Pages: 504,
Specialty: Mathematics,
Publisher: McGraw-Hill,
Publication Year: 1988,
Cover: Paperback,
Dimensions: 205.74x274.32x15.24mm
Master linear algebra with Schaum's - the high-performance solved-problem guide. It will help you cut study time, hone problem-solving skills, and achieve your personal best on exams! Students love Schaum's "Solved Problem Guides" because they produce results. Each year, thousands of students improve their test scores and final grades with these indispensable guides. Get the edge on your classmates. Use Schaum's. If you don't have a lot of time, but want to excel in class, use this book to: brush up before tests; study quickly and more effectively; learn the best strategies for solving tough problems in step-by-step detail; and get the big picture without spending hours pouring over long textbooks. Review what you've learned in class by solving thousands of relevant problems that test your skill.Compatible with any classroom text, Schaum's "Solved Problem Guides" let you practice at your own pace and remind you of all the important problem-solving techniques you need to remember - fast! And Schaum's are so complete, they're perfect for preparing for graduate or professional exams.Inside you will find: 3000 solved problems with complete solutions - the largest selection of solved problems yet published on linear algebra; a superb index to help you quickly locate the types of problems you want to solve; problems like those you'll find on your exams; techniques for choosing the correct approach to problems; and guidance on choosing the quickest, most efficient solution. If you want top grades and thorough understanding of linear algebra, this powerful study tool is the best tutor you can have!The chapters include: Vectors in R" and C"; Matrix Algebra; Systems of Linear Equations; Square Matrices; Determinants; Algebraic Structures; Vector Spaces and Subspaces; Linear Dependence, Basis, Dimension; Mappings; Linear Mappings; Spaces of Linear Mappings; Matrices and Linear Mappings; Change of Basis, Similarity; Inner Product Spaces, Orthogonality; Polynomials over a Field; Eigenvalues and Eigenvectors, Diagonalization; Canonical Forms; Linear Functionals and the Dual Space; Bilinear, Quadratic, and Hermitian Forms; Linear Operators on Inner Product Spaces; and Applications to Geometry and Calculus.show more