21.5 The binomial distribution 605
equal probabilities:. The 4 possible outcomes of 2 tosses are HH,
HT, TH, and TT, each with probability. These outcomes are of three types: 2
heads with probability , 1 head and 1 tail with probability , and 2 tails with
probability. In the same way, the 16 equally probable outcomes of 4 tosses are of 5
types with the following probabilities:
4 heads
3 heads and 1 tail
2 heads and 2 tails
P(2H 1 + 1 2T) 1 = 1 P(HHTT) 1 + 1 P(HTHT) 1 + 1 P(HTTH)
1 head and 3 tails
4 tails
We see that the coefficients of the factor of the probabilities are the numbers
{1, 4, 6, 4, 1} that form the fifth row of the Pascal triangle. They are the binomial
coefficients , for mheads and 41 − 1 mtails. In the case of ntrials, the total number
of possible outcomes is 2
n(2 per trial) and the probability of mheads andn 1 − 1 mtails is
(21.18)
This collection of probabilities is called a binomial distribution(or Bernoulli
distribution).
Pm n m P
n
m
mn(())HT+− = = ×
1
2
m
4
124()
PP() ( )4
1
2
4T ==TTTT
PPPPP( )()()()()13H T+=+++=×TTTH TTHT THTT HTTT 4
441
2
+++=×
PPP()()()TTHH THTH THHT 6
1
2
4PPPPP( )()()()()31H T+=+++=×HHHT HHTH HTHH THHH 4
441
2
PP() ( )4
1
2
1
16
4H ==HHHH
=
14141412+=
1412214()
=
PP() ()HT==
12