Quartiles are the set of values that divide the data points into four identical values using three individual data points. Thus, a quartile is a very important topic in Statistics that helps us to study large amounts of data, they are used to divide the large data values into four equal quarters. These quartiles show the data that is near the middle points of the large data set.
In this article, we will learn about the quartiles as well as the formulas for the first quartile, second quartile, and third quartile and also provide a step-by-step guide to help you easily calculate quartiles. So, let’s start with the definition of quartile first.
Quartiles Definition
Quartiles are the values from the dataset which divide the dataset into four equal parts where each part of the dataset contains an equal number of observations. There are three quartiles such as,
- First or Lower Quartile
- Second Quartile or Median
- Third or Upper Quartile
Quartile Formula
As mentioned above Quartile divides the data into 4 equal parts. This can be represented visually by the below figure.
- Quartile 1 lies between starting term and the middle term.
- Quartile 2 lies between starting terms and the last terms i.e., the Middle term.
- Quartile 3 lies between quartile 2 and the last term.
There is a separate formula for finding each quartile value. And in order to find these quartile values first, sort the given number series data into ascending order.
The steps to obtain the quartile formula are as shown below as follows:Â
- Step 1: Sort the given data in ascending order.
- Step 2: Find respective quartile values/terms as per need from the below formulae.
- First Quartile = ({n + 1}/{4})th term
- Second Quartile = ({n + 1}/{2})th term
- Third Quartile = ({3(n + 1)}/{4})th term
Where n is the total count of numbers in the given data.
Quartiles in Statistics
We know that the Median divides the data into two equal parts, in the same way, the quartile divides the data into four parts. Similar to the median which divides the data into half so that 50% of the estimation lies below the median and 50% lies above it, the quartile splits the data into i.e.,
- First Part of Data: From smallest to largest of numbers 25% of the value, comes under this part and also this part lies below the first quartile.
- Second of Data: Value between 25% and 50% of the data comes under this part and this part lies between the first and second quartile (Median).
- Third of Data: Value between 50% and 75% of the data comes under this part and this part lies between the second and third quartile.
- Fourth of Data: Greatest 25% of all values in the data comes under the fourth part and this part lies above the fourth quartile.
Generalized Formula for Quartile
The generalized formula for the quartile is,
Where,
- Quartiler indicates rth quartile.
- l1, l2 are lower and upper limit value that contains ith quartile,
- f is the frequency count.Â
- cf is the cumulative frequency of class preceding the quartile class.
Using this generalized formula, the first and third quartiles can be calculated as:
Interquartile Range
Interquartile Range is the distance between the first quartile and the third quartile. It is also known as a mid-spread. It helps us to calculate variation for the data which is divided into quartiles. The formula for calculating the Interquartile range is given by,
Interquartile Range (IQR) = Q3 – Q1
Where,Â
- Q3 is third/upper quartile, andÂ
- Q1 is first/lower quartile.
Quartile DeviationÂ
Quartile Deviation is defined as half of the distance between the first quartile and the third quartile. It is also known as Semi Interquartile Range. The formula for quartile deviation is given by,
Quartile Deviation = (Q3 – Q2)/2
Quartile Vs Percentile
The key differences between Quartile and Percentile are given as follows:
Aspect
| Quartile
| Percentile
|
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Definition
| A quartile is a type of quantile that divides a data set into four equal parts
| A percentile is a type of quantile that divides a data set into 100 equal parts
|
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Range
| Quartiles divide a dataset into four parts:Â
Q1 = 25th Percentile
Q2 = 50th Percentile or Median
Q3 = 75th Percentile
| Percentiles divide a dataset into 100 parts, with each percentile representing 1% of the data.
|
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Calculation
| Quartiles are calculated by dividing the data set into four equal parts, with each part containing 25% of the data
| Percentiles are calculated by dividing the data set into 100 equal parts, with each part containing 1% of the data
|
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Represented by
| Quartiles are often represented as Q, Q2, and Q3.
| Percentiles are often represented as P1, P2, P3, and so on up to P99
|
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Usefulness
| Quartiles are useful for identifying the spread and distribution of data, particularly in box plots and histograms
| Percentiles are useful for comparing an individual the data point to the rest of the data set, and for identifying extreme values or outliers
|
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Solved Problems on Quartile Formula
Problem 1: Find Quartile 1 for the given data 10, 30, 5, 12, 20, 40, 25, 15, 18.
Solution:
Step 1: Sort the given data in ny order ( ascending order / descending order)Â
5, 10, 12, 15, 18, 20, 25, 30, 40
Step 2: Find 1st Quartile
FIrst Quartile  term
Here n = 9 because there are total 9 numbers in the given data.
⇒ First Quartile = ((9 + 1)/4)th term
⇒ First Quartile = (10/4)th term
⇒ First Quartile = 2.5th term
Now, 2.5th term = 2nd term + (0.5) (3rd term – 2nd term)
⇒ 2.5th term = (10) + (0.5) (12 – 10)
⇒ 2.5th term = 10+1Â
⇒ 2.5th term = 11
The First Quartile value is 11.
Problem 2: Find the Second Quartile for the data 10, 30, 5, 12, 20, 40, 25, 15, 18.
Solution:
Step 1: Sort the given data in the ascending order
5, 10, 12, 15, 18, 20, 25, 30, 40
Step 2: Find 2nd Quartile
Second Quartile  term
Here n = 9 because there are total 9 numbers in the given data.
⇒ Second Quartile  term
⇒ Second Quartile = (10/2)th term
⇒ Second Quartile = 5th term
5th term is 18
So the Second Quartile value is 18.
Problem 3: Find the third Quartile for the data 10, 30, 5, 12, 20, 40, 25, 15, 18.
Solution:
Step 1: Sort the given data in the ascending order
5, 10, 12, 15, 18, 20, 25, 30, 40
Step 2: Find 3rd Quartile
Third Quartile  term
Here n = 9 because there are total 9 numbers in the given data.
⇒ Third Quartile  term
⇒ Third Quartile=  term
⇒ Third Quartile= 7.5th term
7.5th term is average result of 7th and 8th term = (25 + 30)/2 = 27.5
Remember: Â 7.5th term = 7th term + (0.5) (8th term – 7th term)
The most recommended method to find value is mentioned above
Because the term not always N.5 something  it may vary from N.1 to N.9Â
Here, N be any natural number.
So the third Quartile value is 27.5.
Problem 4: Find the first, second, and third Quartile  for the data 8, 5,15,  20, 18, 30,  40, 25
Solution:
Step 1: Sort the given data in the ascending order
5, 8, 15, 18, 20, 25, 30, 40.
Step 2: Find all Quartiles step by step
First Quartile= {(n + 1)/4}th term
Here n = 8 because there are total 8 numbers in the given data.
⇒ First Quartile = {(8 + 1)/4}th term
⇒ First Quartile= {9/4})th term
⇒ First Quartile= 2.25th term
Thus, 2.25th Term = 2nd term + (0.25)(3rd term – 2nd term )
⇒ 2.25th Term = 8+(0.25)(15-8) = 9.75
First Quartile value is 9.75
Second Quartile = {(n + 1)/2}th term
⇒ Second Quartile = (9 + 1)/2}th term
⇒ Second Quartile = {10/2}th term
⇒ Second Quartile = 5th term
5th term is 20
So the second Quartile value is 20.
Third Quartile = 3(n + 1)/4th term
⇒ Third Quartile = (3(8 + 1)/4)th term
⇒ Third Quartile = (27/4)th term
⇒ Third Quartile = 6.75th term
Thus, 6.75th  = 6th term +(0.75)(7th -6th)
⇒ 6.75th = 25+ (0.75)(5)= 28.75
So the third Quartile value is 28.75
Problem 5: What is the Interquartile Range for the data if the first quartile is 10 and the third quartile is 30cm?
Solution:
Given,
Interquartile range = Q3 – Q1
⇒ Interquartile range = 30 – 10
Thus, Interquartile range is 20.
Problem 6: What is the Quartile Deviation for the data if the first quartile is 15 and the third quartile is 30cm?
Solution:
Given,
Quartile Deviation = (Q3 – Q1)/2
⇒ Quartile Deviation = (30 – 15)/2
⇒ Quartile Deviation = 15/2
Thus, Quartile Deviation is 7.5
FAQs on Quartile Formula
Q1: What is a Quartile?
Answer:
A quartile is a value in the dataset which divides the observations in four equal parts in terms of frequency. There are three quartiles in any data named as first, second and third quartile.Â
Q2: What is the Formula for Finding the First Quartile?
Answer:
The formula for first quartile (Q1) is given as follows:
Q1 = L + (N/4 – cf) × (U – L)/F
Where,
- L is the Lower limit of the first quartile class,
- U is the Upper limit of the first quartile class,
- N is the Total number of observations, andÂ
- cf is the Cumulative Frequency of the first quartile class (the class containing Q1)
Q3: What is the Formula for Finding the Second Quartile?
Answer:
Second quartile (Q2), also known as the median as it divides the data in two equal halves each containing equal number of observations as the other.
For n observation if n is odd, then median is
M = (n + 1)/2th Observation
For n observation if n is even, then median is
M = [(n/2)th Observation + ((n/2) + 1)th Observation]/2
Q4: What is the Formula for Finding the Third Quartile?
Answer:
The formula for finding the third quartile (Q3) is:
Q3 = L + (3N/4 – F) × (U – L)/F
Where,
- L is the Lower limit of the first quartile class,
- U is the Upper limit of the first quartile class,
- N is the Total number of observations, andÂ
- cf is the Cumulative Frequency of the third quartile class (the class containing Q3)
Q5: What is the Interquartile Range?
Answer:
The interquartile range (IQR) is the difference between the third and first quartiles. It represents the middle 50% of the dataset and is given as follows:
IQR = Q3 – Q1
Q6: What is Quartile Deviation?
Answer:
Quartile deviation is a measure of dispersion that is half the difference between the third and first quartiles of a dataset which mathematically can be represented as:
Quartile Deviation =Â (Q3 – Q2)/2
Q7: What is the Difference between Quartiles and Percentiles?
Answer:
Quartiles divide data into four equal parts, while percentiles divide data into 100 equal parts.
Q8: Can Quartiles be Calculated for Non-Numerical Data?
Answer:
No, quartiles are only applicable for numerical data.
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