| Titre : |
How to learn calculus of one variable V.1 |
| Type de document : |
texte imprimé |
| Auteurs : |
J. D. GHOSH, Auteur ; Md. ANWARUL HAQUE, Auteur |
| Editeur : |
NEW AGE |
| Année de publication : |
2005 |
| Importance : |
693 p. |
| Format : |
25 cm. |
| ISBN/ISSN/EAN : |
978-81-224-1529-2 |
| Langues : |
Anglais (eng) |
| Catégories : |
MATHÉMATIQUES:Analyse
|
| Index. décimale : |
04-02 Analyse |
| Résumé : |
"How to Learn Calculus of One Variable" a central part in many branches of Physics and Engineering. The present book tries to bring out some of the most important concepts associates with the theoretical aspects which is quite exhaustively. The entire book in a manner can help the student to learn the methods of Calculus and theoretical aspects.
These techniques are presented in this book in a lucid manner with a large number of example, students will easily understand the principles of Calculus. It helps to solve most examples and reasonings.
This book mainly caters to the need of Intermediate and competitive students, who will find it a pleasure in this book. It can also be useful for all users of Mathematics and for all Mathematical Modelers.
SOMMAIRE:
FUNCTION
LIMIT AND LIMIT POINTS
CONTINUITY OF A FUNCTION
PRACTICAL METHODS OF FINDING THE LIMITS
PRACTICAL METHODS OF CONTINUITY TEST
DERIVATIVE OF A FUNCTION
DIFFERENTIABILITY AT A POINT
RULES OF DIFFERENTIATION
CHAIN RULE FOR THE DERIVATIVE
DIFFERENTIATION OF INVERSE TRIGONOMETRIC FUNCTIONS
DIFFERENTIAL COEFFICIENT OF MOD FUNCTIONS
IMPLICIT DIFFERENTIATION
LOGARITHMIC DIFFERENTIATION
SUCCESSIVE DIFFERENTIATION
L'HOSPITAL'S RULE
EVALUATION OF DERIVATIVES FOR PARTICULAR ARGUMENTS
DERIVATIVES AS RATE MEASURER
APPROXIMATIONS
TANGENT AND NORMAL TO A CURVE
ROLLE'S THEOREM AND LAGRANGE'S MEAN VALUE THEOREM
MONOTONOCITY OF A FUNCTION
MAXIMA AND MINIMA |
How to learn calculus of one variable V.1 [texte imprimé] / J. D. GHOSH, Auteur ; Md. ANWARUL HAQUE, Auteur . - NEW AGE, 2005 . - 693 p. ; 25 cm. ISBN : 978-81-224-1529-2 Langues : Anglais ( eng)
| Catégories : |
MATHÉMATIQUES:Analyse
|
| Index. décimale : |
04-02 Analyse |
| Résumé : |
"How to Learn Calculus of One Variable" a central part in many branches of Physics and Engineering. The present book tries to bring out some of the most important concepts associates with the theoretical aspects which is quite exhaustively. The entire book in a manner can help the student to learn the methods of Calculus and theoretical aspects.
These techniques are presented in this book in a lucid manner with a large number of example, students will easily understand the principles of Calculus. It helps to solve most examples and reasonings.
This book mainly caters to the need of Intermediate and competitive students, who will find it a pleasure in this book. It can also be useful for all users of Mathematics and for all Mathematical Modelers.
SOMMAIRE:
FUNCTION
LIMIT AND LIMIT POINTS
CONTINUITY OF A FUNCTION
PRACTICAL METHODS OF FINDING THE LIMITS
PRACTICAL METHODS OF CONTINUITY TEST
DERIVATIVE OF A FUNCTION
DIFFERENTIABILITY AT A POINT
RULES OF DIFFERENTIATION
CHAIN RULE FOR THE DERIVATIVE
DIFFERENTIATION OF INVERSE TRIGONOMETRIC FUNCTIONS
DIFFERENTIAL COEFFICIENT OF MOD FUNCTIONS
IMPLICIT DIFFERENTIATION
LOGARITHMIC DIFFERENTIATION
SUCCESSIVE DIFFERENTIATION
L'HOSPITAL'S RULE
EVALUATION OF DERIVATIVES FOR PARTICULAR ARGUMENTS
DERIVATIVES AS RATE MEASURER
APPROXIMATIONS
TANGENT AND NORMAL TO A CURVE
ROLLE'S THEOREM AND LAGRANGE'S MEAN VALUE THEOREM
MONOTONOCITY OF A FUNCTION
MAXIMA AND MINIMA |
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