Assume that the duration of human pregnancies can be described by a Normal model with mean

267

days and standard deviation

13

days.

​a) What percentage of pregnancies should last between

270

and

278

​days?

​b) At least how many days should the longest

30​%

of all pregnancies​ last?

​c) Suppose a certain obstetrician is currently providing prenatal care to

50

pregnant women. Let

y

represent the mean length of their pregnancies. According to the Central Limit​ Theorem, what's the distribution of this sample​ mean,

y​?

Specify the​model, mean, and standard deviation.

​d) What's the probability that the mean duration of these​ patients' pregnancies will be less than

257

​days?

​a) The percentage of pregnancies that should last between

270

and

278

days is

nothing​%.

​(Round to two decimal places as​ needed.)

​b) The longest

30​%

of all pregnancies should last at least

nothing

days.

​(Round to one decimal place as​ needed.)

​c) Select the correct choice below​ and, if​ necessary, fill in the answer​ box(es) within your choice.

 

 

A.

A Normal model with mean

nothing

and standard deviation nothing

​(Type integers or decimals rounded to two decimal places as​ needed.)

 

B.

A Binomial model with

nothing

trials and a probability of success of nothing

​(Type integers or decimals rounded to two decimal places as​ needed.)

 

C.

There is no model that fits this distribution.

​d) The probability that the mean duration of these​ patients' pregnancies will be less than

257

days is

nothing.

​(Round to four decimal places as​ needed.)