Replace each ____ with >,< , or = to make a true statement.

3/4in. ____ 5/8 in.

To solve the system of equations:

Equation 1: 6d + 3f = 12

Equation 2: 2d = 8 - f

We can use the substitution method or the elimination method to find the solution. Let's use the substitution method: From Equation 2, we can express d in terms of f: 2d = 8 - f. Solving for d, we get d = 4 - (f/2).

Now, substitute this expression for d into Equation 1:

6(4 - f/2) + 3f = 12

24 - 3f + 3f = 12

24 = 12

The resulting equation, 24 = 12, is false. This implies that the system of equations is inconsistent, meaning there is no solution that satisfies both equations simultaneously. Geometrically, the two equations represent parallel lines that never intersect. Therefore, the given system of equations does not have a solution.

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The critical value that should be used in constructing the confidence interval is 1.645.

We are constructing a 90% confidence interval, so the alpha level is 1 - 0.90 = 0.10. The z-score that corresponds to an alpha level of 0.10 is 1.645.

We can find the critical value using the following steps:

1. We can look up the z-score in a z-table.

2. We can use a statistical calculator to find the z-score.

The following is the z-table for a two-tailed test with an alpha level of 0.10:

```

z-score | Probability

------- | --------

1.645 | 0.9500

```

As we can see, the z-score that corresponds to an alpha level of 0.10 is 1.645.

We can also use a statistical calculator to find the z-score. For example, in Excel, we can use the following formula:

```

=NORMSINV(0.95)

```

This will return the value 1.645.

Once we have found the critical value, we can use it to construct the confidence interval.

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Without further information on the representativeness of the follow-up sample and potential non-response bias, it would be cautious to conclude solely based on the given information that approximately 40% of the entire population of California is satisfied with their parks and recreation facilities.

To determine if it would be appropriate to conclude that approximately 40% of the entire population of California is satisfied with their parks and recreation facilities, we need to consider the response rates and sample sizes of both the initial survey and the follow-up sample.

In the initial survey:

The researcher sent out the survey questionnaire to 200,000 people in California.

150,000 people responded to the survey, and 40% of them reported being satisfied.

From this initial survey data alone, we can estimate that 40% of the respondents are satisfied, but we cannot directly conclude that 40% of the entire population of California is satisfied. This is because the respondents may not be representative of the entire population.

Now let's consider the follow-up sample:

The researcher follows up with a random sample of the 50,000 people who didn't respond to the original survey.

In this follow-up sample, it is found that they also report being satisfied about 40% of the time.

The follow-up sample provides additional information, but we need to evaluate its representativeness as well. If the follow-up sample is also representative of the overall population, it would provide support for the conclusion that approximately 40% of the entire population of California is satisfied with their parks and recreation facilities.

However, it's important to note that non-response bias may exist. Non-response bias occurs when the characteristics of those who respond to a survey differ from those who do not respond. In this case, the 50,000 people who didn't respond to the original survey may have different characteristics than the 150,000 who did respond. If the non-responders are systematically different from the responders, it could introduce bias into the follow-up sample and affect the generalizability of the findings.

Therefore, without further information on the representativeness of the follow-up sample and potential non-response bias, it would be cautious to conclude solely based on the given information that approximately 40% of the entire population of California is satisfied with their parks and recreation facilities.

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(a) The set of vectors forms a plane in ℝ³.

(b) The set of vectors forms a plane in ℝ³.

(c) The set of vectors forms all of ℝ³.

To determine whether the set of all linear combinations of a given set of vectors in ℝ³ forms a line, a plane, or all of ℝ³, examine the linear independence of the vectors.

(a) {(-2, 5, -3), (6, -15, 9), (-10, 25, -15)}:

To determine the linear independence, form a matrix using these vectors as rows and perform row reduction. If the row-reduced echelon form contains a row of zeros, it indicates linear dependence.

Creating a matrix and performing row reduction:

-2 5 -3

6 -15 9

-10 25 -15

After row reduction, we obtain the following row-reduced echelon form:

1 -5/2 3/2

0 0 0

0 0 0

Since the row-reduced echelon form contains a row of zeros, the vectors are linearly dependent. Therefore, the set of all linear combinations of these vectors forms a plane in ℝ³.

(b) {(1, 2, 0), (1, 1, 1), (4, 5, 3)}:

Performing the same process, we create a matrix and perform row reduction:

1 2 0

1 1 1

4 5 3

After row reduction, we obtain the following row-reduced echelon form:

1 0 -2

0 1 2

0 0 0

Since the row-reduced echelon form does not contain a row of zeros, the vectors are linearly independent. Thus, the set of all linear combinations of these vectors forms a plane in ℝ³.

(c) {(0, 0, 3), (0, 1, 2), (1, 1, 0)}:

Creating a matrix and performing row reduction:

0 0 3

0 1 2

1 1 0

After row reduction, we obtain the following row-reduced echelon form:

1 1 0

0 1 2

0 0 3

Since the row-reduced echelon form does not contain a row of zeros, the vectors are linearly independent. Therefore, the set of all linear combinations of these vectors forms all of ℝ³.

In summary:

(a) The set of vectors forms a plane in ℝ³.

(b) The set of vectors forms a plane in ℝ³.

(c) The set of vectors forms all of ℝ³.

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The complete question goes thus:

Determine whether the set of all linear combinations of the following set of vector in R3 is a line or a plane or all of R3. Justify, your answer. (a) {(-2,5,-3), (6, -15,9),(-10, 25, -15)} (b) {(1,2,0), (1,1,1),(4,5,3)} (c) {(0,0,3), (0,1,2), (1,1,0)}

An inequality forms a boundary on a number line by defining a range of values that the variable can take. The number line provides a visual representation of this range, with the boundary points indicating the limits of the variable. The inequality establishes the relationship between the variable and the boundary values, determining whether the variable is greater than, less than, or equal to those boundaries.

For example, consider the inequality x > 3. This inequality forms a boundary on the number line at x = 3, indicating that x is greater than 3. Any value of x that lies to the right of this boundary satisfies the inequality, while values to the left do not. The inequality sets the boundary by defining the conditions for inclusion or exclusion of values on the number line, effectively determining the extent or limit of the variable's range. The number line provides a visual representation of this boundary, helping us understand the solution set and the relationship between the variable and its boundaries.

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The rational zeros of the polynomial function can be found using the Rational Root Theorem, the rational zeros of the polynomial function f(x) = x³ - 3/2 x² - 23/2 x + 6 are -3/2, 1, and 2.

Which states that any rational zero of a polynomial function with integer coefficients must be of the form p/q, where p is a factor of the constant term and q is a factor of the leading coefficient. In this case, the constant term is 6 and the leading coefficient is 1.

To find the factors of 6, we have ±1, ±2, ±3, and ±6. To find the factors of 1, we have ±1. Therefore, the possible rational zeros are ±1, ±2, ±3, and ±6.

To determine which of these possible zeros are actual zeros of the polynomial function, we can use synthetic division or evaluate the function at each possible zero and check if the result is equal to zero. Synthetic division can help simplify the process by quickly testing the possible zeros.

By performing synthetic division or evaluating the function, we find that the rational zeros of the polynomial function are: x = -3/2, x = 1, and x = 2.

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The distance from P to l is √10.

To find the distance from point P to l, first we need to find the equation of line l for which we need to calculate slope and y-intercept. After that we have to find the perpendicular distance from point P to l with the help of perpendicular distance formula.

So, the equation of l with points (0,3) and (-4,-9) is:

m = y2 - y1 / x2 - x1

m = -9 -3 / -4 - 0

m = -12 / -4

m = 3

with the help of slope, let's calculate the y-intercept:

y = mx + c

3 = 3(0) + c

c = 3

So, the equation of the line l is y = 3x + 3.

Now, let's calculate the perpendicular distance from point P to line l:

Distance = [tex]\frac{|Ax1 + By1 + C|}{\sqrt{A^{2} + B^{2} } }[/tex]

Comparing with Ax + By + C = 0, we have A = 3, B = -1, C = 3, and (x1, y1) = (-6, -5). So, after substituting the values in the equation, we get:

Distance = [tex]\frac{|3(-6) + -1(-5) + (3)|}{\sqrt{3^{2} + (-1)^{2} } }[/tex]

Distance = |-10| / √10

Distance = √10

Therefore, the distance from P to l is √10.

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The linear stepwise representation of the process of science oversimplifies the complex and iterative nature of scientific inquiry. It fails to capture the non-linear and dynamic aspects of scientific investigations, which often involve back-and-forth iterations, revisions, and new discoveries. The linear representation can create a false impression that science progresses in a straightforward and predictable manner.

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The population grew by 162 students between 2005 and 2008. It took 3 years for the population to grow from 1664 students to 1826 students. The average population growth per year is 54 students. The equation for the population, P, of the school t years after 2000 is P = 54t + 1394. Using the equation, the predicted population of the school in 2014 is 2150 students

The population growth between 2005 and 2008 is calculated by subtracting the initial population from the final population:

Population growth = Final population - Initial population

Population growth = 1826 - 1664

Population growth = 162 students

Therefore, the population grew by 162 students between 2005 and 2008.To determine how long it took the population to grow from 1664 students to 1826 students, we need to find the time difference between these two years:

Time taken = 2008 - 2005

Time taken = 3 years

Therefore, it took 3 years for the population to grow from 1664 students to 1826 students. The average population growth per year can be calculated by dividing the population growth by the time taken:

Average population growth per year = Population growth / Time taken

Average population growth per year = 162 students / 3 years

Average population growth per year = 54 students per year

Therefore, the average population growth per year is 54 students.  The question does not provide information about the population in the year 2000, so we cannot determine the population for that year without additional data. To find an equation for the population (P) of the school t years after 2000, we can use the given data points to establish a linear relationship between time and population.

We know that in 2005, the population was 1664, so the point (t=5, P=1664) is on the line. Additionally, in 2008, the population was 1826, giving us the point (t=8, P=1826). We can use these two points to find the equation of the line using the slope-intercept form (y = mx + b).

Slope (m) = (Change in population) / (Change in time)

         = (1826 - 1664) / (8 - 5)

         = 162 / 3

         = 54

Using the point-slope form of the equation:P - P1 = m(t - t1)

where P1 = 1664 and t1 = 5, we can substitute the values:

P - 1664 = 54(t - 5)

Expanding and simplifying: P - 1664 = 54t - 270

P = 54t - 270 + 1664

P = 54t + 1394

Therefore, the equation for the population, P, of the school t years after 2000 is P = 54t + 1394.Using the equation P = 54t + 1394, we can predict the population of the school in 2014 by substituting t = 2014 - 2000 = 14:

P = 54(14) + 1394

P = 756 + 1394

P = 2150

Therefore, using the equation, the predicted population of the school in 2014 is 2150 students.

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The checkmarks that can be placed next to the characteristics of the graph are as follows:

The given graph has an array of characteristics that include the fact that it forms a straight line that springs from its linear function.

In addition, this graph has an increasing constant and this is peculiar to graphs that have the coordinates in the y-axis getting larger in an upwards direction. So, the above three attributes are characteristic of the given graph.

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Juan would have to make $20 in sales to earn the same amount as Rita in a two-hour shift.

Let's calculate the earnings for both Rita and Juan in a two-hour shift.

Rita's earnings:

Rita earns $7 per hour, so in a two-hour shift, she would earn:

Rita's earnings = $7/hour * 2 hours = $14

Juan's earnings:

Juan earns $6 per hour plus a 10% commission on sales. Let's assume his sales in dollars are S.

Juan's earnings = (hourly wage * hours worked) + (commission rate * sales)

Juan's earnings = ($6/hour * 2 hours) + (0.10 * S)

To earn the same amount as Rita, Juan's earnings should be equal to $14.

($6/hour * 2 hours) + (0.10 * S) = $14

Simplifying the equation:

$12 + 0.10S = $14

Subtracting $12 from both sides:

0.10S = $14 - $12

0.10S = $2

Dividing both sides by 0.10:

S = $2 / 0.10

S = $20

Therefore, Juan would have to make $20 in sales to earn the same amount as Rita in a two-hour shift.

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The linear expressions for the height and the width are (x + 3) and (x - 2), respectively.

To factor the polynomial -x^3 - x^2 + 6x, we can look for common factors and apply factoring techniques.

First, let's factor out -x to simplify the expression:

V(x) = -x(x^2 + x - 6)

Now, we need to factor the quadratic expression x^2 + x - 6. To do this, we look for two numbers that multiply to -6 and add up to +1 (the coefficient of the x term). The numbers that satisfy these conditions are +3 and -2.

Therefore, we can factor the quadratic as:

V(x) = -x(x + 3)(x - 2)

The factored form of the polynomial is -x(x + 3)(x - 2).

To determine the linear expressions for the height and the width, we can consider the factors:

Height: (x + 3)

Width: (x - 2)

Since the problem states that the height is greater than the width, we can assign the expressions accordingly:

Height = (x + 3)

Width = (x - 2)

Therefore, the linear expressions for the height and the width are (x + 3) and (x - 2), respectively.

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The maximum-likelihood estimates of the probabilities for clear, cloudy, and rainy summer days next year can be derived from this year's weather data. The estimates are given by the ratios of the number of days with each type of weather to the total number of days in the summer. The maximum-likelihood estimates are pclear = nclear/100, pcloudy = ncloudy/100, and prainy = nrainy/100.

To find the maximum-likelihood estimates of pclear, pcloudy, and prainy, we divide the number of days with each type of weather by the total number of days in the summer. Given that nclear = 62, ncloudy = 28, nrainy = 10, and the total number of days in the summer is 100, we can calculate the estimates as follows:

pclear = nclear/100 = 62/100 = 0.62

pcloudy = ncloudy/100 = 28/100 = 0.28

prainy = nrainy/100 = 10/100 = 0.1

These estimates represent the probabilities of each type of weather occurring on a summer day next year, based on the observed frequencies from this year's data. For example, the estimate of pclear suggests that there is a 0.62 (or 62%) chance of a summer day next year being clear.

It is important to note that these estimates assume that next summer's weather will follow the same pattern as this year's. However, weather patterns can vary, and other factors may influence the probabilities of different weather types. Therefore, these estimates provide a reasonable approximation based on the available data, but they may not accurately reflect the actual probabilities for next year's weather.

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f(x)=3x+6 and g(x)=9−x², then: a) f(g(0)) = 9

                                                  (b) g(f(0)) = 3

* **(a)** f(g(0)) is found by first evaluating g(0) and then evaluating f(g(0)).

* g(0) = 9 - 0² = 9.

* f(9) = 3(9) + 6 = 27 + 6 = 33.

* Therefore, f(g(0)) = 33.

* **(b)** g(f(0)) is found by first evaluating f(0) and then evaluating g(f(0)).

* f(0) = 3(0) + 6 = 6.

* g(6) = 9 - 6² = 9 - 36 = -27.

* Therefore, g(f(0)) = -27.

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Given a mean of 63.5 and a standard deviation of 12.333, the proportion of data within one standard deviation of the mean is approximately 0.6826. Hence, approximately 68.26% (0.6826) of the data lie within one standard deviation of the mean.

To find the proportion of data within one standard deviation of the mean, we can use the properties of the standard normal distribution. In a standard normal distribution, approximately 68% of the data falls within one standard deviation of the mean.

To calculate the z-scores for one standard deviation above and below the mean, we can use the formula:

z = (x - μ) / σ

where x is the value, μ is the mean, and σ is the standard deviation.

For one standard deviation below the mean:

z_lower = (63.5 - 63.5) / 12.333 = 0

For one standard deviation above the mean:

z_upper = (63.5 + 12.333 - 63.5) / 12.333 = 1

We can then find the area under the normal distribution curve between these z-scores. Since the total area under the curve is 1, the proportion of data within one standard deviation of the mean is given by the area between z = 0 and z = 1, which is approximately 0.6826.

Therefore, approximately 68.26% (0.6826) of the data lie within one
standard deviation of the mean.

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Answer:

Step-by-step explanation:

The correct statement that describes the graph of y = f(x − 7) + 3 is:

D. It is the graph of f translated 3 units up and 7 units to the right.

Explanation:

Starting with the original function f(x) = 3√x, the given transformation y = f(x − 7) + 3 indicates that the graph has undergone two transformations: a horizontal translation (shifting) of 7 units to the right and a vertical translation of 3 units up.

The function f(x − 7) represents a horizontal translation of 7 units to the right, moving the entire graph horizontally. Then, adding +3 to the function results in a vertical translation of 3 units up.

Therefore, the correct statement is that the graph of y = f(x − 7) + 3 is the graph of f translated 3 units up and 7 units to the right.

The volume of the cylinder is approximately 904.8 cubic inches.

The surface area of a cylinder is given by the formula A = 2πrh + 2πr^2, where A represents the surface area, r represents the radius, and h represents the height of the cylinder. In this case, the surface area is given as 144π square inches, and the height is 6 inches. We can set up the equation as follows:

144π = 2πr(6) + 2πr^2

To simplify the equation, we can divide both sides by 2π: 72 = 6r + r^2

Rearranging the equation, we have: r^2 + 6r - 72 = 0

Factoring the quadratic equation, we get: (r + 12)(r - 6) = 0

Solving for r, we find two possible solutions: r = -12 or r = 6. Since a negative radius is not meaningful in this context, we discard the negative value.

\Thus, the radius of the cylinder is 6 inches. Using the formula for the volume of a cylinder, V = πr^2h, we can calculate the volume:

V = π(6^2)(6)

 = π(36)(6)

 ≈ 904.8 cubic inches

Therefore, the volume of the cylinder is approximately 904.8 cubic inches, rounded to the nearest tenth.

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The determinant of the given matrix is 19.

To evaluate the determinant of a 3x3 matrix, we can use the formula:
det(A) = a(ei - fh) - b(di - fg) + c(dh - eg)

Plugging in the values from the given matrix:
A = [-3 2 0 -2 1 5 -1 0 3]

We can calculate the determinant as follows:
det(A) = (-3)((1)(3) - (5)(0)) - (2)((-2)(3) - (5)(-1)) + (0)((-2)(0) - (1)(-1))
      = (-3)(3) - (2)(7) + (0)(1)
      = -9 - 14 + 0
      = -23 + 0
      = -23

Therefore, the determinant of the given matrix is -23.

Determinants are useful in various areas of mathematics and have applications in solving systems of linear equations, calculating inverse matrices, and determining the invertibility of a matrix. The determinant represents a scalar value that provides information about the properties of the matrix. In this case, the determinant of -23 indicates that the given matrix is not invertible, meaning it does not have an inverse matrix. The magnitude of the determinant also gives insights into the scaling factor of the matrix transformation.

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The name of the graph is a parabola. A parabola is a U-shaped curve that is symmetric about its vertex.

The vertex of the parabola is at the point (-1, -2). This is the point where the parabola changes direction from increasing to decreasing.

The vertex is a minimum value. This means that the value of the function is decreasing as x approaches the vertex.

The x-intercepts are the points where the parabola crosses the x-axis. These points are (-3, 0) and (2, 0).

There are no y-intercepts, because the parabola does not intersect the y-axis.

The vertex of the parabola is the point where the derivative of the function is equal to 0. In this case, the derivative of the function is f'(x) = -4x + 4. Setting f'(x) = 0 and solving for x gives us x = -1. The vertex is then (-1, f(-1)) = (-1, -2).

The x-intercepts of the parabola are the points where the function is equal to 0. In this case, the function is equal to 0 when x = -3 and x = 2.

The y-intercept of the parabola is the point where the function is equal to 0 and x = 0. In this case, the function is equal to 6 when x = 0. Therefore, there are no y-intercepts.

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The exact value of sin 600° is -√3/2. To find the exact value of sin 600° using a double-angle identity, we can express 600° as a sum or difference of angles that have known sine values.

First, we can rewrite 600° as 360° + 240°. Using the double-angle identity for sine, which states that sin 2θ = 2sin θ cos θ, we can rewrite sin 600° as sin (360° + 240°).

Using the sine addition formula, sin (a + b) = sin a cos b + cos a sin b, we can expand sin (360° + 240°) as sin 360° cos 240° + cos 360° sin 240°.

Since sin 360° = 0 and cos 360° = 1, the expression simplifies to 0 cos 240° + 1 sin 240°.

Finally, sin 240° can be determined using the trigonometric values of special angles, specifically the 30°-60°-90° triangle. In a 30°-60°-90° triangle, sin 60° = √3/2. Therefore, sin 240° = sin (180° + 60°) = -sin 60° = -√3/2.

Hence, the exact value of sin 600° is -√3/2.

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To solve the system of equations by substitution, we'll start by solving one equation for one variable and then substituting that expression into the other equation.

Given the system of equations:
1) x + y = 3
2) y = x² - 8x - 9
We can rearrange equation 1 to solve for y: y = 3 - x
Now we substitute this expression for y in equation 2: 3 - x = x² - 8x - 9
Rearranging equation 2: x² - 7x - 6 = 0
Now we can factorize the quadratic equation:
(x - 6)(x + 1) = 0

Setting each factor equal to zero: x - 6 = 0 or x + 1 = 0
Solving for x: x = 6 or x = -1
Now we substitute these values of x back into equation 1 to find the corresponding y-values: For x = 6: y = 3 - 6
y = -3
For x = -1:
y = 3 - (-1)
y = 4
Therefore, the solutions to the system of equations are (x, y) = (6, -3) and (x, y) = (-1, 4).

To solve a system of equations by substitution, we choose one equation and solve it for one variable in terms of the other variable. In this case, we solved equation 1 for y, obtaining y = 3 - x. Then, we substituted this expression for y into equation 2. This led us to a quadratic equation, which we factorized and solved for x. Once we found the values of x, we substituted them back into equation 1 to determine the corresponding y-values.

The resulting solutions were (x, y) = (6, -3) and (x, y) = (-1, 4). These represent the points of intersection between the two equations, satisfying both equations simultaneously.

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A. Neither Lola nor Xavier is correct.

B. To determine if Graciela or Xavier is correct, we need to understand the properties of squares and rhombuses.

A square is a special type of parallelogram where all four sides are equal in length and all angles are right angles (90 degrees).

A rhombus, on the other hand, is a parallelogram where all four sides are equal in length, but the angles are not necessarily right angles.

Given that PR = QS, we can conclude that the opposite sides of the parallelogram PORS are equal.

However, we cannot determine if the angles are right angles based on this information alone.

Therefore, we cannot conclude that the parallelogram is a square.

Similarly, since PR = QS, we can conclude that the opposite sides of the parallelogram are equal in length, which is a property of a rhombus.

However, we cannot determine if the angles are equal or not.

Therefore, we cannot conclude that the parallelogram is a rhombus either.

In summary, without additional information about the angles of the parallelogram PORS, we cannot determine if it is a square or a rhombus.

Therefore, neither Lola nor Xavier is correct based on the given information.

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The number described, "the average amount of sleep college students get each night is 6.2 hours," is a statistic.

In the field of statistics, a statistic refers to a numerical value that is calculated from a sample of data. In this case, the average amount of sleep is based on a sample of college students. It represents a characteristic or measure of the sample.

The reason it is considered a statistic and not a parameter is because a parameter refers to a numerical value that describes a population as a whole. To obtain a parameter, data from the entire population would need to be collected and analyzed. In this case, the average amount of sleep for all college students would need to be determined, which is not feasible.

Therefore, since the information is based on a sample, the average amount of sleep of 6.2 hours is considered a statistic. It provides insight into the sleep habits of the specific group of college students that were surveyed.

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To find the derivative dy/dx of the function y = 2x + 2/x², we can use the quotient rule. The value of dy/dx at x = 1 is -2

The quotient rule states that if we have a function of the form f(x) = g(x)/h(x), then the derivative is given by:

f'(x) = (g'(x)h(x) - g(x)h'(x))/[h(x)]²

In this case, g(x) = 2x + 2 and h(x) = x². Let's find the derivatives of g(x) and h(x):

g'(x) = 2 (the derivative of 2x is 2)

h'(x) = 2x (the derivative of x² is 2x)

Now we can substitute these values into the quotient rule formula:

f'(x) = [(2)(x²) - (2x)(2x)]/[x²]²

      = [2x² - 4x²]/[x⁴]

      = -2x²/[x⁴]

      = -2/x²

Now, to find the value of dy/dx at x = 1, we substitute x = 1 into the derivative:

dy/dx = -2/(1)²

      = -2/1

      = -2

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The triangle ∆MNO is similar to the triangle ∆M'N'O' hence, N'O' is equal to 4.5 inches and M'O' is equal to 6 inches

Similar triangles are two triangles that have the same shape, but not necessarily the same size. This means that corresponding angles of the two triangles are equal, and corresponding sides are in proportion.

We solve for N'O' and M'O' with the proportion equation as follows:

NO/N'O' = MN/M'N'

3in/N'O' = 2/3

N'O' = (3 × 3in)2 {cross multiplication}

N'O' = 4.5 in

MO/M'O' = MN/M'N'

4in/M'O' = 2/3

M'O' = (3 × 4in)2 {cross multiplication}

M'O' = 6 in

Therefore, the similar triangles ∆MNO and ∆M'N'O' have the value of N'O' equal to 4.5 inches and M'O' is equal to 6 inches

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The length of the wire used to make the coil is approximately 0.4241 meters, calculated using the given values and formulas.

Let's calculate the length of the wire using the given values:


Number of turns (N) = 115
Magnetic field (B) = 0.700 T
Frequency (f) = 60.0 Hz
RMS emf (emf) = 110 V

We know that ω = 2πf, so ω = 2π * 60 = 120π radians/s.

First, let's calculate the radius (r) of the circular coil:
emf = N * B * A * ω
110 = 115 * 0.700 * π * r^2 * 120π
110 = 9660 * π^2 * r^2
r^2 = 110 / (9660 * π^2)
r^2 ≈ 3.61 * 10^(-6)
r ≈ √(3.61 * 10^(-6))
r ≈ 0.0019 m (rounded to four decimal places)

Now, let's calculate the length of the wire:
Length = 2πr * N
Length = 2π * 0.0019 * 115
Length ≈ 0.4241 meters (rounded to four decimal places)

Therefore, the length of the wire from which the coil is made is approximately 0.4241 meters.

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Question -A generator uses a coil that has 115 turns and a 0.700-T magnetic field. The frequency of this generator is 60.0 Hz, and its emf has an rms value of 110 V. Assuming that each turn of the coil is circular, determine the length of the wire from which the coil is made.

The calculated area of the triangles is 5 square units

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

Area = Length * Width/2

Where

Length = L

Width = W

For the triangle, we have

L = 2 and W = 5

When the given values are substituted, we have the following equation

Area = 2 * 5/2

Area = 5

Hence, the area of the triangle is 5 square units

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180 millimeters is equal to 0.18 meters.

To complete the sentence, we need to convert 180 millimeters to meters.

1 meter is equal to 1000 millimeters, or alternatively, 1 millimeter is equal to 0.001 meters.

Therefore, to convert 180 millimeters to meters, we can multiply it by the conversion factor:

180 mm x 0.001 meters/mm = 0.18 meters.

So, 180 millimeters is equal to 0.18 meters.

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Answer:

x = 9 or x = -17

Step-by-step explanation:

|x+4|+3=17

|x+4| = 13

When finding absolute value, to get rid of brackets, we need two different values on the right side of the equation: One positive and one negative. So,

x + 4 = 13

or

x + 4 = -13

For x + 4 = 13:

x = 9

For x + 4 = -13:

x = -17

The solution to the given system of equations -2x+3y+z = 1 x-3z= 7 -y+z= -5 is x = -2, y = 3, and z = 4.

We can solve this system using various methods, such as substitution or elimination. Here, we'll use the elimination method.

First, let's eliminate the variable z by adding the second and third equations together:

x - 3z + (-y + z) = 7 + (-5)

x - y - 2z = 2.

Next, let's eliminate the variable x by multiplying the first equation by -1 and adding it to the new equation we obtained:

-(-2x + 3y + z) + (x - y - 2z) = -1 + 2

2x - 3y - z + x - y - 2z = 1.

Simplifying this equation gives us:

3x - 4y - 3z = 3.

Now, we have a system of two equations:

x - y - 2z = 2,

3x - 4y - 3z = 3.

We can solve this system by elimination or substitution methods. By substituting x = 2 + y + 2z into the second equation, we can find y and z. After substituting the values back into the first equation, we can solve for x. Solving the system yields x = -2, y = 3, and z = 4. Therefore, the solution to the system is x = -2, y = 3, and z = 4.

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