clarkson university surveyed alumni to learn more about what they think of clarkson. one part of the survey asked respondents to indicate whether their overall experience at clarkson fell short of expectations, met expectations, or surpassed expectations. the results showed that 3% of the respondents did not provide a response, 24% said that their experience fell short of expectations, and 64% of the respondents said that their experience met expectations. (a) if we chose an alumnus at random, what is the probability that the alumnus would say their experience surpassed expectations? (b) if we chose an alumnus at random, what is the probability that the alumnus would say their experience met or surpassed expectations?

Answer: its either 5 or 8 kilometers

Inverse Laplace transform of the given function needs to be determined.

The inverse Laplace transform is a mathematical operation that allows us to recover a function from its Laplace transform. In this case, we are given a function and asked to find its inverse Laplace transform. The Laplace transform is a powerful tool in mathematics and engineering that converts a function from the time domain to the complex frequency domain.

To determine the inverse Laplace transform, we need to apply techniques such as partial fraction decomposition, convolution, or table look-up methods. These methods involve manipulating the Laplace transform of the given function using algebraic operations and known formulas to obtain the original function in the time domain.

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The MATLAB variable "dogbirthchange" can be defined as a numeric array or vector that stores the difference in the number of dogs born from year to year for each state.

To define the "dogbirthchange" variable in MATLAB, you can use an array or vector where each element represents the difference in dog births for a specific state between consecutive years.

The size of the array or vector would depend on the number of states and the number of years for which the data is available.

For example, if you have data for 50 states and 10 years, you can define a 50x10 matrix or a 1x10 cell array where each element corresponds to the difference in dog births for a specific state from one year to the next.

Each element in the variable "dogbirthchange" would hold the value of the difference in dog births for a particular state and year combination.

By storing this information in a MATLAB variable, you can perform various operations and analyses on the data, such as calculating the average change in dog births, identifying states with the highest or lowest changes, or visualizing the trends over time.

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The pair x(t) = e^3t, y(t) = e^t is a solution to the given system.

The given system consists of two differential equations: dx/dt = 3y^3 and dy/dt = y. We are given the pair x(t) = e^3t and y(t) = e^t. To verify if this pair is a solution, we need to substitute these values into the differential equations and check if they hold true.

Substituting x(t) = e^3t and y(t) = e^t into the first equation, we have dx/dt = 3(e^t)^3. Simplifying, we get dx/dt = 3e^(3t).

Similarly, substituting x(t) = e^3t and y(t) = e^t into the second equation, we have dy/dt = e^t.

We can see that both sides of the differential equations match the given pair (x(t), y(t)). Hence, x(t) = e^3t and y(t) = e^t satisfy the given system of differential equations.

To sketch the trajectory of the given solution in the phase plane, we can plot the points (x(t), y(t)) for different values of t. The trajectory would represent the path traced by the solution in the phase plane.

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Answer: 16

Step-by-step explanation:

A data point would be 1 on the vertical axis meaning you can simply add everything up.

Data Points:

0-1: 1

1-2: 3

3-4: 1

4-5: 1

5-6: 2

6-7: 4

7-8: 2

8-9: 1

10-11: 1

Sum: 16

First you need to identify the type of equation in the table, then you can set up the correspondent equation or system of equations to find your equation.

To find an equation from a table, you will need to identify the pattern or relationship between the given inputs and outputs (so the first thing you need to do, is identify which type of equation is represented by the table)

There are different methods depending on the type of relationship and the data provided. Here are a few common approaches:

Linear Relationship (y = ax + b)

If the table data suggests a linear relationship between the inputs (x-values) and outputs (y-values), you can use the method of finding the equation of a straight line. This can be done by calculating the slope (m) and the y-intercept (b) using two data points from the table.

Quadratic Relationship (y = ax² + bx + c)

If the table data suggests a quadratic relationship, meaning the outputs change according to a quadratic function of the inputs, you can use the method of finding the equation of a quadratic function. This involves using three data points from the table and solving a system of equations to determine the coefficients of the quadratic equation.

Exponential Relationship (y = A*bˣ)

If the table data suggests an exponential relationship, where the outputs change exponentially with respect to the inputs, you can use the method of finding the equation of an exponential function. This involves determining the base and exponent of the exponential function by examining the ratios between the outputs.

Please notice that these are only 3 types of equations, but there are a lot more, like logarithmic functions, trigonometric functions, cubic functions.

And each one will have a different way of setting up equations to find the equation represented in the table.

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The magnitude of the resultant force can be found using the law of cosines, and it is approximately 692 pounds.

The direction of the resultant force can be found using the law of sines, and it is approximately 14.6° with respect to the positive x-axis

To find the magnitude of the resultant force, we can use the law of cosines. The law of cosines states that in a triangle, the square of one side is equal to the sum of the squares of the other two sides minus twice the product of their magnitudes and the cosine of the included angle.

In this case, the two sides are the magnitudes of the given forces (300 pounds and 500 pounds), and the included angle is the angle between the forces.

Applying the law of cosines, we have: Resultant force^2 = 300^2 + 500^2 - 2 * 300 * 500 * cos(60° - (-45°))

Calculating this equation, we find that the resultant force^2 is approximately equal to 479,200 pounds^2. Taking the square root of this value, we get the magnitude of the resultant force, which is approximately 692 pounds.

To find the direction of the resultant force, we can use the law of sines. The law of sines states that in a triangle, the ratio of the length of a side to the sine of its opposite angle is constant.

In this case, the sides are the magnitudes of the forces, and the opposite angles are the angles between the forces and the positive x-axis.

Applying the law of sines, we have: (sin θ) / 500 = (sin 60°) / Resultant force

Solving for θ, we find that sin θ is equal to (sin 60°) / (Resultant force / 500). Calculating this equation, we get sin θ is approximately 0.250.

Taking the inverse sine of this value, we find that θ is approximately 14.6°. Therefore, the direction of the resultant force is approximately 14.6° with respect to the positive x-axis.

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a) The interval that is likely to contain the exact percent of U.S. teenagers who consider entrepreneurship as a career option is between 37.8% and 44.2%. b) 8.63 million teenagers in the U.S. consider entrepreneurship as a career option.

a) To determine the interval that is likely to contain the exact percent of U.S. teenagers who consider entrepreneurship as a career option, we can use the margin of error of ±3.2% with the given percentage of 41%.

Lower bound: 41% - 3.2% = 37.8%

Upper bound: 41% + 3.2% = 44.2%

Therefore, the interval that is likely to contain the exact percent of U.S. teenagers who consider entrepreneurship as a career option is between 37.8% and 44.2%.

b) To estimate the number of teenagers in the U.S. who consider entrepreneurship as a career option, we can use the estimated population of teenagers in the U.S., which is about 21.05 million, and the percentage of teenagers who consider entrepreneurship as 41%.

Estimated number of teenagers who consider entrepreneurship = (Percentage of teenagers considering entrepreneurship / 100) * Total population of teenagers

Estimated number of teenagers who consider entrepreneurship = (41 / 100) * 21.05 million

Estimated number of teenagers who consider entrepreneurship ≈ 8.63 million

Therefore, based on the given percentage and estimated population, it is estimated that approximately 8.63 million teenagers in the U.S. consider entrepreneurship as a career option.

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The orthogonal projection of f(x) = 4x^2 - 4 onto the subspace V spanned by g(x) = x and h(x) = 1 is given by p(x) = 2x - 2/3.

To find the orthogonal projection of f(x) = 4x^2 - 4 onto the subspace V spanned by g(x) = x and h(x) = 1 in the vector space C0[0,1], we can utilize the inner product ?f,g? = ∫[0,1] 10f(x)g(x) dx. The orthogonal projection, p(x), can be obtained by calculating the inner product of f(x) with each basis function in V and scaling them accordingly.

Using the inner product, we have ?f,g? = ∫[0,1] 10f(x)g(x) dx = 10∫[0,1] (4x^2 - 4)x dx = 10∫[0,1] (4x^3 - 4x) dx = 10[(x^4/4 - 2x^2) ∣[0,1]] = 10(1/4 - 2/3) = -5/3.

Similarly, ?f,h? = ∫[0,1] 10f(x)h(x) dx = 10∫[0,1] (4x^2 - 4) dx = 10[(4x^3/3 - 4x) ∣[0,1]] = 10(4/3 - 4) = -10/3.

Next, we need to determine the inner product ?g,g? and ?h,h? to find the norms of g(x) and h(x) respectively. ?g,g? = ∫[0,1] 10g(x)g(x) dx = 10∫[0,1] x^2 dx = 10(x^3/3 ∣[0,1]) = 10/3. Similarly, ?h,h? = ∫[0,1] 10h(x)h(x) dx = 10∫[0,1] dx = 10(x ∣[0,1]) = 10.

Using the formula for the orthogonal projection, p(x) = (?f,g?/?g,g?)g(x) + (?f,h?/?h,h?)h(x), we can substitute the values we obtained:

p(x) = (-5/3)/(10/3)x + (-5/3)/(10) = (2x - 2/3).

Therefore, the orthogonal projection of f(x) = 4x^2 - 4 onto the subspace V spanned by g(x) = x and h(x) = 1 is given by p(x) = 2x - 2/3.

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A(11) counts partitions of 11 into parts congruent to ±1 mod 6 is A(11) = 2 and B(11) counts partitions of 11 into distinct parts congruent to ±1 mod 3 is  B(11) = 2. C(11) counts partitions of 11 into parts differing by at least 3 and multiples of 3 differing by at least 6 is C(11) = 1.

A(11) counts the number of partitions of 11 into parts congruent to ±1 mod 6. One such partition is 11, which is already congruent to ±1 mod 6. Another partition is 7+1+1+1+1, which consists of four parts that are congruent to 1 mod 6 and one part that is congruent to -1 mod 6. Therefore, A(11) = 2.

B(11) counts the number of partitions of 11 into distinct parts congruent to ±1 mod 3. One such partition is 11, which is already congruent to ±1 mod 3. Another partition is 7+3+1, which consists of three distinct parts that are congruent to 1 mod 3. Therefore, B(11) = 2.

C(11) counts the number of partitions of 11 into parts that differ by at least 3, with the added condition that any parts that are multiples of 3 must differ by at least 6. One such partition is 11, which is the only way to partition 11 into parts that differ by at least 3. Therefore, C(11) = 1.

Therefore, the partitions of 11 counted by A(11), B(11), and C(11) are:
A(11): 11, 7+1+1+1+1
B(11): 11, 7+3+1
C(11): 11

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To compute the truth table for --P<->Q, we need to first understand the meaning of the logical operator "<->". This operator stands for "if and only if" and it is true only when both statements are either true or false.

In other words, if P is true and Q is true or if P is false and Q is false, then the statement is true. If P is true and Q is false or if P is false and Q is true, then the statement is false.

Using canonical form, we can write the statement --P<->Q as (P v ~Q) ^ (~P v Q), where ^ stands for "and" and v stands for "or". The negation of P is represented by ~P.

Now, we can construct the truth table with the four possible combinations of truth values for P and Q. Labeling each row from 1 to 4, we have:

Row 1: P is true, Q is true
Row 2: P is true, Q is false
Row 3: P is false, Q is true
Row 4: P is false, Q is false

Next, we evaluate the canonical form for each row. For example, in row 1, we have (true v ~true) ^ (~true v true), which simplifies to true ^ true, resulting in a truth value of true. Continuing this process for all four rows, we get:

Row 1: true
Row 2: false
Row 3: false
Row 4: true

Therefore, the truth table for --P<->Q using canonical form is:

| P | Q | --P<->Q |
|---|---|---------|
| T | T |    T    |
| T | F |    F    |
| F | T |    F    |
| F | F |    T    |

The first column represents the truth values for P, the second column represents the truth values for Q, and the third column represents the truth values for --P<->Q. The answer is more than 100 words and includes the requested term "canonical form".

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Todd must purchase 300 copies of his resume to have enough resumes for 245 schools.

Todd plans to send resumes to 245 schools, so he needs at least 245 copies of his resume.

The local printer sells copies in sets of 100

so Todd must purchase at least the nearest multiple of 100 that is greater than or equal to 245.

Divide 245 by 100

245 ÷ 100 = 2.45

The nearest multiple of 100 that is greater than or equal to 2.45 is 3. Therefore, Todd needs to purchase 3 sets of 100 copies.

3 sets × 100 copies = 300 copies

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The inequality expression in algebraic notation is x/3 ≤ 5

From the question, we have the following parameters that can be used in our computation:

the quotient of x and 3 is less than or equal to 5

Represent the number with x

So the statement can be rewritten as follows:

the quotient of x and 3 is less than or equal to 5

The quotient of x and 3 means x/3

So, we have

x/3  is less than or equal to 5

less than or equal to 5 means ≤5

So, we have

x/3 ≤ 5

Hence, the expression in algebraic notation is x/3 ≤ 5

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The function f(x, y, z) = y 9x2 − y2 7z2 is continuous at all points (x, y, z) such that z ≠ 0.

To determine the set of points at which the function is continuous, we need to check if the function is continuous at every point in its domain. The domain of the function is all possible values of x, y, and z for which the function is defined. Looking at the function, we see that it is a combination of polynomial and rational functions. Both of these types of functions are continuous over their domains, except for the points where the denominator of a rational function is zero. In this case, the denominator of the second term of the function is 7z2, which is equal to zero when z = 0. Therefore, the function is not defined at z = 0. Thus, the set of points at which the function is continuous is the set of all points in R3 except for those where z = 0. In other words, the function is continuous at all points (x, y, z) such that z ≠ 0.

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The function f(x) is continuous for -0.5 < x < -0.2 based on the given values.

In the provided interval, the function f(x) has been evaluated at various points: x = -0.5, -0.4, -0.3, and -0.2. The values of f(x) at these points are 1, 1.1, 1.3, and 1.6, respectively.

For a function to be continuous at a specific point, three conditions must be met:

1) The function must be defined at that point.

2) The limit of the function as x approaches that point must exist.

3) The limit of the function as x approaches that point must equal the value of the function at that point.

In this case, since the given values of f(x) are provided and the function is evaluated at specific points within the interval -0.5 < x < -0.2, the function is defined at those points. Additionally, the values of f(x) approach the corresponding limits as x approaches each point within the given interval. Therefore, based on the provided information, we can conclude that f(x) is continuous for -0.5 < x < -0.2.

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To use Green's Theorem to evaluate f · dr, we first need to calculate the curl of f:

curl(f) = (∂Q/∂x) - (∂P/∂y)
where P = x sin(y) and Q = y - cos(y)

∂Q/∂x = 0
∂P/∂y = x cos(y)

So curl(f) = x cos(y)

Now we can apply Green's Theorem:

∫∫(curl(f)) · dA = ∫C f · dr
where C is the curve we are evaluating and dA is the differential area element.

The curve C is given by the equation (x - 7)^2 + (y - 5)^2 = 4. This is a circle centered at (7, 5) with radius 2. The orientation of the curve is clockwise, which means we need to reverse the sign of our answer.

We can parameterize the curve C as follows:

x = 7 + 2cos(t)
y = 5 + 2sin(t)
where 0 ≤ t ≤ 2π

Now we can evaluate the line integral using the parameterization and the formula f(x, y):

f(x, y) = y - cos(y), x sin(y)
= (5 + 2sin(t)) - cos(5 + 2sin(t)), (7 + 2cos(t))sin(5 + 2sin(t))

So we have:

∫C f · dr = -∫0^2π [(5 + 2sin(t)) - cos(5 + 2sin(t))](-2sin(t) dt + [(7 + 2cos(t))sin(5 + 2sin(t))]2cos(t) dt

Evaluating this integral gives the answer: -32π

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The value of expression (b - c) / (c - a) is,

⇒ (b - c) / (c - a) = 1

We have to given that;

Here, a, b and c are distinct numbers such that;

⇒ (b - a)²-4(b - c)(c- a) = 0

Now, We can simplify as;

⇒ (b - a)²- 4(b - c)(c- a) = 0

⇒ b² + a² - 2ab - 4 (bc - ab - c² + ac) = 0

⇒ b² + a² - 2ab - 4bc + 4ab + 4c² - 4ac = 0

⇒ b² + a² + 4c² + 2ab - 4bc - 4ac = 0

⇒ (2c - a - b)² = 0

⇒ 2c = a + b

⇒ c + c = a + b

⇒ c - a = b - c

⇒ (b - c) / (c - a) = 1

Hence, The value of expression (b - c) / (c - a) is,

⇒ (b - c) / (c - a) = 1

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The distance apart the wires are on the ground is 12 feet.

We are given that;

Measurements= 35foot and 37 feet

Now,

We can use the Pythagorean theorem. Let’s call the distance between the two wires on the ground “x”. Then we have:

x^2 + 35^2 = 37^2

Simplifying this equation, we get:

x^2 = 37^2 - 35^2

x^2 = 144

x = 12 feet

Therefore, by Pythagoras theorem the answer will be 12 feet.

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The integral does not have a closed-form solution, but it can be expressed using the exponential integral function,where u = 3x and c is the constant of integration.

To evaluate the integral ∫2e^(3xe^(3x)) dx, we can use the substitution method. Let u = 3x, then du = 3dx.

Although this integral does not have a closed-form solution in terms of elementary functions, it can be expressed using special functions such as the exponential integral.

Thus, the integral evaluates to (2/3)Ei(uˣ e^u) + c, where Ei(x) is the exponential integral function and c is the constant of integration.

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The x-coordinate of the new point is 3/2 but we cannot calculate the exact value of the new y-coordinate.

The new coordinate for the transformation of f(x) under the function g(x) = f((1/2)x) - 7, we'll start with the given point (3, 6) and apply the transformation.

First, let's substitute x = 3 into the transformation equation:

g(3) = f((1/2)(3)) - 7

= f(3/2) - 7

Now, to determine the new y-coordinate, we need to know the value of f(x) at x = 3/2.

Without specific information about the function f(x), we cannot calculate the exact value of f(3/2) or the new y-coordinate.

We can still provide a general representation of the new coordinate for any function f(x).

Let's denote the new coordinate as (x', y'):

x' = 3/2

y' = f(3/2) - 7

The value of y' will depend on the function f(x) and its behavior at x = 3/2. If you provide the specific function f(x), we can substitute it into the equation to determine the exact value of y' and provide the coordinates (x', y').

The function f(x), we can determine the new x-coordinate as 3/2, but we cannot calculate the exact value of the new y-coordinate or provide the specific new coordinate (x', y') without additional information.

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The second triangle will have the same side lengths and angles as the initial triangle.

The correct option is D.

The reflection of an equilateral triangle relative to the line passing through its side results in a new equilateral triangle that is the same size as the initial triangle. Therefore, the correct answer is D: The second triangle is the same size as the initial triangle.

When a figure is reflected across a line, every point on the figure is flipped to the opposite side of the line, maintaining the same distances and angles. In the case of an equilateral triangle, each side is reflected to the opposite side of the line, resulting in a new equilateral triangle with the same side lengths and angles.

The property of an equilateral triangle is that all three sides are equal in length, and all three angles are equal to 60 degrees. The reflection does not alter these properties. Therefore, the second triangle will have the same side lengths and angles as the initial triangle.

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The eigenvalues of L are λ = 4, -1, and 1.

The eigenvectors associated with λ = 1 are of the form v = [ 1, 0, -1 ]  where y is any real number.

To find the eigenvalues and eigenvectors of L, we need to solve the equation LM = ML, where M is the matrix representing L with respect to the basis (t2 + 1, t, 1). We can rewrite this equation as (L - λI)M = 0, where λ is an eigenvalue of L and I is the identity matrix.

Let's solve for the eigenvalues first. We have:

(L - λI)M =[tex]\begin{bmatrix}-1 & -\lambda & 0 \\-1 &0 &1 &1 \\ 1& 0 &1 \\-1 & -\lambda &0 \\\end{bmatrix}[/tex]

[tex]\begin{bmatrix} 0&-\lambda &0 \\ 0 & 0& 0\end{bmatrix} = \begin{bmatrix} 0&0 &0 \\ 0 &-\lambda & 0\end{bmatrix}[/tex]

Expanding the matrix product, we get:

[tex]= > [ (-1-\lambda)(-1) + 2(2)(1-\lambda) 0 (-1-\lambda)(1) + 2(1)(1-\lambda) ] \times [ 0 (-\lambda)(0) 0 ][/tex]

Simplifying the expressions, we obtain:

[tex]\begin{bmatrix}\lambda^2-3\lambda-4 & 0 &3\lambda - 2 \\ 0& 0 &0 \\ 2\lambda - 2 & 0 &\lambda-1 \end{bmatrix}[/tex]

To find the eigenvalues, we need to solve the characteristic equation det(L - λI) = 0. We have:

det(L - λI) = (λ² - 3λ - 4)(λ - 1)

= (λ - 4)(λ + 1)(λ - 1)

Simplifying the equations, we get:

-5x + z = 0

-4y = 0

2x - 3z = 0

From the second equation, we get y = 0. Substituting this into the first and third equations, we get:

-5x + z = 0

2x - 3z = 0

Solving for x and z, we obtain:

x = z/5

z = 2x/3

Therefore, the eigenvectors associated with λ = 4 are of the form v = [ x, 0, z ], where x = z/5 and z = 2x/3. We can choose x = 5 and z = 10/3 to obtain a specific eigenvector:

v = [ 5, 0, 10/3 ]

Similarly, we can find the eigenvectors associated with λ = -1 and λ = 1. The eigenvectors associated with λ = -1 are of the form v = [ x, 0, y ], where x = y/5. Choosing y = 5, we obtain the eigenvector:

v = [ 1, 0, 5 ]

The eigenvectors associated with λ = 1 are of the form v = [ x, y, z ], where x + z = 0. Choosing x = 1 and z = -1, we obtain the eigenvector:

v = [ 1, y, -1 ]

We can choose y = 0 to obtain a specific eigenvector:

v = [ 1, 0, -1 ]

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41% of the incidence of Disease x in smokers is attributable to smoking. This highlights the significant impact that smoking has on the incidence of disease x among smokers.

The proportion of the incidence of disease x in smokers that is attributable to smoking can be determined using the formula for attributable risk, which is the incidence rate in exposed individuals (smokers) minus the incidence rate in unexposed individuals (nonsmokers). In this case, the attributable risk of smoking for disease x can be calculated as follows:
56/1,000 - 33/1,000 = 23/1,000
This means that smokers have an additional 23 cases of disease x per 1,000 individuals per year compared to nonsmokers. The proportion of disease x incidence in smokers that is attributable to smoking can be calculated using the formula for population attributable risk, which is the attributable risk divided by the incidence rate in the exposed population (smokers). Therefore, the proportion of disease x incidence in smokers that is attributable to smoking is:
(56/1,000 - 33/1,000) / 56/1,000 = 0.41 or 41%
This means that 41% of the incidence of disease x in smokers is attributable to smoking. This highlights the significant impact that smoking has on the incidence of disease x among smokers.

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The proportion of the incidence of disease x in smokers that is attributable to smoking is approximately 41.07%.

To calculate the proportion of the incidence of disease x in smokers that is attributable to smoking, we need to use the population attributable risk (PAR) formula, which is:

PAR = incidence rate in the exposed group - incidence rate in the unexposed group / incidence rate in the exposed group

In this case, the exposed group is smokers and the unexposed group is nonsmokers. So, we have:

PAR = (56/1000 - 33/1000) / (56/1000) = 0.4107

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The surface area of the part of the plane z = 4 + 6x + 5y that lies inside the cylinder x^2 + y^2 = 16 is 64π square units.

To find the surface area of the part of the plane that lies inside the given cylinder, we need to determine the region where the two shapes intersect. The equation z = 4 + 6x + 5y represents a plane, where x and y are variables, and z is determined by the given expression. The equation x^2 + y^2 = 16 defines a cylinder in the xy-plane with radius 4.

By substituting the plane equation into the cylinder equation, we can determine the points where the two intersect. Substituting z = 4 + 6x + 5y into x^2 + y^2 = 16 gives:

(4 + 6x + 5y)^2 + y^2 = 16

Expanding this equation, we obtain:

16x^2 + 25y^2 + 36x^2 + 40xy + 48x + 40y + 16 = 16

Combining like terms and simplifying, we get:

52x^2 + 40xy + 25y^2 + 48x + 40y = 0

This equation represents an ellipse in the xy-plane. To find the surface area of the intersection, we need to calculate the area of this ellipse. The formula for the surface area of an ellipse is A = πab, where a and b are the lengths of the major and minor axes, respectively.

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Answer: 24.2

Step-by-step explanation: its right

By simplifying the fraction 3/6 to 1/2, we can express the expression 4 times 3/6 as the product of a unit fraction (1/2) and a whole number (4), resulting in 2.

In the given expression, 4 represents the whole number, and 3/6 represents the fraction. To express this as the product of a unit fraction and a whole number, we need to find a unit fraction that is equivalent to 3/6.

Now that we have found an equivalent unit fraction, 1/2, we can rewrite the expression 4 times 3/6 as the product of a unit fraction and a whole number. Using the commutative property of multiplication, we can rearrange the expression as follows:

4 times 3/6 = 4 times 1/2

Now, we can multiply the whole number, 4, by the unit fraction, 1/2:

4 times 1/2 = 4/1 times 1/2

Multiplying fractions involves multiplying the numerators and multiplying the denominators. In this case, we have:

(4/1) times (1/2) = (4 times 1) / (1 times 2) = 4/2

To simplify the fraction 4/2, we find that both the numerator and denominator have a common factor of 2. When we divide both the numerator and denominator by 2, we get:

4/2 = 2/1 = 2

Therefore, the expression 4 times 3/6, when rewritten as the product of a unit fraction and a whole number, is equal to 2.

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The function g repeats every 20 seconds.

a. The measure of the angle of rotation after t seconds can be found using the formula:
∅ = 0.1t

Since the minute hand rotates 0.1 radius lengths per second counter-clockwise, the angle of rotation in radians can be found by multiplying the rate of rotation (0.1) by the time elapsed (t).

Therefore, the angle of rotation after t seconds is equal to 0.1t radians.

b. To define a function g that relates the minute hand's vertical distance above the center of the clock (in radius lengths) as a function of the number of seconds elapsed, we need to consider the geometry of the clock.

The minute hand is a straight line that extends from the center of the clock to the outer edge, and it rotates around the center point.

Let's assume that the radius of the clock is 1 unit. At the 15-minute mark, the minute hand is located at a distance of 0.25 units above the center of the clock (since the minute hand is at the 3 o'clock position, which is one-quarter of the way around the clock).

As the minute hand rotates, its vertical distance above the center point changes.

We can use trigonometry to find the vertical distance above the center point as a function of the angle of rotation. Let θ be the angle of rotation in radians.

Then, the vertical distance above the center point is given by:

g(θ) = sin(θ)

Since the angle of rotation is related to the time elapsed by the formula ∅ = 0.1t, we can also express g as a function of time:

g(t) = sin(0.1t)

c. To find how long it takes for the minute hand to complete a full rotation, we need to find the time it takes for the angle of rotation to reach 2π radians.

Using the formula from part (a), we have:

2π = 0.1t

Solving for t, we get:

t = 20π

Therefore, it takes 20π seconds (approximately 62.8 seconds) for the minute hand to complete a full rotation.

d. The period of the function g is the time it takes for the function to repeat itself. Since the sine function has a period of 2π, the period of the function g is:

T = 2π/0.1

T = 20 seconds

Therefore, the function g repeats every 20 seconds.

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Using the line plot, we can see that 13 persons talk less than 60 minutes on their phonse.

Here we have a line plot, each one of the points represents a person that talks a given amount of time in the phone.

Here we just need to count the number of points that are before the number 60 in the horizontal axis.

Then we can see:

10 ---> 2 points.

20 ---> 4 points.

40 ---> 4 points.

50 ---> 3 points

Adding that we have a total of 13 points, so there are 13 persons that talk less than 60 minutes per day.

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