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Analyse I (partie 6)

Etudes des fonctions, développements limités

Peter Wittwer

L'étude des fonctions est la discussion de certaines de ses propriétés. Pour cela, nous avons besoin de certains théorèmes permettant par exemple de trouver les variations de la fonction étudiée. Nous avons déjà vu le théorème des accroissements finis. Dans ce chapitre, nous étudions sa généralisation. Lorsque nous étudions une fonction, nous voulons aussi connaître son comportement à l'infini. Malheureusement les limites de certaines fonctions peuvent être assez compliquées à étudier, c'est pour cela que nous introduisons la règle de Bernoulli-l'Hospital et la démontrons. Cette règle utilise la dérivée dans le but de déterminer les limites difficiles à calculer de la plupart des quotients. Après avoir étudié le comportement d'une fonction à l'infini, nous nous intéressons aussi à sa représentation graphique. Nous nous posons les questions suivantes : la fonction admet-elle un maximum ou un minimum local? La fonction admet-elle un maximum ou un minimum global? La fonction est-elle convexe ou concave? Existe-t-il des asymptotes verticales, horizontales ou obliques? Afin de pouvoir répondre à ces différentes questions, nous définissons des critères qui vont nous permettre de pouvoir étudier la fonction en détail. Finalement, nous appliquons cette théorie sur une fonction à l'aide d'un exemple. Le développement limité d'une fonction en un point est une approximation polynomiale de cette fonction au voisinage de ce point. Il permet entre autre de trouver plus simplement des limites de fonctions, de calculer des dérivées ou encore d'étudier les propriétés de la fonction. Nous commençons par définir précisément le développement limité d'une fonction. Nous définissons aussi les fonctions de classe Cn. Au début cette formule peut paraître abstraite, nous donnons donc une interprétation graphique ainsi que des exemples pour des fonctions connues. Nous continuons à manipuler des développements limités en calculant la composition de deux développements limités à l'aide de deux exemples. Cette discussion sur les développements limités nous amène à étudier les séries entières et leur rayon de convergence. Les séries entières possèdent des propriétés de convergence remarquables. Réciproquement, certaines fonctions indéfiniment dérivables peuvent être écrites au voisinage d'un de leurs points comme une série entière. C'est la série de Taylor. Nous étudions un exemple : la série géométrique. Nous étudions en détail la série de Taylor d'une fonction ainsi que certains contre-exemples. Finalement, nous terminons cette discussion par la formule d'Euler. Cette formule est fondée sur les développements en série entière de la fonction exponentielle avec une variable complexe et des fonctions sin et cos.

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What's inside

Learning objectives

Théorème des accroissements finis généralisé
Règle de bernoulli de l'hospital
Discussion du graphe d'une fonction
Convexité
Extrema
Exemple d'étude d'une fonction
Développements limités
Fonctions de classe c^k
Formule de taylor
Interprétation du théorème

Application au calcul des limites
Composition de développements limités
Séries entières
Rayon de convergence
Fonctions définis par des séries entières
Dérivées des fonctions définies par des séries entières
Série de taylor d'une fonction
Exemple de base, la série géométrique
Contre‐exemple de base
La formule d'euler

Théorème des accroissements finis généralisé
Règle de bernoulli de l'hospital
Discussion du graphe d'une fonction
Convexité
Extrema
Exemple d'étude d'une fonction
Développements limités
Fonctions de classe c^k
Formule de taylor
Interprétation du théorème
Application au calcul des limites
Composition de développements limités
Séries entières
Rayon de convergence
Fonctions définis par des séries entières
Dérivées des fonctions définies par des séries entières
Série de taylor d'une fonction
Exemple de base, la série géométrique
Contre‐exemple de base
La formule d'euler

Syllabus

Chapitre 9 : Etudes des fonctions

9.1 Théorème des accroissements finis généralisé

9.2 Règle de Bernoulli de l'Hospital

9.3 Démonstrations du théorème de BH

9.4 Démonstrations du Théorème 8.2

9.5 Discussion du graphe d'une fonction

9.6 Critères

9.7 Exemple d'étude d'une fonction

9.8 Asymptotes (exemples)

Chapitre 10 : Développement limités

10.1 Définitions

10.2 Formule de Taylor

10.3 Interprétation du théorème

10.4 Application au calcul des limites

10.5 Composition de développements limités

10.6 Séries entières

10.7 Fonctions définis par des séries entières

10.8 Dérivées des fonctions définies par des séries entières

10.9 Série de Taylor d'une fonction

10.10 Exemple de base, la série géométrique

10.11 Contre‐exemple de base

10.12 A(re‐)connaître

10.13 La formule d'Euler

Good to know

Know what's good

, what to watch for

, and possible dealbreakers

Développe des compétences de base essentielles pour la compréhension des fonctions mathématiques

Approfondit la connaissance des fonctions et de leurs propriétés

Fournit une base solide pour les études ultérieures en mathématiques

Enseigné par des instructeurs qualifiés ayant une expertise dans le domaine

Nécessite une connaissance préalable des concepts mathématiques de base

Peut nécessiter des ressources supplémentaires pour une compréhension approfondie

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Activities

Be better prepared before your course. Deepen your understanding during and after it. Supplement your coursework and achieve mastery of the topics covered in Analyse I (partie 6) : Etudes des fonctions, développements limités with these activities:

Review limits of functions from a recent calculus course

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Clear up any deficiencies by reviewing the concept of limits of functions.

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Review the different types of limits.
Practice evaluating limits using various techniques, such as factoring, rationalization, and l'Hopital's rule.

Follow a series of online tutorials on generalized mean value theorem and Bernoulli's rule

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Expand knowledge about various theorems and their applications.

Browse courses on Differentiation

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Locate reputable online tutorials that provide clear explanations and examples.
Take notes and work through the provided examples to understand the concepts.

Complete practice problems on graphing functions and identifying their properties

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Develop proficiency in analyzing and visualizing functions.

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Find a collection of practice problems covering various types of functions.
Solve the problems, paying attention to the shape, intercepts, and extrema of the graphs.

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Create a visual representation of Taylor series and its applications

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Enhance understanding of Taylor series by creating a visual representation.

Browse courses on Taylor Series

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Choose a function and determine its Taylor series expansion.
Create a graph or diagram that illustrates the function and its Taylor approximations at different orders.

Compile a comprehensive summary of key concepts and formulas from the course

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Strengthen understanding by organizing and reviewing course materials.

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Gather all notes, assignments, and other relevant materials from the course.
Create an organized summary that includes key concepts, formulas, and examples.

Career center

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Mathematician

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Business Analyst

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Operations Research Analyst

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Statistician

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Software Engineer

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Data Analyst

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Financial Analyst

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Quantitative Analyst

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Actuary

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Computer Scientist

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Economist

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Physicist

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Engineer

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Data Scientist

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Math Teacher

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Reading list

We've selected 14 books that we think will supplement your learning. Use these to develop background knowledge, enrich your coursework, and gain a deeper understanding of the topics covered in Analyse I (partie 6) : Etudes des fonctions, développements limités.

Principles of Mathematical Analysis Textbook by...

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Ce livre classique fournit une introduction rigoureuse à l'analyse réelle, couvrant des sujets tels que les suites, les limites, les fonctions continues et les séries.

Analyse I (partie 6)

Etudes des fonctions, développements limités

Two deals to help you save

What's inside

Learning objectives

Syllabus

Good to know

Save this course

Activities

Career center

Reading list

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