I'm using the
normal functions from Python's
numpy.random module. The functions are pretty similar from what I've read in the http://docs.scipy.org manual (they both concern the Gaussian distribution), but are there any subtler differences that I should be aware of? If so, in what situations would I be better off using a specific function?
I'm using the
Looking at the docs that you linked in your question, I'll highlight some of the key differences:
numpy.random.normal(loc=0.0, scale=1.0, size=None) # Draw random samples from a normal (Gaussian) distribution. # Parameters : # loc : float -- Mean (“centre”) of the distribution. # scale : float -- Standard deviation (spread or “width”) of the distribution. # size : tuple of ints -- Output shape. If the given shape is, e.g., (m, n, k), then m * n * k samples are drawn.
So in this case, you're generating a GENERIC normal distribution (more details on what that means later).
numpy.random.randn(d0, d1, ..., dn) # Return a sample (or samples) from the “standard normal” distribution. # Parameters : # d0, d1, ..., dn : int, optional -- The dimensions of the returned array, should be all positive. If no argument is given a single Python float is returned. # Returns : # Z : ndarray or float -- A (d0, d1, ..., dn)-shaped array of floating-point samples from the standard normal distribution, or a single such float if no parameters were supplied.
In this case, you're generating a SPECIFIC normal distribution, the standard distribution.
Now some of the math, which is really needed to get at the heart of your question:
A normal distribution is a distribution where the values are more likely to occur near the mean value. There are a bunch of cases of this in nature. E.g., the average high temperature in Dallas in June is, let's say, 95 F. It might reach 100, or even 105 average in one year, but it more typically will be near 95 or 97. Similarly, it might reach as low as 80, but 85 or 90 is more likely.
So, it is fundamentally different from, say, a uniform distribution (rolling an honest 6-sided die).
A standard normal distribution is just a normal distribution where the average value is 0, and the variance (the mathematical term for the variation) is 1.
numpy.random.normal(size= (10, 10))
is the exact same thing as writing
because the default values (loc= 0, scale= 1) for
numpy.random.normal are in fact the standard distribution.
To make matters more confusing, as the numpy random documentation states:
sigma * np.random.randn(...) + mu
is the same as
np.random.normal(loc= mu, scale= sigma, ...)
The problem is really specialization: in statistics, Gaussian distributions are so common that terminology cropped up to enable discussions:
- Many distributions are Gaussain, so many that Gaussian became considered the normal distribution.
- Good modeling, especially linear modeling, requires that all elements are "of the same size" (similar mean and variance). So it became standard practice to rescale distributions to
*Final note: I used the term variance to mathematically describe variation. Some folks say standard deviation. Variance simply equals the square of standard deviation. Since the variance = 1 for the standard distribution, in this case of the standard distribution,
variance == standard deviation.
Following up to @Mike Williamson's explanation about variance, standard deviation, I was caught trying to workout the example provided in the Numpy documentation for randn The example provided there:
>>> import numpy as np >>> 2.5 * np.random.randn(2, 4) + 3 array([[-1.13788245, 2.54061141, -0.12769502, 7.46200906], [-0.4780766 , 1.70417835, 5.43802441, 4.71764135]])
The point to note here is that Normal Distribution follows notation N(Mean, Variance), whereas to implement using
.randn() you would require to multiply the standard deviation or sigma and add the Mean or mu to the Standard Normal Output of the Numpy method(s).
sqrt(Variance) = Standard Deviation or sigma
sqrt(6.25) = 2.5
sigma * numpy.random.randn(2, 4) + mean