For a certain frequency distribution, the value of Mean is 101 and Median is 100. Find the value of Mode.

For a certain frequency distribution, the values of mean and median are 72 and 78 respectively. Find the value of mode

In a moderately asymmetric frequency distribution it is known that mean is 42.3 , median is 43.2 .Then the value of mode is

In a moderately asymmetric frequency distribution it is known that mean is 42.3 median is 43.2 .Then the value of mode is

In a moderately asymmetric frequency distribution it is known that mean is 42.3 median is 43.2 .Then the value of mode is

For the given frequency distribution find the median.

For a certain frequency distribution, the value of Assumed mean (A)=1300 , sumf_(i)d_(i)=900 and sumf_(i)=100 . Find the value of mean (barX) .

In a moderately asymmetrical distribution, the mean is 18 and median 22, the value of mode is

Iin a moderately skewed distribution the values of mean and median are 5 and 6 respectively. The value of mode in such a situation is approximately equal to

In a moderately skewed distribution, the values of mean and median are 5 and 6, respectively. The value of mode in such a situation is approximately equal to