Perform 2 sample t-test
Question:
I have a the mean, std dev and n of sample 1 and sample 2 – samples are taken from the sample population, but measured by different labs.
n is different for sample 1 and sample 2. I want to do a weighted (take n into account) two-tailed t-test.
I tried using the scipy.stat module by creating my numbers with np.random.normal, since it only takes data and not stat values like mean and std dev (is there any way to use these values directly). But it didn’t work since the data arrays has to be of equal size.
Any help on how to get the p-value would be highly appreciated.
Answers:
Using a recent version of Scipy 0.12.0, this functionality is built in (and does in fact operates on samples of different sizes). In scipy.stats the ttest_ind function performs Welch’s t-test when the flag equal_var is set to False.
For example:
>>> import scipy.stats as stats
>>> sample1 = np.random.randn(10, 1)
>>> sample2 = 1 + np.random.randn(15, 1)
>>> t_stat, p_val = stats.ttest_ind(sample1, sample2, equal_var=False)
>>> t_stat
array([-3.94339083])
>>> p_val
array([ 0.00070813])
If you have the original data as arrays a and b, you can use scipy.stats.ttest_ind with the argument equal_var=False:
t, p = ttest_ind(a, b, equal_var=False)
If you have only the summary statistics of the two data sets, you can calculate the t value using scipy.stats.ttest_ind_from_stats (added to scipy in version 0.16) or from the formula (http://en.wikipedia.org/wiki/Welch%27s_t_test).
The following script shows the possibilities.
from __future__ import print_function
import numpy as np
from scipy.stats import ttest_ind, ttest_ind_from_stats
from scipy.special import stdtr
np.random.seed(1)
# Create sample data.
a = np.random.randn(40)
b = 4*np.random.randn(50)
# Use scipy.stats.ttest_ind.
t, p = ttest_ind(a, b, equal_var=False)
print("ttest_ind: t = %g p = %g" % (t, p))
# Compute the descriptive statistics of a and b.
abar = a.mean()
avar = a.var(ddof=1)
na = a.size
adof = na - 1
bbar = b.mean()
bvar = b.var(ddof=1)
nb = b.size
bdof = nb - 1
# Use scipy.stats.ttest_ind_from_stats.
t2, p2 = ttest_ind_from_stats(abar, np.sqrt(avar), na,
bbar, np.sqrt(bvar), nb,
equal_var=False)
print("ttest_ind_from_stats: t = %g p = %g" % (t2, p2))
# Use the formulas directly.
tf = (abar - bbar) / np.sqrt(avar/na + bvar/nb)
dof = (avar/na + bvar/nb)**2 / (avar**2/(na**2*adof) + bvar**2/(nb**2*bdof))
pf = 2*stdtr(dof, -np.abs(tf))
print("formula: t = %g p = %g" % (tf, pf))
The output:
ttest_ind: t = -1.5827 p = 0.118873
ttest_ind_from_stats: t = -1.5827 p = 0.118873
formula: t = -1.5827 p = 0.118873
I have a the mean, std dev and n of sample 1 and sample 2 – samples are taken from the sample population, but measured by different labs.
n is different for sample 1 and sample 2. I want to do a weighted (take n into account) two-tailed t-test.
I tried using the scipy.stat module by creating my numbers with np.random.normal, since it only takes data and not stat values like mean and std dev (is there any way to use these values directly). But it didn’t work since the data arrays has to be of equal size.
Any help on how to get the p-value would be highly appreciated.
Using a recent version of Scipy 0.12.0, this functionality is built in (and does in fact operates on samples of different sizes). In scipy.stats the ttest_ind function performs Welch’s t-test when the flag equal_var is set to False.
For example:
>>> import scipy.stats as stats
>>> sample1 = np.random.randn(10, 1)
>>> sample2 = 1 + np.random.randn(15, 1)
>>> t_stat, p_val = stats.ttest_ind(sample1, sample2, equal_var=False)
>>> t_stat
array([-3.94339083])
>>> p_val
array([ 0.00070813])
If you have the original data as arrays a and b, you can use scipy.stats.ttest_ind with the argument equal_var=False:
t, p = ttest_ind(a, b, equal_var=False)
If you have only the summary statistics of the two data sets, you can calculate the t value using scipy.stats.ttest_ind_from_stats (added to scipy in version 0.16) or from the formula (http://en.wikipedia.org/wiki/Welch%27s_t_test).
The following script shows the possibilities.
from __future__ import print_function
import numpy as np
from scipy.stats import ttest_ind, ttest_ind_from_stats
from scipy.special import stdtr
np.random.seed(1)
# Create sample data.
a = np.random.randn(40)
b = 4*np.random.randn(50)
# Use scipy.stats.ttest_ind.
t, p = ttest_ind(a, b, equal_var=False)
print("ttest_ind: t = %g p = %g" % (t, p))
# Compute the descriptive statistics of a and b.
abar = a.mean()
avar = a.var(ddof=1)
na = a.size
adof = na - 1
bbar = b.mean()
bvar = b.var(ddof=1)
nb = b.size
bdof = nb - 1
# Use scipy.stats.ttest_ind_from_stats.
t2, p2 = ttest_ind_from_stats(abar, np.sqrt(avar), na,
bbar, np.sqrt(bvar), nb,
equal_var=False)
print("ttest_ind_from_stats: t = %g p = %g" % (t2, p2))
# Use the formulas directly.
tf = (abar - bbar) / np.sqrt(avar/na + bvar/nb)
dof = (avar/na + bvar/nb)**2 / (avar**2/(na**2*adof) + bvar**2/(nb**2*bdof))
pf = 2*stdtr(dof, -np.abs(tf))
print("formula: t = %g p = %g" % (tf, pf))
The output:
ttest_ind: t = -1.5827 p = 0.118873
ttest_ind_from_stats: t = -1.5827 p = 0.118873
formula: t = -1.5827 p = 0.118873