Answer:
yes exactly what is going on with your profile pic is to y
<span>People initially thought that the gangs were the
responsible for all the deaths that occurred with the servant girls in Texas.
They believed that the gangs were going after these servant women for the
reason that they were living with men out of wedlock, which meant they were living
a sinful life. They believed that they were killing the women for living such a
kind of life.</span>
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Answer:
Can you explain more please?
Explanation:
An awner that I THINK it is b tho
The probability that the aircraft is overloaded is 99.92%.
<h3>Probability</h3>
Given:
Population mean (μ)=177.9 lb
Population standard deviation (σ)=35.9 lb
Sample size (n)=40
a. Probabilty
First step is to calculate the Standard error
Standard error=σ/√n
Standard error=35.9/√40
Standard error=35.9/6.32
Standard error=5.68
Second step is to calculate the probability
P(x>160)=P(z>160-177.9)/5.68)
P(x>160)=P(z>17.9/5.68)
=P(z>-3.15)
=0.9992×100
=99.92%
b. Yes, the pilot should take an action to correct for an overloaded aircraft because the mean weight is higher than 160 lb.
Therefore the probability that the aircraft is overloaded is 99.92%.
Learn more about probability here:brainly.com/question/24756209
#SPJ1
The complete question is:
Before every flight, the pilot must verify that the total weight of the load is less than the maximum allowable load for the aircraft. The aircraft can carry 40 passengers, and a flight has fuel and baggage that allows for a total passenger load of 6,400 lb. The pilot sees that the plane is full and all passengers are men. The aircraft will be overloaded if the mean weight of the passengers is greater than 6,400 lb. The pilot sees that the plane is full and all passengers are men. The aircraft will be overloaded if the mean weight of the passengers is greater than 6400 lb over 40 = 160 lb.
a. What is the probability that the aircraft is overloaded?
b. Should the pilot take any action to correct for an overloaded aircraft? Assume that the weights of men are normally distributed with a mean of 177.9 lb and a standard deviation of 35.9.
