Siegmund Guenther

Adam Günther
Adam Günther
Born	6 February 1848; Nuremberg, Germany
Died	3 February 1923 (aged 74); Munich, Germany
	Scientific career
Fields	Mathematics
Thesis	Studien zur theoretischen Photometrie (1872)

Adam Wilhelm Siegmund Günther (6 February 1848 – 3 February 1923) was a German geographer, mathematician, historian of mathematics and natural scientist.

Early life

Born in 1848 to a German businessman, Günther would go on to attend several German universities including Erlangen, Heidelberg, Leipzig, Berlin, and Göttingen.[1]

Career

In 1872 he began teaching at a school in Weissenburg, Bavaria. He completed his habilitation thesis on continued fractions entitled Darstellung der Näherungswerte der Kettenbrüche in independenter Form in 1873. The next year he began teaching at Munich Polytechnicum. In 1876, he began teaching at a university in Ansbach where he stayed for several years before moving to Munich and becoming a professor of geography until he retired.[1]

His mathematical work[1] included works on the determinant, hyperbolic functions, and parabolic logarithms and trigonometry.[2]

Publications (selection)

Darstellung der Näherungswerthe der Kettenbrüche in independenter Form. Eduard Besold, Erlangen, 1873
Vermischte Untersuchungen zur Geschichte der mathematischen Wissenschaften. Teubner, Leipzig, 1876
Lehrbuch der Determinanten-Theorie für Studirende. Eduard Besold, Erlangen, 1877
Die Lehre von den gewöhnlichen und verallgemeinerten Hyperbelfunktionen. Louis Nebert, Halle, 1881
Parabolische Logarithmen und parabolische Trigonometrie. Teubner, Leipzig, 1882

References

"Adam Wilhelm Siegmund Günther Biography". www-history.mcs.st-andrews.ac.uk. School of Mathematics and Statistics University of St Andrews, Scotland. Retrieved 4 July 2015.
This is about connecting the rectified length of line segments along a parabola, giving logarithms for appropriate coordinates, and trigonometric values for suitable angles, in a similar way as the area under a hyperbola defines the natural logarithm, and a hyperbolic angle is defined via the area of a hyperbolically truncated triangle.

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[mcs-1] "Adam Wilhelm Siegmund Günther Biography". www-history.mcs.st-andrews.ac.uk. School of Mathematics and Statistics University of St Andrews, Scotland. Retrieved 4 July 2015.

[2] This is about connecting the rectified length of line segments along a parabola, giving logarithms for appropriate coordinates, and trigonometric values for suitable angles, in a similar way as the area under a hyperbola defines the natural logarithm, and a hyperbolic angle is defined via the area of a hyperbolically truncated triangle.

Siegmund Guenther

Early life

Career

Publications (selection)

Further reading

References