Benford's Law claims that numbers chosen from very large data files tend to have "1" as the first nonzero digit disproportionately often. In fact, research has shown that if you randomly draw a number from a very large data file, the probability of getting a number with "1" as the leading digit is about 0.301. Suppose you are an auditor for a very large corporation. The revenue report involves millions of numbers in a large computer file. Let us say you took a random sample of n = 250 numerical entries from the file and r = 60 of the entries had a first nonzero digit of 1. Let p represent the population proportion of all numbers in the corporate file that have a first nonzero digit of 1. Test the claim that p is less than 0.301 by using a = 0.01. What does the area of the sampling distribution corresponding to your P-value look like? ) a. The area in the right tail of the standard normal curve. ) b. The area not including the right tail of the standard normal curve. C. The area in the left tail and the right tail of the standard normal curve. ) d. The area not including the left tail of the standard normal curve. e. The area in the left tail of the standard normal curve.
Benford's Law claims that numbers chosen from very large data files tend to have "1" as the first nonzero digit disproportionately often. In fact, research has shown that if you randomly draw a number from a very large data file, the probability of getting a number with "1" as the leading digit is about 0.301. Suppose you are an auditor for a very large corporation. The revenue report involves millions of numbers in a large computer file. Let us say you took a random sample of n = 250 numerical entries from the file and r = 60 of the entries had a first nonzero digit of 1. Let p represent the population proportion of all numbers in the corporate file that have a first nonzero digit of 1. Test the claim that p is less than 0.301 by using a = 0.01. What does the area of the sampling distribution corresponding to your P-value look like? ) a. The area in the right tail of the standard normal curve. ) b. The area not including the right tail of the standard normal curve. C. The area in the left tail and the right tail of the standard normal curve. ) d. The area not including the left tail of the standard normal curve. e. The area in the left tail of the standard normal curve.
Holt Mcdougal Larson Pre-algebra: Student Edition 2012
1st Edition
ISBN:9780547587776
Author:HOLT MCDOUGAL
Publisher:HOLT MCDOUGAL
Chapter11: Data Analysis And Probability
Section: Chapter Questions
Problem 8CR
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