# generate N random numbers from a skew normal distribution using numpy

I need a function in python to return N random numbers from a skew normal distribution. The skew needs to be taken as a parameter.

e.g. my current use is

`x = numpy.random.randn(1000)`

and the ideal function would be e.g.

`x = randn_skew(1000, skew=0.7)`

Solution needs to conform with: python version 2.7, numpy v.1.9

A similar answer is here: skew normal distribution in scipy However this generates a PDF not the random numbers.

• you have made a request, but this is a Q & A site, so what is your question? We will help with issues you have run into while coding but will not just write code for you. Mar 24, 2016 at 15:05
• you want to generate random numbers that follow a distribution ? Mar 24, 2016 at 16:57

I start by generating the PDF curves for reference:

``````NUM_SAMPLES = 100000
SKEW_PARAMS = [-3, 0]

def skew_norm_pdf(x,e=0,w=1,a=0):
# http://stackoverflow.com/questions/5884768/skew-normal-distribution-in-scipy
t = (x-e) / w
return 2.0 * w * stats.norm.pdf(t) * stats.norm.cdf(a*t)

# generate the skew normal PDF for reference:
location = 0.0
scale = 1.0
x = np.linspace(-5,5,100)

plt.subplots(figsize=(12,4))
for alpha_skew in SKEW_PARAMS:
p = skew_norm_pdf(x,location,scale,alpha_skew)
# n.b. note that alpha is a parameter that controls skew, but the 'skewness'
# https://en.wikipedia.org/wiki/Skew_normal_distribution
plt.plot(x,p)
`````` Next I found a VB implementation of sampling random numbers from the skew normal distribution and converted it to python:

``````# literal adaption from:
# http://stackoverflow.com/questions/4643285/how-to-generate-random-numbers-that-follow-skew-normal-distribution-in-matlab
# original at:
def rand_skew_norm(fAlpha, fLocation, fScale):
sigma = fAlpha / np.sqrt(1.0 + fAlpha**2)

afRN = np.random.randn(2)
u0 = afRN
v = afRN
u1 = sigma*u0 + np.sqrt(1.0 -sigma**2) * v

if u0 >= 0:
return u1*fScale + fLocation
return (-u1)*fScale + fLocation

def randn_skew(N, skew=0.0):
return [rand_skew_norm(skew, 0, 1) for x in range(N)]

# lets check they at least visually match the PDF:
plt.subplots(figsize=(12,4))
for alpha_skew in SKEW_PARAMS:
p = randn_skew(NUM_SAMPLES, alpha_skew)
sns.distplot(p)
`````` And then wrote a quick version which (without extensive testing) appears to be correct:

``````def randn_skew_fast(N, alpha=0.0, loc=0.0, scale=1.0):
sigma = alpha / np.sqrt(1.0 + alpha**2)
u0 = np.random.randn(N)
v = np.random.randn(N)
u1 = (sigma*u0 + np.sqrt(1.0 - sigma**2)*v) * scale
u1[u0 < 0] *= -1
u1 = u1 + loc
return u1

# lets check again
plt.subplots(figsize=(12,4))
for alpha_skew in SKEW_PARAMS:
p = randn_skew_fast(NUM_SAMPLES, alpha_skew)
sns.distplot(p)
`````` ``````from scipy.stats import skewnorm
a=10
data= skewnorm.rvs(a, size=1000)
``````

Here, a is a parameter which you can refer to: https://docs.scipy.org/doc/scipy/reference/generated/scipy.stats.skewnorm.html

• This is fine, but the question was originally aimed at numpy. Apr 11, 2019 at 23:21

Adapted from rsnorm function from fGarch R package

``````def random_snorm(n, mean = 0, sd = 1, xi = 1.5):
def random_snorm_aux(n, xi):
weight = xi/(xi + 1/xi)
z = numpy.random.uniform(-weight,1-weight,n)
xi_ = xi**numpy.sign(z)
random = -numpy.absolute(numpy.random.normal(0,1,n))/xi_ * numpy.sign(z)
m1 = 2/numpy.sqrt(2 * numpy.pi)
mu = m1 * (xi - 1/xi)
sigma = numpy.sqrt((1 - m1**2) * (xi**2 + 1/xi**2) + 2 * m1**2 - 1)
return (random - mu)/sigma

return random_snorm_aux(n, xi) * sd + mean
``````
• I get noise when I try to do this p = random_snorm(n, 5.61594709, 3.73888096, 1.62537967) x = linspace(-10, 100, n) plt.plot(x, p), or how would I check the results? Jul 2, 2017 at 23:38