1.6 Independence of the events
Example: Drawings with Replacement Two balls are successively drawn from an urn that contains seven red balls and three black balls. The first ball drawn is put back into the urn after noting its color. Then the second ball is drawn. B = the first ball drawn is black A = the second ball drawn is black P(A) =3/10 10-balls 7- red 3- black P(A|B)=3/10 P(A |B) = P(A) B occurs does not affect the probability of A occurring Two events, A and B, are independent 相互独立性
Two events A and B are independent if P(A | B) = P(A) ;or, P(B | A) = P(B). Definition P18
Example A and B are independent but not disjoint. A and B are disjoint but not independent.
Experiment A dresser drawer contains one pair of socks with each of the following colors: blue, brown, red, white and black. Each pair is folded together in a matching set. You reach into the sock drawer and choose a pair of socks without looking. You replace this pair and then choose another pair of socks. What is the probability that you will choose the red pair of socks both times?
A card is chosen at random from a deck of 52 cards. It is then replaced and a second card is chosen. What is the probability of choosing a jack and then an eight? Experiment :
A school survey found that 9 out of 10 students like pizza. If three students are chosen at random with replacement, what is the probability that all three students like pizza? Experiment
Note: If A and B are independent then are also independent.
We can extend the definition to arbitrarily many events:
Exercise:P22-Q8 、 9 、 12