Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

30.6 FUNCTIONS OF RANDOM VARIABLES


y

y+dy

dx 1 dx 2 X

Y


Figure 30.9 Illustration of a functionY(X) whose inverseX(Y) is a double-
valued function ofY. The rangeytoy+dycorresponds toXbeing either in
the rangex 1 tox 1 +dx 1 or in the rangex 2 tox 2 +dx 2.

This result may be generalised straightforwardly to the case where the rangeyto


y+dycorresponds to more than twox-intervals.


The random variableXis Gaussian distributed (see subsection 30.9.1) with meanμand
varianceσ^2. Find the PDF of the new variableY=(X−μ)^2 /σ^2.

It is clear thatX(Y) is a double-valued function ofY. However, in this case, it is
straightforward to obtain single-valued functions giving the two values ofxthat correspond
to a given value ofy;thesearex 1 =μ−σ



yandx 2 =μ+σ


y,where


yis taken to
mean the positive square root.
The PDF ofXis given by


f(x)=

1


σ


2 π

exp

[



(x−μ)^2
2 σ^2

]


.


Sincedx 1 /dy=−σ/(2



y)anddx 2 /dy=σ/(2


y), from (30.59) we obtain

g(y)=

1


σ


2 π

exp(−^12 y)


∣∣



−σ
2


y


∣∣


∣+


1


σ


2 π

exp(−^12 y)


∣∣



σ
2


y


∣∣



=


1


2



π

(^12 y)−^1 /^2 exp(− 21 y).

As we shall see in subsection 30.9.3,this is the gamma distributionγ(^12 ,^12 ).

30.6.3 Functions of several random variables

We may extend our discussion further, to the case in which the new random


variable is a function ofseveralother random variables. For definiteness, let us


consider the random variableZ=Z(X, Y), which is a function of two other


RVsXandY. Given that these variables are described by the joint probability


density functionf(x, y), we wish to find the probability density functionp(z)of


the variableZ.

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