SOLUTION: On a dry surface, the braking distance (in meters) of a certain car is a normal distribution with mu = μ = 45.1 m and sigma = σ = 0.5 (a) Find the braking distance that

Algebra ->  Probability-and-statistics -> SOLUTION: On a dry surface, the braking distance (in meters) of a certain car is a normal distribution with mu = μ = 45.1 m and sigma = σ = 0.5 (a) Find the braking distance that      Log On


   

Question 714905: On a dry surface, the braking distance (in meters) of a certain car
is a normal distribution with mu = μ = 45.1 m and sigma = σ = 0.5
(a) Find the braking distance that corresponds to z = 1.8
(b) Find the braking distance that represents the 91st percentile.
(c) Find the z-score for a braking distance of 46.1 m
(d) Find the probability that the braking distance is less than or
equal to 45 m
(e) Find the probability that the braking distance is greater than
46.8 m
(f) Find the probability that the braking distance is between 45 m
and 46.8 m.
Answer by lynnlo(4176) About Me  (Show Source):