Independent t- Test (Comparing Two Means) The objectives of this lesson are to learn: the definition/purpose of independent t-test when to use the independent t-test the use of SPSS to complete an independent t-test the interpretations of results Definition Independent t-test involves examination of the significant differences on one factor or dimension (dependent variable) between means of two independent groups (e.g., male vs. female, with disability vs. without disability) or two experimental groups (control group vs. treatment group). For example, you might want to know whether there is a significant difference on the level of social activity between individuals with disabilities and individuals without disabilities. When to Use Independent t-test Any analysis where: There is only one dimension or factor (dependent variable) There are three or more groups of the factor (independent variable) One is interested in looking at mean differences across two independent groups Steps for Independent t-test Using SPSS We will use a step-by-step approach to go through the steps for an Independent t-test using SPSS statistical analysis package. Here is the background information of the sample data we are using here. Number of subjects: 60 Independent variable (Factor): Gender (male = 1, female = 2). Dependent variable: Vocational rehabilitation service cost (VRS cost)
Data: Table 1 Table 1 M a le F e m a le 355 975 305 385 980 99 400 985 365 900 975 245 900 700 335 340 425 305 685 1050 115 655 825 1050 625 625 105 965 735 655 585 975 135 650 925 950 595 355 225 965 125 538 580 875 755 580 140 222 625 325 875 925 155 280 915 300 235 655 135 246 Steps for Independent t-test: Step 1 : A statement of statistical hypothesis H : µ = µ or means for two groups are equal 0 1 2 There is no significant difference between genders in receiving vocational rehabilitation service cost H a : µ 1 µ 2( µ 1 f µ 2or µ 1 p µ 2) Step 2 : Setting the α level of risk associated with the null hypothesis (or Type I error) The level of Type I error is.05. Step 3 & 4: Test statistic using SPSS/ interpreting results Figure 2 Analyze Compare Means Independent t-test (Figure 2)
Group 1 = Male = 1 Group 2 = Female = 2 Alpha level =.05
SPSS Output and Interpretation T-Test Group Statistics VR Cost Gender Males Females Std. Error N Mean Std. Deviation Mean 31 552.4516 293.25357 52.66990 29 578.7586 324.83893 60.32108 Interpretation: This table displays the number of subjects, mean value of VRS cost, standard deviation, and standard error for the test variable(s) within categories defined by the grouping variable (Males and Females). Since the Independent t Test procedure compares the two group means, it is useful to know what the mean values are (Male mean = 552.4516, Female Mean = 578.7586). Independent Samples Test VR Cost Equal variances assumed Equal variances not assumed Levene's Test for Equality of Variances F Sig. t df Sig. (2-tailed) t-test for Equality of Means Mean Difference 95% Confidence Interval of the Std. Error Difference Difference Lower Upper.707.404 -.330 58.743-26.3070 79.80332-186.051 133.43669 -.329 56.382.744-26.3070 80.07965-186.702 134.08782
Interpretation: The Independent t Test procedure compares means for two groups of subjects. If the significance value for the Levene test is high (greater that 0.05), use the results that assume equal variances for both groups. Otherwise, Use the results that do not assume equal variances for both groups. In our case, the equal variances are assumed (p =.404 >.05). A significance value of.743 (greater than.05) indicates that there is no significant difference between the two group means. Furthermore, the confidence interval for the mean difference contains zero within its range. This also indicates that the difference is not significant. If the significance value is high (typically greater than.05) and the confidence interval for the mean difference contains zero, then you cannot conclude that there is a significant difference between the two group means. Step 5: Conclusion Based on the results of independent t-test (p =.743 >.05), we failed to reject the null hypothesis (Ho). Therefore, we concluded that there was no significant difference between male and female in VRS cost.