Since September 2013 *Nature Methods* has been publishing a monthly column on statistics called "Points of Significance." This column is intended to provide reseachers in biology with a basic introduction to core statistical concepts and methods, including experimental design. Although targeted at biologists, the articles are useful guides for researchers in other disciplines as well. A continuously updated list of these articles is provided below.

**Importance of being uncertain** - How samples are used to estimate population statistics and what this means in terms of uncertainty.

**Error Bars** - The use of error bars to represent uncertainty and advice on how to interpret them.

**Significance, P values and t-tests** - Introduction to the concept of statistical significance and the one-sample t-test.

**Power and sample size** - Use of statistical power to optimize study design and sample numbers.

**Visualizing samples with box plots** - Introduction to box plots and their use to illustrate the spread and differences of samples. See also: Kick the bar chart habit and BoxPlotR: a web tool for generation of box plots

**Comparing samples—part I** - How to use the two-sample t-test to compare either uncorrelated or correlated samples.

**Comparing samples—part II** - Adjustment and reinterpretation of P values when large numbers of tests are performed.

**Nonparametric tests** - Use of nonparametric tests to robustly compare skewed or ranked data.

**Designing comparative experiments** - The first of a series of columns that tackle experimental design shows how a paired design achieves sensitivity and specificity requirements despite biological and technical variability.

**Analysis of variance and blocking** - Introduction to ANOVA and the importance of blocking in good experimental design to mitigate experimental error and the impact of factors not under study.

**Replication** - Technical replication reveals technical variation while biological replication is required for biological inference.

**Nested designs** - Use the relative noise contribution of each layer in nested experimental designs to optimally allocate experimental resources using ANOVA.

**Two-factor designs** - It is common in biological systems for multiple experimental factors to produce interacting effects on a system. A study design that allows these interactions can increase sensitivity.

**Sources of variation** - To generalize experimental conclusions to a population, it is critical to sample its variation while using experimental control, randomization, blocking and replication for replicable and meaningful results.

**Split plot design** - When some experimental factors are harder to vary than others, a split plot design can be efficient for exploring the main (average) effects and interactions of the factors.

**Bayes’ theorem** - Use Bayes’ theorem to combine prior knowledge with observations of a system and make predictions about it.

**Bayesian statistics** - Unlike classical frequentist statistics, Bayesian statistics allows direct inference of the probability that a model is correct and it provides the ability to update this probability as new data is collected.

**Sampling distributions and the bootstrap** - Use the bootstrap method to simulate new samples and assess the precision and bias of sample estimates.

**Bayesian networks** - Model interactions between causes and effects in large networks of causal influences using Bayesian networks, which combine network analysis with Bayesian statistics.

**Association, correlation and causation** - Pairwise dependencies can be characterized using correlation but be aware that correlation only implies association, not causation. Conversely, causation implies association, not correlation.

**Simple linear regression** - Given data on the relationship between two variables, linear regression is a simple and surprisingly robust method to predict unknown values.

** Multiple linear regression - **When multiple variables are associated with a response, the interpretation of a prediction equation is seldom simple.

**Analyzing outliers: influential or nuisance - **Some outliers influence the regression fit more than others.

**Regression diagnostics** - Residual plots can be used to validate assumptions about the regression model.

**Logistic regression** - Regression can be used on categorical responses to estimate probabilities and to classify.

**Classification evaluation **- It is important to understand both what a classification metric expresses and what it hides.

**Model selection and overfitting **- "With four parameters I can fit an elephant and with five I can make him wiggle his trunk". John von Neumann

**Regularization** - Constraining the magnitude of parameters of a model can control its complexity.

** P values and the search for significance** - Little

*P*value What are you tryign to say Of significance - Steve Ziliak

**Interpreting P values** - A

*P*value measures a sample's compatability with a hypothesis, not the truth of the hypothesis.

**Tabular data** - Tabulating the number of objects in categories of interest dates back to the earliest records of commerce and population censuses.

**Clustering** - Clustering finds patterns in data, whether they are there or not.

**Principal component analysis** - PCA helps you interpret your data, but it will not always find the important patterns.

**Classification and regression trees** - Decision trees are a simple but powerful prediction method.

**Ensemble methods: bagging and random forests** - Many heads are better than one.

**Machine learning: a primer** - Machine learning extracts patterns from data without explicit instructions.

**Machine learning: supervised methods** - Supervised learning algorithms extract general principles from observed examples guided by a specific prediction objective.

**Statistics versus machine learning** - Statistics draws population inferences from a sample, and machine learning finds generalizable predictive patterns.

**The curse(s) of dimensionality** - There is such a thing as too much of a good thing.

**Optimal experimental design** - Customize the experiment for the setting instead of adjusting the setting to fit a classical design.

**Predicting with confidence and tolerance** – For studying phenomena that are ‘typical’ rather than ‘average’.

**Two-level factorial experiments** – Getting the benefits of probing multiple experimental factors at a time.