Machine Learning

Regression

Predicting a number rather than a category — the oldest tool in the box, and still the right answer more often than anyone admits.

Reading level: Curious
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When not to use it

  • When the relationship is genuinely non-linear and you can't feature-engineer around it. Forcing a line through a curve gives you a model that's wrong in a specific, patterned way.
  • When you have many interacting features. Trees find interactions automatically; regression needs you to specify each one.
  • When interpretation doesn't matter and accuracy does. If nobody will ever ask why, you're giving up performance for a property you're not using.
  • On heavily multicollinear features, if you intend to explain the coefficients. The prediction survives; the explanation doesn't.

Reach for something else instead

  • Gradient boosting — better accuracy on tabular data, no explanation.
  • Generalised additive models — non-linear per feature, still interpretable. The underused middle ground.
  • Decision trees — interpretable and non-linear, at some accuracy cost.
  • Quantile regression — when you need a range rather than a point, or your data has tails.

Sources & further reading

  • Breiman (2001), Statistical Modeling: The Two Cultures — the essay that named the split between explaining and predicting. Read it once.
  • Hastie, Tibshirani & Friedman (2009), The Elements of Statistical Learning — the reference; the regression chapters are still the clearest treatment.
  • Tibshirani (1996), Regression Shrinkage and Selection via the Lasso — L1 regularisation, and getting feature selection for free.

Primary sources, listed so you can check the claims on this page rather than take them on trust.

Where people go wrong

  • Not plotting residuals. A patterned residual plot is the model telling you it's missing something, and it's ignored constantly.
  • Explaining coefficients from a multicollinear model. They're unstable and the story you tell will be wrong.
  • Reporting p-values from a model whose assumptions are violated. The number appears; the meaning doesn't.
  • Skipping linear regression as a baseline. You need to know what the simple thing scored before you claim the complex thing helped.
  • Confusing logistic regression with regression. It's classification wearing the name.

At a glance

FieldMachine Learning
Predictsa number
Agetwo centuries
Main assetthe answer is a sentence
Main riskmulticollinearity ruining the explanation
Alwaysplot the residuals
DifficultyBeginner
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Often compared with

Linear vs. logistic regression — one predicts a number, the other a probability of a class. Only the first is regression despite the shared name.