The Logistic Regression is a regression model in which the response variable (dependent variable) has categorical values such as True/False or 0/1. It actually measures the probability of a binary response as the value of response variable based on the mathematical equation relating it with the predictor variables.
The general mathematical equation for logistic regression is −
y = 1/(1+e^-(a+b1x1+b2x2+b3x3+...))
Following is the description of the parameters used −
y is the response variable.
x is the predictor variable.
a and b are the coefficients which are numeric constants.
The function used to create the regression model is the glm() function.
The basic syntax for glm() function in logistic regression is −
glm(formula,data,family)
Following is the description of the parameters used −
formula is the symbol presenting the relationship between the variables.
data is the data set giving the values of these variables.
family is R object to specify the details of the model. It's value is binomial for logistic regression.
The in-built data set "mtcars" describes different models of a car with their various engine specifications. In "mtcars" data set, the transmission mode (automatic or manual) is described by the column am which is a binary value (0 or 1). We can create a logistic regression model between the columns "am" and 3 other columns - hp, wt and cyl.
# Select some columns form mtcars. input <- mtcars[,c("am","cyl","hp","wt")] print(head(input))
When we execute the above code, it produces the following result −
am cyl hp wt Mazda RX4 1 6 110 2.620 Mazda RX4 Wag 1 6 110 2.875 Datsun 710 1 4 93 2.320 Hornet 4 Drive 0 6 110 3.215 Hornet Sportabout 0 8 175 3.440 Valiant 0 6 105 3.460
We use the glm() function to create the regression model and get its summary for analysis.
input <- mtcars[,c("am","cyl","hp","wt")] am.data = glm(formula = am ~ cyl + hp + wt, data = input, family = binomial) print(summary(am.data))
When we execute the above code, it produces the following result −
Call: glm(formula = am ~ cyl + hp + wt, family = binomial, data = input) Deviance Residuals: Min 1Q Median 3Q Max -2.17272 -0.14907 -0.01464 0.14116 1.27641 Coefficients: Estimate Std. Error z value Pr(>|z|) (Intercept) 19.70288 8.11637 2.428 0.0152 * cyl 0.48760 1.07162 0.455 0.6491 hp 0.03259 0.01886 1.728 0.0840 . wt -9.14947 4.15332 -2.203 0.0276 * --- Signif. codes: 0 ‘***’ 0.001 ‘**’ 0.01 ‘*’ 0.05 ‘.’ 0.1 ‘ ’ 1 (Dispersion parameter for binomial family taken to be 1) Null deviance: 43.2297 on 31 degrees of freedom Residual deviance: 9.8415 on 28 degrees of freedom AIC: 17.841 Number of Fisher Scoring iterations: 8
In the summary as the p-value in the last column is more than 0.05 for the variables "cyl" and "hp", we consider them to be insignificant in contributing to the value of the variable "am". Only weight (wt) impacts the "am" value in this regression model.