5.1 Properties of Continuous Probability Density Functions
Probability density function (pdf) f(x):
- f(x) ≥ 0
- The total area under the curve f(x) is one.
Cumulative distribution function (cdf): P(X ≤ x)
5.2 The Uniform Distribution
X = a real number between a and b (in some instances, X can take on the values a and b). a = smallest X; b = largest X
X ~ U (a, b)
The mean is
The standard deviation is
Probability density function: for
Area to the Left of x: P(X < x) = (x – a)
Area to the Right of x: P(X > x) = (b – x)
Area Between c and d: P(c < x < d) = (base)(height) = (d – c)
- pdf: for a ≤ x ≤ b
- cdf: P(X ≤ x) =
- mean µ =
- standard deviation σ
- P(c < X < d) = (d – c)
5.3 The Exponential Distribution
- pdf: f(x) = me(–mx) where x ≥ 0 and m > 0
- cdf: P(X ≤ x) = 1 – e(–mx)
- mean µ =
- standard deviation σ = µ
- Additionally
- P(X > x) = e(–mx)
- P(a < X < b) = e(–ma) – e(–mb)
- Poisson probability: with mean and variance of μ