Use this statistical tool to calculate the quartiles (q1, q2, & q3) for the data set.
Quartile calculator is a tool that helps to find the quartiles of the data set values. You just need to enter the set of values separated by a comma or space and let this calculator find statistical values to understand how data is distributed:
Quartiles are the statistical values that divide the dataset into four equal parts. There are three quartiles (Q1, Q2, and Q3) that create a four interval. Each of them contains roughly 25% of the data points.
Q1 – Lower Quartile:
Lower quartile (Q1) shows the 25th percentile of the data set. This means that 75% of the data points fall above it. This quartile separates the group with a ratio of 1:3
Q2 – Median Quartile
The median quartile means that the data is divided in half with 50% falling below and 50% falling above. Quartile Q2 is a point that splits the group with a ratio of 2:2
Q3 – Upper Quartile
The upper quartile means the 75% percentile of the given dataset. It means 75% of data falls below Q3 and the remaining 25% falls above it. This point separates the group into 3:1
Interquartile Range (IQR)
IQR is the analysis to determine how the values are spread in the middle 50 % of a dataset. It is the difference between the Q3 and the Q1. This can also be calculated with the help of an IQR Calculator.
These are formulas that help for calculating quartiles yourself:
Lower Quartile = \(\ Q1 = (n + 1) \times{\frac {1}{4}}\)
Median Quartile = \(\ Q2 = (n + 1) \times{\frac {2}{4}}\)
Upper Quartile = \(\ Q3 = (n + 1) \times{\frac {3}{4}}\)
Interquartile Range = \(\ IQR = Q3 - Q1\)
Let us show these calculations with the example:
For the given set of data 2, 7, 9, 11, 13, 23, and 16 find the quartiles and interquartile range.
Step 1: Order the data
2, 7, 9, 11, 13, 16, 23
Step 2: Calculate the total number of terms n
Total terms (n) = 7
Here's how to find the positions of the quartiles:
Step 3: Lower Quartile
\(\ Q1 = (n + 1) \times{\frac {1}{4}}\)
\(\ Q1 = (7 + 1) \times{\frac {1}{4}}\) \(\ Q1 = 2\)
In the given data set the second value is 7
Step 4: Median Quartile
\(\ Q2 = (n + 1) \times{\frac {2}{4}}\)
\(\ Q2 = (7 + 1) \times{\frac {2}{4}}\)
\(\ Q2 = 4\)
In the given data set the fourth value is 11
Step 5: Upper Quartile
\(\ Q3 = (n + 1) \times{\frac {3}{4}}\)
\(\ Q3 = (7 + 1) \times{\frac {3}{4}}\)
\(\ Q3 = 6\)
In the given data set the sixth value is 16
Interquartile Range (IQR)
\(\ IQR = Q3 - Q1\) \(\ IQR = 16 - 7\)
\(\ IQR = 9\)
You can also put the same values in the quartile calculator to find quartiles and how the IQR represents the range that contains the middle 50% of the data points.