After a ham is cured it may be smoked to add flavor or to ensure it lasts longer. Typical grocery-store hams are smoked for a short period of time, whereas gourmet hams are usually smoked for at least one month. A random sample of 36 grocery-store hams was obtained, and the length of the smoking time was recorded for each. The mean was
hours. Assume σ = 8 hours.

a) What assumptions are required so that you can construct a confidence interval?
b) Find a 99% confidence interval for the for the mean amount of time a grocery-store

ham is smoked.
c) Interpret your answer in part b).
d) The precision required for someone in the deli who cooks the grocery store hams is a

margin of error (half-width) of 2 hours. How large a sample is necessary for this precision?

Question

contestada

Respuesta :

AlonsoDehner AlonsoDehner · Answer 1 · 2019-11-09T09:23:43+01:00

Answer:

107

Step-by-step explanation:

Given that after a ham is cured it may be smoked to add flavor or to ensure it lasts longer.

Let X be the smoking time . Then X is N(mu, 8)

a) The sample is drawn at random

b) The sample represents the population

c) Sample size is sufficient to represent the population

b)For 99% conf interval z critical is taken since population std dev is given

Z critical = 2.58

Hence confi interval = [tex](\mu+/- 2.58*\frac{\sigma}{\sqrt{n} } \\=(\mu +/- 2.58\frac{8}{6} )\\= (\mu -3.44, \mu+3.44)[/tex]

c) As sample sizes are large and samples are randomly drawn, we can be 99% confident that sample mean falls within this interval

d) If margin of error is only 2, then we must have

[tex]2.58*\frac{8}{\sqrt{n} } =2\\10.32=\sqrt{n} \\n=106.50\\n~107[/tex]