Evariste Galois succeeded in clarifying the solvability of algebraic equations by root quantities (radicals). He used group theory for this purpose - do my homework for me . Evariste Galois was born on 25 October 1811 in Bourg-la-Reine, near Paris, the eldest son of a boarding school director. Later - during the so-called Hundred Days - his father became mayor (suicide in 1829).
Galois was initially taught by his mother. In 1823 he passed the entrance examination at the College Louis-le Grand in Paris and entered the fourth class. By participating in a circle of pupils - matlab homework help , he became acquainted at an early age with the textbook of geometry by A. M. Legendre (1752 to 1833), which was widely used at the time. While studying this work, he discovered his talent for mathematics and began to read original mathematical literature (by Legendre and GAUSS, among others) with great interest. Thus he also became familiar with the results of Niels H. Abel (1802 to 1829) on the solvability of equations of the nth degree.
After graduating from the College Louis-le Grand in 1828, Galois tried to study at the Ecole polytechnique. However, he failed the entrance examination twice: First, he failed because of major gaps in the mathematical school material, later because of the examiner's incompetence (it is reported that Galois did not use the usual term of the time when asked about logarithms, which led to a heated dispute with the examiner - with the result that Galois is said to have thrown the sponge in the examiner's face).
So in 1830, Evariste Galois only moved into a so-called preparatory school where grammar school teachers were trained. Already in the same year, he issued his first publications - domyhomework.club/accounting-homework/ , which, however, were relatively insignificant and hardly attracted any attention. Another treatise submitted to the Academy was lost (as was Abel's work probably due to the negligence of A. L. Cauchy).