Polinômios, equações algébricas e o estudo de suas raízes reais
| Ano de defesa: | 2015 |
|---|---|
| Autor(a) principal: | |
| Orientador(a): | |
| Banca de defesa: | |
| Tipo de documento: | Dissertação |
| Tipo de acesso: | Acesso aberto |
| Idioma: | por |
| Instituição de defesa: |
Não Informado pela instituição
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| Programa de Pós-Graduação: |
Não Informado pela instituição
|
| Departamento: |
Não Informado pela instituição
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| País: |
Não Informado pela instituição
|
| Palavras-chave em Português: | |
| Link de acesso: | http://www.repositorio.ufc.br/handle/riufc/13137 |
Resumo: | This work aims to help students and high school teachers to improve their math skills in complex numbers, polynomials and polynomial equations. Initially it analysed the historical context of complex numbers then were seen some important concepts such as the body of complex numbers, imaginary unit and complex plane. In addition, the properties and basic operations of the polynomials were presented, the Briot-Ruffini device, through which we can get the quotient and remainder of the division of a polynomial p(x) by a linear polynomial. Significant part of this work was devoted to the study of algebraic equations. In this perspective, were discussed some theorems and methods of resolution of equations such as the method of Gustavo, who helps us in the resolution of equations of the third and fourth degrees, the theorem of rational roots, among others. For both, it was essential to prove the Fundamental Theorem of Algebra, which says that all polynomial not constant with complex coeficients has at least one complex root. Furthermore, we show how we can analyze the number of real roots of a polynomial equation with real coeficients. In this sense, we will prove the Theorem of Descartes, which says that the number of positive roots of an equation does not exceed the number of signal changes following its non-zero coeficients. We prove the theorem of Bolzano, which investigates the number of real roots of an equation in a real interval and finally the theorem of Lagrange the establishes an upper limit on roots of an equation. |
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Nascimento, Carlos Kleber Alves doMaia, José Alberto Duarte2015-08-17T12:30:07Z2015-08-17T12:30:07Z2015NASCIMENTO, Carlos Kleber Alves do. Polinômios, equações algébricas e o estudo de suas raízes reais. 2015. 81 f. Dissertação (Mestrado em Matemática em Rede Nacional) – Centro de Ciências, Universidade Federal do Ceará, Fortaleza, 2015.http://www.repositorio.ufc.br/handle/riufc/13137This work aims to help students and high school teachers to improve their math skills in complex numbers, polynomials and polynomial equations. Initially it analysed the historical context of complex numbers then were seen some important concepts such as the body of complex numbers, imaginary unit and complex plane. In addition, the properties and basic operations of the polynomials were presented, the Briot-Ruffini device, through which we can get the quotient and remainder of the division of a polynomial p(x) by a linear polynomial. Significant part of this work was devoted to the study of algebraic equations. In this perspective, were discussed some theorems and methods of resolution of equations such as the method of Gustavo, who helps us in the resolution of equations of the third and fourth degrees, the theorem of rational roots, among others. For both, it was essential to prove the Fundamental Theorem of Algebra, which says that all polynomial not constant with complex coeficients has at least one complex root. Furthermore, we show how we can analyze the number of real roots of a polynomial equation with real coeficients. In this sense, we will prove the Theorem of Descartes, which says that the number of positive roots of an equation does not exceed the number of signal changes following its non-zero coeficients. We prove the theorem of Bolzano, which investigates the number of real roots of an equation in a real interval and finally the theorem of Lagrange the establishes an upper limit on roots of an equation.Este trabalho visa contribuir para que alunos e professores do ensino médio possam aprimorar seus conhecimentos matemáticos em números complexos, polinômios e equações polinomiais. Inicialmente foi analisado o contexto histórico dos números complexos, em seguida foram vistos alguns conceitos importantes como o de corpo dos números complexos, unidade imaginária e plano complexo. Além disso, foram apresentadas as propriedades e operações básicas dos polinômios, o dispositivo de Briot-Ruffini, através do qual podemos obter o quociente e o resto da divisão de um polinômio p(x) por um polinômio linear. Parte significativa deste trabalho foi dedicado ao estudo de equações algébricas. Nessa perspectiva, foram discutidos alguns teoremas e métodos resolutivos de equações como o método de Gustavo, que nos auxilia na resolução de equações do terceiro e do quarto graus, o teorema das raízes racionais, entre outros. Para tanto, foi essencial provar o Teorema Fundamental da Álgebra, que afirma que todo polinômio não constante com coeficientes complexos possui pelo menos uma raiz complexa. Ademais, mostramos como podemos analisar o número de raízes reais de uma equação polinomial com coeficientes reais. Nesse sentido, provamos o Teorema de Descartes, que diz que o número de raízes positivas de uma equação não supera o número de mudanças de sinal na sequência dos seus coeficientes não nulos. Provamos também o Teorema de Bolzano, que investiga o número de raízes reais de uma equação num intervalo real e, finalmente, o Teorema de Lagrange que estabelece um limite superior das raízes reais de uma equação.Números complexosPolinômiosEquações polinomiaisPolinômios, equações algébricas e o estudo de suas raízes reaisPolynomials, algebraic equations and the study of its real rootsinfo:eu-repo/semantics/publishedVersioninfo:eu-repo/semantics/masterThesisporreponame:Repositório Institucional da Universidade Federal do Ceará (UFC)instname:Universidade Federal do Ceará (UFC)instacron:UFCinfo:eu-repo/semantics/openAccessORIGINALdis_2015_ckanascimento.pdfdis_2015_ckanascimento.pdfapplication/pdf1246805http://repositorio.ufc.br/bitstream/riufc/13137/3/dis_2015_ckanascimento.pdf604c4acf47bc58f41a8dbb208c4821d9MD53LICENSElicense.txtlicense.txttext/plain; charset=utf-81786http://repositorio.ufc.br/bitstream/riufc/13137/2/license.txt8c4401d3d14722a7ca2d07c782a1aab3MD52riufc/131372021-08-02 12:03:31.387oai:repositorio.ufc.br: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Repositório InstitucionalPUBhttp://www.repositorio.ufc.br/ri-oai/requestbu@ufc.br || repositorio@ufc.bropendoar:2021-08-02T15:03:31Repositório Institucional da Universidade Federal do Ceará (UFC) - Universidade Federal do Ceará (UFC)false |
| dc.title.pt_BR.fl_str_mv |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| dc.title.en.pt_BR.fl_str_mv |
Polynomials, algebraic equations and the study of its real roots |
| title |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| spellingShingle |
Polinômios, equações algébricas e o estudo de suas raízes reais Nascimento, Carlos Kleber Alves do Números complexos Polinômios Equações polinomiais |
| title_short |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| title_full |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| title_fullStr |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| title_full_unstemmed |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| title_sort |
Polinômios, equações algébricas e o estudo de suas raízes reais |
| author |
Nascimento, Carlos Kleber Alves do |
| author_facet |
Nascimento, Carlos Kleber Alves do |
| author_role |
author |
| dc.contributor.author.fl_str_mv |
Nascimento, Carlos Kleber Alves do |
| dc.contributor.advisor1.fl_str_mv |
Maia, José Alberto Duarte |
| contributor_str_mv |
Maia, José Alberto Duarte |
| dc.subject.por.fl_str_mv |
Números complexos Polinômios Equações polinomiais |
| topic |
Números complexos Polinômios Equações polinomiais |
| description |
This work aims to help students and high school teachers to improve their math skills in complex numbers, polynomials and polynomial equations. Initially it analysed the historical context of complex numbers then were seen some important concepts such as the body of complex numbers, imaginary unit and complex plane. In addition, the properties and basic operations of the polynomials were presented, the Briot-Ruffini device, through which we can get the quotient and remainder of the division of a polynomial p(x) by a linear polynomial. Significant part of this work was devoted to the study of algebraic equations. In this perspective, were discussed some theorems and methods of resolution of equations such as the method of Gustavo, who helps us in the resolution of equations of the third and fourth degrees, the theorem of rational roots, among others. For both, it was essential to prove the Fundamental Theorem of Algebra, which says that all polynomial not constant with complex coeficients has at least one complex root. Furthermore, we show how we can analyze the number of real roots of a polynomial equation with real coeficients. In this sense, we will prove the Theorem of Descartes, which says that the number of positive roots of an equation does not exceed the number of signal changes following its non-zero coeficients. We prove the theorem of Bolzano, which investigates the number of real roots of an equation in a real interval and finally the theorem of Lagrange the establishes an upper limit on roots of an equation. |
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2015 |
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2015-08-17T12:30:07Z |
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2015-08-17T12:30:07Z |
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2015 |
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info:eu-repo/semantics/masterThesis |
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NASCIMENTO, Carlos Kleber Alves do. Polinômios, equações algébricas e o estudo de suas raízes reais. 2015. 81 f. Dissertação (Mestrado em Matemática em Rede Nacional) – Centro de Ciências, Universidade Federal do Ceará, Fortaleza, 2015. |
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http://www.repositorio.ufc.br/handle/riufc/13137 |
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NASCIMENTO, Carlos Kleber Alves do. Polinômios, equações algébricas e o estudo de suas raízes reais. 2015. 81 f. Dissertação (Mestrado em Matemática em Rede Nacional) – Centro de Ciências, Universidade Federal do Ceará, Fortaleza, 2015. |
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