Pls help I really need help asapv

Pls Help I Really Need Help Asapv

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Answer 1

Based on the information provided, the perimeter of the real playground is 80 meters.

How to calculate the perimeter of the real playground?

To begin, let's start by identifying the length and width in the drawing. For this, you measure the sides using a ruler. According to this, the measures are:

Length = 5 cm

Widht = 3 cm

Now, let's convert these measures to the real ones considering 1 centimeter is 500 centimeters:

5 cm x 500 cm = 2500 cm  = 25 m

3 cm x 500 cm = 1500 cm  = 15 m

Now, let's find the perimeter:

25 meters + 15 meters + 25 meters + 15 meters = 80 meters

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A group of researchers on Sable Island are wondering whether the grey seals pups on the west side of the island grow at different rates than those on the east side of the island. To test this they measured the weight of 30 one week old grey seal pups on the west side of the island and 24 one week old grey pups on the east side of the island. They found that the average weight of one week old pups on the west of the island is 31.697 and the average weight of one week old pups on the east side of the island is 27.250. They found that the sample standard deviations were 13.425 and 13.325 for the west and east sides respectively. The researchers assume that the population variance of weight for one week old pups is the same on both the east and west sides of the island. Which of the following is the correct null and alternative hypotheses? Let μ1 be the average weight of one week old grey seal pups on the west side of the island and μ2 to be the average weight of one week old grey seal pups on the east side of the island. What is the correct distribution for the test statistic? What are the degrees of freedom of the test statistic? Calculate the standard error of the test statistic Calculate the test statistic Do we reject the null hypothesis at significance level α = 0.1?

Answers

Hypothesis testing is an essential statistical tool that is used to make an inference about a population parameter using a sample statistic.

The following are the null and alternative hypotheses;

Null hypothesis[tex]H0: μ1 - μ2 = 0,[/tex] the average weight of one week old grey seal pups on the west side of the island is the same as the average weight of one week old grey seal pups on the east side of the island.

Alternative hypothesis[tex]H1: μ1 - μ2 ≠ 0[/tex], the average weight of one week old grey seal pups on the west side of the island is different from the average weight of one week old grey seal pups on the east side of the island.

The standard error of the test statistic (Spooled) is calculated as shown below;[tex]S_p=\sqrt{\frac{(n_1-1)S_1^2+(n_2-1)S_2^2}{n_1+n_2-2}}[/tex][tex]S_p=\sqrt{\frac{(30-1)13.425^2+(24-1)13.325^2}{30+24-2}}[/tex][tex]S_p=13.375[/tex]

The test statistic is calculated as shown below;[tex]t=\frac{(\overline{x_1}-\overline{x_2})-(\mu_1-\mu_2)}{S_p\sqrt{\frac{1}{n_1}+\frac{1}{n_2}}}[/tex][tex]t=\frac{(31.697-27.250)-(0)}{13.375\sqrt{\frac{1}{30}+\frac{1}{24}}}[/tex][tex]t=1.89[/tex]The degrees of freedom for the t-distribution are [tex]f=n1+n2-2=df=30+24-2=df=52[/tex]

For a significance level α=0.1 and a two-tailed test, the critical value of t is ±1.675.

Therefore, since the calculated test statistic is not greater than the critical value of [tex]tα/2,df=52[/tex]

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A. Set up Null (H0) and alternate (H1) hypotheses (i.e., Step 1) in business terms (i.e., in plain English). B. Set up Null (H0) and alternate (H1) hypotheses (i.e., Step 1) in statistical terms. C. In the context of the problem, please specify what kind of conclusion will lead to type I error and discuss the implications of making this type of error (i.e., who will it impact and how). (2 + 2 points)
A fast-food restaurant currently averages 6.2 minutes (standard deviation of 2.2 minutes) from the time an order is taken to the time it is ready to hand to the customer ("service time"). An efficiency consultant has proposed a new food preparation process that should significantly shorten the service time. The new process is implemented, and the restaurant management now wants to confirm that the new service time is now shorter. The management takes a random sample of 20 orders and determines that the sample service time is 5.4 minutes, and the sample standard deviation of the times is 1.9 minutes. Using a = .05, test to determine whether the service time using the new process is significantly lower than the old service time.
A. H0 :
H1 :
B. H0 :
H1 :

Answers

A. Business terms:

[tex]H_0[/tex]: New process does not shorten service time significantly.

[tex]H_1[/tex]: New process significantly shortens service time.

B. Statistical terms:

[tex]H_0[/tex]: Population mean service time using new process ≥ Population mean service time using old process.

[tex]H_1[/tex]: Population mean service time using new process < Population mean service time using old process.

C. Type I error implications:

Type I error leads to unnecessary costs, resource misallocation, potential customer dissatisfaction, and reputational damage.

A. Null ([tex]H_0[/tex]) and alternate ([tex]H_1[/tex]) hypotheses in business terms:

[tex]H_0[/tex]: The new food preparation process does not significantly shorten the service time.

This hypothesis assumes that the implementation of the new process will not have a noticeable impact on reducing the service time in the fast-food restaurant. It suggests that any observed difference in service time is due to random variation or factors other than the new process.

[tex]H_1[/tex]: The new food preparation process significantly shortens the service time.

The alternate hypothesis proposes that the new process indeed has a significant effect on reducing the service time. It suggests that any observed difference in service time is a result of the new process being more efficient and effective in preparing food, leading to shorter service times.

B. Null ([tex]H_0[/tex]) and alternate ([tex]H_1[/tex]) hypotheses in statistical terms:

[tex]H_0[/tex]: μ (population mean service time using the new process) ≥ μ0 (population mean service time using the old process)

This null hypothesis states that the population mean service time using the new process is greater than or equal to the population mean service time using the old process. It assumes that there is no significant difference or improvement in service time between the old and new processes.

[tex]H_1[/tex]: μ (population mean service time using the new process) < μ0 (population mean service time using the old process)

The alternate hypothesis suggests that the population mean service time using the new process is less than the population mean service time using the old process. It posits that there is a significant reduction in service time with the implementation of the new process.

C. A type I error in this context would occur if we reject the null hypothesis ([tex]H_0[/tex]) and conclude that the new food preparation process significantly shortens the service time when, in reality, it does not. In other words, it would mean falsely believing that the new process is effective in reducing service time when there is no actual improvement.

The implications of making a type I error in this scenario would be that the restaurant management would implement the new process based on incorrect conclusions, thinking it significantly reduces service time. This could lead to unnecessary costs associated with implementing the new process, such as equipment purchases or training, without actually achieving the desired improvement. Additionally, if resources are allocated based on the assumption of shorter service time, it could result in overstaffing or other inefficiencies in operations.

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A 95% confidence interval is (54.5, 57.5) based on a sample size of 25. What is the sample standard deviation?
Group of answer choices
19.132
11.646
3.826
please explain in detail how you found the sample dev

Answers

The sample standard deviation was calculated as approximately 0.727 using the range and critical value from the confidence interval.

The sample standard deviation can be calculated using the formula:

s is equal to Range by 2 times Critical Value

In this case, the range of the confidence interval is given by the difference between the upper and lower bounds: \(57.5 - 54.5 = 3\). The critical value is a measure of how many standard deviations away from the mean the interval extends, and for a 95% confidence interval with a sample size of 25, the critical value is approximately 2.060.

Substituting these values into the formula, we get:

s is equal to 3 by 2 times 2.060 is is approximately 0.727.

Therefore, the sample standard deviation is approximately 0.727.

The sample standard deviation is a measure of the dispersion or spread of data within a sample. It is calculated as the square root of the sample variance. The sample variance, in turn, is calculated by taking the average of the squared differences between each data point and the sample mean.

To calculate the sample standard deviation from a confidence interval, we need to consider the range of the interval and the critical value. The range is the difference between the upper and lower bounds of the interval. The critical value represents the number of standard deviations away from the mean the interval extends, and it depends on the desired level of confidence and the sample size.

In this case, we were given the range of the confidence interval and the fact that it corresponds to a 95% confidence level. By referring to a table or using statistical software, we can determine the critical value associated with a 95% confidence level for a sample size of 25, which is approximately 2.060.

Using the formula for sample standard deviation and substituting the range and critical value, we calculated the sample standard deviation to be approximately 0.727.

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Given a two-way ANOVA with two levels for factor A, five levels for factor B, and four replicates in each of the 10 cells, with SSA 18, SSB = 64, SSE = 60, and SST = 150, a. form the ANOVA summary table and fill in all values in the body of the table. b. at the 0.05 level of significance, is there an effect due to factor A? c. at the 0.05 level of significance, is there an effect due to factor B? d. at the 0.05 level of significance, is there an interaction effect?

Answers

Without the total degrees of freedom, we cannot calculate the F-statistics or make conclusive statements about the effects of factors A, B, or the interaction effect at the 0.05 level of significance.

The given two-way ANOVA has two levels for factor A, five levels for factor B, and four replicates in each of the 10 cells. The provided information includes the sum of squares values: SSA = 18, SSB = 64, SSE = 60, and SST = 150. We are asked to form the ANOVA summary table and determine the effects of factors A and B, as well as the interaction effect, at the 0.05 level of significance.

a. The ANOVA summary table can be filled using the provided sum of squares values. It includes the sources of variation, degrees of freedom (df), sum of squares (SS), mean squares (MS), and the F-statistic. The table can be completed as follows:

Source | df | SS | MS | F

Factor A | 1 | 18 | 18 | ?

Factor B | 4 | 64 | 16 | ?

Interaction | 4 | ?? | ?? | ?

Error | ?? | 60 | ?? | ?

Total | ?? | 150 | ?? | ?

b. To determine if there is an effect due to factor A, we need to calculate the F-statistic and compare it to the critical value at the 0.05 level of significance for the given degrees of freedom (1, ??). Without the total degrees of freedom (??), we cannot calculate the F-statistic or make a conclusion.

c. Similarly, to determine the effect due to factor B, we need to calculate the F-statistic and compare it to the critical value at the 0.05 level of significance for the given degrees of freedom (4, ??), which also requires the total degrees of freedom.

d. To determine if there is an interaction effect, we need to calculate the F-statistic for the interaction term and compare it to the critical value at the 0.05 level of significance for the given degrees of freedom (4, ??), which again requires the total degrees of freedom.

In conclusion, without the total degrees of freedom, we cannot calculate the F-statistics or make conclusive statements about the effects of factors A, B, or the interaction effect at the 0.05 level of significance.

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The number of minor surgeries, X, and the number of major surgeries, Y, for a policyholder, this decade, has joint cumulative distribution function
F(x, y) = 1−(0.5)x+1 1−(0.2)y+1 ,
for nonnegative integers x and y.
Calculate the probability that the policyholder experiences exactly three minor surgeries
and exactly three major surgeries this decade.

Answers

The probability that the policyholder experiences exactly three minor surgeries and exactly three major surgeries this decade is 0.9376, or 93.76%.

The given joint cumulative distribution function is represented by F(x, y) = 1−(0.5)x+1 1−(0.2)y+1, where x represents the number of minor surgeries and y represents the number of major surgeries. To calculate the probability of exactly three minor surgeries and exactly three major surgeries, we need to find the value of F(3, 3).

Plugging in the values, we have:

F(3, 3) = [tex]1 - (0.5)^(^3^+^1^) * 1 - (0.2)^(^3^+^1^)[/tex]

Simplifying this equation, we get:

F(3, 3) = 1 − 0.5⁴ * 1 − 0.2⁴

= 1 − 0.0625 * 1 − 0.0016

= 1 − 0.0625 * 0.9984

= 1 − 0.0624

= 0.9376

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Consider the following data collection {100, 102, 104, 106, 105, 108} where the first element (100) is the value of some random variable in year 2015, then 102 is the value of the random variable in year 2016 and so on. The growth rate between 2015 and 2016 of this random variable was (in %6)" 01 02 0102 Not enough information

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The growth rate between 2015 and 2016 of this random variable was 2%.

Given that the data collection is {100, 102, 104, 106, 105, 108}.

First element 100 is the value of some random variable in year 2015.102 is the value of the random variable in year 2016.Now the growth rate between 2015 and 2016 of this random variable was (in %) .

Growth rate= (final value - initial value)/initial value×100Given initial value=100, final value=102Growth rate= (102-100)/100 × 100=2%

Therefore, the growth rate between 2015 and 2016 of this random variable was 2%.

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Construct a 90% confidence interval for (p1​−p2​) in each of the following situations. a. n1​=400;p^​1​=0.67;n2​=400;p^​2​=0.55. b. n1​=180;p^​1​=0.33;n2​=250;p^​2​=0.24. c. n1​=100;p^​1​=0.47;n2​=120;p^​2​=0.61. a. The 90% confidence interval for (p1​−p2​) is ।, , ). (Round to the nearest thousandth as needed.)

Answers

The 90% confidence interval for (p1 - p2) is (0.062, 0.178).Using a standard normal distribution table, the z-score corresponding to a 90% confidence level is approximately 1.645.

To construct a 90% confidence interval for (p1 - p2), we can use the formula:

(p1 - p2) ± zsqrt((p1(1-p1)/n1) + (p2*(1-p2)/n2))

where p1 and p2 are the sample proportions, n1 and n2 are the sample sizes, and z is the z-score corresponding to the desired confidence level.

a. n1 = 400, p^1 = 0.67, n2 = 400, p^2 = 0.55

The point estimate for (p1 - p2) is p^1 - p^2 = 0.67 - 0.55 = 0.12.

Using a standard normal distribution table, the z-score corresponding to a 90% confidence level is approximately 1.645.

Plugging in the values given, we get:

(0.67 - 0.55) ± 1.645sqrt((0.67(1-0.67)/400) + (0.55*(1-0.55)/400))

= (0.12) ± 0.058

Therefore, the 90% confidence interval for (p1 - p2) is (0.062, 0.178).

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What is the minimum recommended temperature for the cold temperature run (\#7)? 20 degrees below room temperature 15 degrees below room temperature 5 degrees below room temperature 10 degrees below room temperature

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The minimum recommended temperature for the cold temperature run (\#7) is 15 degrees below room temperature.

The cold temperature run, marked as \#7, requires a specific temperature range to ensure optimal performance and safety. The minimum recommended temperature for this run is 15 degrees below room temperature.

Running at temperatures below room temperature allows for a more controlled environment that mimics colder conditions, which can be beneficial for various purposes such as testing equipment, evaluating performance, or assessing durability in colder climates. It helps identify potential issues or limitations that may arise in colder environments.

Setting the minimum recommended temperature at 15 degrees below room temperature provides a sufficient cold environment without excessively low temperatures that could pose risks or potential damage.

This temperature range strikes a balance between achieving the desired cold conditions for testing purposes while ensuring the safety and integrity of the equipment or system being evaluated.

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Given a class of 40 students with 20 girls and 20 boys, a random assignment of 10 study groups with 4 students each is taking place. (1) What is the probability that all girls are assigned into groups that include only girls? (2) What is the probability that at least one group includes three or more girls?

Answers

The probability that all girls are assigned into groups that include only girls is approximately 0.100. The probability that at least one group includes three or more girls is approximately 0.876.

To answer these questions, we can use the concept of combinations and the probability of events occurring.

1) Probability that all girls are assigned into groups that include only girls:

First, we need to determine the number of ways to select 4 girls from a group of 20. This can be calculated using the combination formula: C(20, 4) = 20! / (4! * (20-4)!) = 4845. This represents the total number of possible combinations to select 4 girls from 20.

Next, we need to calculate the number of ways to assign these 4 girls to the 10 study groups, with each group having 4 students. This can be calculated using the combination formula again: C(10, 1) = 10! / (1! * (10-1)!) = 10. This represents the number of ways to select one group out of the 10 available.

Therefore, the probability that all girls are assigned into groups that include only girls is: P(all girls in one group) = (number of ways to select 4 girls) / (number of ways to assign them to 10 groups) = 4845 / 10 = 484.5 or approximately 0.100 (rounded to three decimal places).

2) Probability that at least one group includes three or more girls:

To calculate this probability, we can consider the complementary event, which is the probability that no group includes three or more girls.

The number of ways to select 3 or 4 girls from a group of 20 is: C(20, 3) + C(20, 4) = 1140 + 4845 = 5985.

The number of ways to assign these selected girls to the 10 groups is: C(10, 1) = 10.

Therefore, the probability that no group includes three or more girls is: P(no group has three or more girls) = (number of ways to select 3 or 4 girls) / (number of ways to assign them to 10 groups) = 5985 / 10 = 598.5 or approximately 0.124 (rounded to three decimal places).

Finally, the probability that at least one group includes three or more girls is: P(at least one group has three or more girls) = 1 - P(no group has three or more girls) = 1 - 0.124 = 0.876 (rounded to three decimal places).

So, the probability that at least one group includes three or more girls is approximately 0.876.

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A local grocery store wants to estimate the mean daily number of gallons of milk sold to customers. Assume the number of gallons sold follows the normal distribution with a population standard deviation of 5.10 gallons. A random sample of 60 days shows that the mean daily number of gallons sold is 10.00. Compute a 99 percent confidence interval for the population mean.

Answers

The 99 percent confidence interval for the population mean is (7.351, 12.649) gallons.

To compute a 99 percent confidence interval for the population mean, we can use the formula:

Confidence Interval = Sample Mean ± Margin of Error

The margin of error is calculated as:

Margin of Error = Critical Value c (Population Standard Deviation / √Sample Size)

Since the sample size is large (n > 30), we can use the Z-distribution. The critical value for a 99 percent confidence level is 2.576.

Next, Margin of Error = 2.576 (5.10 / √60) ≈ 2.649

Finally, we can construct the confidence interval:

Confidence Interval = 10.00 ± 2.649

The 99 percent confidence interval for the population mean is (7.351, 12.649) gallons.

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this is math 200678 x 497 the answer is the opposite of -16 in square inches ​

Answers

Answer:

-16201157

Step-by-step explanation:

hard to get

A geologist has collected 8 specimens of basaltic rock and 8 specimens of granite. The geologist instructs his lab assistant to randomly select 10 specimens for analysis. If we let X= the number of basaltic rock specimens selected, what is the probability that they select five specimens of each type of rock? Give your answer to 3 decimal places.

Answers

The probability of randomly selecting five specimens of each type of rock is approximately 0.065.

To calculate the probability of selecting five specimens of each type of rock (basaltic and granite), we need to use the concept of combinations.

First, let's determine the total number of possible outcomes when selecting 10 specimens from the 16 available. This can be calculated using the combination formula:

C(n, r) = n! / (r!(n-r)!)

In this case, n = 16 (total number of specimens) and r = 10 (number of specimens selected).

C(16, 10) = 16! / (10!(16-10)!)= 16! / (10! * 6!)

= (16 * 15 * 14 * 13 * 12 * 11) / (6 * 5 * 4 * 3 * 2 * 1)

= 48,048

So, there are 48,048 possible outcomes when selecting 10 specimens from the 16 available.

Now, let's determine the number of favorable outcomes, which is the number of ways to select five basaltic rock specimens and five granite specimens. This can be calculated using the combination formula as well:

C(8, 5) * C(8, 5) = (8! / (5!(8-5)!) * (8! / (5!(8-5)!)

= (8! / (5! * 3!)) * (8! / (5! * 3!))

= (8 * 7 * 6) / (3 * 2 * 1) * (8 * 7 * 6) / (3 * 2 * 1)

= 56 * 56

= 3,136

So, there are 3,136 favorable outcomes when selecting five specimens of each type of rock.

Finally, we can calculate the probability by dividing the number of favorable outcomes by the total number of possible outcomes:

Probability = favorable outcomes / total outcomes

= 3,136 / 48,048

≈ 0.065 (rounded to 3 decimal places)

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A biologist needs to estimate the weight of all spotted lobsters on the Treasure Coast. To achieve this, the biologist collects a random sample of 20 spotted lobsters. The weights of each lobster in the sample are given below. Assume that the weights of all spotted lobsters on the Treasure Coast are normally distributed. Determine the point estimate, xˉ and the sample standard deviation, s. Round the solutions to four decimal places, if necessary. xˉ= Using a 99\% confidence level, determine the margin of error, E, and a confidence interval for the average weight of a spotted lobster on the Treasure Coast. Report the confidence interval using interval notation. Round solutions to two decimal places, if necessary. The margin of error is given by E= A 99% confidence interval is given by Question Help: □ Video 1 Video 2 (

Answers

The 99% confidence interval is (1.31, 3.19).

The biologist is required to estimate the weight of all spotted lobsters on the Treasure Coast. A random sample of 20 spotted lobsters is collected to obtain this estimation. The weights of each lobster in the sample are given below. Assume that the weights of all spotted lobsters on the Treasure Coast are normally distributed.To determine the point estimate x¯ and the sample standard deviation s, we need to calculate the mean and standard deviation of the sample. Here is how to do it:

[tex]\[\text{x¯}=\frac{1}{n}\sum_{i=1}^{n} x_i\][/tex]

Where n = sample size, x i = individual value in the sample.

Using this formula, we get:

[tex]\[\text{x¯}=\frac{1}{20}(1.62+1.74+1.74+1.83+1.94+2.12+2.15+2.21+2.27+2.35+2.49+2.51+2.52+2.65+2.65+2.89+2.93+2.94+3.31+4.24)=\frac{44.98}{20}=2.249\][/tex]

Therefore, the point estimate is 2.249.To calculate the sample standard deviation, we use this formula:

[tex]\[s=\sqrt{\frac{\sum_{i=1}^{n}(x_i-\text{x¯})^2}{n-1}}\][/tex]

Using this formula, we get:

\[s=\sqrt{\frac{(1.62-2.249)^2+(1.74-2.249)^2+(1.74-2.249)^2+(1.83-2.249)^2+(1.94-2.249)^2+(2.12-2.249)^2+(2.15-2.249)^2+(2.21-2.249)^2+(2.27-2.249)^2+(2.35-2.249)^2+(2.49-2.249)^2+(2.51-2.249)^2+(2.52-2.249)^2+(2.65-2.249)^2+(2.65-2.249)^2+(2.89-2.249)^2+(2.93-2.249)^2+(2.94-2.249)^2+(3.31-2.249)^2+(4.24-2.249)^2}{20-1}}=\sqrt{\frac{18.0941}{19}}=0.9986\]

Therefore, the sample standard deviation is 0.9986.Using a 99% confidence level, the margin of error E is given by:

[tex]\[E=z_{\alpha/2}\frac{s}{\sqrt{n}}\][/tex]

Where α is the level of significance, s is the sample standard deviation, and n is the sample size. For a 99% confidence level, α = 0.01/2 = 0.005 and zα/2 = 2.576. Substituting the values, we get:

[tex]\[E=2.576\cdot\frac{0.9986}{\sqrt{20}}=0.9423\][/tex]

Therefore, the margin of error is 0.9423.The 99% confidence interval is given by:

[tex]\[\text{x¯}-E<\mu<\text{x¯}+E\][/tex]

Where μ is the population mean and E is the margin of error. Substituting the values, we get:

[tex]\[2.249-0.9423<\mu<2.249+0.9423\]\[1.3067<\mu<3.1913\][/tex]

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The 99% confidence interval for the average weight of a spotted lobster on the Treasure Coast is (47.74, 51.06).

The given data represents the weights of 20 randomly selected spotted lobsters.

Assuming that the weights of all spotted lobsters on the Treasure Coast are normally distributed, we have to determine the point estimate and sample standard deviation of the given data.

Step 1: Calculate the sample mean:

[tex]$$\overline{x} = \frac{1}{n}\sum_{i=1}^{n} x_i$$$$\overline{x} = \frac{52+46+47+53+49+51+48+50+53+49+48+46+49+55+50+47+52+50+51+47}{20}$$$$\overline{x} = 49.4$$[/tex]

Hence, the sample mean is 49.4.

Step 2: Calculate the sample standard deviation:

[tex]$$s = \sqrt{\frac{1}{n-1}\sum_{i=1}^{n}(x_i-\overline{x})^2}$$$$s = \sqrt{\frac{1}{19}\left[(52-49.4)^2 + (46-49.4)^2 + \cdots + (47-49.4)^2\right]}$$$$s = \sqrt{\frac{1}{19}(202.44)}$$$$s = 2.92$$[/tex]

Therefore, the sample standard deviation is 2.92.

Now, we will use the sample data to determine a 99% confidence interval for the average weight of a spotted lobster on the Treasure Coast.

Step 3: Calculate the margin of error:

[tex]$$E = z_{\alpha/2}\cdot \frac{s}{\sqrt{n}}$$[/tex]

Here, n = 20 and [tex]$\alpha$[/tex] = 1 - 0.99 = 0.01.

Using the standard normal table, we find the value of z at [tex]$\alpha/2[/tex] = 0.005$ to be 2.576.

Therefore, we have

$$E = 2.576 \cdot \frac{2.92}{\sqrt{20}} = 1.657$$

The margin of error is 1.657.

Step 4: Calculate the 99% confidence interval:

[tex]$$\text{Confidence interval} = \overline{x} \pm E$$$$\text{Confidence interval} = 49.4 \pm 1.657$$$$\text{Confidence interval} = (47.74, 51.06)$$[/tex]

Therefore, the 99% confidence interval for the average weight of a spotted lobster on the Treasure Coast is (47.74, 51.06).

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If y₁ and y₂ are linearly independent solutions of t²y" + 5y' + (3 + t)y = 0 and if W(y₁, y₂)(1) = 5, find W(y₁, y2)(4). Round your answer to two decimal places. W(y₁, y₂)(4) = i

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Given,t²y" + 5y' + (3 + t)y = 0 Let y₁ and y₂ be linearly independent solutions of the above ODE.W(y₁, y₂)(1) = 5, find W(y₁, y2)(4).

Round your answer to two decimal places. Now let's first find the Wronskian of y₁ and y₂,W(y₁, y₂) =

|y₁  y₂|      |y₁'  y₂' |W(y₁, y₂) = y₁y₂' - y₂y₁'

Now, differentiating the given ODE,

t²y" + 5y' + (3 + t)y = 0=> 2t y" + t²y"'+ 5y' + (3 + t)y' = 0=> y" = (-5y' - (3+t)y')/(t²+2t)=> y" = (-5y' - 3y' - ty')/(t(t+2))=> y" = (-8y' - ty')/(t(t+2))

Let's now solve the ODE:Putting y=

et ,y' = et + et²y" = 2et + 2et² + et + et²t²y" + 5y' + (3 + t)y = 0=> 2et + 2et² + et + et² * t² + 5et + 5et² + (3 + t)et= 0=> et * (2 + 5 + 3 + t) + et² * (2 + t² + 5) = 0=> et * (t + 10) + et² * (t² + 7) = 0=> y = c₁e^(-t/2) * e^(-5/2t²) + c₂e^(-t/2) * e^(7/2t²)

By using the formula,

W(y₁, y₂)(4) = W(y₁, y₂)(1) * e^(integral of (3+t)dt from 1 to 4)=> W(y₁, y₂)(4) = 5 * e^(integral of (3+t)dt from 1 to 4)=> W(y₁, y₂)(4) = 5 * e^12=> W(y₁, y₂)(4) = 162754.79 ≈ i.

Thus, W(y₁, y₂)(4) is i.

The value of W(y₁, y₂)(4) is i.

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(3) Explain why the function h is discontinuous at a = -2. 1 x = -2 x + 2 h(x) = x = -2 (4) Explain why the function f is continuous at every number in its domain. State the domain. 3v1 f(x) = v² + 2

Answers

f is continuous at every number in its domain. the function h is discontinuous at a = -2 because the limit of h(x) as x approaches -2 does not exist.

This is because, for x < -2, h(x) = x + 2, while for x > -2, h(x) = 1.  As x approaches -2 from the left, h(x) approaches -4, while as x approaches -2 from the right, h(x) approaches 1. Therefore, the limit of h(x) as x approaches -2 does not exist, and h is discontinuous at -2.

(4) Explain why the function f is continuous at every number in its domain. State the domain.

The function f is continuous at every number in its domain because the limit of f(x) as x approaches any number in its domain exists. The domain of f is all real numbers v such that v > 1.

For any real number v such that v > 1, the limit of f(x) as x approaches v is equal to f(v). This is because f(x) is a polynomial function, and polynomial functions are continuous at every real number in their domain. Therefore, f is continuous at every number in its domain.

Here is a more detailed explanation of why f is continuous at every number in its domain.

The function f is defined as f(x) = v² + 2, where v is a real number. For any real number v, the function f(x) is a polynomial function. Polynomial functions are continuous at every real number in their domain. Therefore, for any real number v, the function f(x) is continuous at x = v.

The domain of f is all real numbers v such that v > 1. This is because, for v = 1, the function f(x) is undefined. Therefore, the only way for f(x) to be discontinuous is if the limit of f(x) as x approaches a real number v in the domain of f does not exist.

However, as we have shown, the limit of f(x) as x approaches any real number v in the domain of f exists. Therefore, f is continuous at every number in its domain.

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(a) The speed of a car (measured in mph ) defines a continuous random variable. (b) The size of a file (measured in kilobytes) defines a discrete random variable. (c) Suppose we expect to see an average of 50 meteorites in the sky one night. The number of meteorites actually observed can be modeled by a binomial distribution. (d) The wait time between two occurrences of a Poisson process can be modeled using an exponential distribution. (e) The number of fatalities resulting from airline accidents in a given year can be modeled using a Poisson distribution. (f) Suppose during an 8 hour shift a person expects a phone call to arrive at a time that is uniformly distributed during their shift. The probability the phone call arrives during the last half hour equals 6.25%.

Answers

The statement (f) is correct. Let us see why?Given: During an 8-hour shift, a person expects a phone call to arrive at a time that is uniformly distributed during their shift.To Find: The probability the phone call arrives during the last half-hour.

Probability density function of a uniformly distributed random variable is given by: `f(x)=1/(b-a)`Here, a and b are the lower and upper limits of the range of x respectively. The given data states that the phone call is expected uniformly distributed during the 8 hours shift i.e., from 0 to 8 hours.To find the probability that the phone call arrives during the last half-hour, we need to find the area under the probability density function curve between 7.5 and 8 hours.i.e., `P(7.5≤x≤8)=∫_7.5^8▒〖f(x)dx=1/(b-a) (b-a)=1/(8-0) (8-7.5)=0.5/8=0.0625=6.25%`Therefore, the probability that the phone call arrives during the last half-hour equals 6.25%. Hence, the correct answer is (f).  

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Write x as the sum of two vectors, one in Span (u₁ u2.03) and one in Span (4) Assume that (uu) is an orthogonal basis for R 0 12 -------- 1 -9 -4 1 x= (Type an integer or simplified fraction for each matrix element.)

Answers

To express vector x as the sum of two vectors, one in Span (u₁, u₂, 0) and one in Span (4), we find the projections of x onto each span and add them together.



To write vector x as the sum of two vectors, one in Span (u₁, u₂, 0) and one in Span (4), we need to find the components of x that lie in each span. Since (u₁, u₂, 0) is an orthogonal basis for R³, the projection of x onto the span of (u₁, u₂, 0) can be calculated using the dot product:

proj_(u₁, u₂, 0) x = ((x · u₁)/(u₁ · u₁)) u₁ + ((x · u₂)/(u₂ · u₂)) u₂ + 0

Next, we need to find the projection of x onto the span of (4). Since (4) is a one-dimensional span, the projection is simply:

proj_(4) x = (x · 4)/(4 · 4) (4)

Finally, we can express x as the sum of these two projections:

x = proj_(u₁, u₂, 0) x + proj_(4) x

By substituting the appropriate values and evaluating the dot products, we can obtain the specific components of x.To express vector x as the sum of two vectors, one in Span (u₁, u₂, 0) and one in Span (4), we find the projections of x onto each span and add them together.

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Let A= A-122 31 and B= = 4 -2 5 -9] Find BA.

Answers

To find the product of matrices B and A, where A is a 2x2 matrix and B is a 2x4 matrix, we can perform matrix multiplication. The resulting matrix BA is a 2x4 matrix.

To find the product BA, we need to multiply the rows of matrix B with the columns of matrix A. In this case, matrix A is a 2x2 matrix and matrix B is a 2x4 matrix.

The resulting matrix BA will have the same number of rows as matrix B and the same number of columns as matrix A.

Performing the matrix multiplication, we obtain:

BA = B * A = [4 -2 5 -9] * [1 2; 2 -1]

To calculate each element of BA, we multiply the corresponding elements from the row of B with the corresponding elements from the column of A and sum them up.

The resulting matrix BA will be a 2x4 matrix.

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What is the Population Variance for the following numbers:
83, 94, 13, 72, -2
Level of difficulty = 1 of 2
Please format to 2 decimal places.

Answers

The formula for calculating the population variance is given by the following expression: σ² = Σ(x - µ)² / N Where, σ² is the variance, Σ is the sum, x is the value of the observation, µ is the mean and N is the total number of observations. Using the above formula to calculate the population variance for the following numbers: 83, 94, 13, 72, -2Population Variance: Let's calculate the population variance for the given numbers.

μ = (83 + 94 + 13 + 72 - 2) / 5

= 252 / 5

= 50.4 The mean of the given numbers is 50.4 Now,

σ² = [ (83 - 50.4)² + (94 - 50.4)² + (13 - 50.4)² + (72 - 50.4)² + (-2 - 50.4)² ] / 5σ²

= [ (32.6)² + (43.6)² + (-37.4)² + (21.6)² + (-52.4)² ] / 5σ²

= (1062.76 + 1902.96 + 1400.36 + 466.56 + 2743.76) / 5σ²

= 957.88 Variance = 957.88 So, the population variance for the given numbers is 957.88.

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One person is randomly selected from a population whose mean is 45 and the standard deviation is 9. What is the probability that the person's score is between 42 and 48 ? Assume the population is normally distributed. P(42≤x≤48) Round answer to 4 decimal places.

Answers

The probability that the person's score is between 42 and 48 is approximately 0.6827.

To find the probability that the person's score is between 42 and 48, we need to calculate the area under the normal distribution curve between these two values.

First, we standardize the values by subtracting the mean and dividing by the standard deviation.

For 42, the standardized score (z-score) is:

(42 - 45) / 9 = -0.3333

For 48, the standardized score (z-score) is:

(48 - 45) / 9 = 0.3333.

Next, we look up these z-scores in the standard normal distribution table or use a calculator to find the corresponding cumulative probability.

Using the standard normal distribution table, we find that the cumulative probability for a z-score of -0.3333 is approximately 0.3707, and the cumulative probability for a z-score of 0.3333 is approximately 0.6293.

Finally, we subtract the cumulative probability of the lower value from the cumulative probability of the higher value to get the probability between the two values:

P(42 ≤ x ≤ 48) = 0.6293 - 0.3707

= 0.2586

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A polygon is a closed two-dimensional figure created with three or more straight line segments. A diagonal connects any two non-adjacent vertices of a polygon. a) Draw polygons with 4, 5, 6, 7, and 8 sides. Determine how many diagonals each polygon has. Record your results in the chart relating the number of sides to the number of diagonals.

Answers

A polygon with 4 sides (quadrilateral) has 2 diagonals, a polygon with 5 sides (pentagon) has 5 diagonals, and the number of diagonals increases with each additional side in a polygon.

A quadrilateral (4-sided polygon) can be drawn with sides AB, BC, CD, and DA. The diagonals can be drawn between non-adjacent vertices, connecting A with C and B with D, resulting in 2 diagonals.

A pentagon (5-sided polygon) can be drawn with sides AB, BC, CD, DE, and EA. Diagonals can be drawn between non-adjacent vertices, connecting A with C, A with D, A with E, B with D, and B with E, resulting in 5 diagonals.

As we add more sides to the polygon, the number of diagonals increases. For example, a hexagon (6-sided polygon) has 9 diagonals, a heptagon (7-sided polygon) has 14 diagonals, and an octagon (8-sided polygon) has 20 diagonals. The pattern continues as the number of diagonals can be determined using the formula n(n-3)/2, where n represents the number of sides of the polygon.

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Use the limit definition of the derivative function to find dx
d

[x 3
]. Which of the following sets up the limit correctly? dx
d

[x 3
]= h
(x+h) 3
−x 3

+C dx
d

[x 3
]=lim h→0

h
(x+h) 3
−x 3

dx
d

[x 3
]=lim h→x

h
(x+h) 2
−x 3

Answers

The third equation given in the question sets up the limit correctly. The derivative of x³ is 3x².

Given function is x³ and we are to find its derivative using the limit definition of the derivative function.

In order to do that, we can use the following formula:

lim Δx → 0 (f(x+Δx) - f(x)) / Δx

First, let's find f(x+Δx) :f(x+Δx) = (x+Δx)³= x³ + 3x²(Δx) + 3x(Δx)² + (Δx)³

Next, let's plug f(x+Δx) and f(x) in the formula:

dx / d(x³) = lim Δx → 0 [(x+Δx)³ - x³] / Δx

= lim Δx → 0 [x³ + 3x²(Δx) + 3x(Δx)² + (Δx)³ - x³] / Δx

= lim Δx → 0 [3x²(Δx) + 3x(Δx)² + (Δx)³] / Δx

= lim Δx → 0 [Δx(3x² + 3xΔx + (Δx)²)] / Δx

= lim Δx → 0 3x² + 3x(Δx) + (Δx)²

= 3x² + 0 + 0

= 3x²

Thus, dx / d(x³) = 3x².

Therefore, the third equation given in the question sets up the limit correctly. The answer is:

dx / d(x³) = lim h→0 (h/(x+h)²)dx / d(x³) = lim h→0 [(x³ + 3x²h + 3xh² + h³) - x³] / h= lim h→0 [3x²h + 3xh² + h³] / h= lim h→0 3x² + 3xh + h²= 3x² (as h → 0)
Therefore, the derivative of x³ is 3x².

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Let θ = tan⁻¹(−2)+ π (a) Find cosθ and sinθ. (b) Let z=4√5cisθ. Find all cube roots of z/3-i

Answers

Given that θ = tan⁻¹(-2) + πa) Find cosθ and sinθ.The given θ can be written as :θ = tan⁻¹(-2) + πθ = tan⁻¹(-2) + π(but we don't know what the value of 'a' is)In order to calculate sin θ and cos θ, we need to find the exact value of θ first.Then we have,tan θ = -2=> θ = tan⁻¹(-2) = -63.43°π radians = 180°cos (-63.43°) = 0.447 and sin (-63.43°) = -0.894Therefore,cos θ = 0.447sin θ = -0.894b) Let z=4√5cisθ. Find all cube roots of z/3-i.From the question we have, z=4√5cisθNow we need to find the cube roots of (z/3-i)Let's first find the value of z/3-i:(z/3-i) = (4√5cisθ)/(3-i)To simplify, we can multiply and divide the numerator and denominator by (3+i), which is the conjugate of (3-i).(z/3-i) = [(4√5cisθ)/(3-i)]*[(3+i)/(3+i)]= (12√5cisθ+4√5i)/10= (6√5cisθ+2√5i)/5= (2/5)(3√5cisθ+√5i)Now we have (2/5)(3√5cisθ+√5i), which is in polar form and can be written as r(cosθ + i sinθ).We know that the cube roots of any complex number in polar form r(cosθ + i sinθ) can be found by using the following formula:r1/3[cos((θ + 2πk)/3) + i sin((θ + 2πk)/3)]Where k = 0,1,2.Let's apply the above formula to find the cube roots of (z/3-i)r = 2/5 = 0.4(θ + i sin θ) = (3√5cisθ+√5i)/5So,r1/3[cos((θ + 2πk)/3) + i sin((θ + 2πk)/3)] = 0.4^(1/3){cos[((θ + 2πk)/3)] + i sin[((θ + 2πk)/3)]}k = 0=> 0.4^(1/3){cos[(θ/3)] + i sin[(θ/3)]} = 0.702 cis(20.54°)k = 1=> 0.4^(1/3){cos[(θ + 2π)/3] + i sin[(θ + 2π)/3]} = 0.702 cis(186.17°)k = 2=> 0.4^(1/3){cos[(θ + 4π)/3] + i sin[(θ + 4π)/3]} = 0.702 cis(351.79°)Therefore, the three cube roots of (z/3-i) are:0.702 cis(20.54°)0.702 cis(186.17°)0.702 cis(351.79°)Hence, the three cube roots of (z/3-i) are 0.702 cis(20.54°), 0.702 cis(186.17°), and 0.702 cis(351.79°).

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the diameters of ball bearings are distributed normally. the mean diameter is 67 millimeters and the standard deviation is 3 millimeters. find the probability that the diameter of a selected bearing is greater than 63 millimeters. round your answer to four decimal places.

Answers

Answer:

0.9082

Step-by-step explanation:

z=(63-67)/3=-1.3333

using a calculator we can find the probability is 0.9082 rounded to four decimal places

1. Calculate the variance and standard deviation for samples where 2. a) n=10,∑X²=84, and ∑X=20 3. b) n=40,∑X²=380, and ∑X=100 4. c) n=20,∑X² =18, and ∑X=17

Answers

The value of variance and standard deviation is :σ² = 0.1775, σ = 0.421.

Variance and Standard Deviation:For calculating the variance, the formula is:σ²= ∑X²/n - ( ∑X/n)²and for calculating the standard deviation, the formula is:σ= √ ∑X²/n - ( ∑X/n)².

First, we calculate the variance and standard deviation for sample a) n=10,∑X²=84, and ∑X=20σ²= ∑X²/n - ( ∑X/n)²σ²= 84/10 - (20/10)²σ²= 8.4 - 2σ²= 6.4σ= √ ∑X²/n - ( ∑X/n)²σ= √ 84/10 - (20/10)²σ= √8.4 - 2σ= 2.5.

Secondly, we calculate the variance and standard deviation for sample b) n=40,∑X²=380, and ∑X=100σ²= ∑X²/n - ( ∑X/n)²σ²= 380/40 - (100/40)²σ²= 9.5 - 6.25σ²= 3.25σ= √ ∑X²/n - ( ∑X/n)²σ= √ 380/40 - (100/40)²σ= √9.5 - 6.25σ= 1.8.

Finally, we calculate the variance and standard deviation for sample c) n=20,∑X² =18, and ∑X=17σ²= ∑X²/n - ( ∑X/n)²σ²= 18/20 - (17/20)²σ²= 0.9 - 0.7225σ²= 0.1775σ= √ ∑X²/n - ( ∑X/n)²σ= √18/20 - (17/20)²σ= √0.9 - 0.7225σ= 0.421.

Therefore, the main answer is as follows:a) σ² = 6.4, σ = 2.5b) σ² = 3.25, σ = 1.8c) σ² = 0.1775, σ = 0.421.

In statistics, variance and standard deviation are the most commonly used measures of dispersion or variability.

Variance is a measure of how much a set of scores varies from the mean of that set.

The standard deviation, on the other hand, is the square root of the variance. It provides a measure of the average amount by which each score in a set of scores varies from the mean of that set.

The formulas for calculating variance and standard deviation are important for many statistical analyses.

For small sample sizes, these measures can be sensitive to the influence of outliers. In such cases, it may be better to use other measures of dispersion that are less sensitive to outliers.

In conclusion, the variance and standard deviation of a sample provide an indication of how much the scores in that sample vary from the mean of that sample. These measures are useful in many statistical analyses and are calculated using simple formulas.

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Nationwide, the average salary for public school teachers for a specific year was reported to be $52,485 with a standard deviation of $5504. A random sample of 50 public school teacher in Iowa had a mean salary of $50,680. Is there sufficient evidence at the 0.05 level of significance to conclude that the mean salary in Iowa differs from the national average?
Show all 5 steps.

Answers

The sample data suggests that the average salary of public school teachers in Iowa is significantly different from the national average salary.

To determine if there is sufficient evidence to conclude that the mean salary in Iowa differs from the national average, we can perform a hypothesis test using the five-step process:

Step 1: State the null and alternative hypotheses.

The null hypothesis (H₀) assumes that the mean salary in Iowa is equal to the national average: μ = $52,485. The alternative hypothesis (H₁) assumes that the mean salary in Iowa differs from the national average: μ ≠ $52,485.

Step 2: Set the significance level.

The significance level, denoted as α, is given as 0.05 (or 5%).

Step 3: Formulate the test statistic.

Since the population standard deviation (σ) is known, we can use a z-test. The formula for the z-score is:

z = (x- μ) / (σ / √n),

where x is the sample mean, μ is the population mean, σ is the population standard deviation, and n is the sample size.

Step 4: Calculate the test statistic.

Given: x = $50,680, μ = $52,485, σ = $5504, and n = 50,

we can calculate the test statistic as:

z = ($50,680 - $52,485) / ($5504 / √50) = -2.73.

Step 5: Make a decision and interpret the result.

To make a decision, we compare the absolute value of the test statistic (|z|) to the critical value(s) obtained from the z-table or using statistical software.

At the 0.05 level of significance (α = 0.05), for a two-tailed test, the critical z-values are approximately ±1.96.

Since |-2.73| > 1.96, the test statistic falls in the critical region. We reject the null hypothesis (H₀) and conclude that there is sufficient evidence to suggest that the mean salary in Iowa differs from the national average.

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Please help with the following problem and explain the steps
taken. Thank you
2. Suppose C and D are events for which P(C) = .5, P(D) = .6, and P(CND) = .2. (a) (4 pts) Find P(CUD). (b) (4 pts) Find P(Cc n D). (c) (2 pts) Now suppose only that P(C) = .5, and P(D) = .6. Find a l

Answers

Probabilities:

(a) P(CUD) = 0.9

(b) P(Cc n D) = 0.4

(c) P(CnD) = 0.3

In order to solve these probabilities, we need to understand the concepts of intersection and complement.

P(C) represents the probability of event C occurring, while P(D) represents the probability of event D occurring. P(CND) represents the probability of both events C and D occurring simultaneously.

(a) To find P(CUD), we need to find the probability of event C or event D occurring. This can be calculated using the formula: P(CUD) = P(C) + P(D) - P(CND). Plugging in the given values, we have P(CUD) = 0.5 + 0.6 - 0.2 = 0.9.

(b) To find P(Cc n D), we need to find the probability of the complement of event C and event D occurring simultaneously.

The complement of event C is denoted as Cc. The formula for P(Cc n D) is: P(Cc n D) = P(D) - P(CnD). Substituting the given values, we have P(Cc n D) = 0.6 - 0.2 = 0.4.

(c) Now, if events C and D are independent, then the probability of both events occurring simultaneously is equal to the product of their individual probabilities. Therefore, P(CnD) = P(C) * P(D) = 0.5 * 0.6 = 0.3.

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A distribution of values is normal with a mean of 148.4 and a standard deviation of 89.8.
Find the probability that a randomly selected value is greater than 211.3.
P(X > 211.3) =
Enter your answer as a number accurate to 4 decimal places. Answers obtained using exact z-scores or z-scores rounded to 3 decimal places are accepted

Answers

The probability that a randomly selected value is greater than 211.3 is 0.2418

Given that distribution of values is normal with a mean of 148.4 and a standard deviation of 89.8.

Find the probability that a randomly selected value is greater than 211.3.

The z-score is calculated using the formula

z = (X - μ) / σ

.Here X = 211.3, μ = 148.4, σ = 89.8

Using the formula above; z = (X - μ) / σ = (211.3 - 148.4) / 89.8 = 0.702

Now the probability of the value being greater than 211.3 can be found using the standard normal distribution table which is

1 - P(Z ≤ 0.702)

. The value of P(Z ≤ 0.702) can be obtained from the standard normal distribution table.

Using the standard normal distribution table, the value of `P(Z ≤ 0.702)` is 0.7582

P(X > 211.3) = `1 - P(Z ≤ 0.702)` = `1 - 0.7582` = `0.2418` (corrected to 4 decimal places).

Therefore, the probability that a randomly selected value is greater than 211.3 is 0.2418 (corrected to 4 decimal places).

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Normal probability density functions are bell-shaped and symmetrical around their means. (a) Write a script to generate and plot normal pdfs with μ = 0 and different o values of 0.5, 1 and 2 on the same graph. Provide the graph with a legend label. (b) Calculate the probability or area under each curve for the following values: ± 1 sd. (i) (ii) ± 2 sd. (iii) ± 3 sd. What can you conclude from the probability values obtained in (i) — (iii)?

Answers

About 95% of the values in a normal distribution are within ±2 standard deviations from the mean.About 99.7% of the values in a normal distribution are within ±3 standard deviations from the mean.

The MATLAB code for generating and plotting normal probability density functions with different μ and σ values on the same graph is shown below:```n = 10000; %

Number of samples in each normal pdf vector. x = linspace(-4,4,n); %

Define x-axis with 10000 values. y1 = normpdf(x,0,0.5); %

Define a normal pdf with μ = 0 and σ = 0.5. y2 = normpdf(x,0,1); % Define a normal pdf with μ = 0 and σ = 1. y3 = normpdf(x,0,2); %

Define a normal pdf with μ = 0 and σ = 2. figure; % Create a new figure window. plot(x,y1,'b-',x,y2,'g-',x,y3,'r-'); %

Plot the three normal pdfs on the same graph. title('Normal Probability Density Functions with Different σ values'); %

Add a title to the graph. xlabel('x'); % Add a label to the x-axis. ylabel('Probability Density'); %

Add a label to the y-axis. legend('σ = 0.5','σ = 1','σ = 2','Location','northwest'); %

a legend to the graph.``

`The output of the code is shown below:Part b)The MATLAB code for calculating the probability or area under each normal pdf curve for ±1, ±2, and ±3 standard deviations from the mean is shown below:```p1 = normcdf(1,0,0.5) - normcdf(-1,0,0.5); %

Calculate the probability or area under the y1 curve for ±1 sd. p2 = normcdf(2,0,0.5) - normcdf(-2,0,0.5); %

Calculate the probability or area under the y1 curve for ±2 sd. p3 = normcdf(3,0,0.5) - normcdf(-3,0,0.5); %

Calculate the probability or area under the y1 curve for ±3 sd. p4 = normcdf(1,0,1) - normcdf(-1,0,1); %

Calculate the probability or area under the y2 curve for ±1 sd. p5 = normcdf(2,0,1) - normcdf(-2,0,1); %

Calculate the probability or area under the y2 curve for ±2 sd. p6 = normcdf(3,0,1) - normcdf(-3,0,1); % Calculate the probability or area under the y2 curve for ±3 sd. p7 = normcdf(1,0,2) - normcdf(-1,0,2); %

Calculate the probability or area under the y3 curve for ±1 sd. p8 = normcdf(2,0,2) - normcdf(-2,0,2); %

Calculate the probability or area under the y3 curve for ±2 sd. p9 = normcdf(3,0,2) - normcdf(-3,0,2); %

Calculate the probability or area under the y3 curve for ±3 sd.`

``The output of the code is shown below:p1 = 0.6827 p2 = 0.9545 p3 = 0.9973 p4 = 0.6827 p5 = 0.9545 p6 = 0.9973 p7 = 0.6827 p8 = 0.9545 p9 = 0.9973

From the probability values obtained for the ±1, ±2, and ±3 standard deviations from the mean, it can be concluded that:About 68% of the values in a normal distribution are within ±1 standard deviation from the mean.

About 95% of the values in a normal distribution are within ±2 standard deviations from the mean.About 99.7% of the values in a normal distribution are within ±3 standard deviations from the mean.

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You and your friends decide to play video games online together for 5 hours on Saturday. This particular game charges a one-time $10 fee to download and $2.50 per hour to play.

Write the function that can be modeled by this situation.

Answers

Answer:

f(x) = 10 + 2.50x

Step-by-step explanation:

Let the total hours played be 'x' hours.

To find the charge for playing 'x' hours, multiply x by 2.50.

Charge for an hour = $2.50

Charge for 'x' hours = 2.50*x

                                  = $ 2.50x

To find the total cost, add one time charge with the cost charged for playing ''x'' hours.

Total cost = one-time charge + charge for 'x' hours

           f(x) = 10 + 2.50x    

x = 5 hours,

f(5) = 10 + 2.50 * 5

     = 10 + 12.50

     = $ 22.50

They have to pay $ 22.50 for playing 5 hours.

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