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Biblioteca

MARC Lista (tabellare)
Calcolo differenziale 1 : funzioni di una variabile reale / Robert A. Adams
Calcolo differenziale 1 : funzioni di una variabile reale / Robert A. Adams
Autore Adams, Robert Alexander
Pubbl/distr/stampa Milano : CEA, c1992
Descrizione fisica [xvi], 648 p. : ill. ; 24 cm
Disciplina 515.33
Soggetto topico Calculus
Differential calculus
ISBN 8840807330
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione ita
Record Nr. UNISALENTO-991003437779707536
Adams, Robert Alexander  
Milano : CEA, c1992
Materiale a stampa
Lo trovi qui: Univ. del Salento
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Calcolo differenziale 2 : funzioni di più variabili / Robert A. Adams
Calcolo differenziale 2 : funzioni di più variabili / Robert A. Adams
Autore Adams, Robert Alexander
Edizione [2. ed.]
Descrizione fisica xii, 458 p. : ill. ; 24 cm
Disciplina 515.33
Soggetto topico Calculus
Differential calculus
ISBN 8840810242
Classificazione AMS 26-01
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione ita
Record Nr. UNISALENTO-991003339709707536
Adams, Robert Alexander  
Materiale a stampa
Lo trovi qui: Univ. del Salento
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Calcolo differenziale e integrale / N. Piskunov
Calcolo differenziale e integrale / N. Piskunov
Autore Piskunov, Nikolaj Semenovic
Edizione [2. ed.]
Pubbl/distr/stampa Roma : Editori Riuniti, 1979
Descrizione fisica 2 v. ; 22 cm
Disciplina 517
Collana Nuova biblioteca di cultura. Serie scientifica ; 137/I
Nuova biblioteca di cultura. Serie scientifica ; 137/II
Soggetto topico Real functions - Textbooks
Differential calculus
Calculus, Integral
Classificazione 510.26
LC QA303
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione ita
Record Nr. UNISALENTO-991003667019707536
Piskunov, Nikolaj Semenovic  
Roma : Editori Riuniti, 1979
Materiale a stampa
Lo trovi qui: Univ. del Salento
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Calcolo differenziale e principii di calcolo integrale / Angelo Genocchi ; pubblicato con aggiunte dal Dr. Giuseppe Peano
Calcolo differenziale e principii di calcolo integrale / Angelo Genocchi ; pubblicato con aggiunte dal Dr. Giuseppe Peano
Autore Genocchi, Angelo
Pubbl/distr/stampa Torino [etc.] : Fratelli Bocca, 1884
Descrizione fisica xxxii, 336 p. ; 25 cm
Disciplina 515.33
Altri autori (Persone) Peano, Giuseppe
Soggetto topico Differential calculus
Real functions
Classificazione AMS 26-01
LC QA304.B78
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione ita
Record Nr. UNISALENTO-991001888269707536
Genocchi, Angelo  
Torino [etc.] : Fratelli Bocca, 1884
Materiale a stampa
Lo trovi qui: Univ. del Salento
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Calcul différentiel / Camille Jordan
Calcul différentiel / Camille Jordan
Autore Jordan, Camille
Edizione [3e éd., Réimpression]
Pubbl/distr/stampa Sceaux : Editions J. Gabay, c1991
Descrizione fisica [vii, 310] p. : ill. ; 18 x 23 cm.
Disciplina 515
Collana Les grands classiques Gauthier-Villars, ISSN 09890602
Cours d'analyse de l'école polytechnique ; 1
Soggetto topico Differential calculus
ISBN 2876470187
Classificazione AMS 26-03
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione fre
Record Nr. UNISALENTO-991000728419707536
Jordan, Camille  
Sceaux : Editions J. Gabay, c1991
Materiale a stampa
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Come costruire i grafici / G. E. Shilov. Problemi elementari di massimo e minimo / I. P. Nathanson
Come costruire i grafici / G. E. Shilov. Problemi elementari di massimo e minimo / I. P. Nathanson
Autore Shilov, G. E.
Pubbl/distr/stampa Milano : Progresso Tecnico Editoriale, 1965
Descrizione fisica 67 p. ; 19 cm.
Disciplina 515
Altri autori (Persone) Nathanson, I. P.
Collana Argomenti di matematica
Soggetto topico Didactis of mathematics
Differential calculus
Classificazione AMS 00A35
ZDM I30
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione ita
Record Nr. UNISALENTO-991000759519707536
Shilov, G. E.  
Milano : Progresso Tecnico Editoriale, 1965
Materiale a stampa
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Derivative with a new parameter : theory, methods and applications / / Abdon Atangana
Derivative with a new parameter : theory, methods and applications / / Abdon Atangana
Autore Atangana Abdon
Pubbl/distr/stampa Amsterdam, [Netherlands] : , : Academic Press, , 2016
Descrizione fisica 1 online resource (0 p.)
Disciplina 515.33
Soggetto topico Derivatives (Mathematics)
Differential calculus
ISBN 0-12-803825-X
0-08-100644-6
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Record Nr. UNINA-9910797664303321
Atangana Abdon  
Amsterdam, [Netherlands] : , : Academic Press, , 2016
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Derivative with a new parameter : theory, methods and applications / / Abdon Atangana
Derivative with a new parameter : theory, methods and applications / / Abdon Atangana
Autore Atangana Abdon
Pubbl/distr/stampa Amsterdam, [Netherlands] : , : Academic Press, , 2016
Descrizione fisica 1 online resource (0 p.)
Disciplina 515.33
Soggetto topico Derivatives (Mathematics)
Differential calculus
ISBN 0-12-803825-X
0-08-100644-6
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Record Nr. UNINA-9910823293003321
Atangana Abdon  
Amsterdam, [Netherlands] : , : Academic Press, , 2016
Materiale a stampa
Lo trovi qui: Univ. Federico II
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Differential and integral calculus . Volume 1 [[electronic resource] /] / by R. Courant ; translated by E.J. McShane
Differential and integral calculus . Volume 1 [[electronic resource] /] / by R. Courant ; translated by E.J. McShane
Autore Courant Richard <1888-1972.>
Edizione [2nd ed.]
Pubbl/distr/stampa Hoboken, NJ, : Wiley, 1988
Descrizione fisica 1 online resource (634 p.)
Disciplina 515
Altri autori (Persone) McShaneE. J <1904-> (Edward James)
Collana Wiley classics library
Soggetto topico Calculus
Differential calculus
ISBN 1-283-29875-9
9786613298751
1-118-03323-X
1-118-03149-0
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Differential and Integral Calculus; CONTENTS; Introductory Remarks; Chapter I INTRODUCTION; 1. The Continuum of Numbers; 2. The Concept of Function; 3. More Detailed Study of the Elementary Functions; 4. Functions of an Integral Variable. Sequences of Numbers; 5. The Concept of the Limit of a Sequence; 6. Further Discussion of the Concept of Limit; 7. The Concept of Limit where the Variable is Continuous; 8. The Concept of Continuity; APPENDIX I; Preliminary Remarks; 1. The Principle of the Point of Accumulation and its Applications; 2. Theorems on Continuous Functions
3. Some Remarks on the Elementary FunctionsAPPENDIX II; 1. Polar Co-ordinates; 2. Remarks on Complex Numbers; Chapter II THE FUNDAMENTAL IDEAS OF THE INTEGRAL AND DIFFERENTIAL CALCULUS; 1. The Definite Integral; 2. Examples; 3. The Derivative; 4. The Indefinite Integral, the Primitive Function, and the Fundamental Theorems of the Differential and Integral Calculus; 5. Simple Methods of Graphical Integration; 6. Further Remarks on the Connexion between the Integral and the Derivative; 7. The Estimation of Integrals and the Mean Value Theorem of the Integral Calculus; APPENDIX
1. The Existence of the Definite Integral of a Continuous Function2. The Relation between the Mean Value Theorem of the Differential Calculus and the Mean Value Theorem of the Integral Calculus; Chapter III DIFFERENTIATION AND INTEGRATION OF THE ELEMENTARY FUNCTIONS; 1. The Simplest Rules for Differentiation and their Applications; 2. The Corresponding Integral Formulae; 3. The Inverse Function and its Derivative; 4. Differentiation of a Function of a Function; 5. Maxima and Minima; 6. The Logarithm and the Exponential Function; 7. Some Applications of the Exponential Function
8. The Hyperbolic Functions9. The Order of Magnitude of Functions; APPENDIX; 1. Some Special Functions; 2. Remarks on the Differentiability of Functions; 3. Some Special Formulae; Chapter IV FURTHER DEVELOPMENT OF THE INTEGRAL CALCULUS; 1. Elementary Integrals; 2. The Method of Substitution; 3. Further Examples of the Substitution Method; 4. Integration by Parts; 5. Integration of Rational Functions; 6. Integration of Some Other Classes of Functions; 7. Remarks on Functions which are not Integrable in Terms of Elementary Functions; 8. Extension of the Concept of Integral. Improper Integrals
APPENDIXThe Second Mean Value Theorem of the Integral Calculus; Chapter V APPLICATIONS; 1. Representation of Curves; 2. Applications to the Theory of Plane Curves; 3. Examples; 4. Some very Simple Problems in the Mechanics of a Particle; 6. Work; APPENDIX; 1. Properties of the Evolute; 2. Areas bounded by Closed Curves; Chapter VI TAYLOR'S THEOREM AND THE APPROXIMATE EXPRESSION OF FUNCTIONS BY POLYNOMIALS; 1. The Logarithm and the Inverse Tangent; 2. Taylor's Theorem; 3. Applications. Expansions of the Elementary Functions; 4. Geometrical Applications; APPENDIX
1. Example of a Function which cannot be expanded in a Taylor Series
Record Nr. UNINA-9910139726403321
Courant Richard <1888-1972.>  
Hoboken, NJ, : Wiley, 1988
Materiale a stampa
Lo trovi qui: Univ. Federico II
Opac: Controlla la disponibilità qui
Differential and integral calculus . Volume 1 [[electronic resource] /] / by R. Courant ; translated by E.J. McShane
Differential and integral calculus . Volume 1 [[electronic resource] /] / by R. Courant ; translated by E.J. McShane
Autore Courant Richard <1888-1972.>
Edizione [2nd ed.]
Pubbl/distr/stampa Hoboken, NJ, : Wiley, 1988
Descrizione fisica 1 online resource (634 p.)
Disciplina 515
Altri autori (Persone) McShaneE. J <1904-> (Edward James)
Collana Wiley classics library
Soggetto topico Calculus
Differential calculus
ISBN 1-283-29875-9
9786613298751
1-118-03323-X
1-118-03149-0
Formato Materiale a stampa
Livello bibliografico Monografia
Lingua di pubblicazione eng
Nota di contenuto Differential and Integral Calculus; CONTENTS; Introductory Remarks; Chapter I INTRODUCTION; 1. The Continuum of Numbers; 2. The Concept of Function; 3. More Detailed Study of the Elementary Functions; 4. Functions of an Integral Variable. Sequences of Numbers; 5. The Concept of the Limit of a Sequence; 6. Further Discussion of the Concept of Limit; 7. The Concept of Limit where the Variable is Continuous; 8. The Concept of Continuity; APPENDIX I; Preliminary Remarks; 1. The Principle of the Point of Accumulation and its Applications; 2. Theorems on Continuous Functions
3. Some Remarks on the Elementary FunctionsAPPENDIX II; 1. Polar Co-ordinates; 2. Remarks on Complex Numbers; Chapter II THE FUNDAMENTAL IDEAS OF THE INTEGRAL AND DIFFERENTIAL CALCULUS; 1. The Definite Integral; 2. Examples; 3. The Derivative; 4. The Indefinite Integral, the Primitive Function, and the Fundamental Theorems of the Differential and Integral Calculus; 5. Simple Methods of Graphical Integration; 6. Further Remarks on the Connexion between the Integral and the Derivative; 7. The Estimation of Integrals and the Mean Value Theorem of the Integral Calculus; APPENDIX
1. The Existence of the Definite Integral of a Continuous Function2. The Relation between the Mean Value Theorem of the Differential Calculus and the Mean Value Theorem of the Integral Calculus; Chapter III DIFFERENTIATION AND INTEGRATION OF THE ELEMENTARY FUNCTIONS; 1. The Simplest Rules for Differentiation and their Applications; 2. The Corresponding Integral Formulae; 3. The Inverse Function and its Derivative; 4. Differentiation of a Function of a Function; 5. Maxima and Minima; 6. The Logarithm and the Exponential Function; 7. Some Applications of the Exponential Function
8. The Hyperbolic Functions9. The Order of Magnitude of Functions; APPENDIX; 1. Some Special Functions; 2. Remarks on the Differentiability of Functions; 3. Some Special Formulae; Chapter IV FURTHER DEVELOPMENT OF THE INTEGRAL CALCULUS; 1. Elementary Integrals; 2. The Method of Substitution; 3. Further Examples of the Substitution Method; 4. Integration by Parts; 5. Integration of Rational Functions; 6. Integration of Some Other Classes of Functions; 7. Remarks on Functions which are not Integrable in Terms of Elementary Functions; 8. Extension of the Concept of Integral. Improper Integrals
APPENDIXThe Second Mean Value Theorem of the Integral Calculus; Chapter V APPLICATIONS; 1. Representation of Curves; 2. Applications to the Theory of Plane Curves; 3. Examples; 4. Some very Simple Problems in the Mechanics of a Particle; 6. Work; APPENDIX; 1. Properties of the Evolute; 2. Areas bounded by Closed Curves; Chapter VI TAYLOR'S THEOREM AND THE APPROXIMATE EXPRESSION OF FUNCTIONS BY POLYNOMIALS; 1. The Logarithm and the Inverse Tangent; 2. Taylor's Theorem; 3. Applications. Expansions of the Elementary Functions; 4. Geometrical Applications; APPENDIX
1. Example of a Function which cannot be expanded in a Taylor Series
Record Nr. UNISA-996209051903316
Courant Richard <1888-1972.>  
Hoboken, NJ, : Wiley, 1988
Materiale a stampa
Lo trovi qui: Univ. di Salerno
Opac: Controlla la disponibilità qui