Mean, median & mode | Engineering Mathematics for Mechanical Engineering PDF Download

Mean, Median, and Mode?

Mean, median, and mode are measures of central tendency used in statistics to summarize a set of data.

  1. Mean (x̅ or μ): The mean, or arithmetic average, is calculated by summing all the values in a dataset and dividing by the total number of values. It’s sensitive to outliers and is commonly used when the data is symmetrically distributed.
  2. Median (M): The median is the middle value when the dataset is arranged in ascending or descending order. If there’s an even number of values, it’s the average of the two middle values. The median is robust to outliers and is often used when the data is skewed.
  3. Mode (Z): The mode is the value that occurs most frequently in the dataset. Unlike the mean and median, the mode can be applied to both numerical and categorical data. It’s useful for identifying the most common value in a dataset.

What is Mean?

Mean is the sum of all the values in the data set divided by the number of values in the data set. It is also called the Arithmetic Average. Mean is denoted as x̅ and is read as x bar.
The formula to calculate the mean is:
Formula of MeanFormula of Mean

Mean Symbol
The symbol used to represent the mean, or arithmetic average, of a dataset is typically the Greek letter “μ” (mu) when referring to the population mean, and “x̄” (x-bar) when referring to the sample mean.

  • Population Mean: μ (mu)
  • Sample Mean: x̄ (x-bar)

These symbols are commonly used in statistical notation to represent the average value of a set of data points.

Mean Formula
The formula to calculate the mean is:

Mean (x̅)  = Sum of Values / Number of Values

If x1, x2, x3,……, xn are the values of a data set then the mean is calculated as:
x̅ =  (x1 + x2 + x3 + . . . + xn) / n

Solved Example: Find the mean of data sets 10, 30, 40, 20, and 50.
Solution:

Mean of the data 10, 30, 40, 20, 50 is

Mean = (sum of all values) / (number of values)

Mean = (10 + 30 + 40 + 20+ 50) / 5 = 30

What is Median?

A Median is a middle value for sorted data. The sorting of the data can be done either in ascending order or descending order. A median divides the data into two equal halves. 
The formula to calculate the median of the number of terms if the number of terms is even is shown in the image below:
Median Formula for Even TermsMedian Formula for Even Terms

The formula to calculate the median of the number of terms if the number of terms is odd is shown in the image below:

Median Formula for Odd TermsMedian Formula for Odd Terms

Median Symbol
The letter “M” is commonly used to represent the median of a dataset, whether it’s for a population or a sample. This notation simplifies the representation of statistical concepts and calculations, making it easier to understand and apply in various contexts. Therefore, in Indian statistical practice, “M” is widely accepted and understood as the symbol for the median.

Median Formula

The formula for the median is:
If the number of values (n value) in the data set is odd then the formula to calculate the median is:

Median = [(n + 1)/2]th term

If the number of values (n value) in the data set is even then the formula to calculate the median is:

Median  = [(n/2)th term + {(n/2) + 1}th term] / 2

Solved Example: Find the median of given data set 30, 40, 10, 20, and 50.
Solution:

Median of the data 30, 40, 10, 20, 50 is,

Step 1: Order the given data in ascending order as:

10, 20, 30, 40, 50

Step 2: Check n (number of terms of data set) is even or odd and find the median of the data with respective ‘n’ value.

Step 3: Here, n = 5 (odd)

Median = [(n + 1)/2]th term

Median = [(5 + 1)/2]th term

= 30

What is Mode?

A mode is the most frequent value or item of the data set. A data set can generally have one or more than one mode value. If the data set has one mode then it is called “Uni-modal”. Similarly, If the data set contains 2 modes then it is called “Bimodal” and if the data set contains 3 modes then it is known as “Trimodal”. If the data set consists of more than one mode then it is known as “multi-modal”(can be bimodal or trimodal). There is no mode for a data set if every number appears only once.
The formula to calculate the mode is shown in the image below:
Formula of MedianFormula of Median

Symbol of ModeIn statistical notation, the symbol “Z” is commonly used to represent the mode of a dataset. It indicates the value or values that occur most frequently within the dataset. This symbol is widely utilised in statistical discourse to signify the mode, enhancing clarity and precision in statistical discussions and analyses.

Mode Formula

Mode = Highest Frequency Term

Solved Example: Find the mode of the given data set 1, 2, 2, 2, 3, 3, 4, 5.
Solution:

Given set is {1, 2, 2, 2, 3, 3, 4, 5}

As the above data set is arranged in ascending order.

By observing the above data set we can say that,

Mode = 2

As, it has highest frequency (3)

Relation between Mean Median Mode

For any group of data, the relation between the three central tendencies mean, median, and mode is shown in the image below:

Mode = 3 Median – 2 Mean
Mode = 3 Median – 2 MeanMode = 3 Median – 2 Mean

Mean, Median and Mode: Another name for this relationship is an empirical relationship. When we know the other two measures for a given set of data, this is used to find one of the measures. The LHS and RHS can be switched to rewrite this relationship in various ways.

What is Range?

In a given data set the difference between the largest value and the smallest value of the data set is called the range of data set. For example, if height(in cm) of 10 students in a class are given in ascending order, 160, 161, 167, 169, 170, 172, 174, 175, 177, and 181 respectively. Then range of data set is (181 – 160) = 21 cm.

Range of Data

Range is the difference between the highest value and the lowest value. It is a way to understand how the numbers are spread in a data set. The range of any data set is easily calculated by using the formula given in the image below:
Mean, median & mode | Engineering Mathematics for Mechanical Engineering

Range Formula
The formula to find the Range is:

Range = Highest value – Lowest Value

Solved Example: Find the range of the given data set 12, 19, 6, 2, 15, 4.
Solution:

Given set is {12, 19, 6, 2, 15, 4} 

Here, 

Lowest Value = 2

Highest Value = 19

Range = 19 − 2 = 17

Difference Between Mean and Median

The key differences between mean and median are listed in the following table:
Mean, median & mode | Engineering Mathematics for Mechanical Engineering

Differences between Mean, Median and Mode

Mean, median, and mode are measures of central tendency in statistics.
Mean, median & mode | Engineering Mathematics for Mechanical Engineering

Difference Between Mean and Average

Mean, median & mode | Engineering Mathematics for Mechanical Engineering

The terms “mean” and “average” are frequently used in mathematics and statistics, often interchangeably. However, they possess subtle distinctions in their meanings and applications.
Mean, in statistical terms, represents the arithmetic average of a dataset. It is calculated by summing up all the values in the dataset and dividing the sum by the total number of values. For instance, if you have the numbers 2, 4, 6, 8, and 10, the mean would be (2 + 4 + 6 + 8 + 10) / 5 = 6.
On the other hand, “Average” is a broader term that can refer to various measures of central tendency, including mean, median, and mode. In common usage, however, “average” often specifically denotes the mean. Like the mean, it involves summing up a set of values and dividing by the number of values to obtain a representative value.

Conclusion – Mean, Median, and Mode

Mean, median, and mode are essential measures of central tendency that help analyze and interpret data across various fields.

  • Mean: Often used as the arithmetic average, it provides a quick summary of the data but is sensitive to extreme values or outliers. It is best used when the data is symmetrically distributed without extreme values.

  • Median: This measure represents the middle value of any dataset and is robust to outliers. It is particularly useful when dealing with skewed data distributions as it provides a better central value than the mean in such cases.

  • Mode: Indicating the most frequently occurring value, the mode is useful for identifying the most common value in a dataset. It can be applied to both numerical and categorical data, making it versatile for various types of analyses.

Together, these measures provide a comprehensive understanding of the central tendency in a dataset, enabling better decision-making and insights across different fields of study and applications.

Solved Numericals

Q1. Direction: Consider the following for the next two (02) items that follow.
The marks obtained by 60 students in a certain subject out of 75 are given below:

Mean, median & mode | Engineering Mathematics for Mechanical Engineering

What is the mode?
Solution: 
Calculation:
From the table, we can see
Class with the highest frequency is 25 - 30 = modal class
Hence,
L = 25, f1 = 11, f0 =  5, f2 = 6, h = 5
Therefore,
Mode = Mean, median & mode | Engineering Mathematics for Mechanical Engineering

⇒ Mode = 27.73
∴ The required mode is 27.73


Q2. Direction: Consider the following for the next two (02) items that follow.
The marks obtained by 60 students in a certain subject out of 75 are given below:

Mean, median & mode | Engineering Mathematics for Mechanical Engineering

What is the median?
Solution:

Mean, median & mode | Engineering Mathematics for Mechanical Engineering

Mean, median & mode | Engineering Mathematics for Mechanical Engineering

⇒ Median = 35 + 4 = 39
∴ Required median is 39.


Q3. What is the mean of the range, mode and median of the data given below?
5, 10, 3, 6, 4, 8, 9, 3, 15, 2, 9, 4, 19, 11, 4
Solution: 

Given:
The given data is 5, 10, 3, 6, 4, 8, 9, 3, 15, 2, 9, 4, 19, 11, 4
Concept used:
The mode is the value that appears most frequently in a data set
At the time of finding Median
First, arrange the given data in the ascending order and then find the term
Formula used:
Mean = Sum of all the terms/Total number of terms
Median = {(n + 1)/2}th term when n is odd 
Median = 1/2[(n/2)th term + {(n/2) + 1}th] term when n is even
Range = Maximum value – Minimum value
Calculation:
Arranging the given data in ascending order
2, 3, 3, 4, 4, 4, 5, 6, 8, 9, 9, 10, 11, 15, 19
Here, Most frequent data is 4 so
Mode = 4
Total terms in the given data, (n) = 15 (It is odd)
Median = {(n + 1)/2}th term when n is odd 
⇒ {(15 + 1)/2}th term
⇒ (8)th term
⇒ 6
Now, Range = Maximum value – Minimum value
⇒ 19 – 2 = 17
Mean of Range, Mode and median = (Range + Mode + Median)/3
⇒ (17 + 4 + 6)/3
⇒ 27/3 = 9

∴ The mean of the Range, Mode and Median is 9


Q4. Find the mean of given data:
Mean, median & mode | Engineering Mathematics for Mechanical EngineeringSolution: 
Given:
Mean, median & mode | Engineering Mathematics for Mechanical Engineering

Calculation:
Now, to calculate the mean of data will have to find ∑fiXi and ∑fi as below,
Mean, median & mode | Engineering Mathematics for Mechanical EngineeringThen,
We know that, mean of grouped data is given by
Mean, median & mode | Engineering Mathematics for Mechanical Engineering
= 35.7
Hence, the mean of the grouped data is 35.7.

The document Mean, median & mode | Engineering Mathematics for Mechanical Engineering is a part of the Mechanical Engineering Course Engineering Mathematics for Mechanical Engineering.
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FAQs on Mean, median & mode - Engineering Mathematics for Mechanical Engineering

1. What is the mean in statistics?
Ans. The mean is the average of a set of numbers calculated by adding up all the numbers and then dividing by the total count of numbers.
2. What is the median in statistics?
Ans. The median is the middle value in a set of numbers when they are arranged in ascending or descending order. If there is an even number of values, the median is the average of the two middle values.
3. What is the mode in statistics?
Ans. The mode is the value that appears most frequently in a set of numbers. A set of numbers can have one mode, more than one mode, or no mode at all.
4. What is the relationship between mean, median, and mode?
Ans. The mean, median, and mode are measures of central tendency. The mean is influenced by extreme values, the median is not affected by extreme values, and the mode represents the most common value in the data set.
5. What is the range in statistics?
Ans. The range is the difference between the maximum and minimum values in a set of numbers. It provides information about the spread or variability of the data.
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