Natural Logarithm

Notational conventions

Mathematicians generally understand either "ln(x)" or "log(x)" to mean log_e(x), i.e., the natural logarithm of x, and write "log₁₀(x)" if the base-10 logarithm of x is intended. Engineers, biologists, and some others write only "ln(x)" or (occasionally) "log_e(x)" when they mean the natural logarithm of x, and take "log(x)" to mean log₁₀(x).

Most of the reason for thinking about base-10 logarithms became obsolete shortly after about 1970 when hand-held calculators became widespread (for more on this point, see common logarithm). Nonetheless, since calculators are made and often used by engineers, the conventions to which engineers were accustomed continued to be used on calculators, so now most non-mathematicians take "log(x)" to mean the base-10 logarithm of x and use only "ln(x)" to refer to the natural logarithm of x. As recently as 1984, Paul Halmos in his autobiography heaped contempt on what he considered the childish "ln" notation, which he said no mathematician had ever used. (The notation was in fact invented in 1893 by Irving Stringham, professor of mathematics at Berkeley.) At the time of this writing (2003), many mathematicians have adopted the "ln" notation, but "log" also remains in widespread use.

To avoid all confusion, Wikipedia uses the notation ln(x) for the natural logarithm of x and log₁₀(x) for the base-10 logarithm of x.

Alternatively, if the exponential function has been defined first using an infinite series, the natural logarithm may be defined as its inverse function, meaning ln(x) is that number for which e^ln(x) = x. Since the range of the exponential function is all positive real numbers and since the exponential function is strictly increasing, this is well-defined for all positive x.

ln(z) = ln(r) + iφ

e^ln(z) = z     for all nonzero z

A somewhat more natural definition of ln(z) interprets it as a multi-valued function: for z = r e^iφ we set

ln(z) = { ln(r) + i(φ + 2πk) : k any integer }

The preferred way to deal with multivalued functions like this in complex analysis is via Riemann surfaces: the function ln is then non defined on the complex plane but instead on a suitable Riemann surface having countably many "leaves" and the values of the function differ by 2πi from leaf to leaf.

Here is the natural logarithm integrated: