Logarithm: Difference between revisions

This page describes the dyadic arithmetic function. For the monadic natural logarithm function, see Natural Logarithm.

Logarithm (⍟), or Log, is a dyadic scalar function which computes the logarithm of the two arguments. More precisely, X⍟Y computes how much power of X equals Y, i.e. the value of R that satisfies Y=X*R. Logarithm shares the glyph ⍟ with the monadic arithmetic function Natural Logarithm. The glyph, a composition of the glyphs for Circular (○) and Power (*) to indicate its close mathematical ties with these two functions, is a stylised tree log.

Examples

      2⍟0.5 1 2 32 1024
¯1 0 1 5 10

Logarithm can be used to determine how many digits are needed to write a positive integer Y in base X:

      Digits←{1+⌊⍺⍟⍵}
      ToBase←⊥⍣¯1
      (2 Digits 100) (2 ToBase 100)
┌─┬─────────────┐
│7│1 1 0 0 1 0 0│
└─┴─────────────┘
      (10 Digits 100) (10 ToBase 100)
┌─┬─────┐
│3│1 0 0│
└─┴─────┘

Properties

By definition, logarithm is the inverse of the power with the same base (left argument).

      2*1 2 3 4 5
2 4 8 16 32
      2⍟2 4 8 16 32
1 2 3 4 5
      2 (*⍣¯1 ≡ ⍟) ⍳10
1

Reciprocal on the left or right argument gives the negated result.

      2⍟÷2 4 8 16 32
¯1 ¯2 ¯3 ¯4 ¯5
      (÷2)⍟2 4 8 16 32
¯1 ¯2 ¯3 ¯4 ¯5

External links

Documentation

• Dyalog
• APLX
• J Dictionary, NuVoc