Equally likely outcomes
In probability theory, equally likely outcomes refer to a situation where each possible outcome is as likely to occur as any other
In probability theory, equally likely outcomes refer to a situation where each possible outcome is as likely to occur as any other. This means that when faced with a set of possible outcomes, there is no reason to expect one outcome to occur more frequently than another.
For example, when flipping a fair coin, the two possible outcomes are “heads” and “tails.” Since the coin is fair, each outcome has an equal chance of occurring, so the probability of getting heads is 1/2 and the probability of getting tails is also 1/2. In this case, the outcomes are equally likely.
Similarly, when rolling a fair six-sided dice, the outcomes of rolling a 1, 2, 3, 4, 5, or 6 are all equally likely. Assuming the dice is not loaded or biased, each outcome has a probability of 1/6.
It is important to note that the occurrence of equally likely outcomes does not guarantee that each outcome will occur the same number of times in a series of trials. In the short term, there can still be variability and deviations from an equal distribution. However, over a large number of trials, the frequencies of each outcome should converge to their respective probability values.
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