Find the diffrence
(-9x^3+x^2+x-3)-(-5x^3-7x^2-3x+4)
You should get -4x^3+8x^2+4x-7
URGENT
SHOW ALL WORK

Answers

Answer 1
Once you distribute that negative (or multiply each term by -1) everything lines up!
Find The Diffrence(-9x^3+x^2+x-3)-(-5x^3-7x^2-3x+4)You Should Get -4x^3+8x^2+4x-7URGENT SHOW ALL WORK

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2 A population grows at a rate of P'(t) = 800te where P(t) is the population after t months. 3 a) Find a formula for the population size after t months, given that the population is 2800 at t = 0. Select the correct interpretation of the population size of 2800. Check all that apply. The initial population size is 2800 OP'(0)-2800 OP(0) = 2800 P(t) = people. (Round to the b) The size of the population after 2 months is about nearest person as needed.)

Answers

a) To find a formula for the population size after t months, we need to integrate the given rate equation with respect to t.

∫P'(t) dt = ∫800te dt

P(t) = 400t^2e

Given that the population is 2800 at t=0, we can substitute these values in the above equation and solve for the constant of integration.

2800 = 400(0)^2e

e = 7

Therefore, the formula for the population size after t months is:

P(t) = 2800e^(400t^2)

The correct interpretations of the population size of 2800 are:

- The initial population size is 2800.

- P(0) = 2800.

b) To find the size of the population after 2 months, we can substitute t=2 in the above formula.

P(2) = 2800e^(400(2)^2)

P(2) ≈ 1.23 x 10^9 people (rounded to the nearest person)

Therefore, the size of the population after 2 months is about 1.23 billion people.

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For the convex set C = {(2,3))} + 1 y 51,1% is = +}05 2,0 Sy} (a) Which points are vertices of C? (0,14) (5,0) 0 (0,0) (560/157,585/157) (0,5) (13,0) (585/157,560/157) (b) Give the coordinates of a po

Answers

the vertices of C are:

(1, 33/2), (6, 5/2), (1, 5/2), (717/157, 935/314), (1, 15/2), (14, 5/2), (942/157, 1135/314)

What are Vertices?

Vertices are defined as the highest point or the point where two straight lines intersect. Examples of peaks are mountain tops. They are also the lines that subtend an angle in a triangle.

(a) To determine the vertices of the convex set C, we need to consider the extreme points of the set. In this case, the set C is defined as the translation of the point (2,3) by the vector (1, 5/2). So, the translation can be written as:

C = {(2,3)} + (1, 5/2)

Let's calculate the vertices of C by adding the translation vector to each point in the given options:

Adding (1, 5/2) to (0,14):

(0,14) + (1, 5/2) = (1, 14 + 5/2) = (1, 33/2)

Adding (1, 5/2) to (5,0):

(5,0) + (1, 5/2) = (5 + 1, 0 + 5/2) = (6, 5/2)

Adding (1, 5/2) to (0,0):

(0,0) + (1, 5/2) = (0 + 1, 0 + 5/2) = (1, 5/2)

Adding (1, 5/2) to (560/157, 585/157):

(560/157, 585/157) + (1, 5/2) = (560/157 + 1, 585/157 + 5/2) = (717/157, 935/314)

Adding (1, 5/2) to (0,5):

(0,5) + (1, 5/2) = (0 + 1, 5 + 5/2) = (1, 15/2)

Adding (1, 5/2) to (13,0):

(13,0) + (1, 5/2) = (13 + 1, 0 + 5/2) = (14, 5/2)

Adding (1, 5/2) to (585/157, 560/157):

(585/157, 560/157) + (1, 5/2) = (585/157 + 1, 560/157 + 5/2) = (942/157, 1135/314)

Therefore, the vertices of C are:

(1, 33/2), (6, 5/2), (1, 5/2), (717/157, 935/314), (1, 15/2), (14, 5/2), (942/157, 1135/314)

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35 percent of customers entering an electronics store will purchase a desk- top PC, 25 percent will purchase a laptop, 20 percent will purchase a digital camera and 20 percent will just be browsing. If on a given day, 10 customers enter the store, what is the probability that 3 purchase a desktop PC, 3 purchase
a laptop, 2 a digital camera, and 2 purchase nothing.

Answers

The probability that 3 out of 10 customers will purchase a desktop PC, 3 will purchase a laptop, 2 will purchase a digital camera, and 2 will purchase nothing is P = (0.35)^3 * (0.25)^3 * (0.20)^2 * (0.20)^2

The probability of a customer purchasing a desktop PC is 35%, which means the probability of exactly 3 customers purchasing a desktop PC out of 10 can be calculated using the binomial probability formula. Similarly, the probabilities for 3 customers purchasing a laptop (25%) and 2 customers purchasing a digital camera (20%) can be calculated in the same way.

Since the events are independent, the probability of each event occurring can be multiplied together to find the probability of the combined event. Therefore, the probability of 3 customers purchasing a desktop PC, 3 customers purchasing a laptop, 2 customers purchasing a digital camera, and 2 customers purchasing nothing can be calculated as the product of these probabilities

P = (0.35)^3 * (0.25)^3 * (0.20)^2 * (0.20)^2

Evaluating this expression will give the probability of this specific combination occurring. The result can be rounded to the desired number of decimal places or expressed as a fraction.

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2. Minimise the function f(21,02) = (6 - 4x12 + (3.02 + 5)2 subject to X2 >e" Hint: The equations 16 In(r) -24 +9p2 + 15r = 0 16r - 24 +9e2r + 15e" = 0 each have only one real root.

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The minimum value of the function f(21,02) = (6 - 4x12 + (3.02 + 5)2 subject to X2 > e is subject to the given constraints.

To minimize the function f(21,02) = (6 - 4x12 + (3.02 + 5)2, we need to find the values of x and e that satisfy the given constraints. The constraint X2 > e suggests that the value of x squared must be greater than e.

Additionally, we are given two equations: 16ln(r) - 24 + 9p2 + 15r = 0 and 16r - 24 + 9e2r + 15e" = 0. It is stated that each of these equations has only one real root.

To find the minimum value of the function f, we need to solve the system of equations and identify the real root. Once we have the values of x and e, we can substitute them into the function and calculate the minimum value.

By utilizing appropriate mathematical techniques such as substitution or numerical methods, we can solve the equations and find the real root. Then, we can substitute the obtained values of x and e into the function f(21,02) to calculate the minimum value.

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Previous Problem Problem List Next Problem (1 point) Use the Fundamental Theorem of Calculus to evaluate the definite integral. L 3 dx = x2 + 1 =

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The value of the definite integral ∫[0,3] dx = x^2 + 1 is 3.

To evaluate the definite integral ∫[0,3] dx = x^2 + 1, we can apply the Fundamental Theorem of Calculus. According to the theorem, if F(x) is an antiderivative of f(x), then:

∫[a,b] f(x) dx = F(b) - F(a).

In this case, we have f(x) = 1, and its antiderivative F(x) = x. Therefore, we can evaluate the definite integral as follows:

∫[0,3] dx = F(3) - F(0) = 3 - 0 = 3.

So, the value of the definite integral ∫[0,3] dx = x^2 + 1 is 3.

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whats the inverse of f(x)=(x-5)^2+9?

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The inverse of the function f(x) = (x-5)² + 9 is f⁻¹(x) = √(x - 9) + 5.

To find the inverse of the function f(x) = (x-5)² + 9, we can follow these steps:

Step 1: Replace f(x) with y: y = (x-5)² + 9.

Step 2: Swap the variables x and y: x = (y-5)² + 9.

Step 3: Solve the equation for y.

Start by subtracting 9 from both sides: x - 9 = (y-5)².

Step 4: Take the square root of both sides: √(x - 9) = y - 5.

Step 5: Add 5 to both sides: √(x - 9) + 5 = y.

Step 6: Replace y with the inverse notation f⁻¹(x): f⁻¹(x) = √(x - 9) + 5.

Therefore, the inverse of the function f(x) = (x-5)² + 9 is f⁻¹(x) = √(x - 9) + 5.

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I 4. A cylindrical water tank has height 8 meters and radius 2 meters. If the tank is filled to a depth of 3 meters, write the integral that determines how much work is required to pump the water to a pipe 1 meter above the top of the tank? Use p to represent the density of water and g for the gravity constant. Do not evaluate the integral.

Answers

The integral that determines how much work is required to pump the water to a pipe 1 meter above the top of the tank is:

**W = ∫6pπr²hg dh**

The work required to pump the water to a pipe 1 meter above the top of the tank can be found using the formula:

W = Fd

where W is the work done, F is the force required to lift the water, and d is the distance the water is lifted.

The force required to lift the water can be found using:

F = mg

where m is the mass of the water and g is the acceleration due to gravity.

The mass of the water can be found using:

m = pV

where p is the density of water and V is the volume of water.

The volume of water can be found using:

V = Ah

where A is the area of the base of the tank and h is the height of the water.

The area of the base of the tank can be found using:

A = πr²

where r is the radius of the tank.

Therefore, we have:

V = Ah = πr²h

m = pV = pπr²h

F = mg = pπr²hg

d = 8 - 3 + 1 = 6 meters

So, the integral that determines how much work is required to pump the water to a pipe 1 meter above the top of the tank is:

**W = ∫6pπr²hg dh**

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dx How many terms of a power series are required sinx to approximate ó x with an error less than 0.0001? A. 4 B. 3 C. The power series diverges. D. 2

Answers

The number of terms required is D. 2.

The answer to the question can be determined by considering the Taylor series expansion of the function sin(x).

The Taylor series expansion for sin(x) is given by:

sin(x) = x - (x^3/3!) + (x^5/5!) - (x^7/7!) + ...

The error of the approximation can be estimated using the remainder term in the Taylor series expansion, which is given by:

R_n(x) = f^(n+1)(c) * (x-a)^(n+1) / (n+1)!

where f^(n+1)(c) is the (n+1)-th derivative of f(x) evaluated at some point c between a and x.

To approximate sin(x) with an error less than 0.0001, we need to find the smallest value of n such that the remainder term is less than 0.0001 for all x within the desired range.

In this case, since the Taylor series for sin(x) is an alternating series and the terms decrease in magnitude, we can use the Alternating Series Estimation Theorem to find the number of terms required. According to the theorem, the error of the approximation is less than the absolute value of the first neglected term.

In the given Taylor series for sin(x), we can see that the first neglected term is (x^7/7!). Therefore, we need to find the value of n such that (x^7/7!) is less than 0.0001 for all x within the desired range.

Simplifying the inequality:

(x^7/7!) < 0.0001

x^7 < 0.0001 * 7!

x^7 < 0.0001 * 5040

x^7 < 0.504

Taking the seventh root of both sides:

x < 0.504^(1/7)

x < 0.667

Therefore, to approximate sin(x) with an error less than 0.0001, we need to choose n such that the approximation is valid for x values less than 0.667. Since the question asks for the number of terms required, the answer is D. 2, as we only need the terms up to the second degree (x - (x^3/3!)) to satisfy the given error condition for x values less than 0.667.

It's important to note that the Taylor series expansion for sin(x) is an infinite series, but we can truncate it to a finite number of terms based on the desired level of accuracy.

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Use the four-step process to find f'(x) and then find f'(1), f'(2), and f'(3). 7 f(x) = 6 + х f'(x) = x) = C

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Answer:

using four step process we found that f'(1) = 1, f'(2) = 1, and f'(3) = 1.

Step-by-step explanation:

To find f'(x), the derivative of f(x), we can apply the four-step process:

Identifying the function f(x).

f(x) = 6 + x

Apply the power rule of differentiation.

For any constant C, the derivative of C with respect to x is 0.

The derivative of x with respect to x is 1.

Combine the derivatives obtained in Step 2.

Since the derivative of a constant is 0, we only need to consider the derivative of x.

f'(x) = 0 + 1

      = 1

Step 4: Evaluate f'(x) at the given values of x.

  f'(1) = 1

  f'(2) = 1

  f'(3) = 1

Therefore, f'(1) = 1, f'(2) = 1, and f'(3) = 1.

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Find the gradient of the following function 22 - 3y2 + 2 f(2, y, z) 2x + y - 43

Answers

The partial derivatives of f(x, y, z) are as follows:

∂f/∂x = 2x

∂f/∂y = -6y

∂f/∂z = 2

Arranging these partial derivatives as a vector gives us the gradient of the function:

∇f = [∂f/∂x, ∂f/∂y, ∂f/∂z] = [2x, -6y, 2]

So, the gradient of the function f(2, y, z) is:

∇f(2, y, z) = [2(2), -6y, 2] = [4, -6y, 2]

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How do you do this?
80. Find the area bounded by f(x) = (In x)2 , the x-axis, x=1, x=e? х 2 а. 8 b. C. 4 3 d. 1 3 olm 를 S zlu lol > de

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The area bounded by the function f(x) = (ln x)^2, the x-axis, x = 1, and x = e can be determined by integrating the function within the given bounds.

To find the area, we need to integrate the function (ln x)^2 with respect to x within the given bounds. First, let's understand the function (ln x)^2. The natural logarithm of x, denoted as ln x, represents the power to which the base e (approximately 2.71828) must be raised to obtain x. Therefore, (ln x)^2 means taking the natural logarithm of x and squaring the result.

To calculate the area, we integrate the function (ln x)^2 from x = 1 to x = e. The integral represents the accumulation of infinitesimally small areas under the curve. Evaluating this integral gives us the area bounded by the curve, the x-axis, x = 1, and x = e.

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The function f(x) = – 2x + 27:02 – 48. + 8 has one local minimum and one local maximum. This function has a local minimum at = with value and a local maximum at x = with value Question Help: Video

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The function f(x) = – 2x² + 27x² – 48x + 8 has one local minimum and one local maximum. This function has a local minimum at x = 12/13 with value = 52.

What is the exponential function?

An exponential function is a mathematical function of the form: f(x) = aˣ

where "a" is a constant called the base, and "x" is a variable. Exponential functions can be defined for any base "a", but the most common base is the mathematical constant "e" (approximately 2.71828), known as the natural exponential function.

To find the local minimum of the function f(x) = -2x² + 27x² - 48x + 8, we need to determine the critical points of the function.

First, we take the derivative of the function f(x) with respect to x:

f'(x) = d/dx (-2x² + 27x² - 48x + 8)

= -4x + 54x - 48

= 52x - 48

Next, we set the derivative equal to zero to find the critical points:

52x - 48 = 0

Solving for x, we have:

52x = 48

x = 48/52

x = 12/13

So, the critical point occurs at x = 12/13.

To determine if this critical point is a local minimum or maximum, we can examine the second derivative of the function.

Taking the second derivative of f(x):

f''(x) = d²/dx² (-2x² + 27x² - 48x + 8)

= d/dx (52x - 48)

= 52

Since the second derivative f''(x) = 52 is a positive constant, it indicates that the function is concave up everywhere, implying that the critical point x = 12/13 is a local minimum.

To find the value of the function at the local minimum, we substitute x = 12/13 into the original function:

f(12/13) = -2(12/13)² + 27(12/13)² - 48(12/13) + 8

Evaluating the expression, we can find the value of the function at the local minimum.

Hence, The function f(x) = – 2x² + 27x² – 48x + 8 has one local minimum and one local maximum. This function has a local minimum at x = 12/13 with value = 52.

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Help due for a grade 49 percent thx if you help asap will give brainliest when I have time

Answers

The area of the composite figure is

99 square in

How to find the area of the composite figure

The area is calculated by dividing the figure into simpler shapes.

The simple shapes used here include

rectangle and

triangle

Area of rectangle is calculated by length x width

= 12 x 7

= 84 square in

Area of triangle is calculated by 1/2 base x height

= 1/2 x 5 x 6

= 15 square in

Total area

= 84 square in + 15 square in

=  99 square in

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please and thank you chegg tutor
ex-1 L'Hosptital's Rule can be used to compute the following limit: lim 4x x-0 True O False 5 pts Question 9 What is the value of the limit: lim ex-1? Express the answer in decimal form (not as a frac

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The statement "L'Hospital's Rule can be used to compute the limit [tex]lim (4x / (x-0))[/tex]as x approaches 0" is True. L'Hospital's Rule is a powerful tool used to evaluate limits of indeterminate forms such as 0/0 or ∞/∞.

L'Hospital's Rule can indeed be used to compute the limit [tex]lim (4x / (x-0))[/tex]as x approaches 0. L'Hospital's Rule is a method used to evaluate limits of indeterminate forms, such as 0/0 or ∞/∞. By applying L'Hospital's Rule, we can differentiate the numerator and denominator with respect to x, and then evaluate the limit again. In this case, the limit can be computed using L'Hospital's Rule as 4/1, which equals 4. Therefore, the statement is true.

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Find the volume of a cone with a base diameter of 9 and a height of 12. Write the exact volume in terms of pi , and be sure to include the correct unit in your answer.

Answers

Volume of a cone is 1/3Bh so your base 20.25(pi) and height is 12, times that and itll make 243, divided by the 1/3 is 81

81 is your volume

Answer:

81π cubic units

Step-by-step explanation:

The formula for volume of cone is given by:

V = 1/3πr^2h, where

V is the volume in cubic units,r is the radius of the circular base,and h is the height of the cone.

Step 1:  Find radius:

We know that the diameter, d, is simply twice the radius.  Thus, we can find the radius of the circular base by dividing the given diameter by 2:

d = 2r

d/2 = r

9/2 = r

4.5 units = r

Thus, the radius of the circular base is 4.5 units.

Step 2:  Find volume and leave in terms of pi:

We can find the volume in terms of pi by plugging in 4.5 for r and 12 for h and simplifying:

V = 1/3π(4.5)^2(12)

V = 1/3π(20.25)(12)

V = 1/3π(243)

V = 81π cubic units

Thus, the volume of the cone in terms of pi is 81π cubic units.

12. Find the equation of the tangent line to f(x) = 2ex at the point where x = 1. a) y = 2ex + 4e b) y = 2ex + 2 c) y = 2ex + 1 d) y = 2ex e) None of the above

Answers

The equation of the tangent line to [tex]\(f(x) = 2e^x\)[/tex] at the point where [tex]\(x = 1\)[/tex] is [tex]\(y = 2e^x + 2\)[/tex].

To find the equation of the tangent line, we need to determine the slope of the tangent at the point [tex]\(x = 1\)[/tex]. The slope of the tangent line is equal to the derivative of the function at that point.

Taking the derivative of [tex]\(f(x) = 2e^x\)[/tex] with respect to x, we have:

[tex]\[f'(x) = \frac{d}{dx} (2e^x) = 2e^x\][/tex]

Now, substituting x = 1 into the derivative, we get:

[tex]\[f'(1) = 2e^1 = 2e\][/tex]

So, the slope of the tangent line at [tex]\(x = 1\)[/tex] is 2e.

Using the point-slope form of a linear equation, where [tex]\(y - y_1 = m(x - x_1)\)[/tex], we can plug in the values [tex]\(x_1 = 1\), \(y_1 = f(1) = 2e^1 = 2e\)[/tex], and [tex]\(m = 2e\)[/tex] to find the equation of the tangent line:

[tex]\[y - 2e = 2e(x - 1)\][/tex]

Simplifying this equation gives:

[tex]\[y = 2ex + 2e - 2e = 2ex + 2\][/tex]

Therefore, the equation of the tangent line to [tex]\(f(x) = 2e^x\)[/tex] at the point where [tex]\(x = 1\)[/tex] is [tex]\(y = 2e^x + 2\)[/tex]. Hence, the correct option is (b) [tex]\(y = 2e^x + 2\)[/tex].

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. A ferris wheel with radius 136 m is mounted on a stand so that the lowest point on the circle is 2m above the ground. The ferris wheel turns counterclockwise and completes one full rotation in 30 minutes. You are sitting in a cart at the lowest point on the ferris wheel. a. Draw a picture of the ferris wheel and label a point P at the bottom of the circle for your location. Also label the radius and height from the ground. 1 b. Draw a graph where x = time (minutes) and y = height off the ground. Do not use a screenshot of Desmos. Upload a photo of your drawing. I c. Find an equation for the graph using sin(x) or cos(x) Amplitude: Period: Midline: Horizontal shift (could be 0): Equation:

Answers

the equation for the graph representing the height off the ground (y) as a function of time (x) is:

y = 136 * sin((π/15) * x) + 2

What is Graph?

A graph of a function is a special case of a relation. In science, engineering, technology, finance, and other areas, graphs are tools used for many purposes.

a. Here is a description of the picture of the Ferris wheel:

The Ferris wheel has a radius of 136 m.

The lowest point on the circle is labeled as point P.

The height from the ground to point P is 2 m.

The radius of the Ferris wheel is labeled.

c. To find an equation for the graph using sine or cosine functions, we can start by considering the properties of the function:

Amplitude: The amplitude of the function represents the maximum displacement from the midline. In this case, the amplitude is equal to the radius of the Ferris wheel, which is 136 m.

Period: The period of the function is the time it takes for one complete cycle. Given that the Ferris wheel completes one full rotation in 30 minutes, the period is 30 minutes.

Midline: The midline of the function represents the average or mean value. In this case, the midline corresponds to the height from the ground to point P, which is 2 m.

Horizontal shift: Since you are sitting at the lowest point of the Ferris wheel initially, there is no horizontal shift. The graph starts at the origin.

Using this information, we can write the equation for the graph:

y = A * sin((2π/P) * (x - h)) + k

where:

A is the amplitude (136 m)

P is the period (30 minutes)

h is the horizontal shift (0)

k is the midline (2 m)

Substituting the values into the equation, we have:

y = 136 * sin((2π/30) * x) + 2

Therefore, the equation for the graph representing the height off the ground (y) as a function of time (x) is:

y = 136 * sin((π/15) * x) + 2

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Integration and volumes Consider the solld bounded by the two surfaces z=f(x,y)=1-3and z = g(x,y) = 2.2 and the planes y = 1 and y = -1 2 1.5 N 1 0.5 0 o 0.5 0 -0.5 y -0.5 0.5 X 0.5 0.5 -0.5 у 0.5

Answers

The solid bounded by the surfaces [tex]z=f(x,y)=1-3*x and z=g(x,y)=2.2[/tex], and the planes y=1 and y=-1, can be calculated by evaluating the volume integral over the given region.

To calculate the volume of the solid, we need to integrate the difference between the upper and lower surfaces with respect to x, y, and z within the given bounds. First, we find the intersection of the two surfaces by setting f(x,y) equal to g(x,y), which gives us the equation[tex]1-3*x = 2.2.[/tex]Solving for x, we find x = -0.4.

Next, we set up the triple integral in terms of x, y, and z. The limits of integration for x are -0.4 to 0, the limits for y are -1 to 1, and the limits for z are f(x,y) to g(x,y). The integrand is 1, representing the infinitesimal volume element.

Using these limits and performing the integration, we can calculate the volume of the solid bounded by the given surfaces and planes.

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A mass of 2 kg stretches a spring 10 cm. The mass is acted on by an external force of 10 sin(2t) N and moves in a medium that imparts a viscous force of 2 N when the speed of the mass is 6 cm/s. If the mass is set in motion from its equilibrium position with an initial velocity of 2 cm/s, find the displacement of the mass, measured in meters, at any time t. y =

Answers

To find the displacement of the mass at any time t, we can use the equation of motion for a mass-spring system with damping:

m * y'' + c * y' + k * y = F(t)

Where:

m = mass of the object (2 kg)

y = displacement of the mass (in meters)

y' = velocity of the mass (in meters per second)

y'' = acceleration of the mass (in meters per second squared)

c = damping coefficient (in N*s/m)

k = spring constant (in N/m)

F(t) = external force acting on the mass (in N)

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dy Evaluate at the given point. dx 5y3 - 57 = x3 – 9y; (1,2) dy The value of at the point (1,2) is ) . dx

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Finding the derivative of the above equation with respect to x is necessary before substituting x = 1 and y = 2 to get dy/dx at the location (1,2).

5y3 - 57 = x3 - 9y is the given equation.

Using the chain rule to differentiate both sides with regard to x, we obtain:

3x2 - 9 * dy/dx = 15y2 * dy/dx.

With the terms rearranged, we have:

9 * dy/dx plus 15y2 * dy/dx equals 3x2.

By subtracting dy/dx, we obtain:

(15y + 9 + dy/dx) = 3x2.

Let's now replace x with 1 and y with 2:

(15(2)^2 + 9) * dy/dx = 3(1)^2.

(60 + 9) * dy/dx = 3.

69 * dy/dx = 3.

When you divide both sides by 69, you get:

dy/dx = 3/69 = 1/23.

As a result, 1/23 is the value of dy/dx at the position (1,2).

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find the radius of convergence, r, of the series. [infinity] (−1)n (x − 6)n 4n 1 n = 0

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The radius of convergence, r, is 4. The series converges for values of x within a distance of 4 units from the center x = 6.

To find the radius of convergence, r, of the series ∑ [tex](-1)^n (x - 6)^n / (4^n)[/tex], we can use the ratio test. The radius of convergence represents the distance from the center of the series (x = 6) within which the series converges.

The ratio test states that for a series ∑ [tex]a_n[/tex], if the limit of the absolute value of the ratio of consecutive terms is less than 1, the series converges. Mathematically, if lim |[tex]a_{(n+1)}/a_n[/tex]| < 1, then the series converges.

In our case, the series is given by ∑ [tex](-1)^n (x - 6)^n / (4^n)[/tex]. To apply the ratio test, we calculate the ratio of consecutive terms:

|[tex](a_{(n+1)}/a_n)[/tex]| = |[tex]((-1)^{(n+1)} (x - 6)^{(n+1)} / (4^{(n+1)})) / ((-1)^n (x - 6)^n / (4^n))[/tex]|

Simplifying, we get: |(-1) (x - 6) / 4|

Taking the limit as n approaches infinity, we have:

lim |(-1) (x - 6) / 4| = |x - 6| / 4

For the series to converge, we need |x - 6| / 4 < 1.

This implies that the absolute value of x - 6 should be less than 4.

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Use Newton's method to approximate a solution of the equation e-2 Indicated. 14. 824 z3= The solution to the equation found by Newton's method is == 5x, starting with the initial guess

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To approximate a solution of the equation using Newton's method, we start with an initial guess and iteratively refine it using the formula:

xᵢ₊₁ = xᵢ - f(xᵢ)/f'(xᵢ)

Given the equation e^(-2x) + 14.824z^3 = 0, we want to solve for z. Let's assume our initial guess is x₀.

To apply Newton's method, we need to find the derivative of the equation with respect to z:

f(z) = e^(-2x) + 14.824z^3

f'(z) = 3(14.824z^2)

Now, we can iterate using the formula until we reach a desired level of accuracy:

x₁ = x₀ - (e^(-2x₀) + 14.824x₀^3)/(3(14.824x₀^2))

x₂ = x₁ - (e^(-2x₁) + 14.824x₁^3)/(3(14.824x₁^2))

Continue this process until you reach the desired level of accuracy or convergence.

Please note that the provided equation seems to involve both z and x variables. Make sure to clarify the equation and the variable you want to approximate a solution for.

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suppose that the slope coefficient for a particular regressor x has a p-value of 0.03. we would conclude that the coefficient is:

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If the p-value for the slope coefficient of a particular regressor x is 0.03, we would conclude that the coefficient is statistically significant at a 5% level of significance.


- A p-value is a measure of the evidence against the null hypothesis. In this case, the null hypothesis would be that the slope coefficient of x is equal to zero.
- A p-value of 0.03 means that there is a 3% chance of observing a coefficient as large or larger than the one we have, assuming that the null hypothesis is true.
- A p-value less than the level of significance (usually 5%) is considered statistically significant. This means that we reject the null hypothesis and conclude that there is evidence that the coefficient is not equal to zero.
- In practical terms, a significant coefficient indicates that the variable x is likely to have an impact on the dependent variable in the regression model.

Therefore, if the p-value for the slope coefficient of a particular regressor x is 0.03, we can conclude that the coefficient is statistically significant at a 5% level of significance, and that there is evidence that x has an impact on the dependent variable in the regression model.

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A pool contains 10000 kg of water at t = 0. Bob pumps water into the pool at the rate of 200 kg/s. Meanwhile, water starts pumping out of the pool at the rate t^2 at time t. 1. find the differential e

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The inflow rate is constant and can be denoted as 200 kg/s.

to find the differential equation that describes the rate of change of the water in the pool, we need to consider the inflow and outflow rates.

given:

- the initial mass of water in the pool is 10,000 kg at t = 0.

- bob pumps water into the pool at a constant rate of 200 kg/s.

- the outflow rate is given by t² kg/s at time t.

let's denote the mass of water in the pool at time t as m(t). we can now analyze the rates of change:

1. inflow rate: bob pumps water into the pool at a constant rate of 200 kg/s. 2. outflow rate: the outflow rate is given by t² kg/s. this means that at any given time t, the rate at which water leaves the pool is t² kg/s.

the rate of change of the water in the pool, dm(t)/dt, is equal to the difference between the inflow and outflow rates.

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While measuring the side of a cube, the percentage error
incurred was 3%. Using differentials, estimate the percentage error
in computing the volume of the cube.
a) 0.09%
b) 6%
c) 9%
d) 0.06%

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The estimated percentage error in computing the volume of the cube, given a 3% error in measuring the side length, is approximately 9% (option c).

To estimate the percentage error in the volume, we can use differentials. The volume of a cube is given by V = s^3, where s is the side length. Taking differentials, we have:

dV = 3s^2 ds

We can express the percentage error in volume as a ratio of the differential change in volume to the actual volume:

Percentage error in volume = (dV / V) * 100 = (3s^2 ds / s^3) * 100 = 3(ds / s) * 100

Given that the percentage error in measuring the side length is 3%, we substitute ds / s with 0.03:

Percentage error in volume = 3(0.03) * 100 = 9%

Therefore, the estimated percentage error in computing the volume of the cube is approximately 9% (option c).

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A random sample of 1500 adults in Ohio were asked if they support an increase in the state sales tax from 5% to 6%. Let X = the number in the sample that say they support the increase. Suppose that 4% of all adults in Ohio support the increase. Which of the following is the approximate standard deviation of X? z. 9.20 B. 0.04 с. 7.59 D. 60 0.24

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Option(C),  the approximate standard deviation of X is 7.59. The sample size increases, the standard deviation of X will decrease, making it a more reliable estimate of the population proportion.

To find the approximate standard deviation of X, we can use the formula:
σ = √(np(1-p))
Where n is the sample size (1500 in this case), p is the probability of success (0.04 in this case), and (1-p) is the probability of failure (0.96 in this case).
Substituting the values, we get:
σ = √(1500 x 0.04 x 0.96)
σ = √57.6
σ ≈ 7.59
Therefore, the approximate standard deviation of X is 7.59. Option C is the correct answer.
The standard deviation is a measure of how spread out a set of data is from the mean. In this case, the standard deviation of X represents how much the number of people who support the increase in the state sales tax varies from sample to sample.
As per the given information, 4% of all adults in Ohio support the increase. We can assume that this is the population proportion. Since we are dealing with a sample of 1500 adults in Ohio, we need to calculate the standard deviation of the sample proportion (X), which is an estimate of the population proportion.
Using the formula σ = √(np(1-p)), we find that the standard deviation of X is approximately 7.59. This means that if we were to take multiple random samples of 1500 adults from Ohio and ask them about their support for the sales tax increase, we can expect the number of supporters to vary by about 7.59 on average.
It's important to note that this is only an estimate, and the actual standard deviation of X may differ slightly from 7.59 due to sampling error. However, as the sample size increases, the standard deviation of X will decrease, making it a more reliable estimate of the population proportion.

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The marginal cost for printing a paperback book at a small publishing company is c(p) = $0.018 per page where p is the number of pages in the book. A 880 page book has a $19.34 production cost. Find the production cost function C(p). C(p) = $

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The marginal cost function gives us the cost per page, but to find the production cost function C(p), we need to find the total cost for a given number of pages.

Given that the marginal cost is $0.018 per page, we can set up the integral to find the total cost:

C(p) = ∫[0, p] c(t) dt

Substituting the marginal cost function c(p) = $0.018, we have:

C(p) = ∫[0, p] 0.018 dt

Evaluating the integral, we have:

C(p) = 0.018t |[0, p]

C(p) = 0.018p - 0.018(0)

C(p) = 0.018p

So, the production cost function C(p) is C(p) = $0.018p.

Now, let's find the production cost for a 880-page book:

C(880) = $0.018 * 880

C(880) = $15.84

Therefore, the production cost for an 880-page book is $15.84.

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Find where y is defined as a function of x implicitly by the dc y equation below. –6x2 - y2 = 11 Suppose f contains a local extremum at c, but is NOT differentiable at c. Which of the following is true? A. f'(c) = 0 B. f'(c) < 0 C. f'(c) > 0 D. f'(c) does not exist.

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The statement "Suppose f contains a local extremum at c but is NOT differentiable at c" indicates that the function has a local extremum at point c, but its derivative does not exist at that point. Therefore, the correct answer is D. f'(c) does not exist.

When a function has a local extremum at a point c, the derivative of the function at that point is typically zero.

However, in this case, the function is stated to be not differentiable at point c. Differentiability is a necessary condition for a function to have a well-defined derivative at a particular point.

If a function is not differentiable at a point, it means that the function does not have a well-defined tangent line at that point, and consequently, the derivative does not exist.

This lack of differentiability can occur due to sharp corners, cusps, or vertical tangents, among other reasons.

Since the function f is not differentiable at point c, the derivative f'(c) does not exist. Therefore, the correct answer is D. f'(c) does not exist.

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Two balls are thrown upward from the edge of a cliff that is 432 ft above the ground. The first is thrown with an initial speed of 48 ft/s, and the other is thrown a second later with a speed of 24 ft/s. Lett be the number of seconds passed after the first ball is thrown. Determine the value of t at which the balls pass, if at all. If the balls do not pass each other, type "never" (in lower-case letters) as your answer. Note: Acceleration due to gravity is –32 ft/sec. t A stone is dropped from the upper observation deck (the Space Deck) of the CN Tower, 450 meters above the ground. (a) Find the distance s of the stone above ground level at time t, where time is measured in seconds. s(t) (b) How long (in seconds) does it take the stone to reach the ground? Time needed = seconds (C) With what velocity (in m/s) does it strike the ground? Velocity = meters per second (d) If the stone is thrown downward with a speed of 4 m/s, how long does it take (in seconds) for the stone to reach the ground? Time needed = seconds

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Two balls are thrown upward from the edge of a cliff. The first ball is thrown with an initial speed of 48 ft/s, and the second ball is thrown a second later with a speed of 24 ft/s. We need to determine the time, t, at which the balls pass each other. The balls pass each other at t = 3 seconds, it takes approximately 9.02 seconds for the stone to reach the ground, the stone strikes the ground with a velocity of approximately -88.596 m/s and  if the stone is thrown downward with a speed of 4 m/s, it takes approximately 9.05 seconds for the stone to reach the ground.

To solve this problem, we can use the kinematic equation for the vertical motion of an object: s(t) = s₀ + v₀t + (1/2)at²

where s(t) is the height of the ball at time t, s₀ is the initial position, v₀ is the initial velocity, a is the acceleration, and t is the time.

For the first ball: s₁(t) = 432 + 48t - 16t²

For the second ball: s₂(t) = 432 + 24(t - 1) - 16(t - 1)²

To find the time at which the balls pass each other, we set s₁(t) equal to s₂(t) and solve for t:

432 + 48t - 16t² = 432 + 24(t - 1) - 16(t - 1)²

Simplifying the equation and solving for t, we find: t = 3 seconds

Therefore, the balls pass each other at t = 3 seconds.

A stone is dropped from the upper observation deck (the Space Deck) of the CN Tower, which is 450 meters above the ground.

(a) To find the distance s of the stone above ground level at time t, we can use the kinematic equation for free fall: s(t) = s₀ + v₀t + (1/2)gt²

where s(t) is the height of the stone at time t, s₀ is the initial position, v₀ is the initial velocity, g is the acceleration due to gravity, and t is the time.

Given:

s₀ = 450 meters

v₀ = 0 (since the stone is dropped)

g = -9.8 m/s² (acceleration due to gravity)

Substituting these values into the equation, we have:

s(t) = 450 + 0t - (1/2)(9.8)t²

s(t) = 450 - 4.9t²

(b) To find how long it takes for the stone to reach the ground, we need to find the time when s(t) = 0: 450 - 4.9t² = 0

Solving this equation for t, we get:

t = √(450 / 4.9) ≈ 9.02 seconds

Therefore, it takes approximately 9.02 seconds for the stone to reach the ground.

(c) The stone strikes the ground with a velocity equal to the final velocity at t = 9.02 seconds. To find this velocity, we can use the equation:

v(t) = v₀ + gt

Given:

v₀ = 0 (since the stone is dropped)

g = -9.8 m/s² (acceleration due to gravity)

t = 9.02 seconds

Substituting these values into the equation, we have:

v(9.02) = 0 - 9.8(9.02)

v(9.02) ≈ -88.596 m/s

Therefore, the stone strikes the ground with a velocity of approximately -88.596 m/s.

(d) If the stone is thrown downward with a speed of 4 m/s, we need to find the time it takes for the stone to reach. If the stone is thrown downward with a speed of 4 m/s, we can determine the time it takes for the stone to reach the ground using the same kinematic equation for free fall: s(t) = s₀ + v₀t + (1/2)gt²

Given:

s₀ = 450 meters

v₀ = -4 m/s (since it is thrown downward)

g = -9.8 m/s² (acceleration due to gravity)

Substituting these values into the equation, we have: s(t) = 450 - 4t - (1/2)(9.8)t²

To find the time when the stone reaches the ground, we set s(t) equal to 0: 450 - 4t - (1/2)(9.8)t² = 0

Simplifying the equation and solving for t, we can use the quadratic formula: t = (-(-4) ± √((-4)² - 4(-4.9)(450))) / (2(-4.9))

Simplifying further, we get: t ≈ 9.05 seconds or t ≈ -0.04 seconds

Since time cannot be negative in this context, we discard the negative value.

Therefore, if the stone is thrown downward with a speed of 4 m/s, it takes approximately 9.05 seconds for the stone to reach the ground.

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Let D be the region bounded below by the cone z = √√x² + y² and above by the sphere x² + y² +2²= 25. Then the z-limits of integration to find the volume of D, using rectangular coordinates an

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The correct z-limits of integration to find the volume of the region D are given by option C, which is [tex]\sqrt{(x^{2} + y^{2} )} \leq z \leq \sqrt{25 - x^{2} - y^{2}}[/tex].

To determine the z-limits of integration, we need to consider the bounds of the region D. The region is bounded below by the cone [tex]z=\sqrt{(x^{2} + y^{2} )}[/tex] and above by the sphere [tex]x^{2} + y^{2} + z^{2} = 25[/tex].

The lower bound is defined by the cone, which is given by [tex]z=\sqrt{(x^{2} + y^{2} )}[/tex]. This means that the z-coordinate starts at the value  [tex]\sqrt{(x^{2} + y^{2} )}[/tex] when we integrate over the region.

The upper bound is defined by the sphere, which is given by [tex]x^{2} + y^{2} + z^{2} = 25[/tex]. By rearranging the equation, we have [tex]z^{2} = 25 - x^{2} - y^{2}[/tex]. Taking the square root of both sides, we obtain [tex]z=\sqrt{25-x^{2} -y^{2} }[/tex]. This represents the maximum value of z within the region.

Therefore, the correct z-limits of integration are  [tex]\sqrt{(x^{2} + y^{2} )} \leq z \leq \sqrt{25 - x^{2} - y^{2}}[/tex], which corresponds to option C. This choice ensures that we consider all z-values within the region D when integrating in the order [tex]dzdydx[/tex] to find its volume.

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The complete question is:

Let D be the region bounded below by the cone [tex]z=\sqrt{(x^{2} + y^{2} )}[/tex] and above by the sphere [tex]x^{2} + y^{2} + z^{2} = 25[/tex]. Then the z-limits of integration to find the volume of D, using rectangular coordinates and taking the order of integration as [tex]dzdydx[/tex] are:

A. [tex]25 - x^{2} - y^{2} \leq z \leq \sqrt{(x^{2} + y^{2} )}[/tex]

B. [tex]\sqrt{(x^{2} + y^{2} )} \leq z \leq 25 - x^{2} - y^{2}[/tex]

C. [tex]\sqrt{(x^{2} + y^{2} )} \leq z \leq \sqrt{25 - x^{2} - y^{2}}[/tex]

D. None of these

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