Compass Bearings Hypothesis
Suns' Azimuth Hypothesis
Expansion-Contraction Hypothesis
Never Go Back Hypothesis
Analyses of Pooled Field Data: Descriptive Statistics |
Descriptive circular statistics of the pooled directional
data for the 1987 Monarch butterfly (Danaus plexippus) migrations in Northwest
Georgia. |
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Wind |
N |
Mean Bearing |
r |
A.D. |
95% C.I. |
North |
121 | 186° (S) | 0.92873*** | ±21.4° | ±4° |
Northeast |
12 | 216° (SW) | 0.74847*** | ±41.3° | ±28° |
East |
7 | 272° (W) | 0.98433*** | ±11.5° | - |
Southeast |
49 | 275° (W) | 0.87853*** | ±28.1° | ±8° |
South |
44 | 265° (W) | 0.80478*** | ±36.2° | ±13° |
Southwest |
15 | 272° (W) | 0.66117*** | ±47.3° | ±30° |
West |
17 | 156° (S) | 0.51947** | ±56.7° | ±38° |
Northwest |
35 | 149° (SE) | 0.82952*** | ±28.1° | ±10° |
Population |
300 | xxx° (x) | 0.xxx | ±xx° | ±xx° |
Table IIIDefinitions of abbreviations and symbols: N = number in sample, S = South, SW = Southwest, WSW = West-Southwest, etc., r = length of mean vector, A.D. = Angular deviation, C.I. = Confidence Intervals. Asterisks indicate significance level for Rayleigh tests (* = P< 0.05, ** = P< 0.01, and *** = P< 0.001)
Comments
- The significance levels of the Rayleigh test for N, NE, E, SE, S, and NW winds
meant that the probability that the population being sampled (e.g.
all monarch butterflies flying in North winds in southern Ontario during late
summer and fall) from which the sample (i.e. 53 vanishing bearings of
monarch butterflies that I observed flying in North winds) was taken actually has
no directional bias (i.e. vanishing bearings are randomly distributed in the
population) is less than one in a thousand. In other words, the chance was
less than one in a thousand chance that the directional bias of my samples of
monarchs were simply runs of (good? bad?) luck.
- The above discussion also applies to the directional data for monarch butterflies flying in W winds, except that the results are a little less convincing. Because P was less than 0.01, but greater than 0.001, the probability that the butterflies were actually flying about in random directions was less than one in a hundred, but greater than one in a thousand. Therefore, we are slightly less confident of the results for West winds than the results for the other seven wind conditions. The high value for the Confidence Intervals for West winds is a further indication that it may be a good idea to get more information (i.e. increase the sample size for this wind condition) before we are feel comfortable about accepting the results as representative of the population.