# 1911 Encyclopædia Britannica/Gauss, Karl Friedrich

**GAUSS, KARL FRIEDRICH** (1777–1855), German mathematician,
was born of humble parents at Brunswick on the 30th
of April 1777, and was indebted for a liberal education to the
notice which his talents procured him from the reigning duke.
His name became widely known by the publication, in his
twenty-fifth year (1801), of the *Disquisitiones arithmeticae.*
In 1807 he was appointed director of the Göttingen observatory,
an office which he retained to his death: it is said that he never
slept away from under the roof of his observatory, except on
one occasion, when he accepted an invitation from Baron von
Humboldt.to attend a meeting of natural philosophers at Berlin.
In 1809 he published at Hamburg his *Theoria motus corporum*
*coelestium*, a work which gave a powerful impulse to the true
methods of astronomical observation; and his astronomical
workings, observations, calculations of orbits of planets and
comets, &c., are very numerous and valuable. He continued
his labours in the theory of numbers and other analytical subjects,
and communicated a long series of memoirs to the Royal Society
of Sciences (*Königliche Gesellschaft der Wissenschaften*) at
Göttingen. His first memoir on the theory of magnetism,
*Intensitas vis magneticae terrestris ad mensuram absolutam*
*revocata*, was published in 1833, and he shortly afterwards
proceeded, in conjunction with Wilhelm Weber, to invent new
apparatus for observing the earth’s magnetism and its changes;
the instruments devised by them were the declination instrument
and the bifilar magnetometer. With Weber’s assistance he
erected in 1833 at Göttingen a magnetic observatory free from
iron (as Humboldt and F. J. D. Arago had previously done on a
smaller scale), where he made magnetic observations, and from
this same observatory he sent telegraphic signals to the neighbouring
town, thus showing the practicability of an electromagnetic
telegraph. He further instituted an association (*Magnetischer*
*Verein*), composed at first almost entirely of Germans, whose
continuous observations on fixed term-days extended from
Holland to Sicily. The volumes of their publication, *Resultate*
*aus den Beobachtungen des magnetischen Vereins*, extend from
1836 to 1839; and in those for 1838 and 1839 are contained the
two important memoirs by Gauss, *Allgemeine Theorie des Erdmagnetismus*,
and the *Allgemeine Lehrsätze*—on the theory of forces attracting according to the inverse square of the distance. The instruments and methods thus due to him are substantially those employed in the magnetic observatories throughout the world. He co-operated in the Danish and Hanoverian measurements of an arc and trigonometrical operations (1821–1848), and wrote (1843, 1846) the two memoirs *Über Gegenstände der höheren Geodäsie*. Connected with observations in general we have (1812–1826) the memoir *Theoria combinationis observationum erroribus minimis obnoxia*, with a second part and a supplement. Another memoir of applied mathematics is the *Dioptrische Untersuchungen* (1840). Gauss was well versed in general literature and the chief languages of modern Europe, and was a member of nearly all the leading scientific societies in Europe. He died at Göttingen on the 23rd of February 1855. The centenary of his birth was celebrated (1877) at his native place, Brunswick.

Gauss’s collected works were published by the Royal Society of Göttingen, in 7 vols. 4to (Gött., 1863–1871), edited by E. J. Schering —(1) the *Disquisitiones arithmeticae*, (2) *Theory of Numbers*, (3)
*Analysis*, (4) *Geometry and Method of Least Squares*, (5) *Mathematical*
*Physics*, (6) *Astronomy*, and (7) the *Theoria motus corporum*
*coelestium*. Additional volumes have since been published, *Fundamente*
*der Geometrie usw*. (1900), and *Geodatische Nachträge zu*
*Band iv*. (1903). They include, besides his various works and
memoirs, notices by him of many of these, and of works of other
authors in the *Göttingen gelehrte Anzeigen*, and a considerable amount
of previously unpublished matter, *Nachlass*. Of the memoirs in pure
mathematics, comprised for the most part in vols. ii., iii. and iv.
(but to these must be added those on *Attractions* in vol. v.), it may
be safely said there is not one which has not signally contributed
to the progress of the branch of mathematics to which it belongs,
or which would not require to be carefully analysed in a history of
the subject. Running through these volumes in order, we have in
the second the memoir, *Summatio quarundam serierum singularium*,
the memoirs on the theory of biquadratic residues, in which the notion
of complex numbers of the form *a*+*bi* was first introduced into the
theory of numbers; and included in the *Nachlass* are some valuable
tables. That for the conversion of a fraction into decimals (giving
the complete period for all the prime numbers up to 997) is a specimen
of the extraordinary love which Gauss had for long arithmetical
calculations; and the amount of work gone through in the construction
of the table of the number of the classes of binary quadratic
forms must also have been tremendous. In vol. iii. we have memoirs
relating to the proof of the theorem that every numerical equation
has a real or imaginary root, the memoir on the *Hypergeometric*
*Series*, that on *Interpolation*, and the memoir *Determinatio attractionis*—in
which a planetary mass is considered as distributed over
its orbit according to the time in which each portion of the orbit is
described, and the question (having an implied reference to the theory
of secular perturbations) is to find the attraction of such a ring. In
the solution the value of an elliptic function is found by means of
the *arithmetico-geometrical mean*. The *Nachlass* contains further researches
on this subject, and also researches (unfortunately very
fragmentary) on the lemniscate-function, &c., showing that Gauss
was, even before 1800, in possession of many of the discoveries which
have made the names of N. H. Abel and K. G. J. Jacobi illustrious.
In vol. iv. we have the memoir *Allgemeine Auflösung*, on the graphical
representation of one surface upon another, and the *Disquisitiones*
*generales circa superficies curvas*. (An account of the treatment of
surfaces which he originated in this paper will be found in the article
Surface.) And in vol. v. we have a memoir *On the Attraction of*
*Homogeneous Ellipsoids*, and the already mentioned memoir *Allgemeine Lehrsätze*, on the theory of forces attracting according to the inverse square of the distance.
(A. Ca.)