Consider the series 15" ni (n + 1)42n41 Evaluate the the following limit. If it is infinite, type "infinity" or "inf". If it does not exist, type "DNE". an+1 lim n>00 EL an Answer: L= What can you say about the series using the Ratio Test? Answer "Convergent", "Divergent", or "Inconclusive". Answer: choose one Determine whether the series is absolutely convergent, conditionally convergent, or divergent. Answer "Absolutely Convergent", "Conditionally Convergent", or "Divergent".

Formula of  significance of  test as a function and value produces significance level is given by  F(x)  = 1 - [tex]e^{(-x /\mu)}[/tex], for x ≥ 0 with p-value  = [tex]e^{(-x /\mu)}[/tex], for x ≥ 0 and  x = μ log(1/α)respectively.

The significance of the test can be calculated using the following formula,

p-value = P(X > x),

where X is the duration of the observed call

And x is the cutoff value for distinguishing between voice and data calls.

Since X is an exponential random variable with expected value μ,

The probability density function of X is equal to,

f(x) = (1/μ) × [tex]e^{(-x /\mu)}[/tex], for x ≥ 0

The cumulative distribution function CDF of X is,

F(x) = P(X ≤ x)

      = [tex]\int_{0}^{x}[/tex] f(t) dt

      = 1 - [tex]e^{(-x /\mu)}[/tex] for x ≥ 0

The significance of the test is,

p-value = P(X > x)

             = 1 - F(x)

             = [tex]e^{(-x /\mu)}[/tex], for x ≥ 0

The value of x that produces a significance level α.

Since the exponential distribution is a continuous distribution,

Use the inverse of the CDF to find x.

Let F⁻¹ be the inverse of the CDF of X.

Then,

P(X > F⁻¹(1 - α)) = α

Substituting F(x) = 1 - [tex]e^{(-x /\mu)}[/tex], we get,

P(X > μ log(1/α)) = α

The value of x that produces a significance level α is,

x = μ log(1/α)

Therefore, the formula of  significance of the test as a function F(x)  = 1 - [tex]e^{(-x /\mu)}[/tex], for x ≥ 0 with p-value  = [tex]e^{(-x /\mu)}[/tex], for x ≥ 0 .

The value produces significance level is x = μ log(1/α).

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The weight that separates the bottom 5% is approximately 5.02 ounces.

To find the weights that separate the top 5% and the bottom 5%, we need to use the z-score formula and the standard normal distribution table.

First, let's find the z-score for the top 5%. Using the standard normal distribution table, we find that the z-score for the top 5% is approximately 1.645.

Next, we can use the formula z = (x - μ) / σ, where z is the z-score, x is the weight we're trying to find, μ is the mean, and σ is the standard deviation.

For the top 5%, we have:

1.645 = (x - 5.12) / 0.07

Solving for x, we get:

x = 5.12 + 1.645 * 0.07

x ≈ 5.22 ounces

Therefore, the weight that separates the top 5% is approximately 5.22 ounces.

To find the weight that separates the bottom 5%, we use the same process but with a negative z-score. The z-score for the bottom 5% is approximately -1.645.

-1.645 = (x - 5.12) / 0.07

Solving for x, we get:

x = 5.12 - 1.645 * 0.07

x ≈ 5.02 ounces

Therefore, the weight that separates the bottom 5% is approximately 5.02 ounces.

These weights could serve as limits used to identify which components should be rejected. Any component with a weight less than 5.02 ounces or greater than 5.22 ounces should be rejected.

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Answer: The value of P is 14.

Step-by-step explanation: To find the value of P, we can use the formula for the mean of a set of numbers:

mean = (sum of numbers) / (number of numbers)

We know that the mean of the set {6, 8, 9, P, 13} is 10. So we can write:

10 = (6 + 8 + 9 + P + 13) / 5

Multiplying both sides by 5, we get:

50 = 6 + 8 + 9 + P + 13

Combining like terms, we get:

50 = 36 + P

Subtracting 36 from both sides, we get:

14 = P

Therefore, the value of P is 14.

The associated homogeneous equation is v (t) + ½' (t) -6y(t) = 0. To find a solution to this equation, we can assume that the solution is in the form of y(t) = e^(rt), where r is a constant. Plugging this into the equation, we get the characteristic equation r^2 - 6 = 0. Solving for r, we get r = ±√6.

Thus, the general solution to the associated homogeneous equation is y(t) = c1e^(√6t) + c2e^(-√6t), where c1 and c2 are constants.

To find a solution to the original differential equation, we can use the method of undetermined coefficients. Assuming that the particular solution is in the form of y(t) = At + B, we can plug this into the equation and solve for A and B.

Taking the derivative of y(t), we get y'(t) = A. Plugging this and y(t) into the differential equation, we get:

A + ½ - 6(At + B) = g(t)

Simplifying, we get:

A(1-6t) + ½ - 6B = g(t)

To solve for A and B, we need to have information about the function g(t). Once we have that, we can solve for A and B and find the particular solution to the differential equation.

In summary, the solution to the associated homogeneous equation is y(t) = c1e^(√6t) + c2e^(-√6t), and the particular solution to the differential equation can be found using the method of undetermined coefficients with information about the function g(t).

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The probability of getting 2 blue candies without replacement from a bag of 7 red candies and 5 blue candies can be calculated as follows:

First, we need to find the total number of ways to choose 2 candies from the bag, which is:

12 choose 2 = (12!)/(2!*(12-2)!) = 66

Next, we need to find the number of ways to choose 2 blue candies from the bag, which is:

5 choose 2 = (5!)/(2!*(5-2)!) = 10

Therefore, the probability of getting 2 blue candies without replacement from the bag is:

10/66 = 5/33

So the probability of getting 2 blue candies without replacement from the bag is 5/33, or approximately 0.152.

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4. Inverse Laplace transform of F(s) is f(t) = e^(-t) * cos(2t) + sin(2t), 5. f(t) = (3/4) * e^(2t) - (1/4) * e^(-2t). This is the inverse Laplace transform of F(s)

For Problem 4, we can first use partial fraction decomposition to write F(s) as:

F(s) = (2s+2)/(s²+2s+5) = A/(s+1-i√2) + B/(s+1+i√2)

where A and B are constants to be determined. To find A and B, we can multiply both sides by the denominator and then set s = -1+i√2 and s = -1-i√2, respectively. This gives us the system of equations:

2(-1+i√2)A + 2(-1-i√2)B = 2+2i√2
2(-1-i√2)A + 2(-1+i√2)B = 2-2i√2

Solving this system, we get A = (1+i√2)/3 and B = (1-i√2)/3. Therefore, we have:

F(s) = (1+i√2)/(3(s+1-i√2)) + (1-i√2)/(3(s+1+i√2))

To find the inverse Laplace transform of F(s), we can use the formula:

L⁻¹{a/(s+b)} = ae^(-bt)

Applying this formula to each term in F(s), we get:

f(t) = (1+i√2)/3 e^(-(-1+i√2)t) + (1-i√2)/3 e^(-(-1-i√2)t)
    = (1+i√2)/3 e^(t-√2t) + (1-i√2)/3 e^(t+√2t)

This is the inverse Laplace transform of F(s).

For Problem 5, we can also use partial fraction decomposition to write F(s) as:

F(s) = (2s-3)/(s²-4) = A/(s-2) + B/(s+2)

where A and B are constants to be determined. To find A and B, we can multiply both sides by the denominator and then set s = 2 and s = -2, respectively. This gives us the system of equations:

2A - 2B = -3
2A + 2B = 3

Solving this system, we get A = 3/4 and B = -3/4. Therefore, we have:

F(s) = 3/(4(s-2)) - 3/(4(s+2))

To find the inverse Laplace transform of F(s), we can again use the formula:

L⁻¹{a/(s+b)} = ae^(-bt)

Applying this formula to each term in F(s), we get:

f(t) = 3/4 e^(2t) - 3/4 e^(-2t)

This is the inverse Laplace transform of F(s).

In each of Problems 4 and 5, find the inverse Laplace transform of the given function.

4. F(s) = (2s + 2) / (s^2 + 2s + 5)
To find the inverse Laplace transform of F(s), first complete the square for the denominator:
s^2 + 2s + 5 = (s + 1)^2 + 4
Now, F(s) = (2s + 2) / ((s + 1)^2 + 4)
The inverse Laplace transform of F(s) is f(t) = e^(-t) * cos(2t) + sin(2t)

5. F(s) = (2s - 3) / (s^2 - 4)
To find the inverse Laplace transform of F(s), recognize this as a partial fraction decomposition problem:
F(s) = A / (s - 2) + B / (s + 2)
Solve for A and B, then apply inverse Laplace transform to each term:
f(t) = (3/4) * e^(2t) - (1/4) * e^(-2t)

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The highest temperature on the surface of the sphere is 64000sqrt(55), and the lowest temperature is -64000sqrt(55).

Using Lagrange multipliers, we want to optimize the temperature function subject to the constraint of the sphere equation:

F(x, y, z) = 400xyz

G(x, y, z) = x^2 + y^2 + z^2 - 22 = 0

The Lagrangian function is:

L(x, y, z, λ) = F(x, y, z) - λG(x, y, z) = 400xyz - λ(x^2 + y^2 + z^2 - 22)

Taking partial derivatives with respect to x, y, z, and λ and setting them to zero, we get:

400yz - 2λx = 0

400xz - 2λy = 0

400xy - 2λz = 0

x^2 + y^2 + z^2 - 22 = 0

Solving the first three equations for x, y, and z, we get:

x = 200yz/λ

y = 200xz/λ

z = 200xy/λ

Substituting these into the sphere equation, we get:

(200yz/λ)^2 + (200xz/λ)^2 + (200xy/λ)^2 - 22 = 0

Simplifying this equation and solving for λ, we get:

λ = ±80sqrt(55)

Using these values of x, y, z, and λ, we can find the corresponding temperature values:

T(x, y, z) = 400xyz = ±64000sqrt(55)

Therefore, the highest temperature on the surface of the sphere is 64000sqrt(55), and the lowest temperature is -64000sqrt(55).

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The horizontal distance of the soda from the bottle when it hits the ground is 6.5.

The given parabolic equation is y=-0.5x²+3x+2.

Graph the parabola using the direction, vertex, focus, and axis of symmetry.

Direction: Opens Down

Vertex: (3,13/2)

Focus: (3,6)

Axis of Symmetry: x=3

Directrix: y=7

The horizontal distance:

Find where the first derivative is equal to 0. Enter the solutions into the original equation and simplify.

y=6.5

Therefore, the horizontal distance of the soda from the bottle when it hits the ground is 6.5.

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Answer: Common denominator

Step-by-step explanation:

Turn them into common denominators such as 10 (hint) has a denominator of 10.

Answer:

A

Step-by-step explanation:

add them up then divide the fractions and get ur amount of hours into a decimal into a fraction

Answer:

Step-by-step explanation:

Since Pens/Pencils is a constant rate (equal rate), we find that
[tex]\frac{13}{78} = \frac{1}{6}[/tex]  and  [tex]\frac{22}{132} = \frac{1}{6}[/tex]. So 1/6 is that rate

We have B / 162 = 1/6
               B = 162 / 6
               B = 27

So the answer is 27

Answer:

answer is 27

Step-by-step explanation:

The rocket will reach its maximum height after 7.44 seconds.

We have,

The height of the rocket is given by the equation y = -16x² + 238x + 81, where y is the height in feet and x is the time in seconds after launch.

To find the time at which the rocket will reach its maximum height, we need to determine the vertex of the parabolic function given by the equation.

The x-coordinate of the vertex can be found using the formula:

x = -b / 2a

where a and b are the coefficients of the quadratic equation ax² + bx + c.

In this case,

a = -16 and b = 238

Substituting

x = -238 / 2(-16)

x = 7.44

Therefore,

The rocket will reach its maximum height after 7.44 seconds.

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To find s', we need to take the derivative of s with respect to t. Using the chain rule, we have: s' = -sin(t-1) * (d/dt) (t-1)
Notice that the derivative of (t-1) with respect to t is simply 1. Therefore, we have: s' = -sin(t-1) * 1
s' = -sin(t-1)
So, the derivative of s with respect to t is -sin(t-1).

We need to find s', which is the derivative of s with respect to t, given that s = cos(t-1). To do this, we'll use the chain rule. Here are the steps:
1. Identify the outer and inner functions:
  Outer function: f(u) = cos(u)
  Inner function: u = t-1
2. Find the derivatives of both functions:
  f'(u) = -sin(u)
  du/dt = 1
3. Apply the chain rule:
  s' = f'(u) * (du/dt)
4. Substitute the expressions for f'(u) and du/dt into the chain rule equation:
  s' = (-sin(u)) * (1)
5. Replace u with the inner function (t-1):
  s' = -sin(t-1)
So, the derivative of s with respect to t, s', is -sin(t-1).

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It would take the trout 150 seconds to swim 100 yards.

We know that the trout swims at a speed of 2 feet per second. This means that for every second the trout swims, it covers a distance of 2 feet.

So, 100 yards x 3 feet/yard = 300 feet.

Now that we know the distance that the trout needs to cover, we can use the formula:

time = distance ÷ speed

where time is the time it takes for the trout to swim the given distance, distance is the distance the trout needs to cover (in feet), and speed is the speed at which the trout swims (in feet per second).

time = 300 feet ÷ 2 feet per second

time = 150 seconds.

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The rate of change of the volume of the hailstone is 108π mm³/min when the radius is 3 mm.

The formula for the volume of a sphere is V = (4/3)πr³, where V is the volume and r is the radius.

We can use implicit differentiation to find the rate of change of the volume with respect to time.

Taking the derivative of both sides with respect to time t, we get:

dV/dt = d/dt[(4/3)πr³]

Using the chain rule, we get:

dV/dt = (4/3)π×3r² dr/dt

Now, we substitute the given values to find dV/dt at the moment when the radius is 3 mm:

r = 3 mm

dr/dt = 2 mm/min

dV/dt = (4/3)π × 3(3)² × 2

dV/dt = (4/3)π × 27 × 2

= 72π mm³/min

Therefore, the rate of change of the volume of the hailstone is 108π mm³/min when the radius is 3 mm.

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Therefore, the vector ä = AB is (8, -2, 2). To find the vector ä = AB, we simply subtract the coordinates of point A from the coordinate

To find the vector AB (also denoted as vector ä) between the points A (-5, 1, 4) and B (3, -1, 6), we need to calculate the difference between the coordinates of point B and point A. This can be done using the formula: AB = (Bx - Ax, By - Ay, Bz - Az).

Using the given coordinates, we have:

Ax = -5, Ay = 1, Az = 4
Bx = 3, By = -1, Bz = 6

Now, we'll apply the formula to find the components of vector AB:

ABx = Bx - Ax = 3 - (-5) = 8
ABy = By - Ay = -1 - 1 = -2
ABz = Bz - Az = 6 - 4 = 2

So, the vector AB (or vector ä) is given by:

AB = (8, -2, 2)

Thus, the vector connecting points A and B has components (8, -2, 2).

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The CDF of Y is: FY(y) = FX((2 - y)/3)

= {1 - [tex]e^{(-4(2-y)/3)}[/tex], for y ∈ (-∞, 2]

{0, for y < -∞

To find the CDF of Y, we need to first find the range of Y:

Y = g(X) = 2 - 3X

When X = 0, Y = 2

As X approaches infinity, Y approaches negative infinity

Thus, the range of Y is (-∞, 2].

Now, let's find the CDF of Y for y ∈ (-∞, 2]:

FY(y) = P(Y ≤ y) = P(2 - 3X ≤ y)

Solving for X:

X = (2 - y)/3

Since FX(x) = P(X ≤ x), we can substitute (2 - y)/3 for x in FX(x) to get:

FX((2 - y)/3) = P(X ≤ (2 - y)/3)

= 1 - [tex]e^{(-4(2-y)/3)}[/tex], for y ∈ (-∞, 2]

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The equation:  f(x,y)= √x⁴+4xy+y⁴+10fx(x,y) = fy(x,y)=fx (2, - 2) = fy(1,3) = (2(3)³ + 4(1)) / (2√(1)⁴ + 4(1)(3) + 2(3)⁴) = 26/38 = 13/19

To find the partial derivatives fx(x, y) and fy(x, y) for the equation f(x, y) = √(x⁴ + 4xy + y⁴ + 10), we will differentiate f with respect to x and y, respectively. fx(x, y) = ∂f/∂x = (1/2)(x⁴ + 4xy + y⁴ + 10)^(-1/2) * (4x³ + 4y) fy(x, y) = ∂f/∂y = (1/2)(x⁴ + 4xy + y⁴ + 10)^(-1/2) * (4x + 4y³)

Now, we'll find the values of fx(2, -2) and fy(1, 3): fx(2, -2) = (1/2)((2^4) + 4(2)(-2) + (-2)^4 + 10)^(-1/2) * (4(2)^3 + 4(-2)) = -0.5 fy(1, 3) = (1/2)((1^4) + 4(1)(3) + (3)^4 + 10)^(-1/2) * (4(1) + 4(3)^3) = 0.0625 So, we have: fx(x, y) = (1/2)(x⁴ + 4xy + y⁴ + 10)^(-1/2) * (4x³ + 4y) fy(x, y) = (1/2)(x⁴ + 4xy + y⁴ + 10)^(-1/2) * (4x + 4y³) fx(2, -2) = -0.5 fy(1, 3) = 0.0625

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To determine the absolute value of -13 using a number line, we would first locate the number -13 on the number line. Then, we would measure the distance between -13 and 0 (the origin of the number line) using units of the same size.

This distance would represent the absolute value of -13, In this case, the distance between -13 and 0 on the number line is 13 units. Therefore, the absolute value of -13 is 13, To use a number line to determine the absolute value of -13, follow these steps:

1. Locate the number -13 on the number line.
2. Measure the distance from -13 to 0. This distance represents the absolute value.
3. Count the number of units from -13 to 0. You will find that the distance is 13 units.

The absolute value of -13 is 13.

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Answer:

= -77

Step-by-step explanation:

11/2 x -14 =

Express 11/2 (-14) as a single fraction.

11(-14)/2

Multiply 11 and -14 to get -154.

-154/2

Divide -154 by  2 to get -77.

-77.

The quadratic equation can be written as:

y =x^2 - 6x + 13

We can see that this is the table for a quadratic equation, there we can see that we have the vertex at (3, -4), then if the leading coefficient is a, we can write the equation in the vertex form as:

y = a*(x - 3)^2 - 4

Now, also notice that the function passes through (0, 5), then:

5 = a*(0 - 3)^2 - 4

5 = 9a - 4

9 = 9a

1 = a

The qudratic is:

y = (x - 3)^2 - 4

Expanding it we get:

y = x^2 - 6x + 9 + 4

y =x^2 - 6x + 13

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The integral of x²(49-x²)³/² dx is [tex](1/2)(49-x^2)^{(5/2)} - (5/2)x^2(49-x^2)^{(3/2)} + C[/tex], where C is the constant of integration.

To evaluate the integral, we can use substitution. Let u = 49-x², then du/dx = -2x, or dx = -du/(2x). Substituting this into the integral, we get:

∫ x²(49-x²)³/² dx = ∫ x²u³/²(-du/(2x)) = -1/2 ∫ u³/² du = -1/2 * (2/5) u^(5/2) + C

Substituting u = 49-x² back into the expression, we get:

[tex]= -(1/5)(49-x^2)^{(5/2)} + C'x[/tex]

To simplify this expression, we can distribute the factor of x and express the constant of integration as C' = C/2. Thus, we have:

[tex]= (1/2)(49-x^2)^{(5/2)} - (5/2)x^2(49-x^2)^{(3/2)} + C[/tex]

Therefore, the integral is [tex](1/2)(49-x^2)^{(5/2)} - (5/2)x^2(49-x^2)^{(3/2)} + C[/tex], where C is the constant of integration.

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we can make an educated guess and say that the total length of the six cars is likely to be close to the length of the roller coaster track they are traveling on.

To find the total length of the six cars, we need to add up the length of each car. Without any information about the length of each car, we cannot provide an exact answer. However, we can make an educated guess and say that the total length of the six cars is likely to be close to the length of the roller coaster track they are traveling on. This is because roller coaster tracks are designed to accommodate the length of the cars and provide a smooth ride. Therefore, the answer is likely to be close to the length of the roller coaster track.

Based on the information provided, I understand that you need to determine the total length of the six cars of a roller coaster. To provide an accurate answer, I would need some more details like the length of each car or the average length of a car. Once I have that information, I can help you find the closest total length of the six cars using the principles of geometry.

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a.) Both defective cylinders are selected:  the probability of both defective cylinders being selected is 1/28. b.) No defective cylinder is selected:  the probability of no defective cylinder being selected is 15/28. c.) At least one defective cylinder is selected: the probability of selecting at least one defective cylinder is 13/28.

a. The probability of selecting both defective cylinders can be calculated by multiplying the probability of selecting the first defective cylinder (which is 2/8, or 1/4 since there are 2 defective cylinders out of 8 total) by the probability of selecting the second defective cylinder given that the first one was already selected (which is 1/3 since there are now only 3 cylinders left and only 1 of them is defective). So the probability of both defective cylinders being selected is (1/4) x (1/3) = 1/12.
b. The probability of selecting no defective cylinder can be calculated by selecting two non-defective cylinders from the six remaining ones. The probability of selecting the first non-defective cylinder is 6/8 (or 3/4) and the probability of selecting the second non-defective cylinder given that the first one was already selected is 5/7. So the probability of selecting no defective cylinder is (3/4) x (5/7) = 15/28.
c. The probability of selecting at least one defective cylinder can be calculated by subtracting the probability of selecting no defective cylinder from 1 (since either at least one defective cylinder is selected or no defective cylinder is selected). So the probability of selecting at least one defective cylinder is 1 - (15/28) = 13/28.

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The series converges to the sum 7 / (1 + 2z) for all values of z such that |z| < 1/2.

To find the sum of the series, we can rewrite it as:

7(1 - 2z + 4z² - 8z³ + ⋯)

This is a geometric series with first term 1 and common ratio -2z. The sum of a geometric series with first term a and common ratio r is given by:

sum = a / (1 - r)

In this case, we have a = 7 and r = -2z. Thus, the sum of the series is:

sum = 7 / (1 + 2z)

To determine the domain where the series converges to this sum, we must ensure that the common ratio |r| < 1. That is:

|-2z| < 1

or

|z| < 1/2

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Answer:

D)619.1

Step-by-step explanation:

The formula for finding the volume of this figure, a cone, is:

[tex]V=\pi r^{2} \frac{h}{3}[/tex]

and we can substitute our values into it:

[tex]V=(3.14) 6.5^{2} \frac{14}{3}[/tex]

to get V=619.1

Hope this helps :)

Answer:

The rate of change for height is 1/6 cubic feet/min at 2 min.

Step-by-step explanation:

The income has increased by 10%.

Let's assume that the original price of the product was P, and the original quantity sold was Q. Then, the original income (revenue) would be:

Income1 = P x Q

After the price decreased by 12%, the new price would be:

P2 = P - 0.12P = 0.88P

And the new quantity sold would be 25% higher than the original quantity, or:

Q2 = 1.25Q

The new income would be:

Income2 = P2 x Q2 = (0.88P) x (1.25Q) = 1.1PQ

Therefore, the percent change in income would be:

[(Income2 - Income1) / Income1] x 100% = [(1.1PQ - PQ) / PQ] x 100%

= (0.1PQ / PQ) x 100%

= 10%

So the income has increased by 10%.

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The side lengths mentioned in option E are the sides of the right angled triangle.

Three given side lengths of a triangle a, b and c are said to be the sides of the right triangled triangle if -

a² = b² + c²

We can write for the given set of numbers in option 5 as -

(13)² = (12)² + (5)²

169 = 144 + 25

169 = 169

LHS = RHS

So, the side lengths mentioned in option E are the sides of the right angled triangle.

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The average value of f(x) = 3x^2 + 5x on the interval [3, 7] is 109, and the value of C for which f(c) = f_average is approximately 3.99.

a) To determine the average value of f(x) on the interval [7, 3], you need to calculate the integral of the function over the interval and divide it by the width of the interval. First, we need to correct the interval [7, 3] to [3, 7] since the smaller number should come first. The width of the interval is 7 - 3 = 4.

∫(3x^2 + 5x) dx from 3 to 7 = [(x^3 + (5/2)x^2) evaluated from 3 to 7] = [(7^3 + (5/2)7^2) - (3^3 + (5/2)3^2)] = 436.

Now, we divide this by the width of the interval: f_average = 436/4 = 109.

b) To find the value of C, we need to solve f(c) = f_average on the interval [3, 7]. We are given that f(c) = f_average = 109, so we set the function equal to the average value and solve for c:

3c^2 + 5c = 109

3c^2 + 5c - 109 = 0

This quadratic equation can be solved using the quadratic formula, factoring, or other methods, but it does not factor easily. Using the quadratic formula, you will find two possible values for c: approximately 3.99 and -9.16. Since -9.16 is not within the interval [3, 7], the value of c is approximately 3.99.

So, On the range [3, 7], the average value of f(x) = 3x2 + 5x is 109, and the value of C for which f(c) = f_average is roughly 3.99.

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Complete question:

f(x) = 3x^2 + 5x in (7,3) a) Determine faverage in [7,3] b) Find the value of C, f(c)= fave in [7,3]