Solve the equation by using the Quadratic Formula. Round to the nearest tenth, if necessary. Write your solutions from least to greatest, separated by a comma, if necessary. If there are no real solutions, write no solutions.

2x^2=12x−18

Based on the information given, it is possible to analyze the effectiveness of the new anxiety medicine. The medicine was formulated to lower anxiety and was prescribed to participants.

The participants were divided into three groups, where 20 received a 10 mg dosage, another 20 received a 20 mg dosage, and the last 20 participants received a placebo.
After three weeks, a questionnaire was administered that measured anxiety on a scale of 1-30. To compare the groups, the mean score of anxiety for each group can be calculated. If the mean score for the group receiving the medicine is significantly lower than the mean score for the placebo group, it can be concluded that the medicine is effective.

Therefore, statistical analysis of the results would be necessary to determine if the new anxiety medicine is effective in lowering anxiety levels.
 Based on the provided information, the study has been formulated to evaluate the effectiveness of the anxiety medicine by comparing three groups of participants: one group receiving a 10 mg dosage, another receiving a 20 mg dosage, and the last group receiving a placebo. To determine if the new anxiety medicine is effective, it's essential to compare the average anxiety scores of each group after the 3-week period. If the scores in the groups receiving the medicine are significantly lower than the placebo group, it could suggest that the anxiety medicine is effective.

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The correct answer is $128.13.The standard error of the mean can be calculated using the formula:
Standard error of the mean = population standard deviation / square root of sample size

In this case, the population standard deviation is given as $2,050.00 and the sample size is 256 middle managers. Plugging these values into the formula:

Standard error of the mean = $2,050.00 / sqrt(256) = $2,050.00 / 16 = $128.13

Therefore, the correct answer is $128.13.

n experiment involves selecting a random sample of 256 middle managers for study. one item of interest is their annual incomes. the sample mean is computed to be $35,420.00. It's important to note that the standard error of the mean represents the variability of the sample mean from one random sample to another. In other words, if we were to repeat the experiment multiple times, taking different random samples of middle managers each time, the sample mean would vary around the population mean by approximately $128.13. This information can be useful in interpreting the results of the experiment and making inferences about the population of middle managers.

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The amount and interest after 2 years will be $3788.58 and $88.58, respectively.

Given that:

Investment, P = $3,700

Rate, r = 1.19

Time, n = 2 years

The amount is calculated as,

A = P(1 + r)ⁿ

A = $3700 (1 + 0.0119)²

A = $3700 x 1.0239

A = $3788.58

The amount of interest is calculated as,

I = A - P

I = $3788.58 - $3700

I = $88.58

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The resulting curve is a limaçon (a type of cardioid) with a loop. It is centered at the origin and has an inner loop with a radius of 4/5 and an outer loop with a radius of 8/5. The curve has symmetry about both the x-axis and the y-axis. Option C is Correct.

To convert the equation R = -8 cos(θ) + 4 sin(θ) to Cartesian coordinates, we can use the following equations:

x = R cos(θ)

y = R sin(θ)

Substituting the given equation, we get:

x = (-8 cos(θ) + 4 sin(θ)) cos(θ)

y = (-8 cos(θ) + 4 sin(θ)) sin(θ)

Simplifying these equations, we get:

x =[tex]-8 cos^2[/tex](θ) + 4 cos(θ) sin(θ)

y = -8 cos(θ) sin(θ) +  [tex]4 sin^2[/tex](θ)

Simplifying further using the identity we get:

x = -8/5 + 4/5 cos(2θ)

y = 4/5 sin(2θ)

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The probability of z being greater than -2.06 is 0.9801. The value of c that satisfies P(0.48 < z < c) = 0.2162 is 1.77.

To find the probability P(z > -2.06) for a standard normal distribution, we can use a standard normal distribution table or a calculator.

Using a standard normal distribution table, we can look up the area to the left of -2.06, which is 0.0199. Since we want the area to the right of -2.06, we can subtract this from 1 to get:

P(z > -2.06) = 1 - 0.0199 = 0.9801

So the probability of z being greater than -2.06 is 0.9801, rounded to four decimal places.

For the second question, we want to find the value of c such that P(0.48 < z < c) = 0.2162, where z is a standard normal random variable.

Using a standard normal distribution table or a calculator, we can find the area to the left of 0.48, which is 0.6844. Since the standard normal distribution is symmetric about zero, the area to the right of c will also be 0.6844. Therefore, we can find c by finding the z-score that corresponds to an area of 0.6844 + 0.2162 = 0.9006 to the left of it.

Looking this up on a standard normal distribution table or using a calculator, we find that the z-score is approximately 1.29. Therefore:

c = 0.48 + 1.29 = 1.77

So the value of c that satisfies P(0.48 < z < c) = 0.2162 is 1.77, rounded to two decimal places.

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a)  bn = (-1)^n (4/nπ) for n = 1, 3, 5, ... and bn = 0 for n = 2, 4, 6, ... Using these coefficients, we can sketch the periodic extension of f as a series of odd, triangular waves with decreasing amplitude.

b)  a0 = 0, a1 = 4/π, a2 = 0, a3 = 4/(9π), a4 = 0, a5 = 4/(25π), ... and an = 0 for all other even values of n.

c) an = (2/nπ) (1 - (-1)^n) for n = 1, 2, 3, ...

d)  bn = (2/nπ) (1 - (-1)^n) for n = 1, 3, 5, ...

We can sketch the periodic extension of f as a series of odd, sine waves with decreasing amplitude. In order to sketch the periodic extension of f to which each series converges, we need to first find the Fourier or cosine/sine coefficients of the given functions.

(a) For f(x) = |x| - x, we can see that it is an odd function, since f(-x) = -f(x). Therefore, the Fourier series will only have sine terms. We can find the coefficients using the formula:

bn = (2/L) ∫f(x) sin(nπx/L) dx, where L is the period of the function (in this case, L = 2).

After integrating, we get that bn = (-1)^n (4/nπ) for n = 1, 3, 5, ... and bn = 0 for n = 2, 4, 6, ...

Using these coefficients, we can sketch the periodic extension of f as a series of odd, triangular waves with decreasing amplitude.

(b) For f(x) = 2x^2 - 1, we can see that it is an even function, since f(-x) = f(x). Therefore, the Fourier series will only have cosine terms. We can find the coefficients using the formula:

an = (2/L) ∫f(x) cos(nπx/L) dx, where L is the period of the function (in this case, L = 2).

After integrating, we get that a0 = 0, a1 = 4/π, a2 = 0, a3 = 4/(9π), a4 = 0, a5 = 4/(25π), ... and an = 0 for all other even values of n.

Using these coefficients, we can sketch the periodic extension of f as a series of even, square waves with decreasing amplitude.

(c) For f(x) = e^x, we can see that it is an even function, since e^(-x) = e^x. Therefore, we can represent it as a cosine series using the formula:

a0 = (2/L) ∫f(x) dx from 0 to L, where L is the period of the function (in this case, L = 1).

After integrating, we get that a0 = (e - 1)/2.

We can then find the remaining coefficients using the formula:

an = (2/L) ∫f(x) cos(nπx/L) dx from 0 to L.

After integrating, we get that an = (2/nπ) (1 - (-1)^n) for n = 1, 2, 3, ...

Using these coefficients, we can sketch the periodic extension of f as a series of even, cosine waves with decreasing amplitude.

(d) For f(x) = e^x, we can see that it is an odd function, since e^(-x) = 1/e^x = -e^x/-1. Therefore, we can represent it as a sine series using the formula:

bn = (2/L) ∫f(x) sin(nπx/L) dx from 0 to L, where L is the period of the function (in this case, L = 1).

After integrating, we get that bn = (2/nπ) (1 - (-1)^n) for n = 1, 3, 5, ...

Using these coefficients, we can sketch the periodic extension of f as a series of odd, sine waves with decreasing amplitude.

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The dimensions of the cubic shape are:

Length = 10 units

Width = 3 units

Height = 1 units

It should be noted that a geometric body of cubic shape has a volume of 30 cubic units, and we want to know the length, width and height dimensions if we know that the length is greater than the width, but less than the height?l.

We can list out all the possible combinations of l, w, and h that multiply to 30:

1 * 1 * 30 = 30

1 * 2 * 15 = 30

1 * 3 * 10 = 30

1 * 5 * 6 = 30

2 * 3 * 5 = 30

Therefore, the dimensions of the cubic shape are: Length = 10 units, Width = 3 units, Height = 1 unit

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A geometric body of cubic shape has a volume of 30 cubic units, what will be its length, width and height dimensions if we know that the length is greater than the width, but less than the height?

In terms of the increasing size of the coefficient of xy, the order of the polynomials would be (3x - y) < 2x + y < x - 2y < x + 3

The first step to ordering the polynomials in terms of the increasing size of the coefficient of xy is to identify the coefficient of xy in each polynomial.

The coefficient of xy in each polynomial is as follows:

x + 3: This polynomial does not contain the term xy, so its coefficient is 0.

2x + y: This polynomial contains the term xy, and its coefficient is 1.

(3x - y): This polynomial contains the term xy, and its coefficient is -1.

x - 2y: This polynomial contains the term xy, and its coefficient is 0.

So, in terms of the increasing size of the coefficient of xy, the order of the polynomials would be:

(3x - y) < 2x + y < x - 2y < x + 3

Therefore, (3x - y) has the smallest coefficient of xy and should be placed at the top, while x + 3 has the largest coefficient of xy and should be placed at the bottom.

You question is incomplete but most probably your full question attached below

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To find the indefinite integral of sin^3(4θ) cos(4θ) dθ, we can use the substitution u = sin(4θ), which gives us du/dθ = 4cos(4θ), or dθ = du/4cos(4θ).

Substituting this in, we have:

∫ sin^3(4θ) cos(4θ) dθ = ∫ u^3 du/4cos(4θ)

= 1/4 ∫ u^3 sec(4θ) dθ

Using the identity sec^2(4θ) - 1 = tan^2(4θ), we can rewrite sec(4θ) as (tan^2(4θ) + 1)^(1/2), giving us:

1/4 ∫ u^3 (tan^2(4θ) + 1)^(1/2) dθ

Now, we can use the substitution v = tan(4θ), which gives us dv/dθ = 4sec^2(4θ), or dθ = dv/4sec^2(4θ).

Substituting this in, we have:

1/16 ∫ u^3 (v^2 + 1)^(1/2) dv

So, the indefinite integral of sin³(4θ)cos(4θ)dθ is (-1/4)sin²(4θ)cos²(4θ) + C, where C is the constant of integration.

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95% confidence interval for the mean sales price of all houses in the community is $273,106 to $296,894 which is the lower limit and upper limit respectively.

a) The lower limit of the 95% confidence interval can be found using the formula:

Lower limit = sample mean - (z-value) x (standard error)

where the z-value for a 95% confidence interval is 1.96, and the standard error is the standard deviation divided by the square root of the sample size:

Standard error = standard deviation / sqrt(sample size)

Substituting the given values, we get:

Standard error = 13000 / √(10) = 4119.9

Lower limit = 285000 - (1.96 x 4119.9) = $275,094.26

Therefore, the lower limit of the confidence interval is $275,094.26.

b) The upper limit of the 95% confidence interval can be found using the same formula, but with a positive value of the z-value:

Upper limit = sample mean + (z-value) x (standard error)

Substituting the given values, we get:

Upper limit = 285000 + (1.96 x 4119.9) = $294,905.74

Therefore, the upper limit of the confidence interval is $294,905.74.

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The question is -

Suppose that a random sample of ten recently sold houses in a certain city has a mean sales price of $285,000, with a standard deviation of $13,000. Under the assumption that house prices are normally distributed, find a 95% confidence interval for the mean sales price of all houses in this community.

a) What is the lower limit of the confidence interval?

b) What is the upper limit of the confidence interval?

Based on the given information, the probability of a new car buyer preferring green is 0.5 or 50%. We can use the binomial probability formula to calculate the probability of exactly 2 out of 15 buyers preferring green:

P(X=2) = (15 choose 2) * (0.5)^2 * (1-0.5)^(15-2)
where (15 choose 2) = 105 is the number of ways to choose 2 buyers out of 15.
Plugging in the values, we get:
P(X=2) = 105 * 0.5^2 * 0.5^13 = 0.3115

Therefore, the probability of exactly 2 out of 15 buyers preferring green is 0.3115 or approximately 0.3115.
To answer your question, we can use the binomial probability formula. In this case, the researcher "wishes" to study "preferences" of car colors, and we need to find the "probability" that exactly 2 out of 15 randomly selected buyers prefer green.

The binomial probability formula is: P(x) = C(n, x) * p^x * (1-p)^(n-x)

Where:
- P(x) is the probability of x successes (buyers who prefer green) in n trials (15 buyers)
- C(n, x) is the number of combinations of n items taken x at a time
- p is the probability of success (50% or 0.50 for preferring green)
- n is the number of trials (15 buyers)
- x is the number of successful outcomes (2 buyers preferring green)

Plugging in the values, we get:

P(2) = C(15, 2) * 0.50^2 * (1-0.50)^(15-2)
P(2) = 105 * 0.25 * 0.0001220703125
P(2) ≈ 0.003204

So, the probability that exactly 2 out of 15 randomly selected buyers prefer green is approximately 0.0032, or 0.32%

when rounded to four decimal places.

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[tex](\stackrel{x_1}{-9}~,~\stackrel{y_1}{0})\qquad (\stackrel{x_2}{-17}~,~\stackrel{y_2}{4}) \\\\\\ \stackrel{slope}{m}\implies \cfrac{\stackrel{\textit{\large rise}} {\stackrel{y_2}{4}-\stackrel{y1}{0}}}{\underset{\textit{\large run}} {\underset{x_2}{-17}-\underset{x_1}{(-9)}}} \implies \cfrac{4 }{-17 +9} \implies \cfrac{ 4 }{ -8 } \implies - \cfrac{1 }{ 2 }[/tex]

If x^2 | (y^2 - 2), then x^2 | (y + sqrt(2)) and x^2 | (y - sqrt(2)). This implies that x | (y + sqrt(2)) and x | (y - sqrt(2)).

(a) Let x | y, then y = kx for some integer k. Since y^2, we have (kx)^2 = y^2, which simplifies to k^2x^2 = y^2. Therefore, y^2 is divisible by x^2, which means y is divisible by x.
Now, since x | y and y^2, we have x | y^2. But x is a divisor of y, so x^2 is also a divisor of y^2. Therefore, x^2 | y^2, which implies that x^2 | (y^2 - 2).
We can write y^2 - 2 as (y + sqrt(2))(y - sqrt(2)), where sqrt(2) is irrational. Since R is an integral domain, if r is a non-zero divisor, then rs = rt implies s = t. Therefore, if x^2 | (y^2 - 2), then x^2 | (y + sqrt(2)) and x^2 | (y - sqrt(2)). This implies that x | (y + sqrt(2)) and x | (y - sqrt(2)). But since sqrt(2) is irrational, y + sqrt(2) and y - sqrt(2) are both distinct, so x | 2.

(b) If ry, then r divides both r and y. Therefore, by the distributive property of multiplication, rr ry.

(c) Assume that rx | ry, then ry = krx for some integer k. Since R is an integral domain and r # 0, we can divide both sides by r to get y = kx. Therefore, x | y. By part (a), we know that if x | y and y^2, then x | 2. Therefore, 2 | y.

(d) If r | and ry, then r divides both r and ry. Therefore, we have rs + yt = r(s + y(t/r)). Since R is an integral domain and r is a non-zero divisor, s + y(t/r) is a unique element in R. Therefore, r | rs + yt for all st ER.

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The answer choice which correctly represents the inverse of the function is; Choice A. n(a)=a+15/3.

It follows from the task content that the answer choice which correctly represents the inverse function is to be determined.

Since the given function is; a(n)=3n-15

make n the subject of the formula;

3n = a(n) + 15

n = (a(n) + 15) / 3

Substitute n for n(a) and a(n) for a;

n(a) = ( a + 15 ) / 3

Ultimately, Choice A. n(a)=a+15/3 is correct.

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[tex]∫f(x)dx = 5\\∫f(x)dx = 8\\∫t(x)dx = 5\\∫t(x)dx = -3[/tex]The answers to the integrals are:

[tex]∫(9x)dx = g(x)dx = -3x + C\\∫4g(x)dx = 4(-3)dx = -12x + C[/tex]

Starting with the given information:

[tex]∫f(x)dx = 5\\∫f(x)dx = 8\\∫t(x)dx = 5\\∫t(x)dx = -3[/tex]

We can rearrange these equations to solve for[tex]f(x), t(x),[/tex]and [tex]g(x)[/tex]separately:

[tex]f(x) = 5/dx = 5\\f(x) = 8/dx = 8\\t(x) = 5/dx = 5\\t(x) = -3/dx = -3[/tex]

Thus, we have:

[tex]f(x) = 5\\t(x) = 5\\g(x) = -3[/tex]

Now we can evaluate the given integrals:

[tex]∫(9x)dx = g(x)dx = -3x + C[/tex], where C is the constant of integration

[tex]∫4g(x)dx = 4(-3)dx = -12x + C[/tex], where C is the constant of integration

Therefore, the answers to the integrals are:

[tex]∫(9x)dx = g(x)dx = -3x + C\\∫4g(x)dx = 4(-3)dx = -12x + C[/tex]

Note: the constant of integration C is added to both answers since the integrals are indefinite integrals.

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Yes, you can calculate the amount of discount of a $100 item that is 10% off in your head using mental math.

We have,

One way to do this is to recognize that 10% of 100 is 10, so the discount on a $100 item would be $10.

Another way to approach it is to divide the percentage off by 10 to get the dollar amount of the discount.

For example, 10% off is equivalent to a discount of 1/10 of the original price, so for a $100 item, the discount would be $10.

This can be a quick and useful mental math skill to have when shopping or budgeting.

Thus,

Yes, you can calculate the amount of discount of a $100 item that is 10% off in your head using mental math.

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(a) At room temperature, the alloy containing 60wt%Pb-40wt%Sn will consist of both α and β phases. (b) The amount of each phase present in the material at room temperature will depend on the cooling rate and will be determined using the lever rule. (c) The expected microstructure will be a mixture of fine α and β grains.

(a) The alloy containing 60wt%Pb-40wt%Sn will consist of both α and β phases at room temperature. The α phase is a solid solution of Sn in Pb, while the β phase is a solid solution of Pb in Sn. The exact composition of each phase will depend on the cooling rate, which determines the extent of solid solution formation during cooling.

(b) The amount of each phase present in the material at room temperature can be determined using the lever rule. The lever rule is used to calculate the fraction of each phase in a two-phase system, based on the weight or volume fractions of each component and the relative amounts of each phase.

For this alloy, the weight fraction of Pb is 0.6, and the weight fraction of Sn is 0.4. The lever rule can be used to calculate the weight fraction of α phase and β phase in the alloy at room temperature.

(c) The expected microstructure of the alloy will consist of a mixture of fine α and β grains. The grain size will depend on the cooling rate, with faster cooling resulting in smaller grains. The microstructure will also contain grain boundaries and possibly some precipitates, depending on the cooling rate and composition of the alloy.

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The total driving distance can be calculated by adding the number of blocks in each direction: 1 + 1 + 5 + 2 = 9 blocks. If you could fly like a bird, your trip would be 1/4 mile shorter.

In your neighborhood, you need to drive from your house to the grocery store following a path of 1 block south, 1 block east, 5 blocks north, and 2 blocks east. Each block is 1/16 of a mile.

Convert this to miles: 9 blocks * (1/16 mile/block) = 9/16 miles.

If you could fly like a bird, you would take a direct path. To find this distance, use the Pythagorean theorem for a right triangle formed by the east-west and north-south distances.

East-west distance: 1 block east + 2 blocks east = 3 blocks = 3/16 miles.
North-south distance: 5 blocks north - 1 block south = 4 blocks = 4/16 miles.

The direct flying distance can be calculated as:

√[(3/16)^2 + (4/16)^2] = √[(9/256) + (16/256)] = √(25/256) = 5/16 miles.

To find the shorter distance when flying, subtract the direct flying distance from the driving distance:

(9/16) - (5/16) = 4/16 miles, which simplifies to 1/4 mile.

So, if you could fly like a bird, your trip would be 1/4 mile shorter.

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The intercept in a regression equation is the point where the regression line intersects with the y-axis. In the context of hurricane wind speed and central pressure, the intercept represents the predicted value of the dependent variable (wind speed) when the independent variable (central pressure) is zero.

However, this interpretation is not necessarily meaningful in this context, as it is unlikely for the central pressure of a hurricane to be exactly zero. Instead, the intercept can be interpreted as the average predicted wind speed when central pressure is at its minimum or near its minimum (i.e., the closest value to zero in the data set). It is important to note that this interpretation assumes that the relationship between wind speed and central pressure is linear, and that the range of central pressure values in the data set is sufficiently close to zero to make this interpretation meaningful. If the relationship is not linear or if the range of central pressure values is far from zero, the intercept may not have a meaningful interpretation in the context of the data.

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The number of marbles that represent each vegetable option are: carrots - 3 marbles, green beans - 7 marbles, asparagus - 2 marbles, and vegetable medley - 8 marbles.

To model the situation of the catering company, we need to use percentages to represent the number of customers who choose each vegetable option. We are given that 15% of customers choose carrots, 35% choose green beans, and 10% choose asparagus. The remaining customers, who choose vegetable medley, can be represented by subtracting the sum of the other three percentages from 100%.

To represent this situation using marbles, we can assign a certain number of marbles to each vegetable option based on the percentage of customers who choose it. For example, if we use 20 marbles in total, 15% of 20 is 3, so we can assign 3 marbles to carrots. Similarly, 35% of 20 is 7, so we can assign 7 marbles to green beans. 10% of 20 is 2, so we can assign 2 marbles to asparagus. Finally, the remaining 8 marbles would represent the customers who choose vegetable medley.

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Based on the results of the hypothesis test, we can say that a batch containing 1.80% zinc phosphide indicates that there is too little zinc phosphide in this production.

Based on the information provided, the chemical company produces a substance that contains 2% zinc phosphide for controlling rat populations in sugarcane fields. The production must be carefully controlled to ensure that the substance contains exactly 2% zinc phosphide. Records from past production indicate that the actual percentage of zinc phosphide present in the substance is approximately mound-shaped with a mean of 2.0% and a standard deviation of .08%.
Suppose one batch chosen randomly actually contains 1.80% zinc phosphide. This may or may not indicate that there is too little zinc phosphide in this production. To determine whether the batch contains too little zinc phosphide, we can perform a hypothesis test.
The null hypothesis in this case is that the batch contains exactly 2% zinc phosphide, and the alternative hypothesis is that the batch contains less than 2% zinc phosphide. We can use a one-tailed z-test to test this hypothesis.
Calculating the z-score for a batch with 1.80% zinc phosphide, we get:
z = (1.80 - 2.00) / 0.08 = -2.5

Using a standard normal distribution table, we can find that the probability of getting a z-score of -2.5 or lower is approximately 0.006. This means that if the batch truly contains 2% zinc phosphide, there is only a 0.006 probability of getting a sample with 1.80% zinc phosphide or less. Assuming a significance level of 0.05, we reject the null hypothesis if the p-value is less than 0.05. Since the p-value in this case is less than 0.05, we can reject the null hypothesis and conclude that there is evidence that the batch contains less than 2% zinc phosphide.

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To construct a confidence interval for the proportion of all Comcast customers who experienced an internet outage in the past month, we can use the formula:

CI = p ± z*sqrt((p*(1-p))/n)

where p is the sample proportion, z is the z-score for the desired confidence level (86%), and n is the sample size.

First, we need to calculate the sample proportion:

p = 19/108 = 0.176

Next, we need to find the z-score for the 86% confidence level. Using a standard normal distribution table or calculator, we find that the z-score is approximately 1.44.

Now we can plug in the values and calculate the confidence interval:

CI = 0.176 ± 1.44*sqrt((0.176*(1-0.176))/108)

CI = 0.176 ± 0.083

CI = (0.093, 0.259)

Therefore, we can say with 86% confidence that the true proportion of all Comcast customers who experienced an internet outage in the past month is between 0.093 and 0.259.

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The area of the shaded portion of the diagram is 14.25 mm²

The triangle is inside the semi circle.

The shaded region of the semi circle is outside the triangle.

Therefore,

area of the shaded region = area of the semi circle - area of triangle

Therefore,

area of the semi circle = 1/2 × π × r²

where

Hence,

r = 5 mm

area of the semi circle = 1/2 × 3.14 × 5²

area of the semi circle = 78.50 / 2

area of the semi circle = 39.25 mm²

area of the triangle = 1/2 × b × h

where

Hence,

b = 10mm

h = 5mm

area of the triangle = 1/2 × 10 × 5

area of the triangle = 50 / 2

area of the triangle = 25 mm²

Therefore,

area of the shaded region = 39.25 - 25

area of the shaded region = 14.25 mm²

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Answer:

The equation of the line is in slope-intercept form, y = mx + b, where m is the slope of the line and b is the y-intercept.

Comparing the given equation y = (-3/2)x - (5/4) with the slope-intercept form, we can see that the y-intercept is -5/4 and the slope of the line is -3/2.

Therefore, the slope of the line is -3/2.

The correct answer to the given question about statistical question and study design of a survey is option B) Observational Study

We need to choose one group of people who sit for at least 8 hours per day and another group who sit for less than 8 hours per day and compare their health problems.

The given statistical question asks: "Do people who sit for at least 8 hours per day have more health problems than those who sit for fewer than 8 hours per day?" To address this question, we need to choose one group of people who sit for at least 8 hours per day and another group who sit for less than 8 hours per day and compare their health problems.

In this case, the study design is an observational study, as we are collecting data by observing the two groups without intervening or manipulating any variables. We aim to examine the differences in health problems between individuals with different sitting habits to draw conclusions about potential associations.

To conduct this observational study, we could select a random sample of people in each group and gather information about their daily sitting habits and any health issues they experience. This could be done through self-reported questionnaires or through interviews with healthcare professionals.

Upon analyzing the collected data, we would be able to assess whether there is a correlation between the amount of time spent sitting and the prevalence of health problems in each group. If a significant difference in health issues is found between the two groups, this could suggest that sitting for extended periods may be linked to an increased risk of health problems.

However, it is important to remember that correlation does not imply causation, and further research would be needed to establish a causal relationship between sitting habits and health outcomes.

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Complete Question

Read the statistical question and study design. determine if it is a survey, experiment, or observational study.

Do people who sit for at least 8 hours per day have more health problems than those who sit for fewer than 8 hours per day? Choose one group of people who sit for at least 8 hours per day and another group who sit for less than 8 hours per day and compare their health problems.

A) Experiment

B) Observational Study

C) Survey

The arithmetic mean of the number of member in each family is 4.

Arithmetic mean is the mean or the average of the samples. That means, it is the sum of all values divided by the number of values.

In this question, we have 8 values. So, the arithmetic mean (M) is:

[tex]\text{M}=\dfrac{2+2+5+4+8+3+1+7}{8}[/tex]

[tex]\text{M}=\dfrac{32}{8}[/tex]

[tex]\text{M}=4[/tex]    

Thus, The arithmetic mean of the number of member in each family is 4.

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The number of square centimeters of the cylinder that Mariah paint in terms of π is 96π square centimeters.

In Mathematics and Geometry, the volume of a cylinder can be calculated by using this formula:

Volume of a cylinder, V = πr²h

72π = π(6)²h

Height, h = 2 cm.

In Mathematics and Geometry, the surface area (SA) of a cylinder can be calculated by using this mathematical equation (formula):

SA = 2πrh + 2πr²

Where:

SA = 2π × 6 × 2 + 2π × 6²

SA = 24π + 72π

SA = 96π square centimeters.

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Answer:

[tex]\Large \boxed{\boxed{\textsf{$v=15t^2+6$}}}[/tex]

Step-by-step explanation:

If the position of a particle, i.e, the displacement is given by:

[tex]\Large \textsf{$f(t)=5t^3+6t+9$}[/tex]

Then the velocity, is the rate at which the displacement changes over time. This is given by the derivative of the displacement function. Hence velocity:

[tex]\Large \textsf{$v=f'(t)$}[/tex]

To differentiate the function, we can follow this simple rule:

[tex]\Large \boxed{\textsf{For $y=ax^n$, $\frac{dy}{dx}=anx^{n-1}$, where the constant term is excluded}}[/tex]

[tex]\Large \textsf{$\implies f'(t)=15t^2+6$}[/tex]

Therefore, velocity at time t:

[tex]\Large \boxed{\boxed{\textsf{$\therefore v=15t^2+6$}}}[/tex]

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Answer:

x > 6.4

Step-by-step explanation:

To solve the inequality 0.3x+1.05>-0.25x+4.57, we can start by simplifying it:

0.3x+1.05 > -0.25x+4.57

0.55x + 1.05 > 4.57

0.55x > 3.52

x > 3.52 / 0.55

x > 6.4

Therefore, the solution to the inequality is x > 6.4.

The values of m for which y=x^m is a solution to the differential equation y'' - 4y' - 5y = 0 are: -1 and 5. The correct option is D.

We can first find the characteristic equation of the differential equation by assuming a solution of the form y=e^(rt), where r is a constant:

r^2 - 4r - 5 = 0

Solving for r, we get r = -1 and r = 5.

Therefore, the general solution to the differential equation is of the form y = c1e^(-t) + c2e^(5t), where c1 and c2 are constants.

To see if y=x^m is also a solution, we substitute it into the differential equation and simplify:

y'' - 4y' - 5y = 0

m(m-1)x^(m-2) - 4mx^(m-1) - 5x^m = 0

x^m [m(m-1) - 4m - 5] = 0

For x^m to be a non-trivial solution, the coefficient of x^m must be zero:

m(m-1) - 4m - 5 = 0

Solving for m, we get m = -1 and m = 5.

Therefore, the values of m for which y=x^m is a solution to the differential equation are -1 and 5, which matches option (D).

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