# Uniformly distributed data in d dimensions

How can I generate a uniformly distributed [-1,1]^d data in Python? E.g. d is a dimension like 10.

I know how to generate uniformly distributed data like np.random.randn(N) but dimension thing is confused me a lot.

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`randn` will return samples of the normal distribution, not the uniform distribution. My gut feeling is that for a multivariate uniform distribution you can just use a product of `d` univariate uniform distributions but I'm not absolutely certain. –  millimoose Oct 12 '11 at 0:24
This question is unclear; the accepted answer seems to be a uniform distribution, but the question asks for a a gaussian/normal distribution docs.scipy.org/doc/numpy/reference/generated/… –  ninjagecko Apr 23 '12 at 10:03

Assuming independence of the individual coordinates, then the following will generate a random point in `[-1, 1)^d`

`````` np.random.random(d) * 2 - 1
``````

The following will generate `n` observations, where each row is an observation

`````` np.random.random((n, d)) * 2 - 1
``````
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As has been pointed out, randn produces normally distributed number (aka Gaussian). To get uniformly distributed you should use "uniform".

If you just want a single sample at a time of 10 uniformly distributed numbers you can use:

``````import numpy as np
x = np.random.uniform(low=-1,high=1,size=10)
``````

OR if you'd like to generate lots (e.g. 100) of them at once then you can do:

``````import numpy as np
X = np.random.uniform(low=-1,high=1,size=(100,10))
``````

Now X[0], X[1], ... each has length 10.

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You can import the `random` module and call `random.random` to get a random sample from [0, 1). You can double that and subtract 1 to get a sample from [-1, 1).

Draw d values this way and the tuple will be a uniform draw from the cube [-1, 1)^d.

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``````[random.choice([-1,1]) for _ in range(N)]
There may be reasons to use numpy's internal mechanisms, or use `random()` manually, etc. But those are implementation details, and also related to how the random number generation rations the bits of entropy the operating system provides.