The cumulative distribution function F(x)associated with the normal probability
density function f(x) =
1
σ√
2 πe−(^12) (x−μ) (^2) /σ 2
is given by
F(x) =∫x−∞f(x)dx =P(X≤x) (11 .52)and represents the area under the probability curve form −∞ to x. Note that this
integral cannot be evaluated in a closed form and one must use numerical methods
to calculate the value of the integral for a given value of x. The area calculated
represents the probability P(X≤x). The total area under the normal probability
density function is unity and so the area
1 −F(x) =∫∞xf(x)dx =P(X > x ) (11 .53)