Mathematical Methods for Physics and Engineering : A Comprehensive Guide

(Darren Dugan) #1

30.2 PROBABILITY


ace from a pack of cards from which one has already been removed, given that


eventA, the card already removed was itself an ace, has occurred.


We denote this probability by Pr(B|A) and may obtain a formula for it by

considering the total probability Pr(A∩B)=Pr(B∩A) that bothAandBwill


occur. This may be written in two ways, i.e.


Pr(A∩B)=Pr(A)Pr(B|A)
=Pr(B)Pr(A|B).

From this we obtain


Pr(A|B)=

Pr(A∩B)
Pr(B)

(30.19)

and


Pr(B|A)=

Pr(B∩A)
Pr(A)

. (30.20)


In terms of Venn diagrams, we may think of Pr(B|A) as the probability ofBin


the reduced sample space defined byA. Thus, if two eventsAandBare mutually


exclusive then


Pr(A|B)=0=Pr(B|A). (30.21)

When an experiment consists of drawing objects at random from a given set

of objects, it is termedsampling a population. We need to distinguish between


two different ways in which such asampling experimentmay be performed. After


an object has been drawn at random from the set it may either be put aside


or returned to the set before the next object is randomly drawn. The former is


termed ‘sampling without replacement’, the latter ‘sampling with replacement’.


Find the probability of drawing two aces at random from a pack of cards(i)when the
first card drawn is replaced at random into the pack before the second card is drawn, and
(ii)when the first card is put aside after being drawn.

LetAbe the event that the first card is an ace, andBthe event that the second card is an
ace. Now
Pr(A∩B)=Pr(A)Pr(B|A),


and for both (i) and (ii) we know that Pr(A)= 524 = 131.
(i) If the first card is replaced in the pack before the next is drawn then Pr(B|A)=
Pr(B)= 524 = 131 ,sinceAandBare independent events. We then have


Pr(A∩B)=Pr(A)Pr(B)=

1


13


×


1


13


=


1


169


.


(ii) If the first card is put aside and the second then drawn,AandBare not independent
and Pr(B|A)= 513 , with the result that


Pr(A∩B)=Pr(A)Pr(B|A)=

1


13


×


3


51


=


1


221


.

Free download pdf