In: Statistics and Probability
An engineer is going to redesign an ejection seat for an airplane. The seat was designed for pilots weighing between 120 lb and 161 lb. The new population of pilots has normally distributed weights with a mean of 129 lb and a standard deviation of 32.7 lb. a. If a pilot is randomly selected, find the probability that his weight is between 120 lb and 161lb. The probability is approximately _____ (Round to four decimal places as needed.) b. If 32 different pilots are randomly selected, find the probability that their mean weight is between 120 lb and 161 lb. The probability is approximately ____. (Round to four decimal places as needed.) c. When redesigning the ejection seat, which probability is more relevant?
Solution :
Given that ,
mean = = 129
standard deviation = = 32.7
a) P(120 < x < 161) = P[(120 - 129)/ 32.7) < (x - ) / < (161 - 129) / 32.7 ) ]
= P(-0.28 < z < 0.98)
= P(z < 0.98) - P(z < -0.28)
Using z table,
= 0.8365 - 0.3897
= 0.4468
b) n = 32
= = 129
= / n = 32.7/ 32 = 5.78
P(120 < < 161)
= P[(120 - 129) /5.78 < ( - ) / < (161 - 129) / 5.76)]
= P(-1.56 < Z < 5.54)
= P(Z < 5.54) - P(Z < -1.56)
Using z table,
= 1 - 0.0594
= 0.9406
Part (a) because the seat performance for a single pilot is more important.