Mercator Series

In mathematics, the Mercator series or Newton–Mercator series is the Taylor series for the natural logarithm:

:$\ln(1+x)=x-\frac+\frac-\frac+\cdots$

In summation notation,

:$\ln(1+x)=\sum_^\infty \frac x^n.$

The series converges to the natural logarithm (shifted by 1) whenever -1 .

History

The series was discovered independently by Johannes Hudde and Isaac Newton. It was first published by Nicholas Mercator, in his 1668 treatise ''Logarithmotechnia''.

Derivation

The series can be obtained from Taylor's theorem, by inductively computing the ''n''^th derivative of $\ln(x)$ at $x=1$ , starting with

:$\frac\ln(x)=\frac1.$

Alternatively, one can start with the finite geometric series ($t\ne -1$)

:$1-t+t^2-\cdots+(-t)^=\frac$

which gives

:$\frac1=1-t+t^2-\cdots+(-t)^+\frac.$

It follows that

:$\int_0^x \frac=\int_0^x \left(1-t+t^2-\cdots+(-t)^+\frac\right)\ dt$

and by termwise integration,

:$\ln(1+x)=x-\frac+\frac-\cdots+(-1)^\frac+(-1)^n \int_0^x \frac\ dt.$

If -1 , the remainder term tends to 0 as $n\to\infty$.

This expression may be integrated iteratively ''k'' more times to yield

:$-xA_k(x)+B_k(x)\ln(1+x)=\sum_^\infty (-1)^\frac,$
where

:$A_k(x)=\frac1\sum_^kx^m\sum_^\frac$
and
:$B_k(x)=\frac1(1+x)^k$
are polynomials in ''x''.

Special cases

Setting $x=1$ in the Mercator series yields the alternating harmonic series

:$\sum_^\infty \frac=\ln(2).$

Complex series

The complex power series

:$\sum_^\infty \frac=z+\frac+\frac+\frac+\cdots$

is the Taylor series for $-\log(1-z)$ , where log denotes the principal branch of the complex logarithm. This series converges precisely for all complex number $, z, \le 1,z\ne 1$. In fact, as seen by the ratio test, it has radius of convergence equal to 1, therefore converges absolutely on every disk ''B''(0, ''r'') with radius ''r'' < 1. Moreover, it converges uniformly on every nibbled disk $\overline\setminus B(1,\delta)$, with ''δ'' > 0. This follows at once from the algebraic identity:

:$(1-z)\sum_^m \frac=z-\sum_^m \frac-\frac,$
observing that the right-hand side is uniformly convergent on the whole closed unit disk.

See also

* John Craig

References

*
* Anton von Braunmühl (1903
Vorlesungen über Geschichte der Trigonometrie
Seite 134, via Internet Archive
* Eriksson, Larsson & Wahde. ''Matematisk analys med tillämpningar'', part 3. Gothenburg 2002. p. 10.
*
Some Contemporaries of Descartes, Fermat, Pascal and Huygens
' from ''A Short Account of the History of Mathematics'' (4th edition, 1908) by W. W. Rouse Ball

{{DEFAULTSORT:Mercator Series
Mathematical series
Logarithms