Civil Engineering (CE) Exam  >  Civil Engineering (CE) Notes  >  Engineering Mathematics  >  PPT: Correlation & Regression Analysis

PPT: Correlation & Regression Analysis | Engineering Mathematics - Civil Engineering (CE) PDF Download

Download, print and study this document offline
Please wait while the PDF view is loading
 Page 1


Correlation
Introduction:
? Two variables are said to be correlated if the change in 
one variable results in a corresponding change in the 
other variable.
? The correlation is a statistical tool which studies the 
relationship between two variables.
? Correlation analysis involves various methods and 
techniques used for studying and measuring the extent 
of the relationship between the two variables.
? Correlation is concerned with the measurement of 
“strength of association between variables”.
? The degree of association between two or more 
variables is termed as correlation.
2
Page 2


Correlation
Introduction:
? Two variables are said to be correlated if the change in 
one variable results in a corresponding change in the 
other variable.
? The correlation is a statistical tool which studies the 
relationship between two variables.
? Correlation analysis involves various methods and 
techniques used for studying and measuring the extent 
of the relationship between the two variables.
? Correlation is concerned with the measurement of 
“strength of association between variables”.
? The degree of association between two or more 
variables is termed as correlation.
2
Contd…
? Correlation analysis helps us to decide the strength of the 
linear relationship between two variables.
? The word correlation is used to decide the degree of 
association between variables.
? If two variables ‘x’ and ‘y’ are so related, the variables in the 
magnitude of one variable tend to be accompanied by 
variations in the magnitude of the other variable, they are 
said to be correlated.
? Thus, correlation is a statistical tool, with the help of which, 
we can determine whether or not two or more variables are 
correlate and if they are correlated, what is the degree and 
direction of correlation.
3
Page 3


Correlation
Introduction:
? Two variables are said to be correlated if the change in 
one variable results in a corresponding change in the 
other variable.
? The correlation is a statistical tool which studies the 
relationship between two variables.
? Correlation analysis involves various methods and 
techniques used for studying and measuring the extent 
of the relationship between the two variables.
? Correlation is concerned with the measurement of 
“strength of association between variables”.
? The degree of association between two or more 
variables is termed as correlation.
2
Contd…
? Correlation analysis helps us to decide the strength of the 
linear relationship between two variables.
? The word correlation is used to decide the degree of 
association between variables.
? If two variables ‘x’ and ‘y’ are so related, the variables in the 
magnitude of one variable tend to be accompanied by 
variations in the magnitude of the other variable, they are 
said to be correlated.
? Thus, correlation is a statistical tool, with the help of which, 
we can determine whether or not two or more variables are 
correlate and if they are correlated, what is the degree and 
direction of correlation.
3
Definition
?The correlation is the measure of the extent and 
the direction of the relationship between two 
variables in a bivariate distribution.
Example:
(i) Height and weight of children.
(ii) An increase in the price of the commodity by a 
decrease in the quantity demanded. 
Types of Correlation: The following are the types of 
correlation
(i) Positive and Negative Correlation
(ii) Simple, Partial and Multiple Correlation
(iii) Linear and Non-linear Correlation
4
Page 4


Correlation
Introduction:
? Two variables are said to be correlated if the change in 
one variable results in a corresponding change in the 
other variable.
? The correlation is a statistical tool which studies the 
relationship between two variables.
? Correlation analysis involves various methods and 
techniques used for studying and measuring the extent 
of the relationship between the two variables.
? Correlation is concerned with the measurement of 
“strength of association between variables”.
? The degree of association between two or more 
variables is termed as correlation.
2
Contd…
? Correlation analysis helps us to decide the strength of the 
linear relationship between two variables.
? The word correlation is used to decide the degree of 
association between variables.
? If two variables ‘x’ and ‘y’ are so related, the variables in the 
magnitude of one variable tend to be accompanied by 
variations in the magnitude of the other variable, they are 
said to be correlated.
? Thus, correlation is a statistical tool, with the help of which, 
we can determine whether or not two or more variables are 
correlate and if they are correlated, what is the degree and 
direction of correlation.
3
Definition
?The correlation is the measure of the extent and 
the direction of the relationship between two 
variables in a bivariate distribution.
Example:
(i) Height and weight of children.
(ii) An increase in the price of the commodity by a 
decrease in the quantity demanded. 
Types of Correlation: The following are the types of 
correlation
(i) Positive and Negative Correlation
(ii) Simple, Partial and Multiple Correlation
(iii) Linear and Non-linear Correlation
4
Contd…
?Correlation first developed by Sir Francis 
Galton (1822 – 1911) and then reformulated 
by Karl Pearson (1857 – 1936)
?Note: The degree of relationship or 
association is known as the degree of 
relationship.
5
Page 5


Correlation
Introduction:
? Two variables are said to be correlated if the change in 
one variable results in a corresponding change in the 
other variable.
? The correlation is a statistical tool which studies the 
relationship between two variables.
? Correlation analysis involves various methods and 
techniques used for studying and measuring the extent 
of the relationship between the two variables.
? Correlation is concerned with the measurement of 
“strength of association between variables”.
? The degree of association between two or more 
variables is termed as correlation.
2
Contd…
? Correlation analysis helps us to decide the strength of the 
linear relationship between two variables.
? The word correlation is used to decide the degree of 
association between variables.
? If two variables ‘x’ and ‘y’ are so related, the variables in the 
magnitude of one variable tend to be accompanied by 
variations in the magnitude of the other variable, they are 
said to be correlated.
? Thus, correlation is a statistical tool, with the help of which, 
we can determine whether or not two or more variables are 
correlate and if they are correlated, what is the degree and 
direction of correlation.
3
Definition
?The correlation is the measure of the extent and 
the direction of the relationship between two 
variables in a bivariate distribution.
Example:
(i) Height and weight of children.
(ii) An increase in the price of the commodity by a 
decrease in the quantity demanded. 
Types of Correlation: The following are the types of 
correlation
(i) Positive and Negative Correlation
(ii) Simple, Partial and Multiple Correlation
(iii) Linear and Non-linear Correlation
4
Contd…
?Correlation first developed by Sir Francis 
Galton (1822 – 1911) and then reformulated 
by Karl Pearson (1857 – 1936)
?Note: The degree of relationship or 
association is known as the degree of 
relationship.
5
Types of Correlation
i. Positive and Negative correlation: If both the 
variables are varying in the same direction i.e. if one 
variable is increasing and the other on an average is 
also increasing or if as one variable is decreasing, the 
other on an average, is also decreasing, correlation is 
said to be positive. If on the other hand, the variable 
is increasing, the other is decreasing or vice versa, 
correlation is said to be negative.
Example 1: a) heights and weights (b) amount of rainfall 
and yields of crops (c) price and supply of a 
commodity (d) income and expenditure on luxury 
goods (e) blood pressure and age
Example 2: a) price and demand of commodity (b) sales 
of woolen garments and the days temperature.
6
Read More
65 videos|120 docs|94 tests

Top Courses for Civil Engineering (CE)

FAQs on PPT: Correlation & Regression Analysis - Engineering Mathematics - Civil Engineering (CE)

1. What is correlation analysis?
Ans. Correlation analysis is a statistical technique that measures the strength and direction of the relationship between two variables. It determines whether there is a linear relationship between the variables and the extent to which one variable can be predicted based on the other.
2. How is correlation coefficient interpreted?
Ans. The correlation coefficient, also known as r, ranges from -1 to +1. A positive value indicates a positive correlation, meaning that as one variable increases, the other variable also tends to increase. On the other hand, a negative value indicates a negative correlation, where one variable increases while the other decreases. The magnitude of the coefficient indicates the strength of the relationship, with values closer to -1 or +1 representing a stronger correlation.
3. What is regression analysis?
Ans. Regression analysis is a statistical method used to model the relationship between a dependent variable and one or more independent variables. It helps in understanding how the dependent variable changes when the independent variables are varied. Regression analysis provides insights into the impact of independent variables on the dependent variable and can be used for prediction and forecasting.
4. What is the difference between correlation and regression analysis?
Ans. Correlation analysis measures the strength and direction of the linear relationship between two variables, while regression analysis helps in modeling and understanding the relationship between a dependent variable and one or more independent variables. Correlation analysis does not establish causation, whereas regression analysis can provide insights into causality. Additionally, correlation analysis only deals with the relationship between variables, while regression analysis can be used for prediction and forecasting.
5. How do you interpret the coefficient of determination (R-squared) in regression analysis?
Ans. The coefficient of determination, denoted as R-squared, is a measure of how well the regression model fits the observed data. It represents the proportion of the variance in the dependent variable that can be explained by the independent variables included in the model. R-squared ranges from 0 to 1, with a higher value indicating a better fit. For example, an R-squared of 0.80 means that 80% of the variation in the dependent variable is explained by the independent variables in the model.
65 videos|120 docs|94 tests
Download as PDF
Explore Courses for Civil Engineering (CE) exam

Top Courses for Civil Engineering (CE)

Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

video lectures

,

practice quizzes

,

past year papers

,

MCQs

,

study material

,

Viva Questions

,

ppt

,

PPT: Correlation & Regression Analysis | Engineering Mathematics - Civil Engineering (CE)

,

Important questions

,

Summary

,

Free

,

shortcuts and tricks

,

Semester Notes

,

PPT: Correlation & Regression Analysis | Engineering Mathematics - Civil Engineering (CE)

,

mock tests for examination

,

Previous Year Questions with Solutions

,

PPT: Correlation & Regression Analysis | Engineering Mathematics - Civil Engineering (CE)

,

Sample Paper

,

Exam

,

pdf

,

Objective type Questions

,

Extra Questions

;