A. Complementary probabilities
1. symbols
2. property of complements
B. Odds
1. in favor
2. against
3. find odds, given the probability
4. find probability, given
the odds
C. Conditional probability
1. definition
2. formula
3. procedure for using tree
diagrams
PROPERTY OF COMPLEMENTS: P(E)
= 1 - P(E compliment)
Odds in favor of an event E:
s/f (ratio of good to bad)
Odds against an event E:
f/s (ratio of bad to good)
s = NUMBER OF SUCCESSES
f = NUMBER OF POSSIBILITIES
s + f = n
Suppose that you know P(E) and
wish to find the odds:
odds in favor of an event E: P(E)/P(E
compliment)
odd against on event E: P(E
compliment)/P(E)
Suppose that you know the odds in favor of an event
E and wish to find the probability:
P(E)
= s/(s + f) and
P(E compliment) = f/(s + f)
The fundamental counting principle gives the
number of ways of two or more tasks. If task A
can be performed in m ways, and if, after task
A is performed, a second task B, can be
performed in n ways, then task A followed
by task B can be performed in mn ways,
The probability of an event E given that another
event F has occurred is called a conditional
probability, and is denoted by P(E | F).
The procedure for using tree diagrams:
Multiply when moving
horizontally across a limb.
Add when moving vertically
from limb to limb.
Conditional probabilities; start at their condition
Unconditional probabilities; start at the beginning of
the tree.