Mathematical Methods for Physics and Engineering : A Comprehensive Guide

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30.6 FUNCTIONS OF RANDOM VARIABLES


functiong(y) for the new random variableY? We now discuss how to obtain


this function.


30.6.1 Discrete random variables

IfXis a discrete RV that takes only the valuesxi,i=1, 2 ,...,n,thenYmust


also be discrete and takes the valuesyi=Y(xi), although some of these values


may be identical. The probability function forYis given by


g(y)=

{∑
jf(xj)ify=yi,
0otherwise,

(30.56)

where the sum extends over those values ofjfor whichyi=Y(xj). The simplest


case arises when the functionY(X) possesses a single-valued inverseX(Y). In this


case, only onex-value corresponds to eachy-value, and we obtain a closed-form


expression forg(y) given by


g(y)=

{
f(x(yi)) ify=yi,

0otherwise.

IfY(X) does not possess a single-valued inverse then the situation is more


complicated and it may not be possible to obtain a closed-form expression for


g(y). Nevertheless, whatever the form ofY(X), one can always use (30.56) to


obtain the numerical values of the probability functiong(y)aty=yi.


30.6.2 Continuous random variables

IfXis a continuous RV, then so too is the new random variableY=Y(X). The


probability thatYlies in the rangeytoy+dyis given by


g(y)dy=


dS

f(x)dx, (30.57)

wheredScorresponds to all values ofxfor whichYlies in the rangeytoy+dy.


Once again the simplest case occurs whenY(X) possesses a single-valued inverse


X(Y). In this case, we may write


g(y)dy=





∫x(y+dy)

x(y)

f(x′)dx′




∣=

∫x(y)+|dxdy|dy

x(y)

f(x′)dx′,

from which we obtain


g(y)=f(x(y))





dx
dy




∣. (30.58)
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