Your school claims that the average student graduates with debt of $1,260. To validate this claim, you create a random sample of 20 students during graduation and ask each student to anonymously report the amount of their student loan debt. Complete parts a through c. $0 $0 $0 $1,900 $4 $2,400 $300 $1,200 $0 $1,700 $2,900 $2,900 $0 $2,100 $2,350 $2,800 $1,900 $150 $2,350 $2,850 a. Construct a 99% confidence interval with these data to estimate the average student loan debt of students graduating at your school. The 99% confidence interval is from $☐ to $. (Round to two decimal places as needed. Use ascending order.)

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Your school claims that the average student graduates with debt of $1,260. To validate this claim, you create a random sample of 20 students during graduation and ask each student to anonymously report the amount of their student loan debt. Complete parts a through c. $0 $0 $0 $1,900 $4 $2,400 $300 $2,900 $1,200 $0 $1,700 $2,900 $0 $2,100 $2,350 $2,800 $1,900 $150 $2,350 $2,850 a. Construct a 99% confidence interval with these data to estimate the average student loan debt of students graduating at your school. The 99% confidence interval is from $☐ to $. (Round to two decimal places as needed. Use ascending order.)

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Your school claims that the average student graduates with debt of $1,260. To validate this claim, you create a random sample of 20 students during graduation and ask each student to anonymously report the amount of their student loan debt. Complete parts a through c. \table[[$0, $4, $300, $1,200, $0, $1,700, $2,350, $2,800, $1,900], [$1,900, $2,400, $ 2,900, $2,900, $0, $2,100, $150, $2,350, $2,850 ง C Your school claims that the average student graduates with debt of $1,260. To validate this claim, you create a random sample of 20 students during graduation and ask each student to anonymously report the amount of their student loan debt. Complete parts a through c. $0 $0 $0 $1,900 $4 $2,400 $300 $2,900 $1,200 $0 $1,700 $2,350 $2,800 $1,900 $2,900 $0 $2,100 $150 $2,350 $2,850 a. Construct a 99% confidence interval with these data to estimate the average student loan debt of students graduating at your school. The 99% confidence interval is from $ to $. (Round to two decimal places as needed. Use ascending order.)