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If I want to use the gaussian random number generator in MATLAB

R = normrnd(mu,sigma)

Let mu = 1.

The question is how to choose sigma? If I want 90% of the values to be near 1.Let us say +/-0.7

Thanks

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It depends what you mean by "near". You should probably refer to the graph at e.g. en.wikipedia.org/wiki/Standard_deviation. –  Oli Charlesworth Sep 13 '11 at 18:41
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1 Answer 1

up vote 4 down vote accepted

It depends on what you mean by "near 1". In a normal distribution, 90% of the values will be within 1.65 standard deviations of the mean (about 5 % above and about 5% below). For example, if you want 90% of the values to be between 0.5 and 1.5, you need

1.65 * sigma ~= 0.5
sigma ~= 0.5 / 1.65
sigma ~= 0.3

You can look at a normal distribution table to look up the other values.
The table (excerpted below) states that ~45% of the values of a normal distribution fall between the mean and 1.65*sigma above the mean. Since the distribution is symmetric, ~45% of the values fall between the mean and 1.65*sigma below the mean and ~90% fall within +- 1.65 * sigma of the mean.

                           Area under the Normal Curve from 0 to X

X       0.00    0.01    0.02    0.03    0.04    0.05    0.06    0.07    0.08    0.09
1.5     0.43319 0.43448 0.43574 0.43699 0.43822 0.43943 0.44062 0.44179 0.44295 0.44408
1.6     0.44520 0.44630 0.44738 0.44845 0.44950 0.45053 0.45154 0.45254 0.45352 0.45449
1.7     0.45543 0.45637 0.45728 0.45818 0.45907 0.45994 0.46080 0.46164 0.46246 0.46327
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Thanks for the quick reply.I have tried google to understand practical aspect of standard deviation before asking but things are still not clear. what will be the effect of sigma? –  pac Sep 13 '11 at 18:57
    
you mean if I want 90% to be between 1 and -1, to find sigma I do 1/1.65? Another question: what is the maximum value generated (farthest from mean) –  pac Sep 13 '11 at 19:09
    
The is no upper bound on the maximum value generated for a normal distribution. All you can say is there is a small probability of a sample from the distribution being greater than a certain value. –  David Nehme Sep 13 '11 at 19:15
    
So David,I can't generate a random gaussian numbers from -4 to 4 with mean 1 and sd=0.7/1.65? –  pac Sep 13 '11 at 19:25
    
so the probability of getting 3*(0.7/1.65) is 0.1% so it is very rare (not impossible)to get value greater than 1.27 am I right? –  pac Sep 13 '11 at 19:53
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