The Classic Texts Series is only one of its kind selections of classic pieces that started off as a bestseller and continues to be the same today as well. These classic texts have been designed to work as elementary textbooks, which help the students in building the concepts to prepare for various competitive examinations.

The revised edition of ‘Higher Algebra’ presents all the elements of Higher Algebra in a single book meant to work as textbook for the students beginning their preparation of the varied aspects. Each chapter in the book begins with point wise introduction of the various concepts that are covered under a particular topic, followed by examples to help the competitors in understanding the concepts better. It showcases theoretical explanations of various important topics of Higher Algebra, in order to provide complete understanding to the competitors. Apart from giving conceptual clarity, it also helps in enhancing the practical knowledge with inbuilt practice sets and detailed and authentic solutions. Covering all aspects of Higher Algebra, it will surely serve as the complete elementary textbook for studying different concepts of Higher Algebra. This book inculcates:

- The Classical Text series ‘best seller’ – collection of classic pieces of work
- Works as elementary text book building up the basic concepts
- ‘Higher Algebra’ has explained various concepts of algebra
- Divided into 33 Chapters
- Each chapter carries theoretical explanations and unsolved practice exercise for complete

practice
- Chapter wise study notes, Miscellaneous examples and answers to unsolved questions

Chapter 1- Theory Of Numbers, Chapter 2- Rationals & Irrationals, Chapter 3- Polynomials, Chapter 4- Symmetric & Alternating Functions, Substitutions, Chapter 5- Complex Numbers, Chapter 6- Theory Of Equations, Chapter 7- Partial Fractions, Chapter 8- Summation Of Series, Chapter 9- Determinants, Chapter 10- Systems Of Equations, Chapter 11- Reciprocal & Binomial Equations, Chapter 12- Cubic & Biquadratic Equations, Chapter 13- Theory Of Irrationals, Chapter 14- Inequalities, Chapter 15- Sequences & Limits, Chapter 16- Convergence Of Series, Chapter 17- Continuous Variable, Chapter 18- Theory Of Equation, Polynomials, Rational Fractions, Chapter 19- Exponential & Logarithmic Functions & Series, Chapter 20- Convergence, Chapter 21- Binomial & Multinomial Theorems, Chapter 22- Rational Fractions, Chapter 23- The Operators, Chapter 24- Continued Fractions, Chapter 25- Indeterminate Equations Of The First Degree, Chapter 26- Theory Of Numbers, Chapter 27- Residues Of Powers Of A Number, Recurring Decimals, Chapter 28- Number Solution Of Equations, Chapter 29- Implicit Functions, Curve Tracing, Chapter 30- Infinite Products, Chapter 31- Permutations, Combinations And Distributions, Chapter 32- Probability, Chapter 33- Continued Fractions