Maths. Scott and jason collect waste to be recycled. Scott collects 640 kilogramns of watse 89% of which can be recycled. . Jason collects 910 kilogramns of watse 63% of which can be recycled Work out who takes the greatest amount of recyclable waste and by how much

Answers

Answer 1

Jason collected the greatest amount of recyclable waste, exceeding Scott's collection by 3.7 kilograms.

To determine who collected the greatest amount of recyclable waste, we calculate the recyclable waste collected by each person. Scott collected 640 kilograms of waste, of which 89% can be recycled, resulting in 569.6 kilograms of recyclable waste. Jason collected 910 kilograms of waste, with 63% being recyclable, resulting in 573.3 kilograms of recyclable waste.

Comparing the two amounts, we find that Jason collected 3.7 kilograms more recyclable waste than Scott. Therefore, Jason collected the greatest amount of recyclable waste.

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Related Questions

Let R be a region in the xy − plane enclosed by the circle x^2+y^2=16, above the line y=2 and below the line y=√3 x.
i. Sketch R.
ii. Use double integral in polar coordinates to find the area of R.

Answers

The area of region R is 4π square units.

The region R is a shaded region in the xy-plane. It is enclosed by the circle x^2 + y^2 = 16 and is located above the line y = 2 and below the line y = √3x. The circle has a radius of 4 units and is centered at the origin. The line y = 2 is a horizontal line passing through the points (0, 2) and (-4, 2). The line y = √3x is a diagonal line passing through the origin with a slope of √3. The region R is the area between these curves.

To find the area of region R, we can use a double integral in polar coordinates. In polar coordinates, the equation of the circle becomes r^2 = 16, and the lines y = 2 and y = √3x can be represented by the equation θ = π/6 and θ = 2π/3, respectively.

The integral for the area of R in polar coordinates is given by:

A = ∫[θ₁, θ₂] ∫[r₁, r₂] r dr dθ

In this case, θ₁ = π/6, θ₂ = 2π/3, and r₁ = 0, r₂ = 4.

The integral becomes:

A = ∫[π/6, 2π/3] ∫[0, 4] r dr dθ

Integrating with respect to r first, we have:

A = ∫[π/6, 2π/3] (1/2)r^2 ∣[0, 4] dθ

  = ∫[π/6, 2π/3] (1/2)(4^2 - 0^2) dθ

  = ∫[π/6, 2π/3] 8 dθ

Evaluating the integral, we get:

A = 8θ ∣[π/6, 2π/3]

  = 8(2π/3 - π/6)

  = 8(π/2)

  = 4π

Therefore, the area of region R is 4π square units.

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Find if the given series is absolutely or conditionally converges n=1∑[infinity]​(−1)n+1 6n/n2​. Find the original knowing the transform F(p)=p(p2+9)1​−p5​.

Answers

The given series is conditionally convergent. The original function corresponding to the given transform F(p) is (p - p^7)/(p^2+9).

To determine if the series is absolutely or conditionally convergent, we can apply the Alternating Series Test. The given series can be written as ∑[n=1 to infinity] [tex]((-1)^(n+1) * (6n/n^2)).[/tex]

Let's check the conditions of the Alternating Series Test:

1. The terms of the series alternate in sign: The[tex](-1)^(n+1)[/tex] factor ensures that the terms alternate between positive and negative.

2. The absolute value of each term decreases: To check this, we can consider the absolute value of the terms [tex]|6n/n^2| = 6/n[/tex]. As n increases, 6/n tends to approach zero, indicating that the absolute value of each term decreases.

3. The limit of the absolute value of the terms approaches zero: lim(n→∞) (6/n) = 0.

Since all the conditions of the Alternating Series Test are satisfied, the given series is conditionally convergent. This means that the series converges, but if we take the absolute value of the terms, it diverges.

Regarding the second part of the question, the given transform F(p) = [tex]p/(p^2+9) - p^5[/tex] can be simplified by factoring the denominator:

F(p) = [tex]p/(p^2+9) - p^5[/tex]

    = [tex]p/(p^2+9) - p^5(p^2+9)/(p^2+9)[/tex]

    = [tex](p - p^7)/(p^2+9)[/tex]

So, the original function corresponding to the given transform F(p) is [tex](p - p^7)/(p^2+9).[/tex]

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when a number is subtracted from x the result is 6. what is that number?6 - xx - 66 + x6 - ( x - 6)

Answers

The number we are looking for is x - 6.

To determine the number that, when subtracted from x, results in 6, we can set up the equation:

x - y = 6

Here, y represents the unknown number we are trying to find. To isolate y, we can rearrange the equation:

y = x - 6

Therefore, the number we are looking for is x - 6.

It's important to note that in mathematics, without specific values or additional information about x, we cannot determine a unique solution. The expression "6 - xx - 66 + x6 - ( x - 6)" you provided is not clear and does not allow us to solve for x or the unknown number directly. If you have specific values or additional context, please provide them, and I'll be glad to assist you further.

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Use the drawing tool(s) to form the correct answer on the provided number line. Will brought a 144-ounce cooler filled with water to soccer practice. He used 16 ounces from the cooler to fill his water bottle. He then took out 16 plastic cups for his teammates and put the same amount of water in each cup. Find and graph the number of ounces of water, x, that Will could have put in each cup.


Answers

According to the information, we can infer that the number of ounces of water, x, that Will could have put in each cup is 8 ounces.

What is the number of ounces of water "x" that Will could have put in each cup?

Will initially had a cooler filled with 144 ounces of water. After using 16 ounces to fill his water bottle, there were 144 - 16 = 128 ounces of water remaining in the cooler.

Will then took out 16 plastic cups for his teammates. Since the same amount of water was put in each cup, the remaining amount of water, 128 ounces, needs to be divided equally among the cups.

Dividing 128 ounces by 16 cups gives us 8 ounces of water for each cup.

So, Will could have put 8 ounces of water in each cup.

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Evaluate the double integral ∬R​(9−y2)dA where R is given as: [2 Points] R={(x,y)∣0≤x≤y,0≤y≤3} 2. Evaluate ∫016​∫x​4​cos(y3)dydx by reversing the order of integration. Note: You need to first reverse the integral, i.e. change the order of variables, and then evaluate it.

Answers

1. Evaluation of the double integral ∬R(9−y2)dA where R is given as:{(x, y) | 0 ≤ x ≤ y, 0 ≤ y ≤ 3} is shown below.To solve the above double integral we have to use the following formula:

∬Rf(x, y) dA = ∫a b dx ∫g(x) h(x) f(x, y) dy

where a ≤ x ≤ b, g(x) ≤ y ≤ h(x).For the given problem, we have:

∬R(9 − y²)dA = ∫0 3 dy ∫y 3 (9 − y²)dx

= ∫0 3 [(9y − y³)/3] dy

= (243/2)2.

Evaluation of the integral: ∫0 16 ∫x 4 cos(y³) dydx by reversing the order of integration, as follows:

We have to convert the above-given limits of integral according to the new variables of integration, y varies from x to 4 and x varies from 0 to 4.

∫0 4 ∫0 x cos(y³) dydx = ∫0 4 [(sin(x³))/3] dx = [(sin(64))/3] − [(sin(0))/3] = (sin(64))/3.

The final answer is (sin(64))/3.

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The following polar equation describes a circle in rectangular coordinates: r=10cosθ \Locate its center on the xy-plane, and find the circle's radius.
(x0,y0)=
R=
Note: You can earn partial credit on this problem.

Answers

The center of the circle described by the polar equation r = 10cosθ is located at the point (x0, y0), and the radius of the circle is denoted by R.radius of the circle is 10.

To find the center of the circle, we can convert the polar equation to rectangular coordinates. Using the conversion formulas r = √([tex]x^2 + y^2)[/tex]and cosθ = x/r, we can rewrite the equation as follows:
√[tex](x^2 + y^2)[/tex]= 10cosθ
√[tex](x^2 + y^2)[/tex] = 10(x/r)
Squaring both sides of the equation, we get:
[tex]x^2 + y^2 = 100(x/r)^2x^2 + y^2 = 100(x^2/r^2)[/tex]
Since r = √(x^2 + y^2), we can substitute r^2 in the equation:
[tex]x^2 + y^2 = 100(x^2/(x^2 + y^2))[/tex]
[tex]x^2 + y^2 = 100x^2/(x^2 + y^2)[/tex]
Simplifying the equation, we have:
[tex](x^2 + y^2)(x^2 + y^2 - 100) = 0[/tex]
This equation represents a circle centered at the origin (0, 0) with a radius of 10. Therefore, the center of the circle described by the polar equation is at the point (0, 0), and the radius of the circle is 10.

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A ball is thrown into the air with a velocity of 44ft/s. Its height, in feet, after t seconds is given by s(t)=44t−16t ². Find the velocity of the ball at time t=2 seconds.

Answers

To find the velocity of the ball at time t=2 seconds, we differentiated the height function, s(t) = 44t - 16t², with respect to time (t) and evaluated it at t=2. The velocity at t=2 is -20 ft/s.

To find the velocity of the ball at time t=2 seconds, we need to differentiate the height function, s(t), with respect to time (t) and then evaluate it at t=2. Let's go through the steps:

Start with the height function: s(t) = 44t - 16t².

Differentiate s(t) with respect to t:

s'(t) = d/dt (44t - 16t²)

= 44 - 32t.

Evaluate the derivative at t=2:

s'(2) = 44 - 32(2)

= 44 - 64

= -20.

Therefore, the velocity of the ball at time t=2 seconds is -20 ft/s (negative because the ball is moving downward).

The given height function represents the vertical position of the ball as a function of time. By differentiating this function, we obtain the derivative, which represents the instantaneous rate of change of the height with respect to time. This derivative is the velocity of the ball.

Evaluating the derivative at t=2 seconds gives us the velocity at that particular time. In this case, the velocity is -20 ft/s, indicating that the ball is moving downward at a rate of 20 feet per second at t=2 seconds. The negative sign indicates the direction of motion, which is downward in this case.

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The variance of a WSS random process does not depend on time True False Question 13 The cross-covariance of two uncorrelated random processes is 0 True False

Answers

False. The variance of a Wide-Sense Stationary (WSS) random process does depend on time. Additionally, the cross-covariance of two uncorrelated random processes is generally not zero.

The statement that the variance of a WSS random process does not depend on time is false. In a WSS process, the mean and autocovariance do not depend on time, but the variance can still vary with time. The WSS property implies that the statistical properties of the process, such as the mean and autocovariance function, remain constant over time. However, the variance, which measures the spread or dispersion of the random process, can change with time. Therefore, the variance of a WSS process is not necessarily constant.

Regarding the second statement, the cross-covariance of two uncorrelated random processes is generally not zero. The cross-covariance measures the statistical relationship between two random processes at different time instances. If two processes are uncorrelated, it means that their cross-covariance is zero on average. However, it is possible for the cross-covariance to be non-zero at specific time instances, even though the processes are uncorrelated. This occurs because correlation is a measure of linear dependence, whereas covariance considers any form of dependence. Therefore, it is not generally true that the cross-covariance of two uncorrelated processes is zero.

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answer all please
1. Given the vectors \( \vec{A}=3 \hat{i}-2 j+4 \hat{k} \) and \( \vec{B}=\hat{i}+5 \hat{j}-2 \hat{k} \), find the direction cosines of each, hence determine the angle between them. [3marks] 2. Find \

Answers

The vector $\vec{v} = \begin{p matrix} 3 \\ 4 \\ 5 \end{pmatrix}$ has magnitude 10, so we need to find a vector that is orthogonal to $\vec{v}$ and has magnitude 10.

1.The direction cosines of [tex]$\vec{A}$ are $\cos \alpha = \frac{3}{\sqrt{3^2+(-2)^2+4^2}} = \frac{3}{13}$, $\cos \beta = \frac{-2}{\sqrt{3^2+(-2)^2+4^2}} = -\frac{2}{13}$, and $\cos \gamma = \frac{4}{\sqrt{3^2+(-2)^2+4^2}} = \frac{4}{13}$. The direction cosines of $\vec{B}$ are $\cos \alpha = \frac{1}{\sqrt{1^2+5^2+(-2)^2}} = \frac{1}{13}$, $\cos \beta = \frac{5}{\sqrt{1^2+5^2+(-2)^2}} = \frac{5}{13}$, and $\cos \gamma = -\frac{2}{\sqrt{1^2+5^2+(-2)^2}} = -\frac{2}{13}$.[/tex]

The angle between  [tex]$\vec{A}$ and $\vec{B}$[/tex] is given by

[tex]\cos \theta = \frac{\vec{A} \cdot \vec{B}}{\|\vec{A}\| \|\vec{B}\|} = \frac{3 \cdot 1 + (-2) \cdot 5 + 4 \cdot (-2)}{\sqrt{3^2+(-2)^2+4^2} \cdot \sqrt{1^2+5^2+(-2)^2}} = -\frac{11}{169}[/tex]

Therefore, the angle between [tex]$\vec{A}$ and $\vec{B}$ is $\cos^{-1} \left( -\frac{11}{169} \right) \approx 113.9^\circ$.[/tex]

2. The answer to the second question is a vector with magnitude 10

The vector $\vec{v} = \begin{pmatrix} 3 \\ 4 \\ 5 \end{pmatrix}$ has magnitude 10, so we need to find a vector that is orthogonal to $\vec{v}$ and has magnitude 10. We can do this by taking the cross product of $\vec{v}$ with itself.

The cross product of two vectors is a vector that is orthogonal to both of the original vectors, and its magnitude is the product of the magnitudes of the original vectors times the sine of the angle between them.

The cross product of $\vec{v}$ with itself is

[tex]\vec{v} \times \vec{v} = \begin{pmatrix} 3 \\ 4 \\ 5 \end{pmatrix} \times \begin{pmatrix} 3 \\ 4 \\ 5 \end{pmatrix} = \begin{pmatrix} -20 \\ 0 \\ 0 \end{pmatrix}[/tex]

The magnitude of $\vec{v} \times \vec{v}$ is $|-20| = 20$, so the vector we are looking for is $\begin{pmatrix} -10 \\ 0 \\ 0 \end{pmatrix}$. This vector has magnitude 10, and it is orthogonal to $\vec{v}$, so it is the answer to the second question.

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unding decimals to the nearest whole number, Adam traveled a distance of about
miles.

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In a case whereby Adam traveled out of town for a regional basketball tournament. He drove at a steady speed of 72.4 miles per hour for 4.62 hours. The exact distance Adam traveled was miles Adam traveled a distance of about 335 miles.

How can the distance be calculated?

The distance traveled in a unit of time is called speed. It refers to a thing's rate of movement. The scalar quantity known as speed is the velocity vector's magnitude. It has no clear direction.

Speed = Distance/ time

speed =72.4 miles

time=4.62 hours

Distance =speed * time

= 72.4 *4.62

Distance = 334.488 miles

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complete question;

Adam traveled out of town for a regional basketball tournament. He drove at a steady speed of 72.4 miles per hour for 4.62 hours. The exact distance Adam traveled was miles. Rounding decimals to the nearest whole number, Adam traveled a distance of about miles.

how to find the lateral area of a pentagonal pyramid

Answers

To find the lateral area of a pentagonal pyramid, you need to calculate the sum of the areas of the five triangular faces that make up the sides of the pyramid.

The formula for the lateral area of any pyramid is given by L = (1/2)Pl, where P represents the perimeter of the base and l represents the slant height of each triangular face.

In the case of a pentagonal pyramid, the base is a pentagon, which means it has five sides. To calculate the perimeter of the base, you can add the lengths of all five sides. Once you have the perimeter, you need to find the slant height, which is the distance from the apex (top) of the pyramid to the midpoint of any side of the base triangle.

Once you have the perimeter and slant height, you can substitute these values into the formula L = (1/2)Pl to calculate the lateral area of the pentagonal pyramid.

It's important to note that the lateral area only considers the surface area of the sides of the pyramid, excluding the base. If you want to find the total surface area, you need to add the area of the base as well.

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convert equation of the surface to an equation in rectangular coordinate system to describe it in words. rhosinϕ=2sinθ

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The equation in rectangular coordinate system that describes the surface is:

z = 2y / x

The given equation, rhosinϕ = 2sinθ, represents the surface in spherical coordinate system. To convert it to an equation in rectangular coordinate system, we need to use the following relationships:

x = ρsinϕcosθ

y = ρsinϕsinθ

z = ρcosϕ

Substituting these expressions into the given equation, we have:

ρcosϕsinϕsinθ = 2sinθ

Since sinθ ≠ 0, we can cancel it from both sides:

ρcosϕsinϕ = 2

Dividing both sides by cosϕsinϕ, we get:

ρ = 2 / (cosϕsinϕ)

Substituting the expressions for x, y, and z back into the equation, we obtain:

(ρcosϕsinϕsinθ) / (ρsinϕcosθ) = 2y / x

Simplifying the equation, we have:

z = 2y / x

In words, the equation describes a surface where the z-coordinate is equal to twice the y-coordinate divided by the x-coordinate. This represents a family of inclined planes that intersect the y-axis at the origin (0,0,0) and have a slope of 2 along the y-axis.

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"How profitable is the Amazon.com operation?

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Amazon.com is a highly profitable operation. It is one of the world's largest e-commerce platforms, offering a wide range of products and services to customers globally.

Its profitability stems from various factors. First, Amazon's scale and market dominance give it a significant advantage in terms of sales volume and revenue. The company's vast customer base and extensive product catalog contribute to generating substantial revenue streams. Additionally, Amazon has successfully diversified its business beyond e-commerce, expanding into cloud computing with Amazon Web Services (AWS) and other sectors like digital content streaming. These ventures have further bolstered its profitability by tapping into new sources of revenue.

Furthermore, Amazon's operational efficiency and continuous optimization efforts play a crucial role in its profitability. The company has developed sophisticated supply chain and logistics systems, enabling it to streamline order fulfillment and delivery processes. Amazon's investment in automation technologies, robotics, and data-driven analytics also enhances its operational efficiency, reducing costs and improving overall profitability. Moreover, the company's focus on innovation, such as the introduction of new services like Amazon Prime and Alexa, helps attract and retain customers, leading to increased sales and profitability.

Amazon's profitability is driven by its market dominance, diverse revenue streams, operational efficiency, and continuous innovation. These factors have allowed the company to thrive and maintain its position as a highly profitable operation in the e-commerce industry.

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Determine the general series solution for the differential equation xy′′+xy′−4y = 0 up to the term x^2.

Answers

The general series solution for the given differential equation up to the term x² is y(x) = 0.

To find the general series solution for the given differential equation up to the term x², we can assume a power series solution of the form:

y(x) = ∑[n=0 to ∞] aₙ * xⁿ

where aₙ are the coefficients to be determined. We'll differentiate this series twice to obtain the terms needed for the differential equation.

First, let's find the first and second derivatives of y(x):

y'(x) = ∑[n=0 to ∞] aₙ * n * xⁿ⁻¹

y''(x) = ∑[n=0 to ∞] aₙ * n * (n-1) * xⁿ⁻²

Next, substitute the power series and its derivatives into the differential equation:

xy'' + xy' - 4y = 0

∑[n=0 to ∞] aₙ * n * (n-1) * xⁿ + ∑[n=0 to ∞] aₙ * n * xⁿ - 4 * ∑[n=0 to ∞] a_n * xⁿ = 0

Now, combine the terms with the same power of x:

∑[n=2 to ∞] aₙ * n * (n-1) * xⁿ + ∑[n=1 to ∞] aₙ * n * xⁿ - 4 * ∑[n=0 to ∞] aₙ * x^n = 0

To satisfy the differential equation, each term's coefficient must be zero. We'll start by considering the coefficients of x⁰, x¹, and x² separately:

For the coefficient of x⁰: -4 * a₀ = 0, so a₀ = 0

For the coefficient of x¹: a₁ - 4 * a₁ = 0, so -3 * a₁ = 0, which implies a₁ = 0

For the coefficient of x²: 2 * (2-1) * a₂ + 1 * a₂ - 4 * a₂ = 0, so a₂ - 3 * a₂ = 0, which implies a₂ = 0

Since both a₁ and a₂ are zero, the general series solution up to the term x^2 is:

y(x) = a₀ * x⁰ = 0

Therefore, the general series solution for the given differential equation up to the term x² is y(x) = 0.

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a
pizza place wants to sell a pizza that is one-third the
circumference of a 54-inch diameter pizza. what should the radius
of this new pizza be?

Answers

The radius of the new pizza is 9 inches. The circumference of a circle is equal to 2πr, where r is the radius of the circle.

The circumference of a 54-inch diameter pizza is 54 x π = 162π inches. The pizza place wants to sell a pizza that is one-third the circumference of a 54-inch diameter pizza, so the circumference of the new pizza will be 162π / 3 = 54π inches.

The radius of a circle is equal to the circumference divided by 2π, so the radius of the new pizza is 54π / (2 x π) = 27 inches.

Therefore, the radius of the new pizza is 9 inches.

The circumference of a circle is the distance around the edge of the circle. The radius of a circle is the distance from the center of the circle to the edge of the circle.

The pizza place wants to sell a pizza that is one-third the circumference of a 54-inch diameter pizza. This means that the new pizza will have a circumference of 1/3 the circumference of the 54-inch diameter pizza.

The circumference of a circle is equal to 2πr, where r is the radius of the circle. So, the circumference of the new pizza is 1/3 x 2πr = 2πr/3.

We know that the circumference of the new pizza is 54π inches, so we can set 2πr/3 = 54π and solve for r. This gives us r = 54π x 3 / 2π = 27 inches. Therefore, the radius of the new pizza is 9 inches.

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Determine whether the sequence a_n = 1^3/n^4 + 2^3/n^4 + ……+ n^3/n^4 converges or diverges.
If it converges, find the limit.

Converges (y/n): ______

Limit (if it exists, blank otherwise): ______

Answers

Lim n→∞ aₙ exists and is finite. The given sequence aₙ = 1³/n⁴ + 2³/n⁴ + ……+ n³/n⁴ converges to the limit of 1.

The given sequence is, aₙ = 1³/n⁴ + 2³/n⁴ + ……+ n³/n⁴

Now, 1ⁿ < 2ⁿ < …… < nⁿ

Then, 1³/n³ < 2³/n³ < ……< n³/n³

Now, (1/n)³ < (2/n)³ < …… < 1

So, n³/n³ (1/n)³ < n³/n³ (2/n)³ < ……< n³/n³ (1)

Adding all the terms, we get

aₙ = (1/n)³ + (2/n)³ + ……+ (n/n)³

So, aₙ < (1/n)³ + (2/n)³ + ……< 1 + 8/n + 27/n²

Let, the limit of aₙ as n tends to infinity be L.

Therefore,

lim n→∞ (1/n)³ + (2/n)³ + ……+ (n/n)³ = L

Therefore, L < lim n→∞ {1 + 8/n + 27/n²} = 1

Therefore, L ≤ 1. Now, we know that 0 < aₙ ≤ 1.

Therefore, aₙ is a bounded sequence.

Using the squeeze theorem, we get,

lim n→∞ aₙ ≤ L ≤ 1

Since lim n→∞ aₙ exists and is finite. The given sequence converges to the limit of 1.

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Subtract 7/8 from 13/16, and write the answer as a mixed number.

Answers

13/16 - 7/8 is equal to the mixed number 0 3/8.

To subtract 7/8 from 13/16, we need to have a common denominator for both fractions. In this case, the least common denominator (LCD) is 8, which is the denominator of the first fraction. Let's convert both fractions to have a common denominator of 8:

13/16 = 13/16 * 1/1 = 13/16

7/8 = 7/8 * 1/1 = 7/8

Now, we can subtract the fractions:

13/16 - 7/8 = (131)/(161) - (71)/(81)

= 13/16 - 7/8

Since the denominators are the same, we can directly subtract the numerators:

13/16 - 7/8 = (13 - 7)/16

= 6/16

The resulting fraction 6/16 can be simplified by dividing both the numerator and denominator by their greatest common divisor (GCD), which is 2 in this case:

6/16 = (6/2) / (16/2)

= 3/8

Therefore, 13/16 - 7/8 is equal to 3/8. Now, let's write the answer as a mixed number.

To convert 3/8 to a mixed number, we divide the numerator (3) by the denominator (8):

3 ÷ 8 = 0 remainder 3

The quotient is 0 and the remainder is 3. So, the mixed number representation is 0 3/8.

Therefore, 13/16 - 7/8 is equal to the mixed number 0 3/8.

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A mathematical model for the average of a group of people learning to type is given by N(t)=7+ln t​, t≥​1, where​ N(t) is the number of words per minute typed after t hours of instruction and practice​ (2 hours per​ day, 5 days per​ week). What is the rate of learning after 50 hours of instruction and​ practice?

Answers

The rate of learning after 50 hours of instruction and​ practice is given as 1/50. Thus, the number of words per minute typed after 50 hours of instruction and practice.

The given mathematical model for the average of a group of people learning to type is given as follows:

N(t)=7+ln t​, t≥​1,

where​ N(t) is the number of words per minute typed after t hours of instruction and practice​ (2 hours per​ day, 5 days per​ week).

To find the rate of learning after 50 hours of instruction and​ practice, we have to calculate the derivative of the given function N(t).

The derivative of N(t) with respect to t is given as below

:dN(t)/dt = d/dt (7 + ln t)

dN(t)/dt = 0 + 1/t

= 1/t

Therefore, the rate of learning after 50 hours of instruction and​ practice is given as 1/50. The above result represents the number of words per minute typed after 50 hours of instruction and practice.

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4. (3 points) The following two hexagons are similar. Find the length of the side marked \( x \) and state the scale factor.

Answers

The length of the side marked x is 15, and the scale factor is 1.5, Similar figures have the same shape, but they may be different sizes. The ratio of the corresponding side lengths of two similar figures is called the scale factor.

In the problem, we are given that the two hexagons are similar. We are also given that the side length of the smaller hexagon is 10. We can use this information to find the scale factor and the length of the side marked x.

The scale factor is the ratio of the corresponding side lengths of the two similar figures. In this case, the scale factor is 10/15 = 2/3. This means that every side of the larger hexagon is 2/3 times as long as the corresponding side of the smaller hexagon.

The side marked x is a side of the larger hexagon, so its length is 10 * 2/3 = 15.

Therefore, the length of the side marked x is 15, and the scale factor is 2/3.

Here are some additional details about the problem:

The two hexagons are similar because they have the same shape.The scale factor is 2/3 because every side of the larger hexagon is 2/3 times as long as the corresponding side of the smaller hexagon.The length of the side marked x is 15 because it is a side of the larger hexagon and the scale factor is 2/3.

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Solve the Logarithmic equation: log16​x=3/4  a) 8 b) −6 c) 12 d) 6

Answers

the solution to the given logarithmic equation is x = 8. Hence, option (a) 8 is the correct option.

We are given the logarithmic equation log16​x=3/4.

To solve this equation, we need to apply the logarithmic property that states that if log a b = c, then b = [tex]a^c.[/tex]

Substituting the values from the equation, we have: x = [tex]16^(3/4)[/tex]

Expressing 16 as 2^4, we get:x =[tex](2^4)^(3/4)x = 2^(4 × 3/4)x = 2^3x = 8[/tex]

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q4 quickly
Q4) Use the definition equation for the Fourier Transformation to evaluate the frequency-domain representation \( x(t)=f(|t|) \) of the following signal. \[ x(t)=f(|t|) \]

Answers

The Fourier Transform of x(t) = f(|t|) is given by:X(f) = 2∫_0^∞ f(t) cos(2πft) dtThe above is the required frequency-domain representation.

Let's evaluate the frequency-domain representation x(t) = f(|t|) of the following signal using the definition equation for the Fourier Transformation.

According to the definition equation of the Fourier transformation, the frequency-domain representation X(f) of x(t) is given by the equation below:X(f) = ∫_(-∞)^∞ x(t) e^(-j2πft) dt

Taking the Fourier Transform of x(t) = f(|t|), we get:X(f) = ∫_(-∞)^∞ f(|t|) e^(-j2πft) dt Let's substitute t with -t to obtain the limits from 0 to ∞:X(f) = ∫_0^∞ f(t) e^(j2πft) dt + ∫_0^∞ f(-t) e^(-j2πft) dt

Since f(t) is an even function and f(-t) is an odd function, the first integral equals the second integral but with the sign changed.

The Fourier transform of an even function is real, whereas the Fourier transform of an odd function is imaginary.

Therefore, the Fourier Transform of x(t) = f(|t|) is given by:X(f) = 2∫_0^∞ f(t) cos(2πft) dtThe above is the required frequency-domain representation.

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2- Given below closed loop transfer Function \( T(s) \) \[ T(s)=\frac{14.65}{\left(s^{2}+0.842 s+2.93\right)(s+5)} \] a- Can we use \( 2^{\text {nd }} \) order approximation for this system \( T(s) \)

Answers

The first factor, \(s^2 + 0.842s + 2.93\), represents a second-order polynomial. We cannot use a second-order approximation for this system \(T(s)\) due to the presence of a first-order factor.

To determine whether we can use a second-order approximation for the given closed-loop transfer function \(T(s)\), we need to analyze its characteristics and assess its similarity to a second-order system.

The given transfer function is:

\[T(s) = \frac{14.65}{(s^2 + 0.842s + 2.93)(s + 5)}\]

To determine if a second-order approximation is suitable, we can compare the denominator of \(T(s)\) with the standard form of a second-order system:

\[H(s) = \frac{\omega_n^2}{s^2 + 2\zeta\omega_ns + \omega_n^2}\]

where \(\omega_n\) represents the natural frequency and \(\zeta\) represents the damping ratio.

In the given transfer function, the denominator consists of two factors: \((s^2 + 0.842s + 2.93)\) and \((s + 5)\).

To determine if it matches the form of a second-order system, we can compare its coefficients with the standard form. By comparing the coefficients, we find that the natural frequency, \(\omega_n\), and the damping ratio, \(\zeta\), cannot be directly determined from the given polynomial.

However, the second factor, \(s + 5\), represents a first-order polynomial. This indicates the presence of a single pole at \(s = -5\).

Since the given transfer function contains a first-order polynomial, it cannot be accurately approximated as a second-order system.

It's important to note that accurate modeling of a system is crucial for control design and analysis. In this case, the system exhibits characteristics that deviate from a typical second-order system. It's recommended to work with the original transfer function \(T(s)\) to ensure accurate analysis and design processes specific to the system's unique dynamics.

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: Find an nth-degree polynomial function with real coefficients satisfying the given conditions. If you are using a graphing utility, use it fo graph the function and verify the real zeros and the given function value n3 3 and 2 i are zeros, f(1)-10 f(x)=0 (Type an expression using x as the variable. Simplify your answer.) Find an nth-degree polynomial function with real coefficients satisfying the given conditions. If you are using a graphing utility, use it to graph the function and verify the real zeros and the given function value n3 - 3 and 8+4i are zeros: f(1) = 260 (Type an expression using x as the variable. Simplify your answer.)

Answers

First scenario: The polynomial function that satisfies the given conditions is f(x) = (x - 3)(x^2 + 4). The real zeros are x = 3, and the complex zeros are x = 2i and x = -2i. The function value f(1) = -10 is also satisfied.

Second scenario: The specific polynomial function is not provided, but it will have real coefficients and the zeros x = -3, x = 8 + 4i, and x = 8 - 4i. The function value f(1) = 260 can be confirmed using a graphing utility.

To find an nth-degree polynomial function with real coefficients that satisfies the given conditions, we can use the fact that complex zeros occur in conjugate pairs.

In the first scenario, we are given that n = 3, and the zeros are 3 and 2i. Since complex zeros occur in conjugate pairs, we know that the third zero must be -2i. We are also given that f(1) = -10.

Using this information, we can construct the polynomial function. Since the zeros are 3, 2i, and -2i, the polynomial must have factors of (x - 3), (x - 2i), and (x + 2i). Multiplying these factors, we get:

f(x) = (x - 3)(x - 2i)(x + 2i)

Expanding and simplifying this expression, we find:

f(x) = (x - 3)(x^2 + 4)

To verify the real zeros and the given function value, we can graph this function using a graphing utility. The graph will show the x-intercepts at x = 3, x = 2i, and x = -2i. Additionally, substituting x = 1 into the function will yield f(1) = -10, as required.

In the second scenario, we are given that n = 3 and the zeros are -3 and 8 + 4i. Again, since complex zeros occur in conjugate pairs, we know that the third zero must be 8 - 4i. We are also given that f(1) = 260.

Using this information, we can construct the polynomial function. The factors will be (x + 3), (x - (8 + 4i)), and (x - (8 - 4i)). Multiplying these factors, we get:

f(x) = (x + 3)(x - (8 + 4i))(x - (8 - 4i))

Expanding and simplifying this expression may be more cumbersome due to the complex numbers involved, but the resulting polynomial will have real coefficients.

To verify the real zeros and the given function value, we can graph this function using a graphing utility. The graph will show the x-intercepts at x = -3, x = 8 + 4i, and x = 8 - 4i. Substituting x = 1 into the function should yield f(1) = 260, as required.

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(cos x – x sin x + y^2) dx + 2xy dy = 0
Determine the general solution of the given first order linear equation.

Answers

\(\ln|x| + \cos x + \int y^2 \frac{dx}{x} = C_1\)\(-y^2 = C_2\). This is the general solution of the given first-order linear equation.

To find the general solution of the given first-order linear equation:

\((\cos x - x \sin x + y^2) dx + 2xy dy = 0\)

We can rewrite the equation in the standard form:

\((\cos x - x \sin x) dx + y^2 dx + 2xy dy = 0\)

Now, we can separate the variables by moving all terms involving \(x\) to the left-hand side and all terms involving \(y\) to the right-hand side:

\((\cos x - x \sin x) dx + y^2 dx = -2xy dy\)

Dividing both sides by \(x\) and rearranging:

\(\frac{\cos x - x \sin x}{x} dx + y^2 \frac{dx}{x} = -2y dy\)

Let's solve the equation in two parts:

Part 1: Solve \(\frac{\cos x - x \sin x}{x} dx + y^2 \frac{dx}{x} = 0\)

This equation is separable. We can separate the variables and integrate:

\(\int \frac{\cos x - x \sin x}{x} dx + \int y^2 \frac{dx}{x} = \int 0 \, dy\)

Integrating the left-hand side:

\(\ln|x| - \int \frac{x \sin x}{x} dx + \int y^2 \frac{dx}{x} = C_1\)

Simplifying:

\(\ln|x| - \int \sin x \, dx + \int y^2 \frac{dx}{x} = C_1\)

\(\ln|x| + \cos x + \int y^2 \frac{dx}{x} = C_1\)

Part 2: Solve \(-2y dy = 0\)

This is a separable equation. We can separate the variables and integrate:

\(\int -2y \, dy = \int 0 \, dx\)

\(-y^2 = C_2\)

Combining the results from both parts, we have:

The constants \(C_1\) and \(C_2\) represent arbitrary constants that can be determined using initial conditions or boundary conditions if provided.

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Problem #1: Determine if the following system is linear, fixed, dynamic, and causal: \[ y(t)=\sqrt{x\left(t^{2}\right)} \] Problem # 2: Determine, using the convolution integral, the response of the s

Answers

The system described by the equation y(t) = √x(t²) is linear, fixed, dynamic, and causal. The response of the system to the input x(t) = δ(t) is:

y(t) = ∫_{-∞}^{∞} δ(τ) h(t - τ) dτ = ∫_{-∞}^{∞} √τ² dτ

Linear: The system is linear because the output is a linear combination of the inputs. For example, if x(t) = 2 and y(t) = √4 = 2, then if we double the input, x(t) = 4, the output will also double, y(t) = √16 = 4.

Fixed: The system is fixed because the output depends only on the current input and not on any past inputs. For example, if x(t) = 2 at time t = 0, then the output y(t) = √4 = 2 at time t = 0, regardless of what the input was at any previous time.

Dynamic: The system is dynamic because the output depends on the input at time t, as well as the input's history up to time t. For example, if x(t) = 2 at time t = 0, then the output y(t) = √4 = 2 at time t = 0, but if x(t) = 4 at time t = 1, then the output y(t) = √16 = 4 at time t = 1.

Causal: The system is causal because the output does not depend on future inputs. For example, if x(t) = 2 at time t = 0, then the output y(t) = √4 = 2 at time t = 0, regardless of what the input will be at any future time.

Problem #2: The response of the system to the input x(t) = δ(t) can be determined using the convolution integral:

y(t) = ∫_{-∞}^{∞} x(τ) h(t - τ) dτ

where h(t) is the impulse response of the system. In this case, the impulse response is h(t) = √t². Therefore, the response of the system to the input x(t) = δ(t) is:

y(t) = ∫_{-∞}^{∞} δ(τ) h(t - τ) dτ = ∫_{-∞}^{∞} √τ² dτ

The integral cannot be evaluated in closed form, but it can be evaluated numerically.

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The demand function for a commodity is given by p =2,000 − 0.1x − 0.01x^2.
Find the consumer surplus when the sales level is 100
a. $9,167
b. $57,167
c. $11,167 d
. $8,167
e. $10,167

Answers

consumer surplus can be calculated by first determining the equilibrium price and quantity, and then subtracting the area of the triangle beneath the demand curve but over the price from the market area.

[tex]p = 2000 - 0.1x - 0.01x²[/tex]

Given that the sales level is 100, we will find the consumer surplus.

Step 1: Find equilibrium quantity

[tex]QD = QS2000 - 0.1x - 0.01x² = 0800 - x - 0.01x² = 0x² + 100x - 80000[/tex]

= 0 Using the quadratic formula to solve for x, we get:

x = 400 and x = -200

Since we cannot sell a negative quantity, we disregard x = -200.

Therefore, the equilibrium quantity is Q = 400.

Step 2: Find equilibrium price

[tex]P = 2000 - 0.1x - 0.01x²P = 2000 - 0.1(400) - 0.01(400)²P = 1600[/tex]

Therefore, the equilibrium price is P = $1600 per unit.

Step 3: Calculate consumer surplus Consumer surplus

= Area of the triangle above the price but below the demand curve Consumer surplus = 1/2(base * height)

Consumer surplus =[tex]1/2(400)(2000 - 0.1(400) - 0.01(400)² - 1600)[/tex]

Consumer surplus = [tex]$160,000[/tex]

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please solve
At one high school, students can run the 100 -yard dash in a mean of \( 15.2 \) seconds with a standard deviation of \( 0.9 \) seconds. The times are very closely approximated by a normal curve. Round

Answers

The given mean of \(15.2\) seconds and a standard deviation of \(0.9\) seconds can be used to determine the probability of a student running the 100-yard dash in a certain amount of time.

The normal distribution curve is a bell-shaped curve that models the data of a random variable, in this case, the running time of the 100-yard dash. This curve is symmetric about the mean, and the standard deviation is the distance from the mean to the inflection points on either side of the curve. With this information, we can find the probability of a student running the 100-yard dash in a certain amount of time using a table or a calculator. For instance, the probability of a student running the 100-yard dash in less than or equal to 14.5 seconds is

\(P(X \le 14.5) = P\Bigg(Z \le \frac{14.5 - 15.2}{0.9}\Bigg) \)

where Z is the standard normal distribution curve and X is the running time of the 100-yard dash. This probability can be obtained using a standard normal table or a calculator and the final answer rounded to the nearest thousandth.

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Find the derivative.

y = x^3lnx

A. y’= x^2 (1 + Inx)
B. y’= (3x^2 + 1) Inx
C. y’= x^2 (1 + 3 lnx)
D. y’ = 3x^2 In x
E. y’= 3x (1+xlnx)

o E
o B
o D
o A
o C

Answers

The correct option is A. y' = x²(1 + ln x).

The given function is y = x³ ln x. We need to find its derivative.

First, we will use the product rule of differentiation to find the derivative of the given function as follows:

[tex]$$y = x^3 \ln x$$[/tex]

[tex]$$\Rightarrow y' = (3x^2 \ln x) + (x^3) \left(\frac{1}{x}\right)$$[/tex]

[tex]$$\Rightarrow y' = 3x^2 \ln x + x^2$$[/tex]

Now, we will use the distributive property of multiplication to simplify the above equation.

[tex]$$y' = x^2 (3 \ln x + 1)$$[/tex]

Therefore, the correct option is A. y' = x²(1 + ln x).

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Find the volume of the following composite object. Enter your answer as an integer in the box.

Please help due today!!

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Answer:

please

Step-by-step explanation:

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Solve the initial value problem y' + 2xy^2 = 0, y(1) = 1.

Answers

Given that the initial value problem y' + 2xy² = 0, y(1) = 1, we need to solve the differential equation.y' + 2xy²

= 0Rearrange the terms:y'

= -2xy²

Now, we can apply the separation of variables method to solve this first-order differential equation.=> dy/y²

= -2xdxIntegrating both sides, we get,∫dy/y²

= -∫2xdx=> -1/y

= -x² + C1 (where C1 is the constant of integration)Now, we can find the value of C1 by using the given initial condition y(1) = 1.Substituting x = 1 and

y = 1, we get,-1/1

= -1 + C1=> C1

= 0So, the equation becomes,-1/y

= -x² + 0=> y = -1/x²

Hence, the initial value problem y' + 2xy²

= 0, y(1)

= 1 is y

= -1/x² with the given initial condition.

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