Table 5.
One-way ANOVA results for steady-state rebound experiments
| N | Parameter | Normality | Variance | Test statistic | df | res | p | ctrl | Proc | Proc + CCAP | Wash |
|---|---|---|---|---|---|---|---|---|---|---|---|
| 16 | τ | Fail | H = 10.310 | 3 | 0.016 | 6 | 6 | 5 | 6 | ||
| 16 | arctan (latency*π) | Pass | Pass | F = 3.124 | 3 | 59 | 0.033 | 0.996 | 0.831 | 0.786 | 0.919 |
| 16 | a | Pass | Pass | F = 7.623 | 3 | 58 | <0.001 | 46.286 | 92.563 | 102.688 | 49.813 |
| 16 | t 1/2 | Fail | H = 3.791 | 3 | 0.285 | 0.714 | 0.690 | 0.678 | 0.691 | ||
| 16 | k | Fail | H = 5.115 | 3 | 0.164 | 0.119 | 0.138 | 0.144 | 0.131 |
“N” is the number of animals, results from tests for normality and equal variance are given as pass/fail, the test statistics are F for ANOVA and H for ANOVA on ranks, and “res” is the residuals. Significant p-values (p ≤ 0.05) are printed in bold. Values for ctrl, Proc, Proc + CCAP, and wash are means for ANOVA, and medians for ANOVA on ranks. Latency was bounded between 0 and 1 by experimental design. Therefore, we transformed the data to a normal distribution by multiplying by π and calculating the arctangent.