Linear regression

Revision as of 13:19, 18 March 2023 by Walle (talk | contribs) (Created page with "{{see also|Machine learning terms}} ==Linear Regression in Machine Learning== Linear regression is a fundamental supervised learning technique used in machine learning and statistics to model the relationship between a dependent variable and one or more independent variables. It is a linear approach that assumes a linear relationship between input and output variables. ===Overview=== In machine learning, linear regression is a popular algorithm for solving reg...")
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See also: Machine learning terms

Linear Regression in Machine Learning

Linear regression is a fundamental supervised learning technique used in machine learning and statistics to model the relationship between a dependent variable and one or more independent variables. It is a linear approach that assumes a linear relationship between input and output variables.

Overview

In machine learning, linear regression is a popular algorithm for solving regression problems, where the goal is to predict a continuous output value based on input features. Linear regression models the relationship between the dependent variable (also known as the target or output variable) and the independent variables (also known as the features or input variables) using a linear equation. The model is trained on a dataset containing input-output pairs and learns the parameters of the linear equation that best describes the relationship between the input and output variables.

Applications

Linear regression has numerous applications in various domains such as economics, finance, and science. It is commonly used to forecast numerical values, analyze trends, and determine the strength and direction of relationships between variables. Some specific examples include:

  • Predicting housing prices based on features such as the size of the house and the location
  • Estimating the demand for a product based on factors like price and advertising
  • Analyzing the relationship between age and income to inform social policy

Assumptions and Limitations

Linear regression makes several assumptions about the data, including:

  • Linearity: The relationship between the dependent and independent variables is linear.
  • Homoscedasticity: The variance of the errors is constant across all levels of the independent variables.
  • Independence: The observations are independent of each other.
  • Normality: The errors are normally distributed.

Violating these assumptions can lead to biased or inefficient estimates. Moreover, linear regression may not be suitable for data with complex, nonlinear relationships, or where the underlying assumptions do not hold.

Explain Like I'm 5 (ELI5)

Imagine you're trying to guess how much a toy car will cost based on its size. You notice that bigger toy cars usually cost more, so you think there might be a connection between the size and the price. Linear regression in machine learning is like finding a straight line that best shows this connection. This line can then be used to guess the price of a toy car based on its size. It's a simple way to understand and predict things, but sometimes real-life situations are more complicated, and a straight line might not be the best way to describe them.