I am trying to follow this tutorial from quantopian where they are trying to show that samples progressively exhibit characteristics of a normal distribution with increase in size .

I tried to generate a normal distribution using the numpy.random.randn() method as shown in the tutorial.

I understand that this method returns a sample of the standard normal distribution and that for a normal distribution, mean = 0 and standard deviation = 1

But, when I check the mean and standard deviation of this distribution, they show weird values i.e mean = 0.23 and standard deviation = 0.49.


import numpy as np
import matplotlib.pyplot as plt
normal = np.random.randn(6)

print (normal.mean())
print (normal.std())



I am guessing this could be because I am looking at just a sample and not the whole distribution and it is not perfectly normal. But if that is the case:

  1. What characteristics should I expect from this sample?

  2. Isn't the tutorial's suggestion wrong, since it will never be a normal distribution?

  • You have a very small sample so deviations from mean = 0 and sd = 1 are expected. As you increase the sample size, the distribution will approach to a standard normal distribution.
    – ayhan
    Apr 20, 2020 at 11:29
  • @ayhan, I get it now.
    – Banad
    Apr 20, 2020 at 11:48
  • Please post an MCVE. Don't expect people to go off site to answer you Apr 20, 2020 at 14:29
  • @MadPhysicist, added code
    – Banad
    Apr 20, 2020 at 14:52
  • @MadPhysicist Added code and result within question.
    – Banad
    Apr 20, 2020 at 14:55

1 Answer 1


You have a sample size or 6. It is not sufficiently large enough to get close to approximating the normal distribution. Try it with 600 or 6000 to get a good representation of the distribution.

import numpy as np

x = np.random.randn(600)
x.mean(), x.std()
# returns:
(-0.07760043571247623, 0.9664411074909558)

x = np.random.randn(6000)
x.mean(), x.std()
# returns:
(0.003908119246211815, 1.0001989021750033)

The average roll of a 6-sided die should be 3.5. However, if you only roll it 6 times, it is unlikely you will have an average of 3.5.

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