a pipe leaks 45 milliliters of water every 9 minutes. Which tells the rate at which the water is leaking.

The probability that a randomly selected point within the circle falls in the red-shaded square is: 0.50

The formula for the area of a circle is:

A = πr²

where:

A is area

r is radius

Thus:

A = π * 4²

A = 50.265 unit²

Area of square = side * side

Area = 5 * 5

Area = 25 unit²

Thus:

P(selected area falls in the read square) = 25/50.265

P(selected area falls in the read square) = 0.497 ≈ 0.50

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Shawndra is correct

(A) It is not possible to draw a trapezoid that is a rectangle true.

(B) it is possible to draw a square that is a rectangle true.

A. A trapezoid cannot be drawn as a rectangle.

The statement is true because we cannot draw a trapezoid that is a rectangle as a rectangle is a parallelogram with two pairs of parallel sides having opposite sides equal in length whereas a trapezoid is a quadrilateral with exactly one pair of parallel sides.

B. A square can be drawn as a rectangle.

The statement is true because we can draw a square that is a rectangle as any parallelogram with right angles is referred to be a rectangle whereas a parallelogram with right angles that has two pairs of opposite sides is a square. Despite being a unique type of rectangle with equal-length sides, squares are all rectangles.

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To find the P-value, we need to find the probability of getting a test statistic less than or equal to the -1.38 under a null hypothesis.

Using a standard normal distribution table or calculator, we find that the area to the left of -1.38 is 0.0844.

Therefore, the P-value is 0.0844.

To decide whether to reject the null hypothesis at a significance level of α = 0.05, we compare the P-value to α. Since the P-value (0.0844) is greater than α (0.05), we fail to reject the null hypothesis. We do not have enough evidence to support the alternative hypothesis at the 0.05 level of significance.

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Answer:

476 cm²

Step-by-step explanation:

area of top rectangle = 20 X 7 = 140.

area of bottom rectangle = 12 X (10 + 6) = 12 X 16 = 192.

area of small triangle = 1/2 X 6 X (20 - 12) = 1/2 X 6 X 8 = 24.

area of large triangle = 1/2 X 10 X 24 = 120.

area of the figure = 140 + 192 + 24 + 120 = 476 cm²

Thus, the equation of the curve that satisfies the differential equation and passes through the point (4,-3) is y = -3x^2/5 + 57/5.

To find the particular solution to the given differential equation, we first need to separate the variables. We can do this by rearranging the equation as follows:

4y^2 dx = 9x^2 dy
dy/dx = 4y^2/9x^2

Now, we can integrate both sides with respect to their respective variables. Integrating the left-hand side gives us y as a function of x:

∫dy = ∫4y^2/9x^2 dx
y = -3x^2/5 + C

To find the value of the constant C, we can use the initial condition provided in the problem. When x = 4 and y = -3, we have:

-3 = -3(4)^2/5 + C
C = 57/5

Therefore, the particular solution to the differential equation is:

y = -3x^2/5 + 57/5

This is the equation of the curve that satisfies the differential equation and passes through the point (4,-3).

In summary, the process of finding a particular solution to a differential equation involves separating the variables, integrating both sides, and using the initial conditions to determine the value of the constant of integration. The resulting function is the particular solution to the differential equation.

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Yes; using proportions, Andy is correct to believe that he has enough builders to finish this wall in less than 11 days.

Proportion refers to the ratio of one quantity or value compared to another.

Proportions are fractional values that are depicted in decimals, fractions, or percentages.

The number of builders that build Andy's wall in 15 days = 8

The number of days it would take 8 builders to finish the wall = 15 days

Proportionately, if 8 builders would take 15 days to build the wall, 11 builders would take 10.9 days (15 × 8) ÷11], which is approximately 11 days.

Thus, we can conclude that Andy is correct as 11 builders would take less than 11 days to finish the wall.

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Answer:

The lines are the same. (Infinite Solutions)

Step-by-step explanation:

To solve this, we need to get either x or y to cancel out and equal 0 first.

Let's look at our two equations.

4x-5y=(-2)

-8x+10y=4

I'm going to divide the -8x by 2. Remember when dividing to divide both sides of the equation, otherwise you will end up with something completely different than what you started out with.

-8x+10y=4 (divided by 2)

Our new equation is -4x+5y=2.

Now let's take our other equation. Please see the screenshot to see how this is solved.

Forgive the horrible handwriting, I'm on a computer :(

True, it is often not feasible to study the entire population because it may be impossible to observe all the items in the population. This is especially true in larger populations where it may be impractical or too costly to collect data on every single item. Therefore, researchers often use statistical sampling techniques to select a representative subset of the population. This sample is then studied and used to make inferences about the population as a whole. While sampling is not perfect, it can provide a reliable estimate of the population parameters with a certain level of confidence. Therefore, it is essential to carefully choose the sample to ensure that it accurately represents the population.

The question is about the feasibility of studying the entire population. It is often not possible to observe all the items in a population due to various constraints such as time, money, and practicality. Therefore, researchers use sampling techniques to select a representative subset of the population, which can provide a reliable estimate of the population parameters.

In conclusion, it is true that it is often not feasible to study the entire population. However, researchers can use statistical sampling techniques to select a representative subset of the population, which can provide a reliable estimate of the population parameters. It is essential to carefully choose the sample to ensure that it accurately represents the population.

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A sample size of at least 538 freshmen to estimate the proportion of freshmen who do not visit their advisors regularly with a margin of error of 4% and a confidence level of 95%.

To answer your question, we need to use the formula for sample size calculation for proportion:
n = [(Z-score)^2 * p(1-p)] / E^2

Where:
n = required sample size
Z-score = the critical value for the desired confidence level (95% confidence level corresponds to a Z-score of 1.96)
p = the estimated population proportion (34% or 0.34)
1-p = the complement of p
E = the desired margin of error (4% or 0.04)

Plugging in the values:
n = [(1.96)^2 * 0.34(1-0.34)] / (0.04)^2
Simplifying the equation:
n = [(3.8416) * 0.2244] / 0.0016
n = 537.38

We need a sample size of at least 538 freshmen to estimate the proportion of freshmen who do not visit their advisors regularly with a margin of error of 4% and a confidence level of 95%. Keep in mind that this is just an estimate based on the historical data and assumes that the population proportion has not changed significantly.

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Answer: C 3

Step-by-step explanation:

Each of the sides from D have been multiplied by 3 to get D'

3 is the factor

C 3

The measure of the various angles are:

∠1= 130°

∠3 = 130°

∠5= 50°

∠6= 130°

Lines m and l are the parallel lines and a line 'n' is a transverse intersecting these lines.

m∠2 = 50°

m∠1 + m∠2 = 180° [Linear pair of angles]

m∠1 = 180° - 50°

m∠1 = 130°

m∠3 = m∠1 = 130° [Vertically opposite angles]

m∠3 + m∠5 = 180° [Consecutive interior angles]

m∠5 = 180° - m∠3

       = 180° - 130°

m∠5   = 50°

m∠6 + m∠5 = 180° [Linear pair of angles]

m∠6 = 180° - 50°

m∠6= 130°

Hence,  the measure of the various angles are:

∠1= 130°

∠3 = 130°

∠5= 50°

∠6= 130°

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Full Question:

Although part of your question is missing, you might be referring to this full question:

See the attached image.

The coefficient of correlation (r) being -0.30 indicates a weak negative linear relationship between the variables x and y. The value of r ranges from -1 to 1, where -1 indicates a perfect negative linear relationship, 0 indicates no linear relationship, and 1 indicates a perfect positive linear relationship. Therefore, an r value of -0.30 suggests that there is a weak negative relationship between x and y, but the relationship is not strong enough to be considered a significant predictor of y based on x.

The negative value of r indicates that as the value of x increases, the value of y tends to decrease, although the relationship is weak. It is important to note that while a weak correlation does not necessarily imply causation, it does suggest that there may be some underlying relationship between the variables that should be further explored. Therefore, it is recommended to use other statistical measures in conjunction with the coefficient of correlation to determine the strength and significance of the relationship between x and y.

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Marked price: 39 dollars

Selling price: 31 dollars

Discount: ???

Subtract the post-discount price from the pre-discount price.

31-39=-8

Divide this new number by the pre-discount price.

-8/39=-0.20512820512

Multiply the resultant number by 100.

-0.20512820512×100= -20.512820512

Round the number

-20.512820512 → -20.5

The discount was %20.5 off

I hoped I solved your question, if I did not you can tell me and I would be more than glad to fix it ૮ ˶ᵔ ᵕ ᵔ˶ ა

When two data sets are both symmetric, then the appropriate measure of center to describe them would be the mean.

The mean, also known as the average, is calculated by adding up all the values in the data set and dividing by the total number of values. It represents the "center" of the data because it balances out the values on both sides of the distribution.

The mean is a good measure of center for symmetric data sets because it captures the balance of the distribution and provides a single value that summarizes the data.

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Which measure of center should you use to describe two data sets that are both symmetric?

A sample size of 139 is required in order to estimate the time its trucks take to drive from city A to city B with a margin of error of ±2 minutes and 95% confidence, assuming the standard deviation is known to be 12 minutes.

To calculate the sample size required for this scenario, we need to use the formula for the sample size for a mean:
n = (z² * s²) / E²

where:
n = sample size
z = z-score for desired confidence level (95% = 1.96)
s = standard deviation (12 minutes)
E = desired margin of error (2 minutes)

Substituting in the values given, we get:
n = (1.96^2 * 12^2) / 2^2
n = 138.2976

We round up to the nearest whole number to get:
n = 139

Therefore, a sample size of 139 is required in order to estimate the time its trucks take to drive from city A to city B with a margin of error of ±2 minutes and 95% confidence, assuming the standard deviation is known to be 12 minutes.

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The central angle is solved and wheel turns while the car travels 2 meters is 5.5556 radians, and while the car travels 5 meters, it is 13.8889 radians

Given data ,

To find the angle (in radians) that the wheel turns while the car travels a given distance, we can use the formula:

Angle (in radians) = Distance / Radius

a)

For a distance of 2 meters (200 cm):

Angle (in radians) = 200 cm / 36 cm

Angle (in radians) = 5.5556 radians

b)

For a distance of 5 meters:

Angle (in radians) = 500 cm / 36 cm

Angle (in radians) = 13.8889 radians

Hence , the angle (in radians) that the wheel turns while the car travels 2 meters is approximately 5.5556 radians, and while the car travels 5 meters, it is approximately 13.8889 radians

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(a) ab l 1 bc l = ab + bc

(b) cd l 1 db l = cd - db

(c) db l 2 ab l = 2ab + db

(d) dc l 1 ca l 1 ab = -ab + ca + dc

In each of the given combinations of vectors, we need to add or subtract the given vectors.

In case (a), the vectors are parallel and have the same direction, so we can simply add them to get the resultant vector: ab + bc = ac.

In case (b), the vectors are also parallel and have opposite directions, so we can subtract them to get the resultant vector: cd - db = cb.

In case (c), we need to double the vector db and subtract it from vector ab to get the resultant vector: ab - 2db = ab - db - db = ac - db.

In case (d), we need to add vector dc and subtract vectors ca and ab to get the resultant vector: dc - ca - ab = db. Therefore, the resultant vectors are: (a) ac, (b) cb, (c) ac - db, (d) db.

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The probability that the mean weight of a 24-bag case of potato chips is below 10 ounces is approximately 0.

Here,

Let X = weight of potato chips in medium size bag.

The random variable X follows a Normal distribution with mean, μ = 10.2 ounces and standard deviation, σ = 0.12 ounces.

A sample of n = 24 bags of chips is selected.

Compute the probability that the mean weight of these 24 bags is less than 10 ounces as follows:

P (X < 0) = 1 - P(Z < 8.16)

            ≈ 0

Thus, the probability that the mean weight of a 24-bag case of potato chips is below 10 ounces is approximately 0.

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complete question:

The weight of potato chips in a medium-size bag is stated to be 10 ounces the amount that the packaging machine puts in these bags is believed to have a normal model with mean 10.2 and standard deviation 0.12 ounces. What's the probability that the mean weight of a 24-bag case of potato chips is below 10 ounces?

The slopes are not equal (7/6 ≠ 7/2), we can conclude that the segments CD and AB are not parallel in triangle ABCDE.

To verify that the segments CD and AB are parallel in triangle ABCDE, we need to show that the corresponding sides have the same slope.

Let's first find the slope of segment CD. Given that point C is the origin (0,0) and point D has coordinates (EC, ED) = (12, 14), the slope of CD can be calculated as follows:

slope_CD = (ED - 0) / (EC - 0)

= 14 / 12

= 7 / 6

Now, let's find the slope of segment AB. Given that point A is the origin (0,0) and point B has coordinates (CA, DB) = (4, 42/3), the slope of AB can be calculated as follows:

slope_AB = (DB - 0) / (CA - 0)

= (42/3) / 4

= (14/1) / (4/1)

= 14 / 4

= 7 / 2

If the slopes of CD and AB are equal, then the segments are parallel. Let's compare the slopes:

slope_CD = 7 / 6

slope_AB = 7 / 2

Since the slopes are not equal (7/6 ≠ 7/2), we can conclude that the segments CD and AB are not parallel in triangle ABCDE.

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The reciprocal of 20.95 to 4 decimal places using the table of reciprocals is 0.0478.

To find the reciprocal of 20.95, we can look up the reciprocal of 20.9 or 21 in the table and then interpolate to get a more accurate value for 20.95.

To interpolate, we can calculate the difference between 20.95 and 20.9, which is 0.05, and the difference between the reciprocals of 20.95 and 20.9, which is 0.00009.

Then we can use the formula:

reciprocal of 20.95 = reciprocal of 20.9 + (difference / interval) x (reciprocal of 21 - reciprocal of 20.9)

where interval is the difference between the numbers in the table (which is 0.1 in this case).

Thus:

reciprocal of 20.95 = 0.04784 + (0.05 / 0.1) x (0.04762 - 0.04784)

= 0.04784 + 0.025 x (-0.00022)

= 0.04784 - 0.0000055

= 0.0478345

In other words, the reciprocal of 20.95 to 4 decimal places using the tables of reciprocals is 0.0478.

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By algebra properties, the simplified form of the expressions are listed below in the following four cases:

Case 1: 6

Case 2: 1 / 5

Case 3: √3

Case 4: - 3

In this problem we must simplify expressions involving powers and roots by algebra properties, mainly power and root properties. Now we proceed to show how each expression is simplified:

Case 1

[tex](1^{3}+2^{3}+ 3^{3})^{\frac {1}{2}}[/tex]

[tex](1 + 8 + 27)^{\frac{1}{2}}[/tex]

[tex]36^{\frac{1}{2}}[/tex]

√36

6

Case 2

[tex]\left[\left(625^{-\frac{1}{2}}\right)^{-\frac{1}{4}}\right]^{2}[/tex]

[tex]\left[\left[\left(625^{\frac{1}{2}}\right)^{-1}\right]^{-\frac {1}{4}}\right]^{2}[/tex]

[tex]\left[\left(\frac{1}{25}\right)^{\frac{1}{4}}\right]^{2}[/tex]

[tex]\left(\frac{1}{25} \right)^{\frac{1}{2}}[/tex]

√(1 / 25)

1 / 5

Case 3

[tex]\frac{9^{\frac{1}{2}}\times 27^{- \frac {1}{3}}}{3^{\frac{1}{6}}\times 3^{-\frac{2}{3}}}[/tex]

[tex]\frac{(3^{2})^{\frac{1}{2}}\times (3^{3})^{-\frac{1}{3}}}{3^{\frac{1}{6}}\times 3^{-\frac{2}{3}}}[/tex]

[tex]\frac{3\times 3^{- 1}}{3^{\frac{1}{6}}\times 3^{- \frac{2}{3}}}\\[/tex]

[tex]\frac{1}{3^{-\frac{1}{2}}}[/tex]

[tex]3^{\frac{1}{2}}[/tex]

√3

Case 4

[tex]64^{-\frac{1}{3}}\cdot \left[64^{\frac{1}{3}}-64^{\frac{2}{3}}\right][/tex]

[tex]64^{-\frac{1}{3}}\cdot 64^{\frac{1}{3}}-64^{-\frac{1}{3}}\cdot 64^{\frac{2}{3}}[/tex]

[tex]1 - 64^{ \frac{1}{3}}[/tex]

1 - ∛64

1 - 4

- 3

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The relationship between x and y is neither linear nor exponential. To determine if the relationship between x and y is linear, exponential, or neither, we can create a table of values and see if there is a constant rate of change or a constant ratio between the values of x and y.

x | y
---|---
5 | -1
19 | -6
33 | -36
47 | -216
Looking at the table, we can see that there is no constant rate of change between the values of x and y. Therefore, the relationship is not linear. To determine if the relationship is exponential, we can check if there is a constant ratio between the values of y and x.
y/x = (-1)/5 = -0.2
(-6)/19 = -0.3158
(-36)/33 = -1.0909
(-216)/47 = -4.5957
Since the ratio between y and x is not constant, the relationship is not exponential either.

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a.  We are 95% confident that the true average porosity of the seam is between 4.25 and 5.45.

b. We are 98% confident that the true average porosity of the seam is between 3.68 and 5.44.

c. A sample size of at least 14 is necessary.

d. A sample size of at least 138 is necessary.

a. To compute a 95% confidence interval for the true average porosity of a certain seam, we use the formula:

CI = x ± tα/2 (s/√n)

where x is the sample average porosity, s is the sample standard deviation, n is the sample size, and tα/2 is the t-value with n-1 degrees of freedom and α/2 probability (0.025 for a 95% confidence interval).

Substituting the given values, we get:

CI = 4.85 ± 2.093 (0.75/√20)

= (4.25, 5.45)

Therefore, we are 95% confident that the true average porosity of the seam is between 4.25 and 5.45.

b. To compute a 98% confidence interval for the true average porosity of another seam, we use the same formula as in part (a), but with a different t-value (2.602 for a 98% confidence interval).

Substituting the given values, we get:

CI = 4.56 ± 2.602 (0.75/√16)

= (3.68, 5.44)

Therefore, we are 98% confident that the true average porosity of the seam is between 3.68 and 5.44.

c. To find the necessary sample size for a 95% confidence interval with a width of 0.40, we use the formula:

n = (tα/2 (s/width))^2

Substituting the given values and solving for n, we get:

n = (1.96 (0.75/0.40))^2

= 13.55

Therefore, a sample size of at least 14 is necessary.

d. To find the necessary sample size for a 99% confidence interval with a width of 0.2, we use the same formula as in part (c), but with a different t-value (2.576 for a 99% confidence interval).

Substituting the given values and solving for n, we get:

n = (2.576 (0.75/0.2))^2

= 137.68

Therefore, a sample size of at least 138 is necessary.

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The exact value of cos 30 degrees is √3/2.

The exact value of sin 45 degrees is 1/√2 or √2/2.

The exact value of tan 30 degrees is 1/√3 or √3/3.

We have,

The exact value of cos 30 can be found using the unit circle, which is a circle with a radius of 1 centered at the origin of a coordinate plane.

On the unit circle, the angle of 30 degrees is measured counterclockwise from the positive x-axis and intersects the circle at a point where the x-coordinate is √3/2 and the y-coordinate is 1/2.

Therefore, Cos 30 is equal to √3/2.

The exact value of sin 45 can also be found using the unit circle. In this case, the angle of 45 degrees intersects the unit circle at a point where both the x-coordinate and y-coordinate are 1/√2.

Therefore, Sin 45 is equal to 1/√2, which can be simplified to (√2)/2.

The exact value of tan 30 can be found using the relationship between tangent and sine/cosine: tan x = sin x / cos x.

Therefore, tan 30 = sin 30 / cos 30.

From the unit circle, we know that sin 30 is equal to 1/2 and cos 30 is equal to √3/2. Substituting these values into the formula, we get,

tan 30 = (1/2) / (√3/2) = 1/√3 = √3/3.

Thus,

The exact value of cos 30 degrees is √3/2.

The exact value of sin 45 degrees is 1/√2 or √2/2.

The exact value of tan 30 degrees is 1/√3 or √3/3.

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If factor a has r levels and factor b has c levels in a two-way ANOVA, we have a r x c factorial design.

In statistics, a factorial design is a study design where all possible combinations of levels of two or more independent variables (factors) are studied. In a two-way ANOVA, two factors are considered, and each factor has multiple levels.

For example, a two-way ANOVA can be used to study the effect of fertilizer type and watering frequency on plant growth, where fertilizer type has three levels and watering frequency has two levels. The resulting design is a 3x2 factorial design.

The number of treatments (unique combinations of levels of factors) in a factorial design is equal to the product of the number of levels of each factor. The advantage of a factorial design is that it allows for the investigation of interactions between factors, which cannot be detected in a one-way ANOVA.

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The two binomials are:

x² + 7x + 12

6x² - 13x + 6

We have,

One possible set of binomials whose product includes the term 12 is:

(x + 4)(x + 3)

Expanding this product, we get:

x^2 + 7x + 12

And,

Another set of binomials whose product includes the term 12 is:

(2x - 3)(3x - 2)

Expanding this product, we get:

6x^2 - 13x + 6

Thus,

The two binomials are:

x² + 7x + 12

6x² - 13x + 6

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Answer:

We have vertical angles, so:

b = 37°

a = c = 180° - 37° = 143°

Sam needs to study approximately 4.6 hours per week to earn a 4.0 GPA. The answer is (d) 4.6 hours.

We know that Sam wants to earn a 4.0 GPA, and his class attendance hours are fixed at 4. Therefore, we can solve for the number of hours he needs to spend studying to achieve this goal by setting the equation equal to 4.0 and solving for the hours spent studying:

4.0 = (0.50 x hours spent studying) + (0.25 x 4) + (0.25 x 2.75)

4.0 = (0.50 x hours spent studying) + 1 + 0.6875

2.3125 = 0.50 x hours spent studying

hours spent studying = 4.625

The correct option is (d) 4.6 hours.

The complete question is:

Sam wants to improve his GPA. to earn a 4.0 this semester. His prior GPA was a 2.75. Imagine that there is an equation that says his new GPA could be calculated based on the number of hours he spends studying, his class attendance, and his prior GPA. Written as an equation, it is Grade = (0.50 x hours spent studying) + (0.25 x class attendance hours) + (0.25 x prior GPA). Sam plans to attend class for 4 out of 4 hours each week. Use the equation to determine approximately how many hours per week Sam needs to study to earn a 4.0.

Select one:

a. 2.3 hours

b. 4.0 hours

c. 1.7 hours

d. 4.6 hours

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After considering all the given options we conclude that the standard error of the mean is 1.80, which is Option A under the condition that the mean is x = 40.0 minutes and the standard deviation is s = 56.9 minutes.

The formula derived for standard error of the mean (SEM) is expressed as:

SEM = σ/√n

Here,

SEM = standard error of the sample,

σ = sample standard deviation

n = sample size.

For the given  case, we have x = 40.0 minutes and s = 56.9 minutes for a sample size of 1000 employed adults in Chicago. Therefore,

SEM = s/√n

   = 56.9/√1000

   ≈ 1.80

Therefore, the answer is A) 1.80.

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The complete question

A study of commuting times reports the travel times to work of a random sample of 1000 employed adults in Chicago. The mean is x = 40.0 minutes and the standard deviation is s = 56.9 minutes.

What is the standard error of the mean?

A) 1.80

B) 21.88

C) 6.99

D) 1.09

Both function have same y - intercept.

The two given functions are;

x:     -3    -2   -1   0   1   2

f(x):   9      4  -1   0   1    4

And, g(x) = 5 cos (3x) - 5

Since, We know that;

The y-intercept occurs when x=0.

Therefore,

⇒ f(x) has a y-intercept of 0

(from given tabular data).

And, g(x) has a y-intercept of at x = 0

 g(0) = 5 cos (0) - 5

        = 5 - 5

        = 0

Hence, Both function have same y - intercept.

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