Introduction to simple regression formula:
In mathematics, one of the most important topics in statistics is regression. Regression is determining the relationship between two variables. Regression math are used to analysis the several variables. Regression is one of the statistical analysis methods that can be used to assessing the association between the two different variables.
Example of Simple Regression Formula:
Here we study about the simple regression formula are,
Formula for regression analysis:
Regression Equation (y) = a + bx
Slope `(b) = (NsumXY-(sumX)(sumY))/(NsumX^2-(NsumX)^2)`
Intercept`(a) = (sumY-b(sumX))/N`
Where,
x and y are the variables.
b = the slope of the regression line is also defined as regression coefficient
a = intercept point of the regression line where is in the y-axis.
N = Number of values or elements
X = First Score
Y = Second Score
`(sumXY)` = Sum of the product of the first scores and Second Scores
`(sumX)` = Sum of First Scores
`(sumY)` = Sum of Second Scores
`(sumX^2)` = Sum of square First Scores.
Example Problem for Simple Regression Formula:
Problem for simple regression formula:
Example 1:
Find the regression slope coefficient, intercept value and create a regression equation by using the given table.
X Values Y Values
10 11
20 22
30 33
40 44
50 55
For the given data set of data, solve the regression slope and intercept values.
Solution:
Let us count the number of values.
N = 5
Determine the values for XY, X2
X Value Y Value X*Y X*X
10 11 110 100
20 22 440 400
30 33 990 900
40 44 1760 1600
50 55 2750 2500
Determine the following values `(sumX), (sumY), (sumXY), (sumX^2).`
`(sumX) = 150`
`(sumY)= 165`
`(sumXY)= 6050`
`(sumX^2) = 5500`
Plug values in the slope formula,
Slope `(b) = (NsumXY-(sumX)(sumY))/(NsumX^2-(NsumX)^2)`
`= (5 xx(6050)-(150)xx(165))/((5)xx(5500)-(150)^2)`
`= (30250 - 24750)/(27500-22500)`
`= 5500/5000`
`b= 1.1`
Plug the values in the intercept formula,
Intercept `(a) = (sumY- b(sumX))/N`
`= (165-(1.1xx150))/5`
`= (165 - 165)/5`
`= 0/5`
`a = 0`
Plug the Regression coefficient values and intercept values in the regression equation,
Regression Equation(y) = a + bx
= 0 + 1.1x
Answer:
Slope (or) Regression coefficient (b) = 1.1
Intercept (y) = 0
Regression equation y = 0 + 1.1x
In mathematics, one of the most important topics in statistics is regression. Regression is determining the relationship between two variables. Regression math are used to analysis the several variables. Regression is one of the statistical analysis methods that can be used to assessing the association between the two different variables.
Example of Simple Regression Formula:
Here we study about the simple regression formula are,
Formula for regression analysis:
Regression Equation (y) = a + bx
Slope `(b) = (NsumXY-(sumX)(sumY))/(NsumX^2-(NsumX)^2)`
Intercept`(a) = (sumY-b(sumX))/N`
Where,
x and y are the variables.
b = the slope of the regression line is also defined as regression coefficient
a = intercept point of the regression line where is in the y-axis.
N = Number of values or elements
X = First Score
Y = Second Score
`(sumXY)` = Sum of the product of the first scores and Second Scores
`(sumX)` = Sum of First Scores
`(sumY)` = Sum of Second Scores
`(sumX^2)` = Sum of square First Scores.
Example Problem for Simple Regression Formula:
Problem for simple regression formula:
Example 1:
Find the regression slope coefficient, intercept value and create a regression equation by using the given table.
X Values Y Values
10 11
20 22
30 33
40 44
50 55
For the given data set of data, solve the regression slope and intercept values.
Solution:
Let us count the number of values.
N = 5
Determine the values for XY, X2
X Value Y Value X*Y X*X
10 11 110 100
20 22 440 400
30 33 990 900
40 44 1760 1600
50 55 2750 2500
Determine the following values `(sumX), (sumY), (sumXY), (sumX^2).`
`(sumX) = 150`
`(sumY)= 165`
`(sumXY)= 6050`
`(sumX^2) = 5500`
Plug values in the slope formula,
Slope `(b) = (NsumXY-(sumX)(sumY))/(NsumX^2-(NsumX)^2)`
`= (5 xx(6050)-(150)xx(165))/((5)xx(5500)-(150)^2)`
`= (30250 - 24750)/(27500-22500)`
`= 5500/5000`
`b= 1.1`
Plug the values in the intercept formula,
Intercept `(a) = (sumY- b(sumX))/N`
`= (165-(1.1xx150))/5`
`= (165 - 165)/5`
`= 0/5`
`a = 0`
Plug the Regression coefficient values and intercept values in the regression equation,
Regression Equation(y) = a + bx
= 0 + 1.1x
Answer:
Slope (or) Regression coefficient (b) = 1.1
Intercept (y) = 0
Regression equation y = 0 + 1.1x
