Answer:
[tex]4.42*10^{-54}[/tex]
Step-by-step explanation:
SO for the total baggage weights onboard to exceed the 6000lb limit, with n = 100 passengers. Each of the passenger must exceed the weigh allowance of 6000/100 = 60lb limit as well.
The probability of that to happen with normal distribution of 48lb and standard deviation of 22lb is:
[tex]P(x > 60, \mu = 48, \sigma = 22) = 1 - 0.707 = 0.293[/tex]
For all 100 passengers to exceed this limit, the probability for that to happen is
[tex]0.293^{100} = 4.42*10^{-54}[/tex]
which is very low
