Calculation of Median in Discrete Series | Formula of Median

Last Updated : 17 Aug, 2023

What is Median?

When elements in the data set are organised sequentially, that is, in either an ascending or descending order of magnitude, the median can be referred to as the middle value of the data set. Its value locates in a distribution in such a way that 50% of the items are below it and 50% are above it. It focuses on the center or middle of a distribution.

What is Discrete Series?

In discrete series (ungrouped frequency distribution), the values of variables represent the repetitions. It means that the frequencies are given corresponding to the different values of variables. The total number of observations in a discrete series, N, equals the sum of the frequencies, which is Σf.

Example of Discrete Series
If 3 students score 60 marks, 9 students score 70 marks, 5 students score 80 marks, and 2 students score 90 marks, then this information will be shown as:

Marks

Number of Students

60

3

70

9

80

5

90

2

Marks	Number of Students
60	3
70	9
80	5
90	2

Calculation of Median in Discrete Series

The steps required to determine median of a discrete series are as follows:

Step 1: Arrange the given distribution in either ascending or descending order.

Step 2: Denote the variables as X and frequency as f.

Step 3: Determine the cumulative frequency; i.e., cf.

Step 4: Calculate the median item using the following formula:

$Median(M)=Size~of~[\frac{N+1}{2}]^{th}~item$

Where, N = Total of Frequency

Step 5: Find out the value of $[\frac{N+1}{2}]^{th}~item$ We can find it by firstly locating the cumulative frequency, which is equal to higher than $[\frac{N+1}{2}]^{th}~item$ and then find the value corresponding to this cf. This value will be the Median value of the series.