Calculate the upper and lower limit for a 95% confidence interval about this mean. a family needs a new car, but isn't sure they can fit the payment into their budget. a sample of 36 months of grocery bills yields a mean of $94 with a standard deviation of $10. if the upper limit of a 95% confidence level is below $100, the family can afford to buy the car. standard error = (standard deviation) / (square root of sample size) upper limit (dollars and cents) lower limit (dollars and cents)

Question

Mathematics

Noah Lozano

16 November, 01:39

Calculate the upper and lower limit for a 95% confidence interval about this mean. a family needs a new car, but isn't sure they can fit the payment into their budget. a sample of 36 months of grocery bills yields a mean of $94 with a standard deviation of $10. if the upper limit of a 95% confidence level is below $100, the family can afford to buy the car. standard error = (standard deviation) / (square root of sample size) upper limit (dollars and cents) lower limit (dollars and cents)

+1

Answers (1)

Know the Answer?

Brice Mcdonald · Answer 1

Answer: Where:

θ = confidence value

n = number of observations

μ = mean

Θ = standard deviation

... then your interval will be:

μ - θΘ/√n ≤ X ≤ μ - θΘ/√n

For some reason they want you to calculate the standard error, which is the Θ/√n section, and I mentioned the 1.96 value, so the above equation simplifies to: μ - 1.96SE ≤ X ≤ μ - 1.96SE