Question

Coal is carried from a mine in West Virginia to a power plant in New York in hopper cars on a long train. The automatic hopper car loader is set to put 59 tons of coal into each car. The actual weights of coal loaded into each car are normally distributed, with mean μ = 59 tons and standard deviation σ = 0.9 ton.

(a) What is the probability that one car chosen at random will have less than 58.5 tons of coal? (Round your answer to four decimal places.)


(b) What is the probability that 42 cars chosen at random will have a mean load weight x of less than 58.5 tons of coal? (Round your answer to four decimal places.)

Answer 1

Solution :

Given that ,

mean = = 59

standard deviation = = 0.9

a)

P(x < 58.5) = P((x - ) / < (58.5 - 59) /0.9 )

= P(z < -0.56)

= 0.2877 Using standard normal table,

Probability = 0.2877

b)

n = 42

= = 59 and

= / n = 0.9 / 42 = 0.1389

P( < 58.5) =   P(( - ) / < (58.5 - 59) / 0.1389)

= P(z < -3.60)   Using standard normal table.   

Probability = 0.0002