What is the standard normal quantile z* for a 97.5% two-sided interval?

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What is the standard normal quantile z* for a 97.5% two-sided interval?

The question is about finding the standard normal quantile that gives a 97.5% two-sided (central) interval. For a symmetric, two-sided interval, you want the central area to be 97.5%, leaving the remaining probability split across the two tails. That means each tail has 1.25% beyond the cutoff, so the cutoff z* is the value where the standard normal cumulative distribution equals 0.9875 (since 0.5 plus the 0.975 central proportion gives 0.9875).

The value that gives CDF ≈ 0.9875 is about 2.24. So the standard normal quantile for this interval is roughly 2.24, which matches the option around 2.24.

Why the other numbers don’t fit: 1.96 corresponds to a 95% central interval (tails of 2.5% each). 2.58 corresponds to a central interval of about 99% (very small tails). 3.00 corresponds to an even wider, about 99.7% central interval.

What is the standard normal quantile z* for a 97.5% two-sided interval?

Master key concepts in Barnard Statistics with engaging quizzes. Study with multiple choice questions, detailed explanations, hints, and structured flashcards to effectively prepare for your statistics exam!

What is the standard normal quantile z* for a 97.5% two-sided interval?

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