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Unlike scientists or statisticians, economists often break the range of a random variable into five parts, or quintiles. For a standard normal distribution, what is the z-score that defines the second quintile, the 40% point? (a) 0.40 (b) -0.40 (c) 0.253 (d) -0.253 (e) -0.842

Respuesta :

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Answer:

(d) -0.253

Step-by-step explanation:

According to a z-score table for a standard normal distribution, a z-score of -0.25 corresponds to the 40.13th percentile, and a z-score of -0.26 corresponds to the 39.74th percentile.

Interpolating those values gives us the z-score for the 40th percentile. The 40.13th percentile is twice as close to the 40th percentile than the 39.74th, thus:

[tex]z = -0.25*\frac{2}{3}-0.26*\frac{1}{3} \\z=-0.253[/tex]

The answer is (d) -0.253.