[Solved] In a moderately asymmetrical distribution, the mode and mean are 32.1 and 35.4 respectively. Calculate the median.

McqMate

Q.	In a moderately asymmetrical distribution, the mode and mean are 32.1 and 35.4 respectively. Calculate the median.
A.	35
B.	34.3
C.	36
D.	37
Answer» B. 34.3

5.4k

1

Do you find this helpful?

20

View all MCQs in

Business Statistics

Discussion

S

S
2 years ago

Mod=3median - 2mean

-1

Related MCQs

In a moderately skewed distribution, the mode and median are 20 and 24 respectively. Calculate the value of mean.
In a moderately asymmetrical distribution, the value of mean is 75 and the value of mode is 60:
In a moderately skewed distribution, the following equation indicates the relationship among mean, median and mode:
In a moderately skewed distribution, the value of mode is 120 and that of median is 140. Find the value of arithmetic mean.
In a moderately skewed distribution, the value of mean is 16 and that of mode is 25.
If the values of mean, median and mode coincide in a unimodal distribution, then the distribution will be:
For a distribution of data, if the arithmetic mean> median>mode, then which of the following is true?
A distribution consists of three components with total frequencies of 200, 250 and 300 having means 25, 10 and 15 respectively. Find the mean of the combined distribution.
For a symmetrical distribution, Q1 and Q3 are 20 and 60 respectively. The value of median will be:
If the mode is 14 and value of mean is 5 then the value of median is