For a moderately asymmetrical distribution, the empirical relationship between Mean, Median, and Mode is: MCQ with Answer and Explanation

For a moderately asymmetrical distribution, the empirical relationship between Mean, Median, and Mode is:
A. Mode = 2 Median - 3 Mean
B. Median = 3 Mean - 2 Mode
C. Mode = 3 Median - 2 Mean
D. Mean = 3 Median - 2 Mode
Answer: Option C
Solution (By JKExamLibrary)
Karl Pearson's empirical relationship holds for moderately skewed distributions: Mode = 3(Median) - 2(Mean).

This question belongs to: Accountancy and Statistics Statistics

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Practice More Statistics Questions

Question #1 Report Error
An open‑ended question allows the respondent to:
A. Answer only 'Yes' or 'No'
B. Choose from given alternatives
C. Answer freely in his/her own words
D. Skip the question

Correct Answer: Option C


Explanation:
Open‑ended questions do not provide fixed response options; the respondent can express his/her views freely.

This question belongs to: Accountancy and Statistics Statistics
Question #2 Report Error
Fisher's ideal index is the ______ of Laspeyres and Paasche indices.
A. Arithmetic mean
B. Harmonic mean
C. Geometric mean
D. Median

Correct Answer: Option C


Explanation:
Fisher's index = √(Laspeyres × Paasche).

This question belongs to: Accountancy and Statistics Statistics
Question #3 Report Error
If a fair die is rolled twice, the probability that the first roll is a 4 and the second roll is a 5 is:
A. 1/12
B. 1/6
C. 1/36
D. 1/18

Correct Answer: Option C


Explanation:
Independent events: (1/6)×(1/6)=1/36.

This question belongs to: Accountancy and Statistics Statistics