brothers in sajha,,,iam taking c++ class n having a hard time with my assignment,,,iam supose to make a program regarding linear regression,,,my teacher send me this help but iam still confused.
any help will be appreciated ,,,plz dont make a funny coments,,iam dam serious right now.
jai nepal
Regression Tutorial
Regression Definition:
A regression is a statistical analysis assessing the association between two variables. It is used to find the relationship between two variables.
Regression Formula:
Regression Equation(y) = a + bx
Slope(b) = (NΣXY - (ΣX)(ΣY)) / (NΣX2 - (ΣX)2)
Intercept(a) = (ΣY - b(ΣX)) / N
where
x and y are the variables.
b = The slope of the regression line
a = The intercept point of the regression line and the y axis.
N = Number of values or elements
X = First Score
Y = Second Score
ΣXY = Sum of the product of first and Second Scores
ΣX = Sum of First Scores
ΣY = Sum of Second Scores
ΣX2 = Sum of square First Scores
Regression Example: To find the Simple/Linear Regression of
X Values Y Values
60 3.1
61 3.6
62 3.8
63 4
65 4.1
To find regression equation, we will first find slope, intercept and use it to form regression equation..
Step 1: Count the number of values.
N = 5
Step 2: Find XY, X2
See the below table
X Value Y Value X*Y X*X
60 3.1 60 * 3.1 = 186 60 * 60 = 3600
61 3.6 61 * 3.6 = 219.6 61 * 61 = 3721
62 3.8 62 * 3.8 = 235.6 62 * 62 = 3844
63 4 63 * 4 = 252 63 * 63 = 3969
65 4.1 65 * 4.1 = 266.5 65 * 65 = 4225
Step 3: Find ΣX, ΣY, ΣXY, ΣX2.
ΣX = 311
ΣY = 18.6
ΣXY = 1159.7
ΣX2 = 19359
Step 4: Substitute in the above slope formula given.
Slope(b) = (NΣXY - (ΣX)(ΣY)) / (NΣX2 - (ΣX)2)
= ((5)*(1159.7)-(311)*(18.6))/((5)*(19359)-(311)2)
= (5798.5 - 5784.6)/(96795 - 96721)
= 13.9/74
= 0.19
Step 5: Now, again substitute in the above intercept formula given.
Intercept(a) = (ΣY - b(ΣX)) / N
= (18.6 - 0.19(311))/5
= (18.6 - 59.09)/5
= -40.49/5
= -8.098
Step 6: Then substitute these values in regression equation formula
Regression Equation(y) = a + bx
= -8.098 + 0.19x.
Suppose if we want to know the approximate y value for the variable x = 64. Then we can substitute the value in the above equation.
Regression Equation(y) = a + bx
= -8.098 + 0.19(64).
= -8.098 + 12.16
= 4.06
This example will guide you to find the relationship between two variables by calculating the Regression from the above steps.
