This Mathematics Course 1 program has been specifically written for California - it’s everything the teacher needs to deliver successful Math lessons for Grade 6 students. The program is a complete, comprehensive, standards-based curriculum, and features a clear layout that will not distract students from the content being taught. It is all written in straightforward, understandable language to aid comprehension and meet the needs of English Language Learners.
The book's text is divided to 6 chapters: 1) Algebra, 2) Number Theory, 3) Geometry, 4) Trigonometry, 5) Mathematical Analysis, 6) Comprehensive Problems each one with 60 very nice problems, and full solutions (and for many problems are presented various solutions).
Edited by: Maria - 28 December 2008
Reason: Uploaded picture to ET server, please do it yourself next time, thank you!
Because of the numerous applications involved in this field, the theory of special functions is under permanent development, especially regarding the requirements for modern computer algebra methods. The Handbook of Special Functions provides in-depth coverage of special functions, which are used to help solve many of the most difficult problems in physics, engineering, and mathematics. The book presents new results along with well-known formulas used in many of the most important mathematical methods in order to solve a wide variety of problems. It also discusses formulas of connection and conversion for elementary and special functions, such as hypergeometric and Meijer G functions.
Developed to meet the needs of modern students, this Second Edition of the classic algebra text by Peter Cameron covers all the abstract algebra an undergraduate student is likely to need. Starting with an introductory overview of numbers, sets and functions, matrices, polynomials, and modular arithmetic, the text then introduces the most important algebraic structures: groups, rings and fields, and their properties. This is followed by coverage of vector spaces and modules with applications to abelian groups and canonical forms before returning to the construction of the number systems, including the existence of transcendental numbers.
