When conducting an experiment, you may observe several aspects depending on the nature of the experiment. Some of the common things that you might observe include:
a. Outcome: The outcome refers to the result or the specific event that occurs as a result of the experiment. For example, in a coin toss experiment, the outcome could be "heads" or "tails."
b. Sample Space: The sample space is the set of all possible outcomes that can occur in an experiment. It represents the range of potential results. In a coin toss experiment, the sample space would be {heads, tails}.
c. Subset: A subset refers to a specific group or collection of outcomes within the sample space. It is a subset of the total possible outcomes. For example, if you are interested in observing only the outcomes of "heads" in a coin toss experiment, the subset would be {heads}.
d. Probabilities: Probabilities are numerical values assigned to each outcome or subset of outcomes, indicating the likelihood or chance of that particular outcome occurring. They represent the relative frequency of occurrence. Probabilities can help predict the likelihood of obtaining a specific outcome or subset of outcomes.
In summary, when conducting an experiment, you observe the outcomes, the sample space (set of all possible outcomes), specific subsets of outcomes, and the associated probabilities assigned to those outcomes.
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When conducting an experiment, you may observe several aspects depending on the nature of the experiment. Some of the common things that you might observe include:
a. Outcome: The outcome refers to the result or the specific event that occurs as a result of the experiment. For example, in a coin toss experiment, the outcome could be "heads" or "tails."
b. Sample Space: The sample space is the set of all possible outcomes that can occur in an experiment. It represents the range of potential results. In a coin toss experiment, the sample space would be {heads, tails}.
c. Subset: A subset refers to a specific group or collection of outcomes within the sample space. It is a subset of the total possible outcomes. For example, if you are interested in observing only the outcomes of "heads" in a coin toss experiment, the subset would be {heads}.
d. Probabilities: Probabilities are numerical values assigned to each outcome or subset of outcomes, indicating the likelihood or chance of that particular outcome occurring. They represent the relative frequency of occurrence. Probabilities can help predict the likelihood of obtaining a specific outcome or subset of outcomes.
In summary, when conducting an experiment, you observe the outcomes, the sample space (set of all possible outcomes), specific subsets of outcomes, and the associated probabilities assigned to those outcomes.