Welch's t-test

In statistics, Welch's t-test, or unequal variances t-test, is a two-sample location test which is used to test the hypothesis that two populations have equal means. Welch's t-test is an adaptation of Student's t-test,^[1] that is, it has been derived with the help of Student's t-test and is more reliable when the two samples have unequal variances and unequal sample sizes.^[2] These tests are often referred to as "unpaired" or "independent samples" t-tests, as they are typically applied when the statistical units underlying the two samples being compared are non-overlapping. Given that Welch's t-test has been less popular than Student's t-test^[2] and may be less familiar to readers, a more informative name is "Welch's unequal variances t-test" or "unequal variances t-test" for brevity.

Assumptions

Student's t-test assumes that the two populations have normal distributions and with equal variances. Welch's t-test is designed for unequal variances, but the assumption of normality is maintained.^[1] Welch's t-test is an approximate solution to the Behrens–Fisher problem.

Calculations

Welch's t-test defines the statistic t by the following formula:

t \quad = \quad {\; \overline{X}_1 - \overline{X}_2 \; \over \sqrt{ \; {s_1^2 \over N_1} \; + \; {s_2^2 \over N_2} \quad }}\,

where $\overline{X}_1$ , $s_1^2$ and $N_1$ are the 1st sample mean, sample variance and sample size, respectively. Unlike in Student's t-test, the denominator is not based on a pooled variance estimate.

The degrees of freedom $\nu$ associated with this variance estimate is approximated using the Welch–Satterthwaite equation:

\nu \quad \approx \quad {{\left( \; {s_1^2 \over N_1} \; + \; {s_2^2 \over N_2} \; \right)^2 } \over { \quad {s_1^4 \over N_1^2 \nu_1} \; + \; {s_2^4 \over N_2^2 \nu_2 } \quad }}

Here $\nu_1 = N_1-1$ , the degrees of freedom associated with the first variance estimate. $\nu_2 = N_2-1$ , the degrees of freedom associated with the 2nd variance estimate.

Welch's t-test can also be calculated for ranked data and might then be named Welch's U-test.^[3]

Statistical test

Once t and $\nu$ have been computed, these statistics can be used with the t-distribution to test the null hypothesis that the two population means are equal (using a two-tailed test), or the alternative hypothesis that one of the population means is greater than or equal to the other (using a one-tailed test). The approximate degrees of freedom is rounded down to the nearest integer.

Advantages and limitations

Welch's t-test is more robust than Student's t-test and maintains type I error rates close to nominal for unequal variances and for unequal sample sizes. Furthermore, the power of Welch's t-test comes close to that of Student's t-test, even when the population variances are equal and sample sizes are balanced.^[2]

It is not recommended to pre-test for equal variances and then choose between Student's t-test or Welch's t-test.^[4] Rather, Welch's t-test can be applied directly and without any substantial disadvantages to Student's t-test as noted above. Welch's t-test remains robust for skewed distributions and large sample sizes.^[5] Reliability decreases for skewed distributions and smaller samples, where one could possibly perform Welch's t-test on ranked data.^[3]

Examples

The following three examples compare Welch's t-test and Student's t-test. Samples are from random normal distributions using the R programming language.

For all three examples, the population means were $\mu_1 = 20$ and $\mu_2 = 22$ .

The first example is for equal variances ( $\sigma_1^2 = \sigma_2^2 = 4$ ) and equal sample sizes ( $N_1 = N_2 = 15$ ). Let A1 and A2 denote two random samples:

A_1 = \{27.5, 21.0, 19.0, 23.6, 17.0, 17.9, 16.9, 20.1, 21.9, 22.6, 23.1, 19.6, 19.0, 21.7, 21.4\}

A_2 = \{27.1, 22.0, 20.8, 23.4, 23.4, 23.5, 25.8, 22.0, 24.8, 20.2, 21.9, 22.1, 22.9, 20.5, 24.4\}

The second example is for unequal variances ( $\sigma_1^2 = 16$ , $\sigma_2^2 = 1$ ) and unequal sample sizes ( $N_1 = 10$ , $N_2 = 20$ ). The smaller sample has the larger variance:

A_1 = \{17.2, 20.9, 22.6, 18.1, 21.7, 21.4, 23.5, 24.2, 14.7, 21.8\}

A_2 = \{21.5, 22.8, 21.0, 23.0, 21.6, 23.6, 22.5, 20.7, 23.4, 21.8, 20.7, 21.7, 21.5, 22.5, 23.6, 21.5, 22.5, 23.5, 21.5, 21.8\}

The third example is for unequal variances ( $\sigma_1^2 = 1$ , $\sigma_2^2 = 16$ ) and unequal sample sizes ( $N_1 = 10$ , $N_2 = 20$ ). The larger sample has the larger variance:

A_1 = \{19.8, 20.4, 19.6, 17.8, 18.5, 18.9, 18.3, 18.9, 19.5, 22.0\}

A_2 = \{28.2, 26.6, 20.1, 23.3, 25.2, 22.1, 17.7, 27.6, 20.6, 13.7, 23.2, 17.5, 20.6, 18.0, 23.9, 21.6, 24.3, 20.4, 24.0, 13.2\}

Reference p-values were obtained by simulating the distributions of the t statistics for the null hypothesis of equal population means ( $\mu_1 - \mu_2 =0$ ). Results are summarised in the table below, with two-tailed p-values:

	Sample A1			Sample A2			Student's t-test				Welch's t-test
Example	$N_1$	$\overline{X}_1$	$s_1^2$	$N_2$	$\overline{X}_2$	$s_2^2$	$t$	$\nu$	$P$	$P_\mathrm{sim}$	$t$	$\nu$	$P$	$P_\mathrm{sim}$
1	15	20.8	7.9	15	23.0	3.8	−2.46	28	0.021	0.021	−2.46	25.0	0.021	0.017
2	10	20.6	9.0	20	22.1	0.9	−2.10	28	0.045	0.150	−1.57	9.9	0.149	0.144
3	10	19.4	1.4	20	21.6	17.1	−1.64	28	0.110	0.036	−2.22	24.5	0.036	0.042

Welch's t-test and Student's t-test gave practically identical results for the two samples with equal variances and equal sample sizes (Example 1). For unequal variances, Student's t-test gave a low p-value when the smaller sample had a larger variance (Example 2) and a high p-value when the larger sample had a larger variance (Example 3). For unequal variances, Welch's t-test gave p-values close to simulated p-values.

Software implementations

Language/Program	Function	Notes
LibreOffice	`TTEST(Data1; Data2; Mode; Type)`	See
MATLAB	`ttest2(data1, data2, 'Vartype', 'unequal')`	See
Microsoft Excel pre 2010	`TTEST(array1, array2, tails, type)`	See
Microsoft Excel 2010 and later	`T.TEST(array1, array2, tails, type)`	See
Python	`scipy.stats.ttest_ind(a, b, axis=0, equal_var=False)`	See
R	`t.test(data1, data2, alternative="two.sided", var.equal=FALSE)`	See
Julia	`UnequalVarianceTTest(data1, data2)`	See
Stata	ttest varname1 == varname2, welch	See 8

References

1 2 Welch, B. L. (1947). "The generalization of "Student's" problem when several different population variances are involved". Biometrika 34 (1–2): 28–35. doi:10.1093/biomet/34.1-2.28. MR 19277.
1 2 3 Ruxton, G. D. (2006). "The unequal variance t-test is an underused alternative to Student's t-test and the Mann–Whitney U test". Behavioral Ecology 17: 688–690. doi:10.1093/beheco/ark016.
1 2 Fagerland, M. W.; Sandvik, L. (2009). "Performance of five two-sample location tests for skewed distributions with unequal variances". Contemporary Clinical Trials 30: 490–496. doi:10.1016/j.cct.2009.06.007.
↑ Zimmerman, D. W. (2004). "A note on preliminary tests of equality of variances". British Journal of Mathematical and Statistical Psychology 57: 173–181. doi:10.1348/000711004849222.
↑ Fagerland, M. W. (2012). "t-tests, non-parametric tests, and large studies—a paradox of statistical practice?". BioMed Central Medical Research Methodology 12: 78. doi:10.1186/1471-2288-12-78.

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