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tonio638
21.02.2020 •
Mathematics
An engineer is going to redesign an ejection seat for an airplane. The seat was designed for pilots weighing between 150 lb and 201 lb. the new population of pilots has normally distributed weights with a mean of 160 lb and a standard deviation of 27.5 lb.
A.) if a pilot is randomly selected, find the probability that his weight is between 150 lb and 201 lb.
The probability is approximately. (round to four decimal place as needed.)
B.) If 39 different pilots are randomly selected, find the probability that their mean weight is between 150 lb and 201 lb.
The probability is approximately. (round to four decimal place as needed.)
C) When redesigning the ejection seat which probability is more relevant
Part A or Part B
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Ответ:
A) 0.5737
B) 0.9884
Step-by-step explanation:
We are given that an engineer is going to redesign an ejection seat for an airplane. The new population of pilots has normally distributed weights with a mean of 160 lb and a standard deviation of 27.5 lb i.e.;
= 160 lb and
= 27.5 lb
(A) We know that Z =
~ N(0,1)
Let X = randomly selected pilot
If a pilot is randomly selected, the probability that his weight is between 150 lb and 201 lb = P(150 < X < 201)
P(150 < X < 201) = P(X < 201) - P(X <= 150)
P(X < 201) = P(
<
) = P(Z < 1.49) = 0.9319
P(X <= 150) = P(
<
) = P(Z < -0.3636) = P(Z > 0.3636) = 0.3582
Therefore, P(150 < X < 201) = 0.9319 - 0.3582 = 0.5737 .
(B) We know that for sampling mean distribution;
Z =
~ N(0,1)
If 39 different pilots are randomly selected, the probability that their mean weight is between 150 lb and 201 lb is given by P(150 < X bar < 210);
P(150 < X bar < 210) = P(X bar < 201) - P(X bar <= 150)
P(X bar < 201) = P(
<
) = P(Z < 9.311) = 1 - P(Z >= 9.311)
= 0.999995
P(X bar <= 150) = P(
<
) = P(Z < -2.2709) = P(Z > 2.2709)
= 0.0116
Therefore, P(150 < X bar < 210) = 0.999995 - 0.0116 = 0.9884
C) If the tolerance level is very high to accommodate an individual pilot then it should be appropriate ton consider the large sample i.e. Part B probability is more relevant in that case.
Ответ:
Option 1 and 2 are correct.
Step-by-step explanation:
1. {x:x <-3 or >4}
Here the values of x can be less than -3 or the values of x can be greater than 4. Since 5 is greater than 4 so, 5 is included in the solution
2. {x:x ≥5}
Here the values of x can be greater than or equal to 5. So, 5 is included in the solution.
3. {x:x <5}
Here the values of x can be less than 5. So, 5 is not included in the solution
4. {x:0<x<4}
Here the value of x is greater than 0 but less than 4. So, 5 is not included in the solution
So, Option 1 and 2 are correct.