Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

30.9 IMPORTANT CONTINUOUS DISTRIBUTIONS


0


0


0. 2


0. 4


0. 6


0. 8


1


1


2 3 4


y

g(y)

μ=0,σ=0
μ=0,σ=0. 5
μ=0,σ=1. 5
μ=1,σ=1

Figure 30.15 The PDFg(y) for the log-normal distribution for various values
of the parametersμandσ.

The probability that an event occurs in the next infinitestimal interval [x, x+dx]


is given byλdx,sothat


Pr(the first event occurs in interval [x, x+dx]) =e−λxλdx.

Hence the required probability density function is given by


f(x)=λe−λx.

The expectation and variance of the exponential distribution can be evaluated as


1 /λand (1/λ)^2 respectively. The MGF is given by


M(t)=

λ
λ−t

. (30.117)


We may generalise the above discussion to obtain the PDF for the interval

between everyrth event in a Poisson process or, equivalently, the interval (waiting


time) before therth event. We begin by using the Poisson distribution to give


Pr(r−1 events occur in intervalx)=e−λx

(λx)r−^1
(r−1)!

,

from which we obtain


Pr(rth event occurs in the interval [x, x+dx]) =e−λx

(λx)r−^1
(r−1)!

λdx.

Thus the required PDF is


f(x)=

λ
(r−1)!

(λx)r−^1 e−λx, (30.118)

which is known as thegamma distributionof orderrwith parameterλ. Although

our derivation applies only whenris a positive integer, the gamma distribution is

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