Mada za sehemu hiiProbabilityMada 6
- Permutations and Combinations
- Probability of an Events
- Combined Events
- Mutually Exclusive Events
- Independent and dependent events
- Application of Probability
Independent and dependent events
Two events are independent if the occurrence of one has no effect on the occurrence of the other. For example, when a fair coin is tossed twice, the outcome of the first toss has no effect on the outcome of the second toss. Therefore, the two events are independent. To find the probability of two independent events occurring together, find the probability of each event occurring separately and then multiply the probabilities.
When two events A and B are independent, the probability of both occurring is:
This is called the multiplicative rule for independent events.
A fair coin is tossed, and a single 6-sided die is rolled. Find the probability of obtaining a head on the coin and rolling a 3 on the die.
Solution:
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?
Solution:
Dependent events are those in which the occurrence of one event affects the occurrence of the other. Two events A and B are dependent if:
This is called the multiplicative rule for dependent events. is the conditional probability, read as "probability of A given that B has occurred."
For example, if cards are drawn from a pack of 52 playing cards without replacement, the event of getting a diamond in the first draw will impact the probability of getting a diamond in the second draw. The probability of getting a diamond in the first draw will be , while the probability of getting a diamond in the second draw will be .
If A and B are dependent events such that and , find .
Solution:
Select two cards from a standard deck of 52 cards without replacement. Find the probability of selecting two kings.
Solution:
Let A be the event that the first card is a king, and B be the event that the second card is a king.
A committee consists of four women and three men. The committee will randomly select two people to attend a conference in Nairobi. The first person selected will not be considered in the second selection. Find the probability that both are women.
Solution:
Let A be the event that the first person is a woman, and B be the event that the second person is a woman.
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