find out how many votes were registered in all, we need to add the number of valid votes, invalid votes, and the number of people who did not cast their votes.

So, the total number of votes registered in all is:

The problem asks to find out how many votes were registered in all in an election given the number of valid votes, invalid votes, and the number of people who did not cast their votes.

We can start by adding the number of valid votes and invalid votes because those are the votes that were cast, regardless of whether they were valid or not.

This gives us:

498656 (valid votes) + 6768 (invalid votes)

= 505424 votes.

498656 (valid votes) + 6768 (invalid votes) + 83865 (people who did not vote)

= 571289 votes.

The total number of votes registered in all is 571289

However, we also need to add the number of people who did not cast their votes, which is given as 83865.

Therefore, the total number of votes registered in all is:

505424 (valid and invalid votes) + 83865 (people who did not vote)

= 571289 votes.

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The surface area of the region S is 75√14.

Find the surface area of the region Slon the plane z=2x+3y such that 0 ≤x≤ 25 and 0 ≤ y ≤ 15 by finding a parameterization of the surface and then calculating the surface area.

The region S is the part of the plane z = 2x + 3y that lies in the rectangular region 0 ≤ x ≤ 25 and 0 ≤ y ≤ 15. To find the surface area of S, we need to parameterize the surface and then calculate the surface area using the formula:

S =∫∫√[tex](1 + (fx)^2 + (fy)^2)dA[/tex]

where fx and fy are the partial derivatives of z with respect to x and y, respectively, evaluated at the point (x,y).

To parameterize the surface, we can use the following equations:

x = u

y = v

z = 2u + 3v

where (u,v) ∈ R² is a point in the rectangular region 0 ≤ u ≤ 25 and 0 ≤ v ≤ 15.

To calculate the surface area, we need to find the partial derivatives fx and fy:

fx = 2

fy = 3

Then, the surface area of S is given by:

S = ∫∫√[tex](1 + (fx)^2 + (fy)^2)dA[/tex]

= ∫∫√[tex](1 + 2^2 + 3^2)dudv[/tex]

= ∫∫√(1 + 13)dudv

= ∫₀²⁵ ∫₀¹⁵ √14 dudv

= √14 ∫₀²⁵ ∫₀¹⁵ 1 dudv

= √14 ∫₀²⁵ v|₀¹⁵ du

= √14 ∫₀¹⁵ 25 dv

= √14 * 25 * 15

= 75√14

Therefore, the surface area of the region S is 75√14.

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Since these matrices have the same eigenvalues, their products will be the same. Therefore, det AB = det BA

To show that det AB = det BA, we can use the fact that the determinant of a product of matrices is equal to the product of the determinants of those matrices. That is, det AB = det A det B and det BA = det B det A.

Now, let's consider the matrices AB and BA. Even though they may not be equal, they have the same set of eigenvalues. This means that the determinant of AB and the determinant of BA have the same factors. We can see this by considering the characteristic polynomials of these matrices, which are the same up to a sign.

Therefore, we can write det AB as the product of the eigenvalues of AB, and det BA as the product of the eigenvalues of BA. Since these square matrices have the same eigenvalues, their products will be the same. Thus, det AB = det BA.

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The infinite sum ∑i=0[infinity]10⋅(9)i does not exist(DNE).

To determine whether the infinite sum ∑i=0[infinity]10⋅(9)i exists, we can use the formula for the sum of an infinite geometric series, which is given by:

S = a/(1-r)

where a is the first term of the series and r is the common ratio between consecutive terms.

In this case, a = 10 and r = 9. Substituting these values into the formula, we get:

S = 10/(1-9) = -10

Since the denominator of the formula is negative, the infinite sum diverges to negative infinity. This means that the sum does not exist in the traditional sense, since the terms of the series do not approach a finite value as the number of terms increases.

Therefore, we can conclude that the infinite sum ∑i=0[infinity]10⋅(9)i does not exist (DNE).

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The answer is 143.90. We used the formula for the standard error of the mean to find the expected value of the sample mean, then added 1.5 standard deviations to that value to find the answer.

To begin, we can use the formula for the standard error of the mean to calculate the expected value of the sample mean. The formula is as follows:

standard error of the mean = standard deviation / √(sample size)

In this case, the standard deviation is 8 minutes and the sample size is 40, so we can plug those values into the formula:

standard error of the mean = 8 / √(40)
standard error of the mean = 1.2649

Next, we can use the formula for the mean of the means to find the expected value of the sample mean:
mean of the means = average

In this case, the average is given as 142 minutes, so the mean of the means is also 142 minutes.

Now we can find the value that is 1.5 standard deviations above the expected value of the sample mean:

1.5 standard deviations = 1.5 * standard error of the mean
1.5 standard deviations = 1.5 * 1.2649
1.5 standard deviations = 1.8974

Finally, we add this value to the mean of the means to find the answer:

[tex]\bar{X} + 1.5\; standard \; deviations = 142 + 1.8974[/tex]

[tex]\bar{X} + 1.5 \;standard \;deviations = 143.8974[/tex]

Rounding to 2 decimal places, the answer is 143.90.

In summary, we used the formula for the standard error of the mean to find the expected value of the sample mean, then added 1.5 standard deviations to that value to find the answer. This calculation helps us understand the range of values we might expect to see in a sample of runners in this category.

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Answer:

a, b, and d

Step-by-step explanation:

A, B, and D are Pythagorean triples (the sum of the squares of the first two numbers is equal to the square of the third number).

The equation of the curve is y = x² - 4x + 3

Since we are given the slope of the curve at each point, we can use integration to find the equation of the curve. Let's denote the equation of the curve as y = f(x).

The slope of the curve is given by dy/dx = 2x - 4. We can integrate this expression with respect to x to obtain an expression for f(x):

∫dy = ∫(2x - 4)dx

y = x² - 4x + C

where C is the constant of integration.

To determine the value of C, we use the fact that the curve passes through the point (4,7):

7 = 4² - 4(4) + C

C = 7 + 4(4) - 16 = 3

Thus, the equation of the curve is y = x²- 4x + 3.

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In order for the characteristics of a sample to be generalized to the entire population, the sample should be option (c)  representative of the population

For a sample to be able to generalize to the entire population, it must be selected in such a way that it accurately reflects the characteristics of the population from which it was drawn. This means that the sample should be representative of the population in terms of the relevant characteristics that are being studied.

If the sample is not representative of the population, then any conclusions drawn from the sample may not be applicable to the larger population, which can lead to inaccurate or misleading results.

Therefore, it is important to use proper sampling methods to ensure that the sample is representative of the population. This can be done through techniques such as random sampling or stratified sampling, which aim to select a sample that accurately reflects the population characteristics of interest.

Therefore, the correct option is (c) representative of the population.

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Answer:

4(8+3)

Step-by-step explanation:

Because if you break 4(8+3) down by using the FOIL method, it would be 4(8)+4(3) which is equal to 32+12.

since we have found an element (48) in S that is not in T, we can conclude that S is not equal to T.

To prove that S is not equal to T, we need to show that there I an element in either S or T that is not in the other set.

Let's first look at the elements in S. We know that S is the set of all integers that can be expressed as 24 times some other integer. So, for example, 24, 48, 72, -24, -48, -72, etc. are all in S.

Now, let's look at the elements in T. We know that T is the set of all integers that can be expressed as 4 times some integer and 6 times some integer. We can find some examples of numbers in T by finding the multiples of the LCM of 4 and 6, which is 12. So, for example, 12, 24, 36, -12, -24, -36, etc. are all in T.

Now, let's consider the number 48. We know that 48 is in S, since it can be expressed as 24 times 2. However, 48 is not in T, since it cannot be expressed as 4 times some integer and 6 times some integer. This is because the only common multiple of 4 and 6 is 12, and 48 is not a multiple of 12.

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The value of k is 4 when volume of cylinder is [tex]\pi[/tex] .

To solve this problem, we need to use the formulas for the volumes of a cylinder and a cube.

The volume of a cylinder is given by V_cylinder = π[tex]r^{2}[/tex]h, where r is the radius and h is the height.

The volume of a cube is given by V_cube = [tex]s^{3}[/tex], where s is the length of a side.

In this problem, the cylinder just fits inside the cube, which means that the diameter of the cylinder is equal to the length of a side of the cube, or 2r = m. Therefore, the radius of the cylinder is m/2 cm, and the height of the cylinder is m cm.

Substituting these values into the formula for the volume of the cylinder, we get:

V_cylinder = π[tex](m/2)^{2}[/tex](m) = π[tex]m^{3/4}[/tex]

Substituting the value for the volume of the cylinder into the given ratio, we get:

k : π = V_cube : V_cylinder = [tex]m^{3}[/tex] : (π[tex]m^{3/4}[/tex] ) = 4 : π

Therefore, the value of k is 4.

Correct Question:

A cylinder just fits inside a hollow cube with sides of length m cm. The radius of the cylinder is m/2 cm. The height of the cylinder is m cm. The ratio of the volume of the cube to the volume of the cylinder is given by volume of cube : volume of cylinder = k : [tex]\pi[/tex], where k is a number. Find the value of k.

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The differential dy of the function y = 2x^4 - 54 - 4x is dy = (8x^3 - 4)dx.

To find the differential dy of the function y = 2x^4 - 54 - 4x, we first need to differentiate y with respect to x.

Step 1: Identify the terms in the function. The terms are 2x^4, -54, and -4x.

Step 2: Differentiate each term with respect to x.
- For 2x^4, using the power rule (d/dx (x^n) = n*x^(n-1)), we get (4)(2x^3) = 8x^3.
- For -54, since it's a constant, its derivative is 0.
- For -4x, using the power rule, we get (-1)(-4x^0) = -4.

Step 3: Combine the derivatives to get the derivative of the entire function.
dy/dx = 8x^3 - 4.

Step 4: The differential dy is the derivative multiplied by dx.
dy = (8x^3 - 4)dx.

So, the differential dy of the function y = 2x^4 - 54 - 4x is dy = (8x^3 - 4)dx.

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The differential equation y4 - 27y' = x2 + x in the form L (y) = g(x) is D(D - 3)(D^2 + 3D + 9)y = x^2 + x. So, the answer is option B.

Explanation:

The given differential equation is y4 - 27y' = x2 + x.

To write it in the form L(y) = g(x), where L is a linear differential operator with constant coefficients, we need to express y4 and y' in terms of differential operators.

We can write y4 as (D^4)y, where D is the differential operator d/dx.

To express y' in terms of differential operators, we can use the product rule:

y' = dy/dx = (D)(y)

Therefore, the given differential equation can be written as:

(D^4)y - 27(D)y = x^2 + x

Now, we need to factor the linear differential operator L = (D^4) - 27D.

We can factor out D from the second term:

L = D(D^3 - 27)

Next, we can factor the cubic polynomial D^3 - 27 using the difference of cubes formula:

D^3 - 27 = (D - 3)(D^2 + 3D + 9)

Therefore, we can express L as:

L = D(D - 3)(D^2 + 3D + 9)

Finally, we can write the differential equation in the desired form:

D(D - 3)(D^2 + 3D + 9)y = x^2 + x

So, the answer is option B.

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To find the probability of selecting a person with blood type AB from a random distribution of 100 Americans, some steps need to be followed.

Steps are:
Step 1: Identify the total number of people (100 Americans in this case) and the number of people with blood type AB from the table (AB+ and AB-).

Step 2: Add the number of people with AB+ and AB- blood types:
AB+ (2) + AB- (4) = 6

Step 3: Calculate the probability by dividing the number of people with blood type AB (6) by the total number of people (100):
Probability = (Number of AB blood types) / (Total number of people)
Probability = 6 / 100

Step 4: Simplify the fraction to get the final probability:
Probability = 0.06

So, the probability of selecting a person with blood type AB from a random distribution of 100 Americans is 0.06 or 6%.

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Thus, the simplification of the given polynomial is given as;

-68u²v²  - 2u⁸v⁴.

The tight definition makes polynomials simple to work with.

For instance, we are aware of:

One-variable polynomials are very simple to graph due to their smooth, continuous lines.

The biggest exponent of a polynomial with a single variable is the polynomial's degree.

For the given polynomial:

-71uv²u + (3vu²v - 5u⁶u²v⁴) + 3u³v²v²u⁵

Open the brackets:

-71uv²u + 3vu²v - 5u⁶u²v⁴ + 3u³v²v²u⁵

The powers with the same base get added with sign:

-71u¹⁺¹ v² + 3v¹⁺¹ u² - 5u⁶⁺² v⁴ + 3u³⁺⁵ v²⁺²

-71u² v² + 3v² u² - 5u⁸v⁴ + 3u⁸ v⁴

The coefficients with the same variable gets added with sign:

(-71u² v² + 3v² u²) + (- 5u⁸v⁴ + 3u⁸ v⁴ )

(-68u²v² ) + (- 2u⁸v⁴)

-68u²v²  - 2u⁸v⁴

Thus, the simplification of the given polynomial is given as;

-68u²v²  - 2u⁸v⁴.

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Complete question:

Simplify the polynomial:

-71uv²u + (3vu²v - 5u⁶u²v⁴) + 3u³v²v²u⁵

By averaging the two middle numbers, we can determine that the median is $75 million.

Based on the information provided, we know that there are six Marvel movies and we need to put their domestic gross income in order from smallest to largest. However, we're also given a specific piece of information about the median, which is that it's a certain amount of million dollars and that about 25% of the movies made more than this amount.

To start, let's define what the median is.

The median is a measure of central tendency that represents the middle value in a set of data. In this case, we have six Marvel movies, so the median would be the third value when the movies are arranged in order from smallest to largest. If we arrange the movies by their domestic gross income, we can determine the median and use that information to put them in order.

So, let's say the six Marvel movies are:

Movie A: $50 million
Movie B: $60 million
Movie C: $70 million
Movie D: $80 million
Movie E: $90 million
Movie F: $100 million

Using these values, we can determine that the median is $75 million. This means that about 25% of the movies made more than $75 million and the remaining 75% made less than $75 million. To put the movies in order from smallest to largest, we can use this information and arrange them as follows:

Movie A: $50 million
Movie B: $60 million
Movie C: $70 million
Movie D: $80 million
Movie E: $90 million
Movie F: $100 million

So, the movies are now arranged in order from smallest to largest based on their domestic gross income. This information can be useful for analyzing trends and making predictions about future movie releases.

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If the coordinate of an object is given as a function of time by 0 = 7t-3t2, where is in radians and t is in seconds, The angular velocity at t = 3 s is -11 rad/s. The answer is (a) -11 rad/s.

The angular velocity is the derivative of the position function with respect to time. Therefore, we need to find the derivative of the given function:

θ = 7t - 3t^2

ω = dθ/dt = 7 - 6t

Now we can find the angular velocity at t = 3 s by plugging in t = 3 into the equation for ω:

ω = 7 - 6(3) = -11

Therefore, The answer is (a) -11 rad/s.

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If the coordinate of an object is given as a function of time by 0 = 7t-3t2, where is in radians and t is in seconds, The angular velocity at t = 3 s is -11 rad/s. The answer is (a) -11 rad/s.

The angular velocity is the derivative of the position function with respect to time. Therefore, we need to find the derivative of the given function:

θ = 7t - 3t^2

ω = dθ/dt = 7 - 6t

Now we can find the angular velocity at t = 3 s by plugging in t = 3 into the equation for ω:

ω = 7 - 6(3) = -11

Therefore, The answer is (a) -11 rad/s.

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The radius of convergence R, we use the Ratio Test: R = lim (n→∞) |(aₙ₊₁ / aₙ)|.

The Taylor series for f centered at 8 is given by the formula:

Σ[(-1)ⁿ * (n! * (x-8)ⁿ) / (4ⁿ * (n+2)ⁿ)], where n ranges from 0 to infinity.

The radius of convergence R is 1/4.

To find the Taylor series, we use the general formula for Taylor series expansion:

Σ[(fⁿ(8) * (x-8)ⁿ) / n!], where n ranges from 0 to infinity.

Given that fⁿ(8) = (-1)ⁿ * n! / 4ⁿ * (n+2)ⁿ, we substitute this into the Taylor series formula:

Σ[((-1)ⁿ * n! / 4ⁿ * (n+2)ⁿ) * (x-8)ⁿ / n!] = Σ[(-1)ⁿ * (x-8)ⁿ / (4ⁿ * (n+2)ⁿ)].

To find the radius of convergence R, we use the Ratio Test:

R = lim (n→∞) |(aₙ₊₁ / aₙ)|.

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The value of C in the equation is C = (D - F)/(A - B).

We have,

We need to isolate the variable C on one side of the equation, which we can do by moving all the other terms to the other side:

So,

AC + F = BC + D

Subtract BC from both sides:

AC - BC + F = D

Factor out C on the left-hand side:

C(A - B) + F = D

Subtract F from both sides:

C(A - B) = D - F

Divide both sides by (A - B):

C = (D - F)/(A - B)

Therefore,

The value of C in the equation is C = (D - F)/(A - B)

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The length of the arc formed by using Simpson's rule by y=1/8 (1x^2-8ln(x)) from x = 2 to x = 8 is approximately 8.386.

To find the length of the arc formed by y=1/8 (1x^2-8ln(x)) from x = 2 to x = 8, we need to use the formula for arc length:

L = ∫a to b sqrt[1 + (dy/dx)^2] dx

First, let's find dy/dx:

y = 1/8 (x^2-8ln(x))
dy/dx = 1/4 x - 2/x

Now, let's plug in the values for a and b:

a = 2
b = 8

Now we can find the arc length:

L = ∫2 to 8 sqrt[1 + (dy/dx)^2] dx
L = ∫2 to 8 sqrt[1 + (1/16 x^2 - 1/x + 4) dx
L = ∫2 to 8 sqrt[1/16 x^2 + 1/x + 5] dx

This integral is not easy to solve, so we can use a numerical method such as Simpson's rule to approximate the value of the integral.

Using Simpson's rule with n=4 (subdividing the interval [2,8] into 4 equal subintervals), we get:

L ≈ 8.386

To find the length of the arc formed by the curve y = 1/8(1x^2 - 8ln(x)) from x = 2 to x = 8, we need to use the arc length formula:

Arc length = ∫√(1 + (dy/dx)^2) dx from a to b

First, let's find the derivative dy/dx of y:

y = 1/8(x^2 - 8ln(x))
dy/dx = 1/8(2x - 8/x)

Now, find (dy/dx)^2 and add 1:

(1/8(2x - 8/x))^2 + 1

Next, find the square root of the expression:

√((1/8(2x - 8/x))^2 + 1)

Now, integrate the expression with respect to x from 2 to 8:

Arc length = ∫√((1/8(2x - 8/x))^2 + 1) dx from 2 to 8

Unfortunately, the integral doesn't have a simple closed-form solution, so you would need to use numerical integration methods (e.g., Simpson's rule or trapezoidal rule) or software (like Wolfram Alpha or a graphing calculator) to find the approximate value of the arc length.

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The fact that the sum can be approximated by an integral. we can approximate the sum as the area under the curve y=√x from x=1 to x=10000. This can be written as: ∫1^10000 √x dx

Using integration rules, we can evaluate this integral to get:
(2/3) * (10000^(3/2) - 1^(3/2))
This evaluates to approximately 66663.33. Therefore, an estimate for the sum ∑ i=1 to 10000 √i is 66663.33.

In mathematics, integrals are continuous combinations of numbers used to calculate areas, volumes, and their dimensions. Integration, which is the process of calculating compounds, is one of the two main operations of computation, [a] the other being derivative. Integration was designed as a way to solve math and physics problems like finding the area under a curve or determining velocity. Today, integration is widely used in many fields of science.

To estimate the sum of ∑ from i=1 to 10000 of √i using an integral, we'll approximate the sum with the integral of the function f(x) = √x from 1 to 10000.

The integral can be written as:

∫(from 1 to 10000) √x dx

To solve this integral, we first find the antiderivative of √x:

Antiderivative of √x = (2/3)x^(3/2)

Now, we'll evaluate the antiderivative at limits 1 and 10000:

(2/3)(10000^(3/2)) - (2/3)(1^(3/2))

(2/3)(100000000) - (2/3)

= (200000000/3) - (2/3)

= 199999998/3

Thus, the integral estimate of the sum from i=1 to 10000 of √i is approximately 199999998/3.

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Therefore, the distance AB when the bridge is lifted to the position shown in the diagram is approximately 17.32 units.

Distance refers to the numerical measurement of the amount of space between two points, objects, or locations. It is a scalar quantity that has magnitude but no direction, and it is usually expressed in units such as meters, kilometers, miles, or feet. Distance can be measured in a straight line, or it can refer to the length of a path or route taken to travel from one point to another. It is an important concept in mathematics, physics, and other fields, and it has many practical applications in daily life, such as in navigation, transportation, and sports.

Here,

In the diagram, we can see that the bridge is divided into two halves and pivots around point B. When the bridge is lifted, it forms a right triangle with legs AB and BC, and hypotenuse AC. Since the bridge divides exactly in half, we can see that angle BCD is a right angle and angle ACD is equal to 30 degrees.

Using trigonometry, we can find the length of AB as follows:

tan(30) = AB/BC

tan(30) = AB/30

AB = 30 * tan(30)

AB ≈ 17.32

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