A study has concluded that the average credit card debt of college graduates has increased from...
A study has concluded that the average credit card debt of college graduates has increased from the year 2009 to 2010. Classify the information in the example as descriptive statistics or inferential statistics and indicate why.
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A study has concluded that the average credit card debt of
college graduates has increased from...
2. It has been reported that the average credit card debt for college series is $...
2. It has been reported that the average credit card debt for college series is $ 3260. The student serate at a large university feels that their, their seniors have a debt. much less than this : So it conducts a study of 47 randomly selected seniors and finds that therardoint sample has an average debt of $ 2995, with a headpoby deviation of $1100. Is the student Schinto correct Use a 001 (Murst State Ho, Ho, the Rejection Region,...
The average credit card debt for college seniors is $3120. The debt is normally distributed with...
The average credit card debt for college seniors is $3120. The debt is normally distributed with standard deviation of $1100. Find P35.
The average credit debt for recent year was $9205...
The average credit card debt for a recent year was $9205. Five years earlier the average credit card debt was $6618. Assume sample sizes of 35 were used and thestandard deviation of both samples were $1928. Is there enough evidence to believe that the average credit card debt has increased? Use alpha = 0.05. Give a possiblereason as to why or why not the debt has increased.
According to a study completed by Nellie Mae in 2005, the average credit card debt of...
According to a study completed by Nellie Mae in 2005, the average credit card debt of a graduating college student is normally distributed with a mean of $2000. Given the standard deviation is $400, what is the probability that a random sample of 4 graduating student will have a debt between $1800 and $2200? Question 3 options: a) 0.95 b) 0.38 c) 0.68 d) 0.99
The average credit card debt for a recent year was $9525. Five years earlier the average...
The average credit card debt for a recent year was $9525. Five years earlier the average credit card debt was $8904. Assume sample sizes of 25 were used and the population standard deviations of both samples were $883. Is there evidence to conclude that the average credit card debt has increased? Use . a. State the hypotheses. b. Find the critical value. c. Compute the test statistic. d. Make the decision. e. Summarize the results.
According to a lending institution, students graduating from college have an average credit card debt of...
According to a lending institution, students graduating from college have an average credit card debt of $4100. A random sample of 40 graduating seniors was selected, and their average credit card debt was found to be $4428. Assume the standard deviation for student credit card debt is $1,300. Using alphaαequals=0.01, complete parts a through c. a) Does this sample provide enough evidence to challenge the findings by the lending institution? Determine the null and alternative hypotheses. Upper H 0H0: muμ...
the average credit card debt for a recent year was $9205. Five years earlier it was...
the average credit card debt for a recent year was $9205. Five years earlier it was $6618. Assume sample sizes of 35 were used and the population standard deviation for both was $1928. Construct a 90% confidence interval for the true difference of means, is there sufficeint evidence to support the claim that the average has increased, why or why not?
The average student loan debt for college graduates is $25,600. Suppose that that distribution is normal...
The average student loan debt for college graduates is $25,600. Suppose that that distribution is normal and that the standard deviation is $14,300. Let X = the student loan debt of a randomly selected college graduate. Round all probabilities to 4 decimal places and all dollar answers to the nearest dollar. a. What is the distribution of X? X - NG b Find the probability that the college graduate has between $7,900 and $20,350 in student loan debt. c. The...
The average student loan debt for college graduates is $25,200. Suppose that that distribution is normal...
The average student loan debt for college graduates is $25,200. Suppose that that distribution is normal and that the standard deviation is $14,450. Let X = the student loan debt of a randomly selected college graduate. Round all probabilities to 4 decimal places and all dollar answers to the nearest dollar. a. What is the distribution of X? X-N( 25200 14450 b Find the probability that the college graduate has between $27,850 and $38,500 in student loan debt. C. The...
The average credit card debt for college seniors is $3262. If the debt is normally distributed...
The average credit card debt for college seniors is $3262. If the debt is normally distributed with a standard deviation of $1100, find these probabilities. a) The senior owes less than $1000. b) The senior owes more than $4000. c) The senior owes between $3000 and $4000 d) The senior owes less than $1000 or more than $4000 e) The senior owes exactly $2500 f) What is the minimum amount a senior needs to owe to be considered a senior...
2. It has been reported that the average credit card debt for college series is $ 3260. The student serate at a large university feels that their, their seniors have a debt. much less than this : So it conducts a study of 47 randomly selected seniors and finds that therardoint sample has an average debt of $ 2995, with a headpoby deviation of $1100. Is the student Schinto correct Use a 001 (Murst State Ho, Ho, the Rejection Region,...
The average student loan debt for college graduates is $25,600. Suppose that that distribution is normal and that the standard deviation is $14,300. Let X = the student loan debt of a randomly selected college graduate. Round all probabilities to 4 decimal places and all dollar answers to the nearest dollar. a. What is the distribution of X? X - NG b Find the probability that the college graduate has between $7,900 and $20,350 in student loan debt. c. The...
The average student loan debt for college graduates is $25,200. Suppose that that distribution is normal and that the standard deviation is $14,450. Let X = the student loan debt of a randomly selected college graduate. Round all probabilities to 4 decimal places and all dollar answers to the nearest dollar. a. What is the distribution of X? X-N( 25200 14450 b Find the probability that the college graduate has between $27,850 and $38,500 in student loan debt. C. The...
The average credit card debt for college seniors is $3262. If the debt is normally distributed with a standard deviation of $1100, find these probabilities. a) The senior owes less than $1000. b) The senior owes more than $4000. c) The senior owes between $3000 and $4000 d) The senior owes less than $1000 or more than $4000 e) The senior owes exactly $2500 f) What is the minimum amount a senior needs to owe to be considered a senior...
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