# Difference between revisions of "Logarithms"

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− | [[Category:CookBook]] | + | [[Category:CookBook]][[Category:NumberRecipes]] |

## Revision as of 23:12, 3 September 2006

## Problem

You want to take a logarithm in various bases.

## Solution

For logarithms to base e, use the built-in math:log:

1> math:log( math:exp(2) ). 2.00000 2> math:log( 2.718281828 ). 1.000000

Note that log is often called ln in the mathematical literature.

Erlang generally uses the underlying C runtime library of your chosen operating system to provide the various mathematical primitives, including the natural logarithm (ln, which is written log in Erlang). If you want logarithms in some other base you need to use the standard mathematical relation:

log(x) log (x) = --------- n log(n)

Example:

To find the base 10 logarithm of 1.82:

log(1.82) log (1.82) = ----------- 10 log(10) 3> math:log(1.82) / math:log(10). 0.260071

You may not be satisfied with five digits of precision. The Erlang command line interface makes a guess about what level of detail you want for display. You can override this via a call to format:

4> io:format("~.16f~n", [ math:log(1.82) / math:log(10) ]). 0.2600713879850748

Incidentally, note that "~n" is equivalent to "\n" in the various io module functions.

The most common bases besides e is 2 and 10. These logarithms are often called log2 and log10. While log10 is defined in the standard Erlang distribution, log2 is not. It can be trivially defined by:

log2(X) -> math:log(X) / math:log(2).

To avoid recomputation of the denominator at each call, one can use:

-define(log2denom, 0.69314718055994529). log2(X) -> math:log(X) / ?log2denom.

A general version is:

logN(N, X) -> math:log(X) / math:log(N). 5> logN(10, 1.82). 0.260071 6> io:format("~.16f~n", [logN(10, 1.82)]). 0.2600713879850748