natural logarithm - meaning and definition. What is natural logarithm
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What (who) is natural logarithm - definition

LOGARITHM TO THE BASE OF THE MATHEMATICAL CONSTANT E
Natural logarithm integral condition; Integrating the derivative of the logarithm of a function; Natural log; Natural logarithms; ㏑; Base-e logarithm; Ln(x); Ln x; Log natural; Base e; Natural Log; Natural Logarithm; Hyperbolic logarithms; Logarithmus naturalis; Base e logarithm; Logarithm of the base e; Natural logarithm plus 1; Natural logarithm plus 1 function; Lnp1; Ln1p; Ln+1; Logh (mathematics); Logh (function); Log1p; Log1p(x); Lnp1(x); Ln1p(x); LN1+X; LN(1+X); Ln(1+x); Natural system of logarithms; Natural logarithm near one; Natural logarithm plus one; Natural logarithm plus one function; Natural logarithm near 1; Ln(1 + x); Ln(x + 1); Ln(x+1)
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  • The Taylor polynomials for ln(1 + ''x'') only provide accurate approximations in the range −1 < ''x'' ≤ 1. Beyond some ''x'' > 1, the Taylor polynomials of higher degree are increasingly ''worse'' approximations.

natural logarithm         
¦ noun Mathematics a logarithm to the base e (2.71828 ...).
Napierian logarithm         
  • A plot of the Napierian logarithm for inputs between 0 and 10<sup>8</sup>.
  • The 19 degree pages from Napier's 1614 table of logarithms of trigonometric functions ''[[Mirifici Logarithmorum Canonis Descriptio]]''
MATHEMATICAL FUNCTION
Napier's logarithm; Naperian logarithm; Naperian system of logarithms
[ne?'p??r??n]
¦ noun another term for natural logarithm.
Origin
C19: named after the Scottish mathematician John Napier (1550-1617).
antilogarithm         
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  • alt=An oval shape with the trajectories of two particles.
  • alt=A density plot. In the middle there is a black point, at the negative axis the hue jumps sharply and evolves smoothly otherwise.
  • alt=An illustration of the polar form: a point is described by an arrow or equivalently by its length and angle to the x-axis.
  • alt=A graph of the value of one mark over time. The line showing its value is increasing very quickly, even with logarithmic scale.
  • e}}
  • alt=A graph of the logarithm function and a line touching it in one point.
  • alt=The graphs of two functions.
  • TI-83 Plus]] graphing calculator
  • alt=A hyperbola with part of the area underneath shaded in grey.
  • alt=The hyperbola depicted twice. The area underneath is split into different parts.
  • alt=A photograph of a nautilus' shell.
  • μ}}, which is zero for all three of the PDFs shown, is the mean of the logarithm of the random variable, not the mean of the variable itself.
  • alt=Parts of a triangle are removed in an iterated way.
  • alt=An animation showing increasingly good approximations of the logarithm graph.
INVERSE OF THE EXPONENTIAL FUNCTION, WHICH MAPS PRODUCTS TO SUMS
Logarithmic algorithm; Antilogarithm; Logathrims; Logarithms; Logarithmic function; Antilog; Logarithim; Colog; Cologarithm; Log (mathematics); Logarithm function; Napier logarithm; Logarithm Table in Trigonometry; Logarithm of a number; Log(x); Logarhythm; Anti-logarithm; Anti-Logarithm; Logarithmic functions; Log function; Logaritm; Change of base rule; Logarithmand; Logarithmically; Logarithm base; Base of a logarithm; Log-transform; Logrithm; Log (function); Double logarithm; Logarithmus; Generic logarithm; Decadic antilogarithm; Natural antilogarithm; Binary antilogarithm; Decimal antilogarithm; Common antilogarithm; General antilogarithm; 3-logarithm; Draft:Direct Differentiation and Integration of Logarithms
¦ noun the number of which a given number is the logarithm.

Wikipedia

Natural logarithm

The natural logarithm of a number is its logarithm to the base of the mathematical constant e, which is an irrational and transcendental number approximately equal to 2.718281828459. The natural logarithm of x is generally written as ln x, loge x, or sometimes, if the base e is implicit, simply log x. Parentheses are sometimes added for clarity, giving ln(x), loge(x), or log(x). This is done particularly when the argument to the logarithm is not a single symbol, so as to prevent ambiguity.

The natural logarithm of x is the power to which e would have to be raised to equal x. For example, ln 7.5 is 2.0149..., because e2.0149... = 7.5. The natural logarithm of e itself, ln e, is 1, because e1 = e, while the natural logarithm of 1 is 0, since e0 = 1.

The natural logarithm can be defined for any positive real number a as the area under the curve y = 1/x from 1 to a (with the area being negative when 0 < a < 1). The simplicity of this definition, which is matched in many other formulas involving the natural logarithm, leads to the term "natural". The definition of the natural logarithm can then be extended to give logarithm values for negative numbers and for all non-zero complex numbers, although this leads to a multi-valued function: see Complex logarithm for more.

The natural logarithm function, if considered as a real-valued function of a positive real variable, is the inverse function of the exponential function, leading to the identities:

e ln x = x  if  x  is strictly positive, ln e x = x  if  x  is any real number. {\displaystyle {\begin{aligned}e^{\ln x}&=x\qquad {\text{ if }}x{\text{ is strictly positive,}}\\\ln e^{x}&=x\qquad {\text{ if }}x{\text{ is any real number.}}\end{aligned}}}

Like all logarithms, the natural logarithm maps multiplication of positive numbers into addition:

ln ( x y ) = ln x + ln y   . {\displaystyle \ln(x\cdot y)=\ln x+\ln y~.}

Logarithms can be defined for any positive base other than 1, not only e. However, logarithms in other bases differ only by a constant multiplier from the natural logarithm, and can be defined in terms of the latter, log b x = ln x / ln b = ln x log b e {\displaystyle \log _{b}x=\ln x/\ln b=\ln x\cdot \log _{b}e} .

Logarithms are useful for solving equations in which the unknown appears as the exponent of some other quantity. For example, logarithms are used to solve for the half-life, decay constant, or unknown time in exponential decay problems. They are important in many branches of mathematics and scientific disciplines, and are used to solve problems involving compound interest.