I used a random number table to generate 5 samples of 10 integers between 1-100. What...

Use R and the RANDBETWEEN(1,300) function to generate: a) 100 random numbers, b) 100 samples of...

Use R and the RANDBETWEEN(1,300) function to generate: a) 100 random numbers, b) 100 samples of size 5, and c) 100 samples of size 20. For each sample in parts (b) and (c), find the sample means. Create histograms for parts (a), (b) and (c). For part (a) use the random numbers (i.e. sample size 1), for parts (b) and (c) use the sample means to create the histograms. Copy and Paste just the histograms into your homework paper. Explain...

(4)(b) Using *set.seed(124)* and the Nile data, generate 1000 random samples of size n = 16,...

(4)(b) Using *set.seed(124)* and the Nile data, generate 1000 random samples of size n = 16, with replacement. For each sample drawn, calculate and store the sample mean. This can be done with a for-loop and use of the *sample()* function. Label the resulting 1000 mean values as "sample1". **Repeat these steps using *set.seed(127)* - a different "seed" - and samples of size n = 64.** Label these 1000 mean values as "sample2". Compute and present the means, sample standard...

(Q5.1) Consider the samples {1, 2, 3, 4, 5, 6}. Using a random number generator, obtain...

(Q5.1) Consider the samples {1, 2, 3, 4, 5, 6}. Using a random number generator, obtain three different bootstrap samples and their respective means. What is the bootstrap estimate of the standard error of the sample mean using these three replicates?

SAS must be used. Please include the code and the answer. 1. Generate 625 samples of...

SAS must be used. Please include the code and the answer. 1. Generate 625 samples of size 961 random numbers from an Exponential distribution with lambda = 2. For each of these 625 samples calculate the mean: a) Find the simulated probability that the mean is between 2 and 2.1. b) Find the simulated mean of the means. c) Find the simulated standard deviation of the means. d) Display the histogram of the means.

1.) Generate an array of 10 random numbers between 1 - 100 2.) Copy the array...

1.) Generate an array of 10 random numbers between 1 - 100 2.) Copy the array to a temp array 3.) Call each of the methods to sort (bubble, selection, insertion, quick, merge), passing it the array 4.) In-between the calls, you are going to refresh the array to the original numbers. 5.) Inside of each sorting method, you are going to obtain the nanoseconds time, before and after the method Subtract the before time from the after time to...

Using R, generate 10 different samples of size 20 from a standard normal distribution and generate...

Using R, generate 10 different samples of size 20 from a standard normal distribution and generate qq plots for each sample. Include two qq plots for your answer; one that shows the sample that is most and one that shows the sample that is least similar to what we would expect from a normal population. Make sure to label which is which and explain what characteristics of the graphs you used to choose which was which.

#5. You can find 20 RANDOM NUMBERS in a Table or you can generate them with...

#5. You can find 20 RANDOM NUMBERS in a Table or you can generate them with software like Excel. The Excel functions are “RAND” and “RANDBETWEEN”. With “Randbetween” you simply input how many numbers you want, the number of digits you want in your random number and the range of values you want those numbers to fall between. For example you may want twenty, 2-digit numbers that fall between 00 and 100 (like “34”). TWO CONSIDERATIONS: (1) You must systematically...

Consider the samples f1; 2; 3; 4; 5; 6g. Using a random number generator, obtain three...

Consider the samples f1; 2; 3; 4; 5; 6g. Using a random number generator, obtain three different bootstrap samples and their respective means. What is the bootstrap estimate of the standard error of the sample mean using these three replicates? Written not in R

Part 1 1. generate 500 data random in Excel with an of the distributions views in...

Part 1 1. generate 500 data random in Excel with an of the distributions views in class that not is it normal. 2 make a histogram of the 500 data generated. 3 take 100 samples of 10 500 generated data data and obtain the means of each sample in Excel. 4. make a histogram of averages show them data. Do the histogram elaborated in point 4 corroborates what is expressed in the Central limit theorem? Why? part 2 1. theory:...

4. To compare the means of 5 populations, random samples of size 10 are selected from...

4. To compare the means of 5 populations, random samples of size 10 are selected from each population. A partial ANOVA table for this data is as follows: Source df SS MS F Treatment 15.32 Error 0.64 Total a. Fill in the missing entries in the ANOVA table. b. Compute the pooled estimate of the population standard deviation. c. State the null and alternative hypotheses in the experiment. d. Test the hypotheses in part c). Use α=0.05.