Sample Space:

The set of all sample points in a random experiment. It represents all possible outcomes, whether finite or infinite. Sample space is a fundamental concept in probability theory and is used to analyze and calculate probabilities. It helps us understand the range of possible outcomes in a given experiment. Example: Tossing a coin has a sample space of {Heads, Tails}.

• Sample space can be discrete or continuous.
• It can be finite or infinite.
• Sample points are mutually exclusive and collectively exhaustive.

Understanding Sample Space

• Sample space is the set of all possible outcomes of a random experiment.
• It is denoted by S and can be finite or infinite.
• Each outcome in the sample space has a certain probability associated with it.
• Probability is a measure of the likelihood of an event occurring.
• By analyzing the sample space, we can calculate probabilities and make informed decisions.

Sample Space:

The sample space is the set of all possible outcomes of a random experiment. It represents the universe of possibilities for an event to occur. It is a fundamental concept in probability theory and is used to calculate the likelihood of events. The sample space can be finite or infinite, depending on the experiment. It is denoted by the symbol Ω.

Understanding Independent Events

• Independent events are events that do not affect each other's outcomes.
• They have no influence on each other's probabilities.
• Probability of two independent events occurring is the product of their individual probabilities.
• Example: Tossing a coin and rolling a dice are independent events.