Advertisements
Advertisements
Question
State and explain the different kinds of Correlation.
Advertisements
Solution
Type I:
Based on the direction of change of variables:
Correlation is classified into two types as Positive correlation and Negative Correlation based on the direction of change of the variables.
Positive Correlation:
The correlation is said to be positive if the values of two variables move in the same direction.
Ex 1:
If income and Expenditure of a Household may be increasing or decreasing simultaneously. If so, there is a positive correlation. Ex Y = a + bx
Negative Correlation:
The Correlation is said to be negative when the values of variables move in the opposite directions. Ex Y = a – bx
Ex 1:
Price and demand for a commodity move in the opposite direction.
Type II:
Based upon the number of variables studied
There are three types based upon the number of variables studied as
- Simple Correlation
- Multiple Correlation
- Partial Correlation
Simple Correlation:
If only two variables are taken for study then it is said to be a simple correlation. Ex Y = a + bx
Multiple Correlations :
If three or more three variables are studied simultaneously, then it is termed as multiple correlations.
Ex: Determinants of Quantity demanded
Qd = f (P, Pc, Ps, t, y)
Where Qd stands for Quantity demanded, f stands for function.
P is the price of the goods,
Pc is the price of competitive goods
Ps is the price of substituting goods
t is the taste and preference
y is the income.
Partial Correlation:
If there are more than two variables but only two variables are considered keeping the other variables constant, then the correlation is said to be Partial Correlation.
Type III: Based upon the constancy of the ratio of change between the variables
Correlation is divided into two types as linear correlation and Non – Linear correlation based upon the Constancy of the ratio of change between the variables.
Linear Correlation:
Correlation is said to be linear when the amount of change in one variable tends to bear a constant ratio to the amount of change in the other.
Ex Y = a + bx
Non Linear:
The correlation would be non-linear if the amount of change in one variable does not bear a constant ratio to the amount of change in the other variables.
Ex Y = a + bx2
APPEARS IN
RELATED QUESTIONS
In the following data one of the value of y is missing. Arithmetic means of x and y series are 6 and 8 respectively. `(sqrt(2) = 1.4142)`
| x | 6 | 2 | 10 | 4 | 8 |
| y | 9 | 11 | ? | 8 | 7 |
Estimate missing observation.
Calculate the correlation coefficient for the following data.
| X | 5 | 10 | 5 | 11 | 12 | 4 | 3 | 2 | 7 | 1 |
| Y | 1 | 6 | 2 | 8 | 5 | 1 | 4 | 6 | 5 | 2 |
Calculate the coefficient of correlation between X and Y series from the following data.
| Description | X | Y |
| Number of pairs of observation | 15 | 15 |
| Arithmetic mean | 25 | 18 |
| Standard deviation | 3.01 | 3.03 |
| Sum of squares of deviation from the arithmetic mean | 136 | 138 |
Summation of product deviations of X and Y series from their respective arithmetic means is 122.
Calculate the correlation coefficient for the following data.
| X | 25 | 18 | 21 | 24 | 27 | 30 | 36 | 39 | 42 | 48 |
| Y | 26 | 35 | 48 | 28 | 20 | 36 | 25 | 40 | 43 | 39 |
Find the coefficient of correlation for the following:
| X | 78 | 89 | 96 | 69 | 59 | 79 | 68 | 62 |
| Y | 121 | 72 | 88 | 60 | 81 | 87 | 123 | 92 |
Example for positive correlation is
If the values of two variables move in the opposite direction then the correlation is said to be
From the following data, N = 11, ∑X = 117, ∑Y = 260, ∑X2 = 1313, ∑Y2 = 6580, ∑XY = 2827 the correlation coefficient is
The correlation coefficient is
If two variables moves in decreasing direction then the correlation is
The coefficient of correlation describes
If Cov(x, y) = – 16.5, `sigma_"x"^2` = 2.89, `sigma_"y"^2` = 100. Find correlation coefficient.
Calculate the correlation coefficient from the following data:
∑X = 125, ∑Y = 100, ∑X2 = 650, ∑Y2 = 436, ∑XY = 520, N = 25
A measure of the strength of the linear relationship that exists between two variables is called:
If the points on the scatter diagram indicate that as one variable increases the other variable tends to decrease the value of r will be:
The value of the coefficient of correlation r lies between:
Define Correlation.
