Calculate the upper and lower limit for a 95% confidence interval about the mean.

A family wants to reduce its expenditures for personal items like gifts, newspapers, magazines and so forth. A sample of 49 months of receipts yields a mean of $220.00 with a standard deviation of $30.00. They decide to calculate a 95% confidence interval about this mean. Standard error = (standard deviation) / (square root of sample size)

Upper limit (dollars and cents) =

Lower limit (dollars and cents) =

Question

Mathematics

Peter Nixon

11 December, 19:15

Calculate the upper and lower limit for a 95% confidence interval about the mean.

A family wants to reduce its expenditures for personal items like gifts, newspapers, magazines and so forth. A sample of 49 months of receipts yields a mean of $220.00 with a standard deviation of $30.00. They decide to calculate a 95% confidence interval about this mean. Standard error = (standard deviation) / (square root of sample size)

Upper limit (dollars and cents) =

Lower limit (dollars and cents) =

+3

Answers (1)

Know the Answer?

Blake Berger · Answer 1

The critical value for a 95% two-tailed confidence interval is 1.96

given that;

Standard error = (standard deviation) / (square root of sample size)

now,

1.96 x Standard error = 1.96 x 30/√49

=1.96 x 30/7 = 8.4

Upper limit (dollars and cents) = mean + 1.96SE = 220 + 8.4 = $228.40

Lower limit (dollars and cents) = mean - 1.96SE = 220 - 8.4 = $211.60