Mathematics for Computer Science

(Frankie) #1

16.5. Conditional Probability 547


16.5.7 Conditioning on a Single Event


The probability rules that we derived in Section 16.4.2 extend to probabilities con-
ditioned on the same event. For example, the Inclusion-Exclusion formula for two
sets holds when all probabilities are conditioned on an eventC:


Pr




A[BjC




DPr




AjC




CPr




BjC




Pr




A\BjC




:


This is easy to verify by plugging in the Definition 16.5.1 of conditional probabil-
ity.^5
It is important not to mix up events before and after the conditioning bar. For
example, the following isnota valid identity:


False Claim.


Pr




AjB[C




DPr




AjB




CPr




AjC




Pr




AjB\C




: (16.6)


A simple counter-example is to letBandCbe events over a uniform space with
most of their outcomes inA, but not overlapping. This ensures that Pr





AjB




and
Pr





AjC




are both close to 1. For example,

BWWDŒ0;9ç;
CWWDŒ10;18ç[f 0 g;
AWWDŒ1;18ç;

so


Pr




AjB




D


9


10


DPr




AjC




:


Also, since 0 is the only outcome inB\Cand 0 ...A, we have


Pr




AjB\C




D 0


So the right hand side of (16.6) is 1.8, while the left hand side is a probability which
can be at most 1 —actually, it is 18/19.


16.5.8 Discrimination Lawsuit


Several years ago there was a sex discrimination lawsuit against a famous univer-
sity. A woman math professor was denied tenure, allegedly because she was a
woman. She argued that in every one of the university’s 22 departments, the per-
centage of men candidates granted tenure was greater than the percentage of women
candidates granted tenure. This sounds very suspicious!


(^5) Problem 16.11 explains why this and similar conditional identities follow on general principles
from the corresponding unconditional identities.

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