A marketing research company is estimating the average total compensation of party clowns. Data were randomly collected from 48 party clowns and the 90% confidence interval for the mean was calculated to be ($9394, $9926). Explain what the phrase "90% confident" means.

a. 90% of the sample means from similar samples fall within the interval. In repeated sampling.
b. 90% of the intervals constructed would contain p.
c. Notes 90% of the similarly constructed intervals would contain the value of the sample mean.
d. 90% of the population values will fall within the interval.

Answer:

The base is a square of side 9.19 cm and the height is 7.66 cm

[tex]C_m=126.58\ cents[/tex]

Step-by-step explanation:

Optimization

We'll use simple techniques to find the optimum values that minimize the cost function given in the problem. Since the restriction is an equality, the derivative will come handy to find the critical points and then we'll prove they are a minimum.

First, we consider the shape of the rectangular bin has a square base and no top. Let x be the side of the base, thus the Area of the base is

[tex]A_b=x^2[/tex]

Let y be the height of the box, thus each one of the four lateral sides of the box is a rectangle with sides x and y and the total lateral area is

[tex]A_s=4xy[/tex]

The cost of the material used to manufacture the box is 0.5 cents per square centimeter of the base and 0.3 cents per square centimeter of the sides, thus the total cost to produce one box is

[tex]C(x,y)=0.5x^2+0.3\cdot 4xy[/tex]

[tex]C(x,y)=0.5x^2+1.2xy[/tex]

Note the cost is a two-variable function. We need to have it expressed as a single variable function. To achieve that, we use the volume provided as [tex]646 cm^3[/tex]. The volume of the box is the base times the height

[tex]V=x^2y[/tex]

Using the value of the volume we have

[tex]x^2y=646[/tex]

Solving for y

[tex]\displaystyle y=\frac{646}{x^2}[/tex]

Replacing into the cost function, it only depends on one variable

[tex]\displaystyle C(x)=0.5x^2+1.2x\cdot \frac{646}{x^2}[/tex]

Operating

[tex]\displaystyle C(x)=0.5x^2+ \frac{775.2}{x}[/tex]

Taking the first derivative

[tex]\displaystyle C'(x)=x-\frac{775.2}{x^2}[/tex]

Equating to 0

[tex]\displaystyle x-\frac{775.2}{x^2}=0[/tex]

Solving

[tex]\displaystyle x=\sqrt[3]{775.2}[/tex]

[tex]x=9.19\ cm[/tex]

Now find the height

[tex]\displaystyle y=\frac{646}{9.19^2}[/tex]

[tex]y=7.66\ cm[/tex]

Find the second derivative

[tex]\displaystyle C''(x)=1+\frac{1550.4}{x^3}[/tex]

Since this value is positive, for all x positive, the function has a minimum at the critical point.

Thus, the minimum cost is

[tex]\displaystyle C_m=0.5\cdot 9.19^2+ \frac{775.2}{9.19}[/tex]

[tex]\boxed{C_m=126.58\ cents}[/tex]

Answer:

126.58 cents or $1.27

Step-by-step explanation:

the math from above is correct they just want the answers in dollars

Answer:

39.20000

Step-by-step explanation:

Sweater costs 56.00

To calculate the discounted price of the sweater

56 * (30/100) = 16.8

We used (30/100) to find out the 30 percent of the sweater which will be on discount/reduced.

56-16.8=39.2 is the discounted price

Then we subtract the amount of discount from the original price of sweater to find out the discounted price.

Answer:

1) Increase the sample size

2) Decrease the confidence level

Step-by-step explanation:

The 95% confidence interval built for a sample size of 1100 adult Americans on how much they worked in previous week is:

42.7 to 44.5

We have to provide 2 recommendations on how to decrease the margin of Error. Margin of error is calculated as:

[tex]M.E=z_{\frac{\alpha}{2} } \times \frac{\sigma}{\sqrt{n}}[/tex]

Here,

[tex]z_{\frac{\alpha}{2} }[/tex] is the critical z-value which depends on the confidence level. Higher the confidence level, higher will be the value of critical z and vice versa.

[tex]\sigma[/tex] is the population standard deviation, which will be a constant term and n is the sample size. Since n is in the denominator, increasing the value of n will decrease the value of Margin of Error.

Therefore, the 2 recommendations to decrease the Margin of error for the given case are:

The two recommendations should be that the sample size should be increased and the confidence interval should be reduced.

Since a​ 95% confidence interval for the mean number of hours worked had a lower bound of 42.7 and an upper bound of 44.5.

We know that margin of error = z value × population / √n

So for reducing the margin of error of the interval,  sample size should be increased and the confidence interval should be reduced.

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Answer:

56,000

Step-by-step explanation:

In your first year of work, you would make $56,000.

The pay rate is $28 per hour and a work week has 40 hours for the HVAC technician.

In a week, you will make:

= Number of hours in week x Amount per hour

= 40 x 28

= $1,120

In a year, assuming there are 50 weeks, the HVAC technician would make:

= Amount per week x Number of weeks in year

= 1,120 x 50

= $56,000

In conclusion, you would make $56,000 a year as an HVAC technician.

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Answer:

C 66 miles

Step-by-step explanation:

88miles/4 gallons = 22 miles/gallon

22 miles/ gallon * 3 gallons = 66 miles

Answer:

66 miles per 3 gallons

Step-by-step explanation:

if you divide 88 by 4 you get 22 which means you get 22 miles to each gallon so for three gallons you would be able to drive 66 miles

Hope I helped:)

Answer:

P(X>17) = 0.979

Step-by-step explanation:

Probability that a camera is defective, p = 3% = 3/100 = 0.03

20 cameras were randomly selected.i.e sample size, n = 20

Probability that a camera is working, q = 1 - p = 1 - 0.03 = 0.97

Probability that more than 17 cameras are working P ( X > 17)

This is a binomial distribution P(X = r) [tex]nCr q^{r} p^{n-r}[/tex]

[tex]nCr = \frac{n!}{(n-r)!r!}[/tex]

P(X>17) = P(X=18) + P(X=19) + P(X=20)

P(X=18) = [tex]20C18 * 0.97^{18} * 0.03^{20-18}[/tex]

P(X=18) = [tex]20C18 * 0.97^{18} * 0.03^{2}[/tex]

P(X=18) = 0.0988

P(X=19) = [tex]20C19 * 0.97^{19} * 0.03^{20-19}[/tex]

P(X=19) = [tex]20C19 * 0.97^{19} * 0.03^{1}[/tex]

P(X=19) = 0.3364

P(X=20) = [tex]20C20 * 0.97^{20} * 0.03^{20-20}[/tex]

P(X=20) = [tex]20C20 * 0.97^{20} * 0.03^{0}[/tex]

P(X=20) = 0.5438

P(X>17) = 0.0988 + 0.3364 + 0.5438

P(X>17) = 0.979

The probability that there are more than 17 working cameras should be 0.979 for the company to accept the whole batch

Answer:

Step-by-step explanation:

Hello!

According to a study regarding the average age of female and male kids to complete toilet training is:

Females:

Average age 32.5 months

The standard deviation of 6.7 months

n= 126

Males:

Average age 35.0 months

The standard deviation of 10.1 months

n= 141

The parameter of study is the difference between the age of females are successfully toilet trained and the average age that males are successfully toilet trained. μf - μm (f= female and m= male)

a.

Assuming that both variables have a normal distribution to choose whether you'll use an unpooled or pooled-t to calculate the confidence interval you have to conduct an F-test for variance homogeneity.

If the variances are equal, then you can usee the pooled-t, but if the variances are different, you have to uses Wlche's approach:

H₀: δ²f = δ²m

H₁: δ²f ≠ δ²m

Since both items b. and c. ask for a 95% CI I'll use the complementary significance level for this test:

α: 0.05

[tex]F= \frac{S^2_f}{S^2_m} * \frac{xSigma^2_f}{Sigma^2_m} ~~~F_{(n_f-1); (n_m-1)}[/tex]

[tex]F= \frac{(6.7^2)}{(10.1)^2} *1= 0.44[/tex]

Critical values:

[tex]F_{125;140;0.025}= 0.71\\F_{125;140;0.975}= 1.41[/tex]

The calculated F value is less than the lower critical value, 0.77, so the decision is to reject the null hypothesis. In other words, there is no significant evidence to conclude the population variances of the age kids are toilet trained to be equal. You should use Welch's approach to construct the Confidence Intervals.

[tex]Df_w= \frac{(\frac{S^2_f}{n_f} + \frac{S^2_m}{n_m} )^2}{\frac{(\frac{S^2_f}{n_f} )^2}{n_f-1} +\frac{(\frac{S^2_m}{n_m} )^2}{n_m-1} }[/tex]

[tex]Df_w= \frac{(\frac{6.7^2}{126} + \frac{10.1^2_m}{141} )^2}{\frac{(\frac{126^2}{126} )^2}{126-1} +\frac{(\frac{10.1^2}{141} )^2}{141-1} } = 254.32[/tex]

b.

The given interval is:

[0.3627; 4.6073]

Using Welch's approach, the formula for the CI is:

(X[bar]f- X[bar]m) ± [tex]t_{Df_w;1-\alpha /2}[/tex] * [tex]\sqrt{\frac{S^2_f}{n_f} +\frac{S^2_m}{n_m} }[/tex]

or

(X[bar]m- X[bar]f) ± [tex]t_{Df_w;1-\alpha /2}[/tex] * [tex]\sqrt{\frac{S^2_f}{n_f} +\frac{S^2_m}{n_m} }[/tex]

As you can see either way you calculate the interval, it is centered in the difference between the two sample means, so you can clear the value of that difference by:

(Upper bond - Lower bond)/2= (4.6073-0.3627)/2= 2.1223

The average age for females is 32.5 months and for males, it is 35 months.

Since the difference between the sample means is positive, we can say that the boys were considered "group 1" and the girls were considered "group 2"

You have a95% confidence that the parameter of interest is included in the given confidence interval.

c.

None of the statements is correct, the interval gives you information about the difference between the average age the kids are toilet trained, that is between the expected ages for the entire population of male and female babies.

This represents a guideline but is not necessarily true to all individuals of the population since some male babies can be toilet trained before that is expected as some female babies can be toiled trained after the average value.

I hope it helps!

Answer:

Step-by-step explanation:

The answer is 10 bananas and 2 apples

The number of apples are 2 and number of bananas is 10.

Two or more expressions with an Equal sign is called as Equation.

Given that Hattie is making fruit baskets, which includes apples and bananas, to send to some of her real estate clients.

She wants each basket to have 12 pieces of fruit, but the fruit should weigh no more than 80 ounces total.

On average, each apple weighs 5 ounces, and each banana weighs 7 ounces.

Let Bananas is denoted by B and Apples are represented by A.

A+B=12...(1)

5A+7B<80...(2)

A=12-B

Substitute in equation 2.

5(12-B)+7B=80

60-5B+7B=80

60+2B=80

Subtract 60 on both sides.

2B=80-60

2B=20

Divide both sides by 2.

B=10

A+B=12

A+10=12

A=2

Hence, the number of apples are 2 and number of bananas is 10.

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Answer:

5 laps

Step-by-step explanation:

We can use ratios to solve

3 minutes        15 minutes

----------------- = ------------------------

1 lap                   x laps

Using cross products

3x = 15

Divide each side by 3

3x/3 = 15/3

x = 5

He can do 5 laps

Answer:

  year 2139

Step-by-step explanation:

The population will double when the factor e^(.005t) is 2.

  e^(.005t) = 2

  .005t = ln(2)

  t = ln(2)/0.005 = 138.6

The population will be double its size at t=0 when t=138.6. That is the population will be about 5.2 million in the year 2139.

The population will double by the year 2139 from its value of 2.6 million in year 2000.

Population function :

[tex]P(t) = 2.6 {e}^{0.005t} [/tex]

Population size at t = 0

[tex]P(0) = 2.6 {e}^{0.005(0)} = 2.6(1) = 2.6[/tex]

Population at t = 2.6 million.

For the population to double ;

2.6 × 2 = 5.2 million :

[tex]5.2 = 2.6 {e}^{0.005t} [/tex]

We solve for t

[tex] \frac{5.2}{2.6} = {e}^{0.005t} [/tex]

[tex]2 = {e}^{0.005t} [/tex]

Take the In of both sides

[tex] ln(2) = 0.005t[/tex]

[tex]t \: = ln(2) \div 0.005 = 138.629[/tex]

The population will double after 139 years

Therefore, the population will double by the 2139 (Year 2000 + 139 years) = year 2139.

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Answer:Y=0 Y=-3

Step-by-step explanation:

Answer:

First graph y=0

Second graph y=-3

Step-by-step explanation:

Edge 2022

The correct value of the angle of rotation is 3π/5

Answer:

Distance travelled ≈ 22.6 ft

Step-by-step explanation:

We are given;

Radius;r = 12 ft

Angle of rotation; θ = 3π/5

The formula for calculating distance travelled is;

Distance travelled = rθ

So, plugging in the relevant values;

Distance travelled = 12 x 3π/5

Distance travelled ≈ 22.6 ft

Answer:

7.28 7.29  c

Step-by-step explanation:

The square root of 53 can be found to lie between the values of 7.28 and 7.29.

The square root function can only have non negative values. If we take thee square root of a number, we obtain a value that can be multiplied by itself to obtain the number.

The square root of 53 can be found to lie between the values of 7.28 and 7.29.

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Answer:

A quadratic function can have two irrational roots.

A quadratic equation can have no real number solutions.

Step-by-step explanation:

A quadratic function can have two irrational roots.

A quadratic equation can have no real number solutions.

A quadratic function is a polynomial function with one or more in which highest exponent of variable is two.

According to the question,

A quadratic function can have two irrational roots.

example: [tex]x^{2} -2x -2 =0[/tex]

This equation have two irrational roots  1+√3 and 1 - √3.

A  quadratic function can have no real number solutions

Hence, A quadratic function can have two irrational roots.

A quadratic equation can have no real number solutions.

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Answer:

wydjae  is męi ze tak

Step-by-step explanation:

The appropriate scale for the y-axis include:

A = 2000

B = 4000

C = 6000

D = 8000

E = 10000

F = 12000

G = 14000

In Mathematics and Euclidean Geometry, a bar chart is a type of graph that is used for the graphical representation of a data set, especially through the use of rectangular bars and vertical columns.

Since the set of axes starts from the origin (0, 0), an appropriate scale for the y-axis (number of satisfied customers) of the graph can be calculated as follows;

1 unit = 250 customers

4 units = (4 × 250) = 2,000 customers.

In this context, the appropriate scale for the y-axis should be completed as follows:

A = 2000

B = 4000

C = 6000

D = 8000

E = 10000

F = 12000

G = 14000

Complete Question;

Look at chart below.

The number of satisfied customers is given below each month on the x-axis.

Select an appropriate scale for the y-axis of the graph.

The appropriate scale for the y-axis is:

A =

B =

C =

D =

E =

F =

G =

Answer: switch the x- and y- coordinates

And the 2nd part is c, e , f

The point on the graph -1(x) =9X to determine a point on the graph of f(x) =logox is (-1, -9).

All the points (and only those points) which lie on the graph of the function satisfy its equation.

Thus, if a point lies on the graph of a function, then it must also satisfy the function.

We are given that;

-1(x) =9X

Now,

To use a point on the graph of one function to determine a point on the graph of another function, you need to find the corresponding x-value on the first graph. Then, you can use that x-value to find the corresponding y-value on the second graph.

In this case, you have a point on the graph of the function f(x) = 9x. To find the corresponding point on the graph of the function g(x) = log(x), you need to find the x-value that corresponds to -1 on the graph of f(x) = 9x.

To do this, you can set f(x) = 9x equal to -1 and solve for x:

9x = -1 x = -1/9

The point (-1, -9) on the graph of f(x) = 9x corresponds to the point (-1/9, log(-1/9)) on the graph of g(x) = log(x). However, note that the logarithm function is not defined for negative values of x, so the point (-1/9, log(-1/9)) is not a valid point on the graph of g(x) = log(x).

Therefore, by the graph of function the point will be (-1, -9).

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Angle Zc measures 90° as it is supplementary to the given 90° angle. Therefore, Zc = 90°.

To find the measure of angle Zc, we need to use the properties of angles formed by intersecting lines.

Given:

- Angle Zc is supplementary to angle 90°.

- Angle 90° is formed by the intersection of lines, let's denote them as line AB and line CD.

- Angle 90° is bisected by line EF, forming two congruent angles.

Step-by-step explanation:

1. Since angle Zc is supplementary to angle 90°, we subtract the measure of angle 90° from 180° to find the measure of angle Zc.

  Measure of angle Zc = 180° - 90°

                                     = 90°

So, angle Zc measures 90°.

The function f(x) = 4x2 + x4 + 3 is even because the substitution of (-x) for x results in the original function. It's not odd because replacing (-x) for x doesn't give the negative of the original function. Hence, as an even function, its graph is symmetric with respect to the y-axis.

The function f(x) = 4x2 + x4 + 3 can be tested for symmetry. If a function is even, its graph is symmetric with respect to the y-axis. If a function is odd, its graph is symmetric with respect to the origin.

To test if a function is even, we substitute (-x) for x in the function and simplify. If the result is the original function, then the function is even. For the given function, f(-x) = 4(-x)2 + (-x)4 + 3 = 4x2 + x4 + 3. So, the function is even.

To test if a function is odd, we also substitute (-x) for x in the function and simplify. If the result is the negative of the original function, then the function is odd. In our case, f(-x) is not the negative of f(x), so the function is not odd.

Therefore, the function is even and its graph is symmetric with respect to the y-axis.

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Answer:

a

Step-by-step explanation:

a yard is 3 feet.24/3 equals 8 .then 80!

Answer:

-A person can be 95% confident that the mean drive through service time  lies between 177.6 seconds and 181.0 seconds.

Step-by-step explanation:

- Confidence level is the degree of certainty we have on a particular statistic.

-The 95% confidence interval means that we are 95% confident that the mean drive through service time is lies between 177.6 seconds and 181.0 minutes.

Answer:??

Step-by-step explanation:

Answer: dont have an answer

Step-by-step explanation:

sorry

Answer:

y = -2x+3

Step-by-step explanation:

Answer:

We have to produce the equation y = mx +b

We start by solving for b

b = y - mx

b = 3 - -2*0

b = 3

Let's put b and the slope into this equation

y = mx +b

y = -2*x +3

Step-by-step explanation:

Answer:

Probability that the spending is more than $42.35 is 0.7271.

Step-by-step explanation:

We are given that American Statistical Association budget is distributed normally with a mean spending of $45.67 and a standard deviation of $5.50.

Let X = American Statistical Association budget

So, X ~ N([tex]\mu=45.67,\sigma^{2} =5.5^{2}[/tex])

The z-score probability distribution for normal distribution is given by;

               Z = [tex]\frac{ X -\mu}{\sigma}[/tex]  ~ N(0,1)

where, [tex]\mu[/tex] = mean spending = $45.67

            [tex]\sigma[/tex] = standard deviation = $5.50

The Z-score measures how many standard deviations the measure is away from the mean. After finding the Z-score, we look at the z-score table and find the p-value (area) associated with this z-score. This p-value is the probability that the value of the measure is smaller than X, that is, the percentile of X.

So, the probability that the spending is more than $42.35 is given by = P(X > $42.35)

  P(X > $42.35) = P( [tex]\frac{ X -\mu}{\sigma}[/tex] > [tex]\frac{42.35-45.67}{5.5}[/tex] ) = P(Z > -0.604) = P(Z < 0.604)

                                                              = 0.7271

Now, in the z table the P(Z [tex]\leq[/tex] x) or P(Z < x) is given. So, the above probability is calculated by looking at the value of x = 0.604 in the z table which will lie between x = 0.60 and x = 0.70 which has an area of 0.7271.

Hence, the probability that the spending is more than $42.35 is 0.7271.

Answer:

I hope this helps

Answer:

Probability that the person preferred milk as his or her primary drink  = 0.3

Step-by-step explanation:

Given -

In a recent survey, 18 people preferred milk, 29 people preferred coffee, and 13 people preferred juice as their primary drink for breakfast .

Total no of people is =  18 + 29 + 13 = 60

If a person is selected at random ,

The probability of person preferred milk = [tex]\frac{18}{60}[/tex]

The probability of person preferred coffee = [tex]\frac{29}{60}[/tex]

The probability of person preferred juice = [tex]\frac{13}{60}[/tex]

Probability that the person preferred milk as his or her primary drink =

P ( milk ) = [tex]\mathbf{\frac{No\;of\;favourable\;outcomes}{total\;no\;of\:outcomes}}[/tex]

    =   [tex]\frac{18}{60}[/tex]  =  0.3

Answer:

We have,

max 4x+10y

3x+4y<480

4x+2y<360

The feasible corner points are ( 48,84),(0,120),(0,0),(90,0)

Now, our problem is maximum type so put above feasible points in equation max 4x + 10y one by one and select one point at which our value from this equation is maximum,

(48,84) 4*48+10*84 1032

(0,120) 4*0+10*120 1200

(0,0) 4*0+10*0 0

(90,0) 4*90+10*0 360

Here we get maximum value at (0,120) which is 1200.

Correct option is (B)1200

Answer:

Answer is 1200.

Refer below.

Step-by-step explanation:

The maximum possible value for the objective function is 1200.

Answer:

you are to subtract the equation

Answer:

(7,-8)

Step-by-step explanation: