# Python np.lognormal gives infinite results for big average and St Dev

I am trying to draw the lognormal distribution for my data. using the following code:

``````mu, sigma = 136519., 50405. # mean and standard deviation
hs = np.random.lognormal(mu, sigma, 1000) #mean, s dev , Size
count, bins, ignored = plt.hist(hs, 100, normed=True)
x = np.linspace(min(bins), max(bins), 10000)
pdf = (math.exp(-(np.log(x) - mu)**2 / (2 * sigma**2)))
#plt.axis('tight')
plt.plot(x, pdf, linewidth=2, color='r')
``````

As you can see, my mean and sigma are big values, it creates the problem that hs goes to infinity that gives an error. While if I put something like mu =3 and sigma =1, it works, any suggestions for big numbers?

Update 1 :

I corrected my code with the first answer, but now I only get a straight line :

`````` mu, sigma = 136519 , 50405 # mean and standard deviation

normal_std = np.sqrt(np.log(1 + (sigma/mu)**2))
normal_mean = np.log(mu) - normal_std**2 / 2
hs = np.random.lognormal(normal_mean, normal_std, 1000)
print(hs.max())    # some finite number

#    hs = np.random.lognormal(mu, sigma, 1000) #mean, s dev , Size
#
count, bins, ignored = plt.hist(hs, 100, normed=True)

x = np.linspace(min(bins), max(bins), 10000)
pdfT = [];
for el in range (len(x)):
pdfTmp = (math.exp(-(np.log(x[el]) - mu)**2 / (2 * sigma**2)))
pdfT += [pdfTmp]

#plt.axis('tight')
pdf = np.asarray(pdfT)
plt.plot(x, pdf, linewidth=2, color='r')
``````

The parameters mu and sigma in np.random.lognormal are not the mean and STD of the lognormal distribution. They are the mean and STD of the underlying normal distribution, that is of `log(X)`. This means that by passing `136519` for the mean you ask NumPy to generate numbers of size `exp(136519)` which is about `10**60000`, far beyond the double precision limits.

With a bit of algebra you can get the correct parameters for `np.random.lognormal` from the ones you have.

``````mu, sigma = 136519., 50405.
normal_std = np.sqrt(np.log(1 + (sigma/mu)**2))
normal_mean = np.log(mu) - normal_std**2 / 2
hs = np.random.lognormal(normal_mean, normal_std, 1000)
print(hs.max())    # some finite number
• Because you are again using wrong values of mu and sigma there. Just one line is needed to compute `pdf`: `pdf = np.exp(-(np.log(x) - normal_mean)**2 / (2 * normal_std**2))`