In this classic of mathematical literature, first published in 1884, Felix Klein elegantly demonstrates how the rotation of icosahedron can be used to solve complex quintic equations. Divided into two parts-qTheory of the Icosahedronq and qThe Theory of Equations of the Fifth Degreeq-The Icosahedron covers: . the regular solids and the theory of groups . introduction of (x + iy) . statement and discussion of the fundamental problem, according to the theory of functions . the algebraical character of the fundamental problem . general theorems and survey of the subject . the historical development of the theory of equations of the fifth degree . introduction of geometrical material . the canonical equations of the fifth degree . the problem of the A's and the Jacobian equations of the sixth degree . the general equation of the fifth degree Complete with detailed equations and instructive material, The Icosahedron will be valued by experts in higher mathematics and students of algebra alike. German mathematician FELIX KLEIN (1849-1925) specialized in function theory, group theory, and non-Euclidean geometry. His published works include Elementary Mathematics from an Advanced Standpoint: Arithmetic, Algebra, Analysis; Elementary Mathematics from an Advanced Standpoint: Geometry; and Famous Problems of Elementary Geometry.The object of this exposition is, as we have repeatedly pointed out, to place the solution of equations of the fifth ... 1877), and in Bd. xiii of the Math. ... der Gleiohungen S, Grades aquot; (Bd. 14 of the Annalen, May 1878), and aquot; Ueber die Aufldsung gewisser Gleiohungen von 7. und 8. Grade aquot; (Bd. 15 of the Annalen, March 1879).
|Title||:||Lectures on the Icosahedron and the Solution of the Fifth Degree|
|Publisher||:||Cosimo, Inc. - 2007|