| • Science | • People | • Locations | • Timeline |
| Contents | ||
The method of logarithms was first propounded in 1614, in a book entitled Mirifici Logarithmorum Canonis Descriptio, by John Napier (latinized Neperus), Baron of Merchiston in Scotland, who was born about 1550, and died in 1618, four years after the publication of his memorable invention. This method contributed to the advance of science, and especially of astronomy, by facilitating the difficult calculations without which that advance could not have been made. Prior to the advent of calculators and computers, it was constantly used in surveying, navigation, and other branches of practical mathematics. Besides their usefulness in computation, logarithms also fill an important place in the higher theoretical mathematics.
Joost Bürgi, a Swiss clockmaker in the employ of the Duke of Hesse-Kassel had, however, first conceived of logarithms, but only published later.
The word logarithm, which is due to Napier, is a portmanteau formed from λoγoς (logos), ratio, and αριθμoς (arithmos), number, and means a number that indicates a ratio. It refers to the proposition which was made by Napier his fundamental theorem, that the difference of two logarithms determines the ratio of the numbers for which they stand, so that an arithmetical series of logarithms corresponds to a geometric series of numbers.
The base of a system of logarithms is a fixed number to which all numbers are referred in that system. It may have positive value except unity.
The logarithm of a number in any system is the exponent of the power to which the base of the system must be raised to produce that number.
The antilogarithm of a number is that number of which the given number is the logarithm; in other words, it is that power of the base of which the given number is the exponent.
So, in a system of logarithms of which 8 is the base,
In general, if and have any such values as to satisfy the equation , we have, in the system of which is the base, and and either of the two latter equations may be regarded as equivalent to the former.
Napier at first called logarithms artificial numbers, and antilogarithms natural numbers. The word antilogarithm was introduced in the 1800's and, while convenient, its use was never widespread.
If b > 0 and x = by, then y is the logarithm of x in the base b (meaning y is the power we have to raise b to, in order to get x), and we write logbx = y. For example,
The function logb(x) is defined whenever x is a positive real number and b is a positive real number different from 1. See logarithmic identities for several rules governing the logarithm functions.
Logarithms are useful in order to solve equations in which the unknown appears in the exponent, and they often occur as the solution of differential equationIn mathematics, a differential equation is an equation that describes a prescribed relationship between a set of unknowns which are to be regarded as an unknown function and its (ordinary or partial) derivatives. In practice the "unknown function" is usuas because of their simple derivativeCalculus In mathematics, the derivative of a function is one of the two central concepts of calculus. The inverse of a derivative is called the antiderivative, or indefinite integral. The derivative of a function at a certain point is a measure of the rats. Furthermore, various quantities in science are expressed by their logarithms; see logarithmic scaleValue Logarithmic scales give the logarithm of a quantity instead of the quantity itself. This is often done if the underlying quantity can take on a huge range of values; the logarithm reduces this to a more manageable range. Some of our senses operate i for an explanation and a list.
For integerThe integers consist of the positive natural numbers (1, 2, 3, …) the negative natural numbers (−1, −2, −3,. and the number zero. The set of all integers is usually denoted in mathematics by Z (or Z in blackboard bold, ), which sts a and b, the number logba is irrationalIn mathematics, an irrational number is any real number that is not a rational number, i. one that cannot be written as a fraction a ''b with a and b integers, and b not zero. It can readily be shown that the irrational numbers are precisely those numbers (i.e., not a quotient of two integers) if one of a and b has a prime factorIn number theory, the prime factors of a positive integer are the prime numbers that divide into that integer exactly, without leaving a remainder. Two positive integers are coprime if and only if they have no prime factors in common. The integer 1 is cop which the other does not (and in particular if they are coprimeIn mathematics, the integers a and b are said to be coprime or relatively prime iff they have no common factor other than 1 and -1, or equivalently, if their greatest common divisor is 1. For example, 6 and 35 are coprime, but 6 and 27 are not because the and both greater than 1).