Mathematics for Economists: An Introductory TextbookManchester University Press, 2001 - 613 pages This text for undergraduates provides a thorough and self-contained treatment of all the mathematics commonly taught in honours degree economics. Features include extensive coverage of linear algebra, emphasizing its links with calculus and differential equations. |
Table des matières
LINEAR EQUATIONS | 1 |
LINEAR INEQUALITIES | 19 |
SETS AND FUNCTIONS | 35 |
vi | 52 |
QUADRATICS INDICES AND LOGARITHMS | 53 |
SEQUENCES AND SERIES | 69 |
INTRODUCTION TO DIFFERENTIATION | 86 |
METHODS OF DIFFERENTIATION | 107 |
IMPLICIT RELATIONS | 271 |
ОРTІMISATION WITH SEVERAL VARIABLES | 294 |
PRINCIPLES OF CONSTRAINED OPTIMISATION | 318 |
FURTHER TOPICS IN CONSTRAINED OPTIMISATION | 347 |
viii | 370 |
ASPECTS OF INTEGRAL CALCULUS | 398 |
INTRODUCTION TO DYNAMICS | 415 |
THE CIRCULAR FUNCTIONS | 442 |
ΜΑΧIMA AND MINIMA | 121 |
ΕΧΡΟNENTIAL AND LOGARITHMIC FUNCTIONS | 147 |
APPROXIMATIONS | 165 |
MATRIX ALGEBRA | 184 |
SYSTEMS OF LINEAR EQUATIONS | 203 |
DETERMINANTS AND QUADRATIC FORMS | 224 |
FUNCTIONS OF SEVERAL VARIABLES | 245 |
COMPLEX NUMBERS | 466 |
FURTHER DYNAMICS | 483 |
EIGENVALUES AND EIGENVECTORS | 511 |
DYNAMIC SYSTEMS | 533 |
Notes on Further Reading | 570 |
| 607 | |
Autres éditions - Tout afficher
Mathematics for Economists: An Introductory Textbook Malcolm Pemberton,Nicholas Rau Affichage d'extraits - 2001 |
Mathematics For Economists: An Introductory Textbook, Second Edition Malcolm Pemberton,Nicholas Rau Aucun aperçu disponible - 2007 |
Expressions et termes fréquents
algebra apply approximation c₁ calculate Chapter columns complex numbers concave concave function consider constrained maximum constraint convex convex function critical point curve defined definite demand functions denote diagonal entries diagram difference equation differential equation echelon matrix economics eigenvalues eigenvectors envelope theorem Example Exercises fact Figure fixed point function f generalise geometric progression given global maximum Hence income indifference curves inequality input integration invertible isoquant linearly linearly independent local maximum logarithms maximise mean value theorem method minimise minimum point multiplier n-vector negative non-negative notation output panel particular solution positive constants positive number problem production function quantity quasi-concave real number result roots satisfies scalar Section semidefinite Similarly Simpson's rule slope solve square matrix Suppose symmetric matrix tangent theorem utility function variables vector xy-plane zero ду
Références à ce livre
Giving Credit Where Due: A Path to Global Poverty Reduction Robert F. Clark Affichage d'extraits - 2006 |