Respuesta :
Answer:
a) 0.7287
b) 0.9663
c) 0.237
d) 3.65 tons of cargo per week or more that will require the port to extend its operating hours.
Step-by-step explanation:
We are given the following information in the question:
Mean, μ = 4.5 million tons of cargo per week
Standard Deviation, σ = 0 .82 million tons
We are given that the distribution of number of tons of cargo handled per week is a bell shaped distribution that is a normal distribution.
Formula:
[tex]z_{score} = \displaystyle\frac{x-\mu}{\sigma}[/tex]
a) P( port handles less than 5 million tons of cargo per week)
P(x < 5)
[tex]P( x < 5) = P( z < \displaystyle\frac{5 - 4.5}{0.82}) = P(z < 0.609)[/tex]
Calculation the value from standard normal z table, we have,
[tex]P(x < 5) =0.7287= 72.87\%[/tex]
b) P( port handles 3 or more million tons of cargo per week)
[tex]P(x \geq 3) = P(z \geq \displaystyle\frac{3-4.5}{0.82}) = P(z \geq −1.82926)\\\\P( z \geq −1.82926) = 1 - P(z < -1.829)[/tex]
Calculating the value from the standard normal table we have,
[tex]1 - 0.0337 = 0.9663 = 96.63\%\\P( x \geq 3) = 96.63\%[/tex]
c)P( port handles between 3 million and 4 million tons of cargo per week)
[tex]P(3 \leq x \leq 4) = P(\displaystyle\frac{3 - 4.5}{0.82} \leq z \leq \displaystyle\frac{4-4.5}{0.82}) = P(-1.829 \leq z \leq -0.609)\\\\= P(z \leq -0.609) - P(z < -1.829)\\= 0.271-0.034 = 0.237= 23.7\%[/tex]
[tex]P(3 \leq x \leq 4) = 23.7\%[/tex]
d) P(X=x) = 0.85
We have to find the value of x such that the probability is 0.85.
P(X > x)
[tex]P( X > x) = P( z > \displaystyle\frac{x - 4.5}{0.82})=0.85[/tex]
[tex]= 1 -P( z \leq \displaystyle\frac{x - 4.5}{0.82})=0.85 [/tex]
[tex]=P( z \leq \displaystyle\frac{x - 4.5}{0.82})=0.15 [/tex]
Calculation the value from standard normal z table, we have,
[tex]P( z \leq -1.036) = 0.15[/tex]
[tex]\displaystyle\frac{x - 4.5}{0.82} = -1.036\\x = 3.65[/tex]
Thus, 3.65 tons of cargo per week or more that will require the port to extend its operating hours.
