# Logarithmic series of numbers from 1 to MAX

I'd like to calculate a logarithmic range of numbers from 1 to MAX, with the approximate total count of numbers being TOTAL.

A non-logarithmic example might be:

``````\$max = 3600;
\$total = 100;

\$range = array();
for(\$i = \$total; \$i > 0; \$i--){
\$range[] = round(\$max/\$i);
}
``````

This creates a roughly equally distributed range however. I'd like the range to have the majority of its numbers in the start, and the less numbers toward the end-- via a logarithmic scale. The total number of values isn't a strict restriction, just an estimate.

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The funny thing about a logarithmic scale is that the elements of your `\$range` array (those are the values `x` that you might use to calculate the function values `fct(x)` later) actually have an exponential behaviour, not a logarithmic one. If you look at this Wikipedia image, you can see that the axis ticks are 10^1, 10^2, 10^3 etc. - this is exponential growth (I'm talking about the axis ticks, not the function itself!).

To generate this, use

``````\$max = 3600;
\$total = 100;

\$range = array();
for(\$i = 0; \$i < \$total; \$i++) {
\$range[] = pow(\$max,\$i/(\$total - 1));
}
``````
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Using PDL seems to be your best bet here:

``````require_once '../LognormalDistribution.php';
require_once 'make_table.php';

\$mu     = 0.0;
\$sigma  = 1.0;

\$lognormal = new LognormalDistribution(\$mu, \$sigma);

\$Output1 = \$lognormal->PDF(.2);
\$Output2 = \$lognormal->ICDF(0.95);
\$Output3 = \$lognormal->CDF(.50);
``````

Hope that helps...

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