Respuesta :
Answer:
(a) A 99% confidence interval for the actual mean noise level in hospitals is (44.02 db, 49.98 db).
(b) We can be 90% confident that the actual mean noise level in hospitals is 47 db with a margin of error of 1.89 db.
(c) Unless our sample (of 81 hospitals) is among the most unusual 2% of samples, the actual mean noise level in hospitals is between 44.41 db and 49.59 db.
Step-by-step explanation:
The problem is incomplete. The questions are:
(a) A 99% confidence interval for the actual mean noise level in hospitals is (44.02 db, 49.98 db).
For a 99% CI, the value of z is z=2.58
Then, the confidence interval for the mean is:
[tex]M-z\sigma/\sqrt{n}\leq\mu\leq M-z\sigma/\sqrt{n}\\\\47-2.58*10/\sqrt{75} \leq\mu\leq47+2.58*10/\sqrt{75}\\\\47-2.98\leq\mu\leq47+2.98\\\\44.02\leq\mu\leq 49.98[/tex]
(b) We can be 90% confident that the actual mean noise level in hospitals is 47 db with a margin of error of 1.89 db.
For a 90% CI, the value of z is z=1.64.
Then, we can calculate the margin of error as:
[tex]E=z*\sigma/\sqrt{n}=1.64*10/\sqrt{75}=1.89[/tex]
(c) Unless our sample (of 81 hospitals) is among the most unusual 2% of samples, the actual mean noise level in hospitals is between 44.41 db and 49.59 db.
The 2% tails data corresponds, in the standard normal distirbution, to the values of z whose absolute value is higher than 2.33.
The values of db for these critical values are:
[tex]X_1=M+z_1*\sigma/\sqrt{n}=47+(-2.33)*10/\sqrt{81}=47-2.59=44.41\\\\\\ X_2=M+z_2*\sigma/\sqrt{n}=47+(2.33)*10/\sqrt{81}=47+2.59=49.59[/tex]
