# Extra(Extremely Randomized) Trees

Extremely Randomized Trees, or Extra Trees for short, is an ensemble machine learning algorithm based on decision trees. The Extra Trees algorithm works by creating a large number of unpruned decision trees from the training dataset. Predictions are made by averaging the prediction of the decision trees in the case of regression or using majority voting in the case of classification. The predictions of the trees are aggregated to yield the final prediction, by majority vote in classification problems and arithmetic average in regression problems.

There are three main hyperparameters to tune in the algorithm; they are the number of decision trees in the ensemble, the number of input features to randomly select and consider for each split point, and the minimum number of samples required in a node to create a new split point.

The random selection of split points makes the decision trees in the ensemble less correlated, although this increases the variance of the algorithm. This increase in variance can be countered by increasing the number of trees used in the ensemble.

The two ensembles have a lot in common. Both of them are composed of a large number of decision trees, where the final decision is obtained taking into account the prediction of every tree. Specifically, by majority vote in classification problems, and by the arithmetic mean in regression problems.

The main differences between Extra Trees and Random Forest are the following:

• Random forest uses bootstrap replicas, that is to say, it subsamples the input data with replacement, whereas Extra Trees use the whole original dataset. In the Extra Trees sklearn implementation there is an optional parameter that allows users to bootstrap replicas, but by default, it uses the entire input sample. This may increase variance because bootstrapping makes it more diversified.
• Another difference is the selection of cut points in order to split nodes. Random Forest chooses the optimum split while Extra Trees chooses it randomly. However, once the split points are selected, the two algorithms choose the best one between all the subset of features. Therefore, Extra Trees adds randomization but still has optimization.

These differences motivate the reduction of both bias and variance. On one hand, using the whole original sample instead of a bootstrap replica will reduce bias. On the other hand, choosing randomly the split point of each node will reduce variance.

In terms of computational cost, and therefore execution time, the Extra Trees algorithm is faster. This algorithm saves time because the whole procedure is the same, but it randomly chooses the split point and does not calculate the optimal one.