Hypothesis Testing

Hypothesis Testing ESM 206 6 Feb. 2002

Example: Gas Mileage Do “Small” cars have a different average gas mileage than “Compact” cars? Data on mileage of 13 small and 15 compact cars.

Example: gas consumption • Which coefficients are different from zero? • Data from 36 years in US.

Hypothesis testing • Define null hypothesis (H0) • Does direction matter? • Choose test statistic, T • Distribution of T under H0 • Calculate test statistic, S • Probability of obtaining value at least as extreme as S under H0 (P) • P small: reject H0

The null hypothesis • Statement about underlying parameters of the population • We will either reject or fail to reject H0 • Usually a statement of no pattern or of not exceeding some criterion • Examples

The alternate hypothesis • Written HA • Is the logical complement of H0 • Examples

One- and two-sided tests • One-sided test: direction matters • Pick a direction based on regulatory criteria or knowledge of processes • Direction must be chosen a priori • Two-sided: all that matters is a difference • One-sided has greater power • Must make decision before analyzing data

Comparing means: the t-test • Compare sample mean to fixed value (eqs. 1-4) • Compare regression coefficient to fixed value (eq. 5) • Compare the difference between two sample means to a fixed value (usually 0) (eqs. 6-7)

Assumptions of the t-test • The data in each sample are normally distributed • The populations have the same variance • Can correct for violations of this with the Welch modification of df • Test for difference among variances with F-test

The P-value • P is the probability of observing your data if the null hypothesis is true • P is the probability that you will be in error if you reject the null hypothesis • P is not the probability that the null hypothesis is true

Critical values of P • Reject H0 if P is less than threshold • P < 0.05 commonly used • Arbitrary choice • Other values: 0.1, 0.01, 0.001 • Always report P, so others can draw own conclusions

Example: Gas Mileage Do “Small” cars have a different average gas mileage than “Compact” cars? Data on mileage of 13 small and 15 compact cars.

Gas mileage: variances are unequal

Gas mileage Test Name: Welch Modified Two-Sample t-Test Estimated Parameter(s): mean of x = 31 mean of y = 24.13333 Data: x: Small in DS2 , and y: Compact in DS2 Test Statistic: t = 5.905054 Test Statistic Parameter: df = 16.98065 P-value: 0.00001738092 95 % Confidence Interval: LCL = 4.413064 UCL = 9.32027

Example: gas consumption • Which coefficients are different from zero? • Data from 36 years in US.

Gas consumption Value Std. Error t value Pr(>|t|) (Intercept) -0.0898 0.0508 -1.7687 0.0868 GasPrice -0.0424 0.0098 -4.3058 0.0002 Income 0.0002 0.0000 23.4189 0.0000 New.Car.Price -0.1014 0.0617 -1.6429 0.1105 Used.Car.Price -0.0432 0.0241 -1.7913 0.0830

Interpreting model coefficients • Is there statistical evidence that the independent variable has an effect? • Is the parameter estimate significantly different from zero? • Is the coefficient large enough that the effect is important? • Must take into account the variation in the independent variable • Use linear measure of variation – SD, IQ range, etc.

Types of error • Type I: reject null hypothesis when it’s really true • Desired level: a • Type II: fail to reject null hypothesis when it’s really false • Desired level: b • Is associated with a given effect size • E.g., want a probability 0.1 of failing to reject when true difference between means is 0.35.

Types of error

Controlling error levels • a is controlled by setting critical P-value • b is controlled by a, sample size, sample variance, effect size • Tradeoff between a and b • Need to balance costs associated with type I and type II errors • Power is 1-b

Hypothesis Testing