In a normal distribution, which statement correctly describes the proportion of outcomes that lie beyond two standard deviations from the mean?

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Multiple Choice

In a normal distribution, which statement correctly describes the proportion of outcomes that lie beyond two standard deviations from the mean?

In a normal distribution, the empirical rule tells us how data spread around the mean: about 68% fall within one standard deviation, about 95% within two standard deviations, and about 99.7% within three. That means the outcomes beyond two standard deviations from the mean—the tails on either side—make up the remaining portion, roughly 5% in total (about 2.5% in each tail). So the statement describing outcomes outside two standard deviations correctly captures the tail regions far from the mean. The other descriptions refer to regions inside or closer to the mean, which do not match the idea of outcomes beyond two standard deviations.

In a normal distribution, which statement correctly describes the proportion of outcomes that lie beyond two standard deviations from the mean?

Prepare for the CPCU 500 Exam. Study with comprehensive quizzes and multiple-choice questions, each with detailed hints and explanations. Master key concepts and boost your confidence to excel in your certification exam!

In a normal distribution, which statement correctly describes the proportion of outcomes that lie beyond two standard deviations from the mean?

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