Carl Friedrich Gauss Essays

The Fundamental Theorem of algebra doesn’t have anything to do with the start of algebra rather it does have something to do with polynomials. It is the theorem of equation solving. It was first proved by Carl Friedrich Gauss (1800) as such the linear factors and irreducible quadratic polynomials are both the building block of all polynomial. The linear factors is the polynomials of degree 1 .The Fundamental Theorem of Algebra tells us when we have factored a polynomial completely. A polynomial

During this tie, Germain also returned to her passion for number theory. In 1819, she resumed her correspondence with Gauss, in which she described her solution to Fermat’s last theorem. Her solution stated that there is no solution for the equation xn + yn = zn if n is an integer greater than 2 and x, y, and z are nonzero integers. She proved the special case in which

In my research paper I will be talking about Marie Sophie Germain, a famous mathematician born and raised in Paris, France. I chose Sophie Germain because I believe that female historical figures deserve the equal amount of recognition that males receive. She also caught my attention because she had no support at all, and because of that would receive education secretly. I believe that Germain has taught us that even though we will encounter obstacles on our path, with determination and perseverance

Sophie Germain is the person who I chose to do this biography because I truly admire her admiration for getting a education. Sophie Germain was born April 1, 1776 Sophie Germain was was born in Rue Saint-Denis, Paris, France she is known for elasticity theory, differential geometry, number theory, and Sophie Germain prime numbers. Sophie Germain parents were wealthy but never let her study or get a education because that wasnt meant for a woman to do back then, remember we are talking about many

students learn in school, the math that computer programmers use, even the math that architects use, were all founded, and proved by mathematicians who are never given the appreciation that they deserve. One of these great mathematicians is Georg Friedrich Bernhard Riemann. In calculus classes, there are lessons on Riemann Sums, one of his more famous calculus contributions, and one of the easiest graphing lessons I ever had. He was able to prove something in a way that strayed away from complicated

in 1831, published her paper on the curvature of elastic surfaces. She also published principles of examination that would later lead to the discovery of laws of equilibrium and the movement of elastic solids.” Later in life, she reconnected with Gauss who convinced the University he worked at to give her an honorary degree. Unfortunately, Germain died on June 27, 1831” at the age of 55 in Paris, France before the University could present her with her degree (pbs.org). Because of the bias of her

which had been published by the mathematician as supplement of the second edition of his original book.After reading Carl Friedrich Gauss’ book ‘Disquisitiones Arithmeticae’, Sophie Germain wrote to the author in 1804 regarding her own ideas in relation to Fermat’s Last Theorem. According to many, Germain’s theories did not have solid proofs and she never got a response from Gauss regarding this subject.} The French Academy of Sciences conducted a mathematics competition in which the contestants

He is one of the most influential mathematicians in terms of the study of primes. Recall Euler’s Zeta function, ∑_(n=1)^∞▒1/n^s . It would be Riemann, who was a student of Gauss, to allow s to be complex numbers and further Euler’s fuction. These complex numbers were in the form of a real number + some number(i). This allowed Riemann to begin to search the zeta function and find it’s zeros in a plane with the number line as

Sophie also read various works from Carl Friedrich Gauss, a world-famous number theorist, and began corresponding with him, sharing her own proofs to various theorems. Of course, all her correspondence was done using her pseudonym M. LeBlanc. 3.1.1 Germain’s Attempt to Solve Fermat’s Last Theorem

ignored. While, another individual named, L. Euler introduced i as the symbol for square root of negative one. In addition, Jean Robert Argand wrote how to plot these complex numbers in a plane. This is now known as Argand diagram. Then in 1831, Carl Friedrich Gauss made Argand’s idea popular and then took Descartes’ a+bi notation and called it a complex number. Lastly, William Rowan Hamilton expressed complex numbers as real numbers by expressing 4+3i as (4,3)) and thus making it

Samuel Morse was born April 27, 1791 In Charlestown Massachusetts. He died from pneumonia April 2, 1872 in New York, New York, while married to his second wife Sarah Elizabeth Griswold. He was the first child to his father Jedidiah Morse and mother Elizabeth Ann Finley Breese. His religious views were protestant, he was very anti-catholic, and thought slavery was simply fate. In “An Argument On The Ethical Position of Slavery”, he touched down on the subject by saying, “ He attended Yale University

Hebb thought of a theory which attempted to acknowledge the influence of both genetics and environmental influences on child intelligence; the notion Intelligence A and Intelligence B. Intelligence A is regarding the individual's potential attainable intelligence inherited through their genes. Intelligence B is how far this genetic potential can reach as a result of the child's experience in their environment. Vernon added Intelligence C to these, which takes into account that intelligence tests

LeBlanc. Sophie wrote a paper and gave it to her teacher, who was impressed by the impressive paper received at the end of term and wished to meet the student who wrote it. Her fascination and inspiration stemmed from a German mathematician named Carl Friedrich Gauss in 1804. She eagerly provided him with papers and theories that she had meticulously crafted in her mind. However, this exchange was short-lived. In 1807,

Archimedes is known for his prestigious works in geometry and science, as well as for his many inventions and innovations in his time. Historians project his birth date to be around 287 BC, and the whereabouts of his birth to be in Syracuse, Sicily (Rorres 15). Syracuse, at the time, being an independent Greek city-state. Growing up, Archimedes was very bright and somewhat gifted with an intellect from before his time. His father Pheidias, a greek astronomer, is also known for is intellect and thought