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Éditeur Pragati prakashan
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Titre : Advanced course in modern algebra : a complete study of modern algebra including galois theory, solvable groups, modules. for(honours, post-graduate and ias students) Type de document : texte imprimé Auteurs : J.K. GOYAL, Auteur ; K.P. GUPTA, Auteur Editeur : Pragati prakashan Année de publication : 2006 Importance : 636 p. Format : 25 cm. ISBN/ISSN/EAN : 978-81-7556-984-3 Langues : Anglais (eng) Catégories : MATHÉMATIQUES:Algébre Index. décimale : 04-03 Algébre Résumé : Introduction 1. Symbols and Their Meanings 2. Basic Concepts of Set 3. Basic Set Operations 4. Relations and Ordered Sets 5. Functions 6. Countability and Sequences 7. Groups 8. Subgroups 9. Normal Series and Composition Series 10. Finite Groups 11. Rings 12. Vectir Spaces 13. Extension Fields 14. Galois Theory 15. Nilpotent and Solvable Groups 16. Modules 17. Noetherian Rings ans Artinian Rings 18. Canonical Forms
SOMMAIRE:
Introduction 1. Symbols and Their Meanings 2. Basic Concepts of Set 3. Basic Set Operations 4. Relations and Ordered Sets 5. Functions 6. Countability and Sequences 7. Groups 8. Subgroups 9. Normal Series and Composition Series 10. Finite Groups 11. Rings 12. Vectir Spaces 13. Extension Fields 14. Galois Theory 15. Nilpotent and Solvable Groups 16. ModulesAdvanced course in modern algebra : a complete study of modern algebra including galois theory, solvable groups, modules. for(honours, post-graduate and ias students) [texte imprimé] / J.K. GOYAL, Auteur ; K.P. GUPTA, Auteur . - Pragati prakashan, 2006 . - 636 p. ; 25 cm.
ISBN : 978-81-7556-984-3
Langues : Anglais (eng)
Catégories : MATHÉMATIQUES:Algébre Index. décimale : 04-03 Algébre Résumé : Introduction 1. Symbols and Their Meanings 2. Basic Concepts of Set 3. Basic Set Operations 4. Relations and Ordered Sets 5. Functions 6. Countability and Sequences 7. Groups 8. Subgroups 9. Normal Series and Composition Series 10. Finite Groups 11. Rings 12. Vectir Spaces 13. Extension Fields 14. Galois Theory 15. Nilpotent and Solvable Groups 16. Modules 17. Noetherian Rings ans Artinian Rings 18. Canonical Forms
SOMMAIRE:
Introduction 1. Symbols and Their Meanings 2. Basic Concepts of Set 3. Basic Set Operations 4. Relations and Ordered Sets 5. Functions 6. Countability and Sequences 7. Groups 8. Subgroups 9. Normal Series and Composition Series 10. Finite Groups 11. Rings 12. Vectir Spaces 13. Extension Fields 14. Galois Theory 15. Nilpotent and Solvable Groups 16. ModulesRéservation
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Code-barres type de document numéro d'inventaire Cote Support Localisation Section Disponibilité 00001001040466 04-03-308 Livre Magazin Documentaires Disponible 178292 00001001040458 04-03-308 Livre Magazin Documentaires Disponible 178291 00001000702561 04-03-308 Livre Magazin Documentaires Disponible 178293 00001000550465 04-03-308 Livre Salle 1 Documentaires Exclu du prêt 165634
Titre : A Text book on fortran programming Type de document : texte imprimé Auteurs : M. P. THAPLIYAL, Auteur ; M.M.S. RAUTHAN, Auteur Editeur : Pragati prakashan Année de publication : 2008 Importance : 170 p. Format : 25 cm. ISBN/ISSN/EAN : 978-81-8398-124-8 Langues : Anglais (eng) Catégories : INFORMATIQUE:Logiciels et programmation Index. décimale : 08-02 Logiciels et programmation A Text book on fortran programming [texte imprimé] / M. P. THAPLIYAL, Auteur ; M.M.S. RAUTHAN, Auteur . - Pragati prakashan, 2008 . - 170 p. ; 25 cm.
ISBN : 978-81-8398-124-8
Langues : Anglais (eng)
Catégories : INFORMATIQUE:Logiciels et programmation Index. décimale : 08-02 Logiciels et programmation Exemplaires(1)
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Titre : Complete solutions to differential calculus : according to revised & enlarged edition of the text book Type de document : texte imprimé Auteurs : V. P. GOYAL, Auteur ; Ram Dev SHARMA, Auteur Editeur : Pragati prakashan Importance : 676 p. Format : 24 cm. Langues : Anglais (eng) Catégories : MATHÉMATIQUES:Analyse Index. décimale : 04-02 Analyse Résumé : In mathematics, differential calculus is a subfield of calculus[1] concerned with the study of the rates at which quantities change. It is one of the two traditional divisions of calculus, the other being integral calculus, the study of the area beneath a curve.[2]
The primary objects of study in differential calculus are the derivative of a function, related notions such as the differential, and their applications. The derivative of a function at a chosen input value describes the rate of change of the function near that input value. The process of finding a derivative is called differentiation. Geometrically, the derivative at a point is the slope of the tangent line to the graph of the function at that point, provided that the derivative exists and is defined at that point. For a real-valued function of a single real variable, the derivative of a function at a point generally determines the best linear approximation to the function at that point.
Differential calculus and integral calculus are connected by the fundamental theorem of calculus, which states that differentiation is the reverse process to integration.
Differentiation has applications to nearly all quantitative disciplines. For example, in physics, the derivative of the displacement of a moving body with respect to time is the velocity of the body, and the derivative of velocity with respect to time is acceleration. The derivative of the momentum of a body with respect to time equals the force applied to the body; rearranging this derivative statement leads to the famous F = ma equation associated with Newton's second law of motion. The reaction rate of a chemical reaction is a derivative. In operations research, derivatives determine the most efficient ways to transport materials and design factories.
Derivatives are frequently used to find the maxima and minima of a function. Equations involving derivatives are called differential equations and are fundamental in describing natural phenomena. Derivatives and their generalizations appear in many fields of mathematics, such as complex analysis, functional analysis, differential geometry, measure theory, and abstract algebra.
SOMMAIRE:
REAL NUMBERS AND FUNCTIONS
LIMITS AND CONTINUITY
DIFFERENTIATION- SIMPLE CASE
DIFFERENTIATION MORE DIFFICULT CASES
SIMPLE APPLICATIONS
SUCCESSIVE DIFFERENTIATION
CONVERGENCE OF SERIES
EXPANSION OF FUNCTIONS
TANGENT AND NORMAL
ASYMPTOTES
CURVATURE
SINGULAR POINTS CURVE TRACING
PARTIAL DIFFERENTIATION
ENVELOPES EVOLUTES
MAXIMA AND MINIMA
INDETERMINATE FORMS DIFFERENTIALS
DIFFERENTIATION OF VECTOR FUNCTIONSComplete solutions to differential calculus : according to revised & enlarged edition of the text book [texte imprimé] / V. P. GOYAL, Auteur ; Ram Dev SHARMA, Auteur . - Pragati prakashan, [s.d.] . - 676 p. ; 24 cm.
Langues : Anglais (eng)
Catégories : MATHÉMATIQUES:Analyse Index. décimale : 04-02 Analyse Résumé : In mathematics, differential calculus is a subfield of calculus[1] concerned with the study of the rates at which quantities change. It is one of the two traditional divisions of calculus, the other being integral calculus, the study of the area beneath a curve.[2]
The primary objects of study in differential calculus are the derivative of a function, related notions such as the differential, and their applications. The derivative of a function at a chosen input value describes the rate of change of the function near that input value. The process of finding a derivative is called differentiation. Geometrically, the derivative at a point is the slope of the tangent line to the graph of the function at that point, provided that the derivative exists and is defined at that point. For a real-valued function of a single real variable, the derivative of a function at a point generally determines the best linear approximation to the function at that point.
Differential calculus and integral calculus are connected by the fundamental theorem of calculus, which states that differentiation is the reverse process to integration.
Differentiation has applications to nearly all quantitative disciplines. For example, in physics, the derivative of the displacement of a moving body with respect to time is the velocity of the body, and the derivative of velocity with respect to time is acceleration. The derivative of the momentum of a body with respect to time equals the force applied to the body; rearranging this derivative statement leads to the famous F = ma equation associated with Newton's second law of motion. The reaction rate of a chemical reaction is a derivative. In operations research, derivatives determine the most efficient ways to transport materials and design factories.
Derivatives are frequently used to find the maxima and minima of a function. Equations involving derivatives are called differential equations and are fundamental in describing natural phenomena. Derivatives and their generalizations appear in many fields of mathematics, such as complex analysis, functional analysis, differential geometry, measure theory, and abstract algebra.
SOMMAIRE:
REAL NUMBERS AND FUNCTIONS
LIMITS AND CONTINUITY
DIFFERENTIATION- SIMPLE CASE
DIFFERENTIATION MORE DIFFICULT CASES
SIMPLE APPLICATIONS
SUCCESSIVE DIFFERENTIATION
CONVERGENCE OF SERIES
EXPANSION OF FUNCTIONS
TANGENT AND NORMAL
ASYMPTOTES
CURVATURE
SINGULAR POINTS CURVE TRACING
PARTIAL DIFFERENTIATION
ENVELOPES EVOLUTES
MAXIMA AND MINIMA
INDETERMINATE FORMS DIFFERENTIALS
DIFFERENTIATION OF VECTOR FUNCTIONSRéservation
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Titre : Computer and languages with C Type de document : texte imprimé Auteurs : Chanchal MITTAL, Auteur Editeur : Pragati prakashan Année de publication : 2003 Importance : 658 p. Format : 25 cm. ISBN/ISSN/EAN : 978-81-7556-456-5 Langues : Anglais (eng) Catégories : INFORMATIQUE:Logiciels et programmation Index. décimale : 08-02 Logiciels et programmation Computer and languages with C [texte imprimé] / Chanchal MITTAL, Auteur . - Pragati prakashan, 2003 . - 658 p. ; 25 cm.
ISBN : 978-81-7556-456-5
Langues : Anglais (eng)
Catégories : INFORMATIQUE:Logiciels et programmation Index. décimale : 08-02 Logiciels et programmation Exemplaires(1)
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Titre : Computer graphics Type de document : texte imprimé Auteurs : A. K. PRAJAPATI, Auteur Editeur : Pragati prakashan Année de publication : 2006 Importance : 340 p. Format : 25 cm. ISBN/ISSN/EAN : 978-81-8398-041-8 Langues : Anglais (eng) Catégories : INFORMATIQUE:Informatique générale Index. décimale : 08-01 Informatique générale Computer graphics [texte imprimé] / A. K. PRAJAPATI, Auteur . - Pragati prakashan, 2006 . - 340 p. ; 25 cm.
ISBN : 978-81-8398-041-8
Langues : Anglais (eng)
Catégories : INFORMATIQUE:Informatique générale Index. décimale : 08-01 Informatique générale Réservation
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