# Creat Log-normal Random Variable in MATLAB [closed]

I have trouble with the probability density function (p.d.f) of a log-normal distribution. I really need your help. As defined by wikipedia: http://en.wikipedia.org/wiki/Log-normal_distribution#Probability_density_function

The probability density function of a log-normal distribution is:

My problem is, how to define x variable in MATLAB? Thanks for your help!

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What have you tried so far? –  Oleg Komarov Jun 27 at 20:55
yeap, i have tried many time but it not successful. i really need hints from everybody. –  user2443165 Jun 27 at 21:44

## closed as unclear what you're asking by woodchips, bensiu, Jeremy J Starcher, Antal S-Z, イオニカ ビザウJun 28 at 5:36

Please clarify your specific problem or add additional details to highlight exactly what you need. As it's currently written, it’s hard to tell exactly what you're asking.If this question can be reworded to fit the rules in the help center, please edit the question.

If you have the Stats toolbox, you can just use `lognpdf`:

``````y = lognpdf(x,mu,sigma);
``````

Though this is a very simple function - fully vectorized, it's effectively just:

y = exp(-0.5*((log(x)-mu)./sigma).^2)./(x.*sqrt(2*pi).*sigma);

But you may want to check that `x > 0` and `sig > 0`. To create this plot on the Wikipedia article that you cited, you can do:

``````mu = 0;
sigma = [1;0.5;0.25];
x = 0:0.01:3;
y = lognpdf([x;x;x],mu,sigma(:,ones(1,length(x))));
figure; plot(x,y);
``````

When your question asks about defining `x`, maybe you're actually looking for log-normally distributed random variables, i.e., you want to sample randomly from the log-normal PDF/distribution? In that case you can use `lognrnd`:

``````r = lognrnd(mu,sigma);
``````
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Thanks. maybe this is thing i am looking for. i will try again –  user2443165 Jun 27 at 22:02
i think that "x = 0:0.01:3;" should be replaced by x = 0:0.1:3; :) –  user2443165 Jun 27 at 23:27
@user2443165: It certainly can be replaced by that if you like. You'll just have a larger spacing between your `x` samples and end up with a blocky plot, just as with any discretizing any function. –  horchler Jun 27 at 23:40
Thanks my friend. i did it! :) –  user2443165 Jun 28 at 7:20

I'm confused, like you can do this in a one-liner,

``````fun = @(x,mu,sigma) (1./(x*sigma*sqrt(2*pi))).*exp( -(power((log(x)-mu),2))/(2*power(sigma,2)))
``````

`x` is any value that satisfies `x > 0`, the pdf tells you via Wikipedia

In probability theory, a probability density function (pdf), or density of a continuous random variable, is a function that describes the relative likelihood for this random variable to take on a given value.

So any value `x` given to the log-normal pdf tells you tel relative likelihood that a random variable could be that value.

Consider this toy example:

``````mu = 1;
sigma = 10;
x = logspace(-2,0,10);
plot( x, fun(x,1,10) )
``````

From this plot as `x` gets closer to zero, it's relative likelihood of actually taking on that value increases. DISCLAIMER I just threw that function together, it needs to be checked for accuracy, the preceding was for illustration only.

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I had not come across `logspace` before. Very nice use of that function! –  Floris Jun 27 at 21:28
Thanks. i will try by your hint, my friend! –  user2443165 Jun 27 at 21:46