2/8/2013

Using Simulation to Estimate Probabilities

• Tossing and spinning coins
• Rolling dice
• Dealing cards

Basic Probability Definitions

• The sample space S of a random experiment is the set of all outcomes.
• A random variable is a variable that takes on numerical values determined by the outcome of a random experiment.
• An event is a subset of S.

Example - Rolling a pair of dice

• Identify the sample space.
• Find the probability that the number of dots on the upward facing sides is 6.

Probabilities in a Finite Sample Space

• Assign probabilities to each basic outcome.
• Compute the probability of the event of interest by summing the probabilities of the basic outcomes making up the event.

Addition Rule for Disjoint Events

• Two events, say A and B, are called disjoint events if they have no outcomes in common.  If events A and B are disjoint, then P(A or B) = P(A) + P(B).
• Find the probability of getting a 2 or a 6 when rolling two dice.

Complement Rule

• If A is any event, the set of basic outcomes that are not in A is called the complement of A and denoted A^c.
• For any event A, the probability that A does not occur is P(A^c) = 1 - P(A)
• Find the probability of getting an even number when rolling a pair of dice.

Multiplication Rule for Independent Events

• Events A and B are independent if knowledge of the occurrence of one event does not change the probability that the other occurs.
• If A and B are independent events, then P(A and B) = P(A) x P(B)

What is the probability of getting two heads when tossing a coin twice?

What is the probability of getting n heads when tossing a coin n times?

Applied Probability Problems (see handout)

Please read Appendix A for class on Monday