# Logarithm Algorithm

I need to evaluate a logarithm of any base, it does not matter, to some precision. Is there an algorithm for this? I program in Java, so I'm fine with Java code.

How to find a binary logarithm very fast? (O(1) at best) might be able to answer my question, but I don't understand it. Can it be clarified?

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The tricks mentioned in that question take advantage of the way numbers are stored in memory. You had better rely on Math's (or BigInteger/BigDecimal's) methods if you do not fully understand those tricks. Anyway, they take advantage of the fact that numbers are internally represented very closely to their representation in base 2. In Java you have no unions, instead you get the raw bits of a double via Double.doubleToRawLongBits. – ignis Dec 12 '12 at 1:16
BigInteger and BigDecimal do not contain log methods. – Justin Dec 12 '12 at 1:18
exactly. for ints use that obvious bit shift in a counted loop. – vaxquis Dec 12 '12 at 1:55

Use this identity:

``````logb(n) = log(n) / log(b)
``````

Where `log` can be a logarithm function in any base, `n` is the number and `b` is the base. For example, in Java this will find the base-2 logarithm of 256:

``````Math.log(256) / Math.log(2)
=> 8.0
``````

`Math.log()` uses base `e`, by the way. And there's also `Math.log10()`, which uses base `10`.

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I know that identity. I want to calculate a logarithm with more precision than a double can give. – Justin Dec 12 '12 at 1:18
@user1896169 in that case, switch to `BigDecimal` and use this recipe for calculating the logarithm – Óscar López Dec 12 '12 at 1:19
Math.log() default base is e – abc123 Dec 12 '12 at 1:22
@Óscar López, I tried that, my compiler (Eclipse) doesn't know what intRoot is, and I don't know what intRoot means – Justin Dec 12 '12 at 1:25
@user1896169 a quick search in google yielded this link with a complete implementation of the functions – Óscar López Dec 12 '12 at 1:32