1

I have two samples of values, measured on the same group under two different conditions:

import numpy as np
import scipy.stats as st

v1 = np.array([ 152.65285 ,   97.011475,   77.56722 ,  120.19234 ])
v2 = np.array([ 149.19984,  172.08975,  143.92285,  108.60255])

What I want to do is perform the dependent t-test for paired examples on this particular dataset. As is seen in the wikipedia link, this is performed by calculating the t value using the formula:

enter image description here

Where mu_0 is set to 0. I performed this calculation and calculated that the t_value is equal to

>>> (np.average(v1 - v2) * np.sqrt(len(v1))) / (np.std(v1 - v2))
-1.6061552162815307

However, using the scipy.stats package, I get a slightly different result:

>>> st.ttest_rel(v1,v2)
(-1.3909712197206947, 0.25844779134312651)

The first number that st.ttest_rel(v1,v2) returns should, according to the scipy manual, be equal to the t-value, but it's not. Am I missing something here or is the scipy.stats calculating the statistic incorrectly?

3

The difference seems to be that np.std calculates the standard deviation with N degrees of freedom, whereas ttest_rel uses a biased estimator to calculate it (N-1 degrees of freedom).

You can fix this by specifying the difference in the degrees of freedom in np.std as 1:

>>> (np.average(v1 - v2) * np.sqrt(len(v1))) / (np.std(v1 - v2, ddof=1))
-1.3909712197206947

The two calculations then agree.

  • Ahh, of course. The degrees of freedom for the standard deviation. Thank you for pointing that out to me. Answer accepted. – 5xum Feb 9 '15 at 10:08
  • General question: If I do: ttest_rel(a, b) and the obtained t value is negative, does this mean that the mean of b is greater than the mean of a ? – serafeim Oct 31 '18 at 12:00
1

I had a look at scipy's sources in the site-packages directory of my python folder. In the file scipy/stats/stats.py it is shown how the ttest_rel is calculated. I found that it is done a bit differently than in your manually calculated case. But as I am not an expert in statistics, you might want to have a look at the implementation by yourself. That is the best tip I can give at the moment...

  • You are correct, the answer by ajcr also explains why the ttest is correct and my method is not. – 5xum Feb 9 '15 at 10:09

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