Description
Book SynopsisContains the exercises and their solutions for Lang's second edition of "Undergraduate Analysis." The variety of exercises, which range from computational to more conceptual and which are of varying difficulty, cover several subjects. This volume also serves as an independent source for those interested in learning analysis or linear algebra.
Table of Contents0 Sets and Mappings.- I Real Numbers.- II Limits and Continuous Functions.- III Differentiation.- IV Elementary Functions.- V The Elementary Real Integral.- VI Normed Vector Spaces.- VII Limits.- VIII Compactness.- IX Series.- X The Integral in One Variable.- XI Approximation with Convolutions.- XII Fourier Series.- XIII Improper Integrals.- XIV The Fourier Integral.- XV Functions on n-Space.- XVI The Winding Number and Global Potential Functions.- XVII Derivatives in Vector Spaces.- XVIII Inverse Mapping Theorem.- XIX Ordinary Differential Equations.- XX Multiple Integrals.- XXI Differential Forms.
