The bottom of a ladder must be placed 5 feet from the building. The ladder is 14 feet long. How far above the ground does the ladder touch the wall?

Answer:

average cost ≈ $12.21  (nearest cent)

Step-by-step explanation:

The cost of printing the shirt is $400 plus $7.50 per shirt. The cost for producing the shirt requires  a flat rate of $ 400 plus an additional $7.50 for each shirt.

Let

x = number of shirt

total cost = 400 + 7.50(x)

The number of shirt sold = 85

The average cost per shirt can be calculated as follows when he sold 85 shirts.

Average cost =  total cost/number of shirt

total cost = 400 + 7.50(x)

total cost = 400 + 7.50(85)

total cost = 400 + 637.50

total cost = $1037.5

number of shirt = 85

average cost per shirt = 1037.5/85

average cost = 12.205882353

average cost ≈ $12.21  (nearest cent)

Answer:

The answer is constant multiplicative and it is 1.05 times larger.

There is constant rate of change in an exponential relationship.

The value of the account is 1.05 times.

In the given statement, it states that there is a [ ] rate of change in an exponential relationship. The missing word in this case would be "constant."

In an exponential relationship, the rate of change between consecutive terms is constant.

Now, after each year, the value of the account is [. ] times as large as the previous year. The missing value in this case would be "1.05."

This indicates that the value of the account increases by a factor of 1.05 each year, which corresponds to a 5% annual growth rate.

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Answer:

357cos(2π/365(t-171))+739.5  

To model day length in Juneau, Alaska, a sine function with parameters calculated from the longest and shortest days is used. The function L(t) for the length of day in minutes, t days after January 1, is given by L(t) = 357 sin((2π/365)(t - 171)) + 739.5.

To model the length of day in Juneau, Alaska using a trigonometric function, we need to consider the longest and shortest day timings, the periodic nature of day length, and the fact that we're measuring time in minutes.

The function will have a sine function because the length of day varies sinusoidally, with the longest and shortest days being half a period apart.

The sine function to model day length L (in minutes) t days after January 1 will take the form:

L(t) = A sin(B(t - C)) + D

Where:

A is the amplitude, half the difference between the longest and shortest day lengths.

B is related to the period of the function, which is 2π divided by the number of days in a year.

C is the horizontal shift, which aligns the function with the longest day of the year.

D is the vertical shift, the average of the longest and shortest day lengths.

Let's calculate the amplitude (A), which is half the difference between the longest (1096.5 minutes) and shortest (382.5 minutes) day lengths:

A = (1096.5 - 382.5) / 2

A = 357

The period (B) can be calculated as:

B = 2π / 365

To find the horizontal shift (C), we use the fact that the longest day is on June 21, which is 171 days after January 1:

C = 171

The average day length (D), which is the vertical shift, is calculated:

D = (1096.5 + 382.5) / 2

D = 739.5

Finally, our function for day length L(t) is:

L(t) = 357 sin((2π/365)(t - 171)) + 739.5

Answer:

It is 45m2

Step-by-step explanation:

Just took did the question of the topic calculating the Base of Area of a Cone

Answer:

its 42 m^2

Step-by-step explanation: did it on edge

The equation of the circle with diameter AB and endpoints A(5, 4) and B(-1, -4) is (x - 2)² + y² = 25.

We have,

To find the equation of a circle given the diameter endpoints, use the midpoint formula and the distance formula.

Given the diameter endpoints:

A(5, 4) and B(-1, -4)

Step 1:

Find the midpoint of the diameter.

The midpoint formula is given by:

Midpoint = ((x₁ + x₂) / 2, (y₁ + y₂) / 2)

Let's calculate the midpoint using the coordinates of A and B:

Midpoint = ((5 + (-1)) / 2, (4 + (-4)) / 2)

Midpoint = (4 / 2, 0 / 2)

Midpoint = (2, 0)

Step 2:

Find the radius of the circle.

The radius is the distance between the midpoint and one of the endpoints, A or B.

The distance between the midpoint and point A:

Distance = √((x₂ - x₁)² + (y₂ - y₁)²)

Distance = √((5 - 2)² + (4 - 0)²)

Distance = √(3² + 4²)

Distance = √(9 + 16)

Distance = √25

Distance = 5

The radius of the circle is 5.

Step 3:

Write the equation of the circle.

The equation of a circle with center (h, k) and radius r is given by:

(x - h)² + (y - k)² = r²

Using the midpoint as the center (h, k) and the radius we calculated:

(x - 2)² + (y - 0)² = 5²

(x - 2)² + y² = 25

Therefore,

The equation of the circle with diameter AB and endpoints A(5, 4) and B(-1, -4) is (x - 2)² + y² = 25.

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Answer:

Best predicted value of y' = 86.16 kg

Step-by-step explanation:

Given,

n = 100

Range of heights = 138 - 190cm

Range of weight = 39 to 150 kg

x' =167.46 cm

y' = 81.44 kg

r = 0.108

p value = 0.285

y = - 105 + 1.08x

Significance level = 0.05

We reject H0 since pvalue, 0.285 is less than significance level of 0.05.

Therefore,

Given height of adult male, x = 177 cm

y = - 105 + 1.08x

The best predicted value of y' =

y' = - 105 + 1.08(177)

y' = 86.16 kg

The best predicted value of y' is 86.16kg

Answer:

"The probability that the amount of time spent on leisure activities per day for a randomly selected adult from the population of interest is less than 6 hours per day" is about 0.8749.

Step-by-step explanation:

We have here a random variable that is normally distributed, namely, the time spent on leisure activities by adults living in a household with no young children.

The normal distribution is determined by two parameters: the population mean, [tex] \\ \mu[/tex], and the population standard deviation, [tex] \\ \sigma[/tex]. In this case, the variable follows a normal distribution with parameters [tex] \\ \mu = 4.5[/tex] hours per day and [tex] \\ \sigma = 1.3[/tex] hours per day.

We can solve this question following the next strategy:

We use the standard normal distribution because we can "transform" any raw score into standardized values, which represent distances from the population mean in standard deviations units, where a positive value indicates that the value is above the mean and a negative value that the value is below it. A standard normal distribution has [tex] \\ \mu = 0[/tex] and [tex] \\ \sigma = 1[/tex].

The formula for the z-scores is as follows

[tex] \\ z = \frac{x - \mu}{\sigma}[/tex] [1]

Solving the question

Using all the previous information and using formula [1], we have

x = 6 hours per day (the raw score).

[tex] \\ \mu = 4.5[/tex] hours per day.

[tex] \\ \sigma = 1.3[/tex] hours per day.

Then (without using units)

[tex] \\ z = \frac{x - \mu}{\sigma}[/tex]

[tex] \\ z = \frac{6 - 4.5}{1.3}[/tex]

[tex] \\ z = \frac{1.5}{1.3}[/tex]

[tex] \\ z = 1.15384 \approx 1.15[/tex]

We round the value of z to two decimals since most standard normal tables only have two decimals for z.

We can observe that z = 1.15, and it tells us that the value is 1.15 standard deviations units above the mean.

With this value for z, we can consult the cumulative standard normal table, and for this z = 1.15, we have a cumulative probability of 0.8749. That is, this table gives us P(z<1.15).  

We can describe the procedure of finding this probability in the next way: At the left of the table, we have z = 1.1; we can follow the first line on the table until we find 0.05. With these two values, we can determine the probability obtained above, P(z<1.15) = 0.8749.

Notice that the probability for the z-score, P(z<1.15), of the raw score, P(x<6) are practically the same,  [tex] \\ P(z<1.15) \approx P(x<6)[/tex]. For an exact probability, we have to use a z-score = 1.15384 (without rounding), that is, [tex] \\ P(z<1.15384) = P(x<6) = 0.8757[/tex]. However, the probability is approximated since we have to round z = 1.15384 to z = 1.15 because of the use of the table.

Therefore, "the probability that the amount of time spent on leisure activities per day for a randomly selected adult from the population of interest is less than 6 hours per day" is about 0.8749.

We can see this result in the graphs below. First, for P(x<6) in [tex] \\ N(4.5, 1.3)[/tex] (red area), and second, using the standard normal distribution ([tex] \\ N(0, 1)[/tex]), for P(z<1.15), which corresponds with the blue shaded area.

Final answer:

The question seeks to find the probability that an adult spends less than 6 hours per day on leisure activities, using the given mean and standard deviation for a normal distribution. The z-score is calculated and then used to determine the probability using the cumulative normal distribution function.

Explanation:

The student's question asks to find the probability that a randomly selected adult from a certain population spends less than 6 hours per day on leisure activities, given that the distribution of time spent is normally distributed with a mean of 4.5 hours and a standard deviation of 1.3 hours.

To solve this, you can use the z-score formula:

z = (X - μ) / σ

where X is the value of interest (6 hours), μ is the mean (4.5 hours), and σ is the standard deviation (1.3 hours).

Using this, we calculate:

z = (6 - 4.5) / 1.3

= 1.15 / 1.3

= 0.8846

Now, we look up this z-score in a standard normal distribution table or use a calculator with the normal distribution function to find the corresponding probability.

Assuming normal CDF is the function for cumulative normal distribution:

probability = CDF(-∞, 0.8846, 0, 1)

This will give us the probability that the adult spends less than 6 hours per day on leisure activities. Remember, the cumulative distribution function gives the area to the left of the z-score, which corresponds to the probability of obtaining a value less than the one of interest.

Answer:

12 inches

Step-by-step explanation:

c=2*pi*r

75 = 2*3.14*r

r=75/(2*314)=75/6.28=11.9, which is close to 12

Answer:

  see the bullet list below

Step-by-step explanation:

Given the expression: p² -3 +3p -8 +p +p³

The following statements are true:

_____

Terms are generally separated by + or - signs. (The sign is considered to be part of the term.) In the context of a polynomial, terms may be constants, or may be a product with factors that are constants or variables.

_____

Further comments on "term"

In other contexts, the word "term" is used for various purposes. It can designate a member of a sequence, the left or right side of an equation, the numerator or denominator of a rational expression, or just about any identifiable expression that can be considered as a unit. Whereas "coefficient" or "factor" may apply to just about any subset of the (prime) factors of a product, the word "term" is generally restricted to consideration of the product as a whole.

In the given expression, -3 and -8 are like terms, while 3p and p are also like terms. The expression contains six terms and like terms have the same variables raised to the same powers. However, not all terms with variables are like terms in this instance.

The expression given is p squared minus 3 + 3p minus 8 + p + p cubed. When we look into it, we can see a couple of true statements.

However, the terms p squared, 3p, p, and p cubed are not like terms since the powers of p in each term are different. Similarly, the terms p squared and p cubed are not like terms since the powers of p are 2 and 3, which are not the same.

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Answer:

80%

Step-by-step explanation:

Answer:

the 1st one

Step-by-step explanation:

Answer:

About a third of the residents prefer a park improvement of more trees.

Step-by-step explanation:

Less than 1/2 of the sample actually wanted more trees, so it isn't " Most residents in the town would like to have more trees in the park."

You (usually) can't get an exact answer with a sample, so it isn't ". Exactly 36% of the residents in the town would like more trees in the park."

You don't have enough data to say "Residents who use the park the most would like more trees planted."

Answer:

six hunddered n twelve

Step-by-step explanation:

Answer: The percentage of adults that have a blodd pressure less than 125 mmHg is 15.87%

Step-by-step explanation:

In a normal distribution, we have that in the range:

(-∞, M) we have a 50%

(M, ∞) we have the other 50%.

(the infinite symbols are for notation, obviusly you can not have negative blood pressure)

where M is the mean.

If SD is the standard deviation, in the range

(M - SD, M) we have a 34.13%

Now, the values we have are: M = 134 mmHg, SD = 9mmHg

Then we can replace those values and get:

(M - SD, M) = (125mmHg, 134mmHg) = 34.13%

The range of blodd presure that is smaller than

Then, the range of blood pressure smaller than 125mmHg is the range between (-∞, 125mmHg)

We can calculate this proportion as:

(-∞. 134mmHg) - ( 125mmHg, 134mmHg) = 50% - 34.13% = 15.87%

The percentage of adults that have a blodd pressure less than 125 mmHg is 15.87%

The percentage of adults in the town of Bridgeport with a systolic blood pressure less than 125 mmHg is approximately 15.87%.

In this question, we are given that the systolic blood pressure of adults in the town of Bridgeport is normally distributed with a mean of 134 mmHg and a standard deviation of 9 mmHg.

We need to find the percentage of adults in the town who have a systolic blood pressure less than 125 mmHg.

To solve this, we can standardize the given value of 125 mmHg using the formula z = (x - μ) / σ, where z is the z-score, x is the given value, μ is the mean, and σ is the standard deviation.

Substituting the given values, we have z = (125 - 134) / 9 = -1. Here, we are interested in finding the area to the left of this z-score on the standard normal distribution curve.

Using a standard normal distribution table or a calculator, we can find that the percentage of adults in the town with a systolic blood pressure less than 125 mmHg is approximately 15.87%.

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Answer:

22 cm

Step-by-step explanation:

The perimeter is the distance all the way around a shape. To find the perimeter, add up all the sides

The side lengths are 5, 8 and 9

5+8+9=22

So, the perimeter is 22 centimeters.

Answer:

42cm²

Step-by-step explanation:

b×h

6×7=42

area-To find the area of a rectangle multiply its height by its width. For a square you only need to find the length of one of the sides (as each side is the same length) and then multiply this by itself to find the area.

Answer:

42 sq cm

Step-by-step explanation:

6 x 7=42

Answer:

Step-by-step explanation:

Corresponding heights of presidents and height of their main opponents form matched pairs.

The data for the test are the differences between the heights.

μd = the​ president's height minus their main​ opponent's height.

President's height. main opp diff

191. 166. 25

180. 179. 1

180. 168. 12

182. 183. - 1

197. 194. 3

180. 186. - 6

Sample mean, xd

= (25 + 1 + 12 - 1 + 3 + 6)/6 = 5.67

xd = 5.67

Standard deviation = √(summation(x - mean)²/n

n = 6

Summation(x - mean)² = (25 - 5.67)^2 + (1 - 5.67)^2 + (12 - 5.67)^2+ (- 1 - 5.67)^2 + (3 - 5.67)^2 + (- 6 - 5.67)^2 = 623.3334

Standard deviation = √(623.3334/6 sd = 10.19

For the null hypothesis

H0: μd ≥ 0

For the alternative hypothesis

H1: μd < 0

The distribution is a students t. Therefore, degree of freedom, df = n - 1 = 6 - 1 = 5

The formula for determining the test statistic is

t = (xd - μd)/(sd/√n)

t = (5.67 - 0)/(10.19/√6)

t = 1.36

We would determine the probability value by using the t test calculator.

p = 0.12

Since alpha, 0.05 < than the p value, 0.12, then we would fail to reject the null hypothesis.

Therefore, at 5% significance level, we can conclude that for the population of heights for presidents and their main​ opponents, the differences have a mean greater than 0 cm.

The null hypothesis in this case would be that there is no average height advantage for presidents over their main opponents (µd ≤ 0), while the alternative hypothesis is that presidents are taller on average (µd > 0). A paired t-test with a significance level of 0.05 is usually employed in testing these hypotheses using the p-value and t-score.

In hypothesis testing, the goal is to determine the validity of a claim made. In this case, the claim is that the mean difference in height, where the difference is calculated as the president's height minus their main opponent's height, is greater than 0 cm. This represents the theory that taller presidential candidates have an advantage.

For setting up a null hypothesis and an alternative hypothesis, we consider the following parameters:

To test these hypotheses, we would typically use a one-sample t-test for paired differences with a significance level (alpha) of 0.05. A p-value less than this would allow us to reject the null hypothesis in favor of the alternative hypothesis that presidents are on average taller than their main opponents. Use of p-value and t-score is essential in conducting such a test.

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isolate m by subtracting 110 on both sides.

125=m+110

-110      -110

15=m

Answer: 150

Step-by-step explanation: cause it has six side in total of 720 and subtract it and you have 150

Answer:

A, D, and the choice that says the volume is ~261.33 metres cubed

Step-by-step explanation:

The volume of a triangular prism is denoted by: V = (1/3) * Bh, where B is the base area and h is the height.

Here, we know that the base is a triangle with base 8 and height 14, and the overall height is 7. The first step is to find the area of the base. The area of a triangle is denoted by:

A = (1/2) * b * h, where b is the base and h is the height, so A is correct.

Plug values in:

A = (1/2) * 8 * 14 = 56 metres squared, so the D is correct.

Then use this and the height of 14 to find the volume:

V = (1/3) * Bh

V = (1/3) * 56 * 14 = 784/3 metres cubed (I'm assuming you missed an answer choice when copying the problem on here, so the correct last option is the one that says the volume is 784/3 or ~261.33 metres cubed)

Answer:

Use the formula A = one-half b h to find the area of the base.

The area of the base, A, is One-half (8) (14) = 56 meters squared.

The volume of the prism, V is (56) (7) = 392 meters cubed.

Step-by-step explanation:

Volume of prism:

Base area × height

Base area:

½ × 8 × 14 = 56

Volume:

56 × 7 = 392

Answer:

choice c. 46

Step-by-step explanation:

Find a b if a = 10i + 4j and b = 3i + 4%

a = <10, 4>

b = <3, 4>

a*b = <10, 4> * <3, 4> = 10*3 + 4*4 = 30 + 16 = 46

Answer:

C. 46

Step-by-step explanation:

Answer:

2x^3 -x

Step-by-step explanation:

x^3 -2x +2x^2 + x^3 -2x^2 +x

Combine like terms

x^3 + x^3   +2x^2 - 2x^2   -2x +x

2x^3 -x

Answer:

D, E, F

Step-by-step explanation:

The first step I would do is distribute the original equation. After distributing, the equation is now 8x² + 16xy. The first answer I see that matches this is D.

Then, after already eliminating A, B, and C, I look at E. I distribute the x and find out it is also equal to 8x² + 16xy.

Then, I look at F. After distributing again, it is also equal to 8x² + 16xy.

Answer:

0.00086 or 0.086%

Step-by-step explanation:

The question is not complete, however, after searching online for the question, I was able to get the complete question.

Given that

USL = 14 ; CL = 13 ; LSL = 12

Probability of air pressure > 14 is equal to the  Probability of air pressure <12 because the process is centered

Therefore, the probability of defect in future is equal to 2 × Probability of air pressure > 14

For us to discover the probability of pressure > 14, finding Z-value for X= 14 is important,

Mean Pressure (mu) =13

Std. Deviation (Sigma) = 0.3

Therefore;

Z = (X-mu)/sigma = (14-13)/0.3 = 3.33

From Standard normal distribution table for Z = 3.3, p = 0.99957

Hence,

the probability of pressure > 14 = 1 - 0.99957 = 0.00043

Finally, the probability of defect in future

= 2 × Probability of air pressure > 14

= 2 × 0.00043

= 0.00086

= 0.086 %

Answer:

2.5

and

y=2.5x

Step-by-step explanation:

Answer:

2.5

y=2.5x

Step-by-step explanation:

I hope you do good today I'm a little sad sorry I didn't do the joke of the day :(

Answer:

A.   x = [  5/3   -2/3  ] [  -3  ]

      y = [  2        -1   ]  [  -9  ]

Step-by-step explanation:

got it correct on the unit test review on edge 2020

The matrix equation to solve the system of equations 3x - 2y = -3 and 6x - 5y = -9 is AX = B, where A is the coefficient matrix[tex]\(\begin{bmatrix}3 & -2 \\ 6 & -5\end{bmatrix}\)[/tex], X is the variable matrix[tex]\(\begin{bmatrix}x \\ y\end{bmatrix}\)[/tex], and B is the constant matrix[tex]\(\begin{bmatrix}-3 \\ -9\end{bmatrix}\)[/tex].

To solve the system of linear equations presented using matrices, we can set up a matrix equation of the form AX = B, where A is the coefficient matrix, X is the variable matrix, and B is the constant matrix.

The system of equations is:

From the system, we can identify the coefficient matrix A, the variable matrix X, and the constant matrix B as follows:

A =
[tex]\(\begin{bmatrix}3 & -2 \\ 6 & -5\end{bmatrix}\)[/tex]

X =
[tex]\(\begin{bmatrix}x \\ y\end{bmatrix}\)[/tex]

B =
[tex]\(\begin{bmatrix}-3 \\ -9\end{bmatrix}\)[/tex]

The matrix equation that can be used to solve the system is:

[tex]\(\begin{bmatrix}3 & -2 \\ 6 & -5\end{bmatrix}\) \(\begin{bmatrix}x \\ y\end{bmatrix}\) = \(\begin{bmatrix}-3 \\ -9\end{bmatrix}\)[/tex]

Answer:

a) [tex]46.14-3.707\frac{1.19}{\sqrt{7}}=44.47[/tex]    

[tex]46.14+3.707\frac{1.19}{\sqrt{7}}=47.81[/tex]    

b) For this case the upper limit for the confidence interval is lower than 48 so then at 1% of significance we can't conclude that the claim given is true.

c) [tex] ME = t_{\alpha/2}\frac{s}{\sqrt{n}}[/tex]

If we reduce the sample size from 30 to 10 we will have an interval wider since the margin of error would be larger

Step-by-step explanation:

Data given

[tex]\bar X=46.14[/tex] represent the sample mean

[tex]\mu[/tex] population mean

s=1.19 represent the sample standard deviation

n=7 represent the sample size  

Part a

The confidence interval for the mean is given by the following formula:

[tex]\bar X \pm t_{\alpha/2}\frac{s}{\sqrt{n}}[/tex]   (1)

The degrees of freedom are given by:

[tex]df=n-1=7-1=6[/tex]

The Confidence level is 0.99 or 99%, the significance would be [tex]\alpha=0.01[/tex] and [tex]\alpha/2 =0.005[/tex], and the critical value for this case is [tex]t_{\alpha/2}=3.707[/tex]

Replacing we got:

[tex]46.14-3.707\frac{1.19}{\sqrt{7}}=44.47[/tex]    

[tex]46.14+3.707\frac{1.19}{\sqrt{7}}=47.81[/tex]    

Part b

For this case the upper limit for the confidence interval is lower than 48 so then at 1% of significance we can't conclude that the claim given is true.

Part c

For this case we need to take in count that the margin of error is given by:

[tex] ME = t_{\alpha/2}\frac{s}{\sqrt{n}}[/tex]

If we reduce the sample size from 30 to 10 we will have an interval wider since the margin of error would be larger

Answer:

[tex]-77\sqrt{30}[/tex]

Step-by-step explanation:

[tex](-7\sqrt{3})(11\sqrt{10})=-77\sqrt{30}[/tex]

Hope this helps!

The simplified form of the expression is  -77√33

Given the surd function (-7√3)(11√10)

Multiply the surd functions together. To do this, you multiply both the integers and the surd functions separately  as shown:

Hence the simplified form of the expression is  -77√33

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Answer: one third of a chance

Step-by-step explanation:

The probability that she will select a pencil and a cap that is the same color is 1/4 option (C) 1/4 is correct.

It is defined as the ratio of the number of favorable outcomes to the total number of outcomes, in other words, the probability is the number that shows the happening of the event.

The question is incomplete.

The complete question is in the picture, please refer to the attached picture.

It is given that:

Mechanical pencil: 1 red, 1 green, 1 blue

Erase cap: 1 red, 1 green, 1 blue, and 1 yellow.

P(both red) = (1/3)x(1/4) = 1/12

P(both green) = (1/3)x(1/4) = 1/12

P(both blue) = (1/3)x(1/4) = 1/12

P(same colour) = 1/12 + 1/12 + 1/12 = 3/12 = 1/4

Thus, the probability that she will select a pencil and a cap that is the same color is 1/4 option (C) 1/4 is correct.

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Answer:

Yes. We have evidence to support the claim that there is a difference in the use of the four entrances.

Step-by-step explanation:

The question is incomplete:

Entrance Frequency

Main Street 81

Broad Street 129

Cherry Street 72

Walnut Street 119

Total: 401

The building maintenance supervisor wants to know if the entrances are equally utilized.

This problem can be solved using the Chi-square goodess of fit test.

The expected value for each door is

[tex]E=401/4=100.25[/tex]

The degrees of freedom are equal to the number of categories (4 doors) minus one:

[tex]df=n-1=4-1=3[/tex]

Then, the value of the chi-square statistic can be calculated as:

[tex]\chi^2=\sum \dfrac{(O_i-E)^2}{E}\\\\\\\chi^2=\dfrac{(81-100.25)^2}{100.25}+\dfrac{(129-100.25)^2}{100.25}+\dfrac{(72-100.25)^2}{100.25}+\dfrac{(119-100.25)^2}{100.25}\\\\\\\chi^2=\dfrac{370.5625+826.5625+798.0625+351.5625}{100.25}=\dfrac{2346.75}{100.25}=23.41[/tex]

The P-value for this test statistic χ^2=23.41 and df=3 is:

[tex]P-value=P(\chi^2_3>23.41)=0.00003[/tex]

This P-value is much smaller than the significance level (0.01), so the effect is significant.

We have evidence to support the claim that there is a difference in the use of the four entrances.