Hướng dẫn dùng polynomial regression python
Polynomial RegressionIf your data points clearly will not fit a linear regression (a straight line through all data points), it might be ideal for polynomial regression. Polynomial regression, like linear regression, uses the relationship between the variables x and y to find the best way to draw a line through the data points. How Does it Work?Python has methods for finding a relationship between data-points and to draw a line of polynomial regression. We will show you how to use these methods instead of going through the mathematic formula. In the example below, we have registered 18 cars as they were passing a certain tollbooth. We have registered the car's speed, and the time of day (hour) the passing occurred. The x-axis represents the hours of the day and the y-axis represents the speed: ExampleStart by drawing a scatter plot: import matplotlib.pyplot as plt x = [1,2,3,5,6,7,8,9,10,12,13,14,15,16,18,19,21,22] plt.scatter(x, y) Result:Run example » ExampleImport import numpy x = [1,2,3,5,6,7,8,9,10,12,13,14,15,16,18,19,21,22] mymodel = numpy.poly1d(numpy.polyfit(x, y, 3)) myline = numpy.linspace(1, 22, 100) plt.scatter(x, y) Result:Run example » Example ExplainedImport the modules you need. You can learn about the NumPy module in our NumPy Tutorial. You can learn about the SciPy module in our SciPy Tutorial.
Create the arrays that represent the values of the x and y axis:
NumPy has a method that lets us make a polynomial model:
Then specify how the line will display, we start at position 1, and end at position 22:
Draw the original scatter plot:
Draw the line of polynomial regression:
Display the diagram:
R-SquaredIt is important to know how well the relationship between the values of the x- and y-axis is, if there are no relationship the polynomial regression can not be used to predict anything. The relationship is measured with a value called the r-squared. The r-squared value ranges from 0 to 1, where 0 means no relationship, and 1 means 100% related. Python and the Sklearn module will compute this value for you, all you have to do is feed it with the x and y arrays: ExampleHow well does my data fit in a polynomial regression? import numpy x = [1,2,3,5,6,7,8,9,10,12,13,14,15,16,18,19,21,22] mymodel = numpy.poly1d(numpy.polyfit(x, y, 3)) print(r2_score(y, mymodel(x))) Try if Yourself » Note: The result 0.94 shows that there is a very good relationship, and we can use polynomial regression in future predictions. Predict Future ValuesNow we can use the information we have gathered to predict future values. Example: Let us try to predict the speed of a car that passes the tollbooth at around the time 17:00: To do so, we need the same
ExamplePredict the speed of a car passing at 17:00: import numpy x = [1,2,3,5,6,7,8,9,10,12,13,14,15,16,18,19,21,22] mymodel = numpy.poly1d(numpy.polyfit(x, y, 3)) speed = mymodel(17) Run example » The example predicted a speed to be 88.87, which we also could read from the diagram: Bad Fit?Let us create an example where polynomial regression would not be the best method to predict future values. ExampleThese values for the x- and y-axis should result in a very bad fit for polynomial regression: import numpy x =
[89,43,36,36,95,10,66,34,38,20,26,29,48,64,6,5,36,66,72,40] mymodel = numpy.poly1d(numpy.polyfit(x, y, 3)) myline = numpy.linspace(2, 95, 100) plt.scatter(x, y) Result:Run example » And the r-squared value? ExampleYou should get a very low r-squared value. import numpy x = [89,43,36,36,95,10,66,34,38,20,26,29,48,64,6,5,36,66,72,40] mymodel = numpy.poly1d(numpy.polyfit(x, y, 3)) print(r2_score(y, mymodel(x))) Try if Yourself » The result: 0.00995 indicates a very bad relationship, and tells us that this data set is not suitable for polynomial regression. |