Independent Events
Joint Probability
The joint probability of two independent events is the product of the
individual probabilities of each event.
P(A)gamete = P(a)gamete = 1/2
P(B)gamete = P(b)gamete = 1/2
P(AB) = P(Ab) = P(aB) = P(ab) = 1/2 x
1/2 = 1/4
* Provided that the genes are not linked.
Testcrosses
Testcross - cross an F1 heterozygote to a double
homozyous recessive.
AABB x aabb 
AaBb(F1)
AaBb x aabb is the F1 testcross.
| 1/4
AB |
1/4
AB |
1/4
Ab |
1/4
aB |
1/4
ab |
| ab |
Aa |
Aa |
aa |
aa |
| |
Bb |
bb |
Bb |
bb |
Results in a 1:1:1:1 (Ho:1:1:1:1 Type 1 error - reject
Ho when it is true) ratio and completely reveals genotype of F1,
regardless of dominace gene action at each locus. The relative frequencies
of the gametes of the heterzygous parent can be observed in the testcross
progeny.
Examples
Probability of an event is the proportion of times that an event is
expected to occur in numerous repeated trials. Relative frequency is
the actual number of events divided by the total number of events.
Example 1:
Probability of a head in a coin toss = 1/2. If we
toss a coin 50 times and count 20 heads and 30
tails, the relative frequency of heads is 20/50 =
0.4. The probability of a head is 25/50, assuming
the coin is balanced. If we continued to toss the
coin, the relative frequency of heads would
approach 1/2 as the number of coin tosses
approached infinity. Probability is an abstract
concept of what we would expect in the long run.
If two events are independent, we can multiply
the probabilities of each event to determine the
probability of both events occurring.
If the probability of one event is not influenced
by the probability of a second event, the events
are independent.
Example 2:
Prob. (boy) = 1/2
Prob. (girl) = 1/2
Probability of a boy being born as the first child
and a girl born as the second child is
1/2 x 1/2 = 1/4.
