Interquartile Range Formula
Interquartile Range is related to the quartile concept which comes under parent topic statistics which is a study of the collection of data, analyzing, interpreting, presenting the data in an organized manner. The interquartile range finds the difference between the upper quartile and lower quartile.
Interquartile Range
The interquartile range can be defined as the distance between the upper quartile and the lower quartile. It is also known as Mid Spread. A quartile is used to partition the given data into four parts by three cuts- Quartile 1, Quartile 2, Quartile 3.
Quartile 1: It is also known as the lower quartile which cuts the first half of sorted data.
Quartile 2: It is a median value which is the centre value in sorted data.
Quartile 3: It is an upper quartile that cuts the last part of the ordered data.
Interquartile Range Formula
Interquartile Range Formula is the difference between the Third/Upper quartile and First/Lower quartile. It is a calculation of variation while dividing the dataset into quartiles. The formula is given by-
Interquartile Range = Q3 – Q1
Where
Q3-Upper Quartile
Q1-Lower Quartile
Upper Quartile is calculated using the formula:
Q3 = ((3 × (n + 1))/4)th term
where,
n is the number of terms.
Lower Quartile is calculated using the below formula-
Q1 = ((n + 1)/4)th term
where,
n is the total number of terms.
Steps to Solve
Step 1: Sort the given data in ascending order.
Step 2: Find Upper Quartile and lower quartile for the given data.
Step 3: Find Inter Quartile Range.
Let’s look into a few examples to find the IQR (Inter Quartile Range)
Sample Questions
Question 1: Find Inter Quartile Range for the data 20,10,50,40,25,70,30
Solution:
Step 1: Given data is in unsorted manner. So sort it in ascending order.
10,20,25,30,40,50,70
Step 2: Find first Quartile
Q1 = ((n+1)/4)th term
Here n = 7 (Total 7 terms)
= ((7+1)/4)th term
= (8/4)th term
= 2nd term
2nd term is 20
So Quartile1 = 20
Find Upper/third Quartile
Q3 = ((3x(n+1))/4)th term
Here n = 7 (Total 7 terms)
= ((3×(7+1))/4)th term
= ((3×8)/4)th term
= (24/4)th term
= 6th term
6th term is 50
So Quartile3 = 50
Step 3: Find IQR (Inter Quartile Range)
IQR = Q3 – Q1
= 50 – 20
= 30
Interquartile Range for the given data is 30.
Question 2: Find Inter Quartile Range for the data 22,12,55,45,25,75,30,26,49
Solution:
Step 1: Given data is in unsorted manner. So sort it in ascending order.
12,22,25,26,30,45,49,55,75
Step 2: Find first Quartile
Q1 = ((n+1)/4)th term
Here n = 9 (Total 9 terms)
= ((9+1)/4)th term
= (10/4)th term
= 2.5th term
2.5th term is average of 2nd and 3rd terms
2.5th term = (22+25)/2
= 47/2 => 23.5
So Quartile1 = 23.5
Find Upper/third Quartile
Q3 = ((3x(n+1))/4)th term
Here n = 9 (Total 9 terms)
= ((3x(9+1))/4)th term
= ((3×10)/4)th term
= (30/4)th term
= 7.5th term
7.5th term is average of 7th and 8th terms
7.5th term = (49+55)/2
= 104/2
= 52
So Quartile3 = 52
Step 3: Find IQR (Inter Quartile Range)
IQR = Q3 – Q1
= 52 – 23.5
= 28.5
Interquartile Range for the given data is 28.5.
Question 3: What is the interquartile range for the data if Quartile-1 is 20 and Quartile-3 is 40.
Solution:
Given
Quartile-3 (Q3) = 40
Quartile-1 (Q1) = 20
Interquartile Range = 40 – 20
= 20
So interquartile range is 20.
Question 4: What is the interquartile range for the data if Quartile-1 is 10 and Quartile-3 is 90.
Solution:
Given
Quartile-3 (Q3) = 90
Quartile-1 (Q1) = 10
Interquartile Range = 90 – 10
= 80
So interquartile range is 80.
Question 5: What is the interquartile range for the data if Quartile-1 is 30 and Quartile-3 is 120.
Solution:
Given
Quartile-3 (Q3) = 120
Quartile-1 (Q1) = 30
Interquartile Range = 120 – 30
= 90
So interquartile range is 90.
Contact Us