Complete the following steps to interpret a Mann-Whitney test. Key output includes the point estimate, the confidence interval, and the p-value.

First, consider the difference in the sample medians and then examine the confidence interval.

The difference is an estimate of the difference in population medians. Because the difference is based on sample data and not on the entire population, it is unlikely that the sample difference equals the population difference. To better estimate the population difference, use the confidence interval.

The confidence interval provides a range of likely values for the difference between two population medians. For example, a 95% confidence level indicates that if you take 100 random samples from the population, you could expect approximately 95 of the samples to produce intervals that contain the population difference. The confidence interval helps you assess the practical significance of your results. Use your specialized knowledge to determine whether the confidence interval includes values that have practical significance for your situation. If the interval is too wide to be useful, consider increasing your sample size.

Difference | CI for Difference | Achieved Confidence |
---|---|---|

-1.85 | (-3, -0.9) | 95.52% |

In these results, the estimate of the population median for the difference in the number of months that paint persists on two highways is −1.85. You can be 95.52% confident that the difference between the population medians is between −3.0 and −0.9.

To determine whether the difference between the medians is statistically significant, compare the p-value to the significance level. Usually, a significance level (denoted as α or alpha) of 0.05 works well. A significance level of 0.05 indicates a 5% risk of concluding that a difference exists when there is no actual difference.

- P-value ≤ α: The difference between the medians is statistically significant (Reject H
_{0}) - If the p-value is less than or equal to the significance level, the decision is to reject the null hypothesis. You can conclude that the difference between the population medians is statistically significant. Use your specialized knowledge to determine whether the difference is practically significant. For more information, go to Statistical and practical significance.
- P-value > α: The difference between the medians is not statistically significant (Fail to reject H
_{0}) - If the p-value is greater than the significance level, the decision is to fail to reject the null hypothesis. You do not have enough evidence to conclude that the difference between the population medians is statistically significantly. You should make sure that your test has enough power to detect a difference that is practically significant.

A tie occurs when the same value is in both samples. If your data has ties, Minitab displays a p-value that is adjusted for ties and a p-value that is not adjusted. The adjusted p-value is usually more accurate than the unadjusted p-value. However, the unadjusted p-value is the more conservative estimate because it is always greater than the adjusted p-value for a specific pair of samples.

Null hypothesis | H₀: η₁ - η₂ = 0 |
---|---|

Alternative hypothesis | H₁: η₁ - η₂ ≠ 0 |

Method | W-Value | P-Value |
---|---|---|

Not adjusted for ties | 76.50 | 0.002 |

Adjusted for ties | 76.50 | 0.002 |

In these results, the null hypothesis states that the difference in the median time that two brands of paint persist on a highway is 0. Because the p-value is 0.002, which is less than the significance level of 0.05, the decision is to reject the null hypothesis and conclude that the time that the two brands of paint persist are different.