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Item Code: | NAH057 |

Author: | James T. Glover |

Publisher: | Motilal Banarsidass Publishers Pvt. Ltd. |

Language: | English |

Edition: | 2013 |

Pages: | 696 |

Cover: | Paperback |

Other Details | 8.5 inch X 5.5 inch |

Weight | 820 gm |

**ISBN:**

Vol-I: 9788120813182

Vol-II: 9788120816701

Vol-III: 9788120818194

Vedic Mathematics for School offers a fresh and easy approach to learning mathematics. The system was reconstructed from ancient Vedic Sources by the late Bharati Krsna Tirthaji earlier this century and is based on a small collection of sutras. Each Sutra briefly encapsulates a rule of mental working, a principle or guiding maximum. Through simple practice of these methods all may become adept and efficient at mathematics.

Book 1 of the series is intended for primary schools in which many of the fundamental concepts of mathematics are introduced. It has been written from the classroom experience of teachings Vedic methods are used, the rest being introduced at a later stage.

James T. Glover is head of mathematics at St. James Independent School in London. He is director of mathematical studies at the school of Economic Science and a Fellow of the Institute of Mathematics and its Applications. He has been researching Vedic Mathematics and its use in Education for more than twenty years and has run public courses in London on the subject. Other books by the author are An Introductory Course in Vedic Mathematics, Vedic Mathematics for Schools, Book 1 and Foundation Mathematics, Books 1,2 and 3.

“The examples and exercises have been arranged with care and the grading of the latter shows every evidence of the same pedagogic thoroughness. The exercises have been beautifully structured, presenting a mixed bag of fairly straight forword stuff, with may stimulating questions going well beyond the merely routine. For this reason, if no other, the book deserves to serve as a model for text books at this level, in use in this country.”

Vedic Mathematics for Schools is an exceptional book. It is not only a sophisticated pedagogic tool but also introduction to an ancient civilization. It takes us back to many millennia of India’s mathematical heritage. Rooted in the ancient Vedic sources which heralded the dawn of human history and illumined by their erudite exegeses, India’s intellectual, scientific and aesthetic vitality blossomed and triumphed not only in philosophy, physics, ecology and performing arts but also in geometry, algebra and arithmetic. Indian mathematicians gave the world the numerals now in universal use. The crowning glory of Indian mathematics was the invention of Zero and the introduction of decimal notation without which mathematics as a scientific discipline could not have made much headway. It is noteworthy that the ancient Greeks and Romans did not have made much headway. It is noteworthy that the ancient Greeks and Romans did not have the decimal notation and, therefore, did not make much progress in the numerical sciences. The Arabs first learnt the decimal notation from Indians and introduced it into Europe. The 973 A.D. and travelled to India, testified that the Indian attainments in mathematics were unrivalled and unsurpassed. In Keeping with that ingrained tradition of mathematics in India, S. Ramanujan, “the man who knew infinity”, the genius who was one of the greatest mathematical trails in Cambridge University in the second decade of the twentieth century even though he this not himself possess a university degree.

The real contribution of this book, Vedic Mathematics for Schools, is to demonstrate that Vedic mathematics belongs not only to an hoary antiquity but is any day as modern as the day after tomorrow. What distinguishes it particularly is that it has been fashioned by British teachers for use at St James Independent from the pioneering work of the late Bharati Krishna Tirthaji, a former Sankarcharya of Puri, who reconstructed a unique system on the basis of ancient Indian mathematics. The book is thus a bridge across centuries, civilizations, linguistic barriers and national frontiers.

Vedic mathematics was traditionally taught aphorisms or sutras. A Sutra is a thread of Knowledge, a theorem, a ground norm, a repository of proof. It is formulated as a proposition to encapsulate a rule or a principle. A single Sutra would encompass a wide and varied range of particular applications and may be linked to a programmed chip of our computer age. These aphorisms of Vedic mathematics have much in common with aphorisms which are contained in Panin’s Ashtadhyayi, that grand edifice of Sanskrit grammar, Both Vedic mathematics and Sanskrit grammar are built on the foundations of rigorous logic and on a deep understanding of how the human mind works. The methodology of Vedic mathematics and of Sanskrit grammar help to hope the human intellect and to guide and groom the human mind into modles of logical reasoning.

I hope that Vedic Mathematics for Schools will prove to be an asset of great value as a pioneering exemplar and will be used and adopted by discerning teachers throughout the world. It is also my prayer mathematics and Sanskrit may eventually be emulated Indian school.

Vedic mathematics is a new and unique system based on simple rules and principles which enable mathematical problems of all kinds to be solved easily and efficiently. The methods and techniques are based on the pioneering work of the late Bharati Krishna Tirthaji, Sankarcarya of Puri, who estabilished the system from the study of ancient Vedic texts coupled with a profound insight into the natural processes of mathematical reasoning.

The characteristics of Vedic mathematics is to present the subject as a unified body of knowledge and so reduce the burden and toil which young students often experience during their studies. It is based on sixteen principles which lie behind short rules of working. Or aphorisms, which are easily remembered. In the Vedic system these aphorisms are called sutras, simple terse statements expressing rules, definations or governing principles. In some topics, the sutras provide rues for special cases as well as for the general case. Understanding their nature and scope is achieved by the practice of their applications.

Experience of teaching the Vedic methods to children has shown that a high degree of mathematical ability can be attained from an early age while the subject is enjoyed for its own merits.

This book should be taken as an introductory volume. Many of the methods are developed further at a later stage and so, in the present text, it may not be apparent why a particular method is being given. An important characteristic is that, although there are general methods for calculations and algebraic manipulations, there are also methods for particular methods are introduced at an early stage it is because they relate to more general aspects of the system at a later stage or are simply very quick and easy ways to obtain answers.

The current methods of calculating which have been adopted by most schools are ‘blanket’ methods. For example, with division, only one methods is taught and actually used by the children. Although it will suffice in all cases it may often be difficult to use. The vedic system teachers three basic algorithms for division which are applied sum. The principle is that, if a particular sum can be done by an easier method, then that method should be used. Of course, with children, some mastery of the different methods must be accomplished before this more creative approach can be adopted. A simple example to illustrate this point is the method for finding the product of 19 and 7. The conventional system teaches us to multiply the 7 by 9, to get 63 and then to multiply 7 by 10 to get 70. On summing these we arrive at the answer of 133. Bright children will arrive at this method for themselves but the Vedic mathematics teaches this sort approach systematically.

The study of number begins at one which is an expression of unity. From here all the other numbers arise and if it were not for the number one we would not have any numbers at all. If there is any fear of large numbers it is always comforting to remember that there are really only nine together with nought which stands for nothing. All other numbers are just repetitions of these nine. It is useful to treat these nine numbers as friends. In fact , they are universal friends because everybody uses them every day in one way or another.

Vedic mathematics readily acknowledges the importance of the number one. Many calculations are made simple and easy by relating the numbers involved back to one. The very first sutra or formula in Vedic Mathematics does just this. It realtes every number to unity.

In Vedic mathematics there are sixteen or formulae and about thirteen subsutras. The word sutra (pronounced ‘sootra’) is from ancient India and means a thread of knowledge. The English word ‘suture’ comes from sutra and a suture is short and simple statements which give formulae for how to answer mathematical problems. Each sutra has a large number of uses at all levels of mathematics.

In the research work which has resulted in this course there have been two guiding maxims. The first is that there are only nine numbers, together with a nought, and that these numbers represent the nine Elements as described in the ancient scriptural texts of India. It is well known that the nine numerals and the nought originated in India but the philosophical tradition to the Hindus also ascribes a universal significance to each of the numbers. The second is that the whole of mathematics is governed by the sixteen sutras, or short formula-like aphorisms, which are both objective and subjective in their character. They are objective in that they may be applied to solve everyday problems. The subjective aspect is that a sutra may also describe the way the human mind naturally works. The whole emphasis of the system is on the process and movement taking place in the mind at the time that a problem is being solved. The effect of this is to bring the attention into the present moment.

Vedic Mathematics for Schools Book 1 is a first text designed for the young mathematics student of about eight years of age. The text introduces new and quick methods in numerical calculation and comprehension.

New algorithms used for numerical calculations are introduced and exercises are carefully graded to enable the distinct development steps of each methods to be mastered. Each algorithm is denoted by a simple rule which, when applied and practiced, provides a high standard of mathematical capability. The text incorporates explanations and worked examples of all the methods used and includes description of how to set out written work.

The course has been written for children who, at the age of about eight, have mastered the basics four rules including times tables. Although this is assumed, it is also clear that at this stage the stage the child needs a good deal of revision work in the basics as an on-going practice and this has been taken into account in the composing of exercises. Older children and even adults may also find the techniques interesting and useful. The text provides introductory steps to each Vedic algorithm which may be followed by pupils of the intended age level with some help from an adult. The main emphasis at this stage is on developing numeracy which is the most essential aspect of mathematics. The text concentrates on these areas of mathematics and treats them as the core curriculum of the subject the main Vedic methods used in this book are those for multiplication, division and subtractions to vulgar and decimal fractions, elementary algebra and vinculums are are also given. Topics in geometry, weights and measures and statistics are not included in this text.

Experience has shown that children benefit most from their own practice and experience rather than being continually provided with explanations of mathematical concepts the explanations given in this text show the pupil how to practice so that they may develop their own understanding. It is also felt that teachers might provide their own understanding. It is also felt that teachers might provide their own practical ways of demonstrating this system or of enabling children to practice and experience the various methods and concepts.

It is assumed that pupils using this book already have a degree of mathematical ability. In particular, the times tables need to be fully estabilished. The Vedic system relies on and develops mental capabilities and many of the answers to questions are obtained only one line. This reliance is greatly aided by regular practice of mental arithmetic.

Only five of the sixteen sutras and thirteen sub-sutras are used in this book others will be introduced in later volumes.

1 All from nine and the last from ten

Nikhilam Navatascaramam Dasatah

2 Vertically and crosswise

Urdhva Tiryagbhyam

3 Transpose and Adjust

Paravartya Yojayet

4 By Elimination and Retention

Lopana Sthapanabhyam

5 By one more than the one before

Ekadhikena Purvena

Vedic mathematics for Schools, Book 2 is intended as a first year textbook for senior schools or for children aiming for examination at 11+. It is based on the fundamental principles of Vedic mathematics which were reconstructed earlier this century by Sri Sankaracarya Bharati Krsna Tirthaji. Although the sutras may well be very ancient, Practice and experience have shown that they are highly relevant and useful to the modern-day teaching of mathematics. They are entirely applicable to modern problems and even to Modern approaches to mathematics.

Topics covered includes the four rules of number, fractions and decimals, simplifying and solving in algebra, perimeters and areas, ratio and proportion, percentages, averages, graphs, angles and basic geometrical constructions. The book contains step-by-step worked examples with explanatory notes together with over two hundred together exercises.

The material in this book is currently used at schools around the world associated with the Education Renaissance Trust.

It is assumed that pupils using this book already have a degree of mathematical ability. In particular, the time tables need to be fully established. It should also be stated that regular practice of mental arithmetic is an essential accompaniment to this course.

Each method used for numerical calculations is introduced separately and exercises are carefully graded to enable the distinct developmental steps to be mastered. Each technique is denoted by one more of the sutras. The text incorporates explanations and worked examples of all the methods used and includes descriptions of how to set out written work.<.p> The structure of the book is such that at the end term a bright pupil should be able to complete about eight chapters. There are three revision chapters, the last of which contains practice papers. It is not necessarily intended that teachers rigidly adhere to the order of chapters as presented. Nevertheless, there are certain topics that the should be covered before moving on to more advanced work.

The course has been written in conjunction with teaching a group of ten and eleven year-olds. The main emphasis at this stage is on developing numeracy and its principal fields of application, since this is the most essential aspect of mathematics. The text concentrates on these areas of mathematics and treats them as the core curriculam of the subject.

Experience has shown that children benefit most from their own practice and experience rather than being continually provided with explanations of mathematical concepts. The explanation given in this text show the pupil how to proactive so that they may develop their own understanding.

It is to be hoped that teachers may provide their own practical ways of demonstrating this system or of enabling children to practice and experience the various methods and concepts and concepts, of course, where teachers are unfamiliar with the system themselves they would also have to practise. It is difficult to appreciate the full benefits of Vedic mathematics unless one gets immersed in the techniques, leaving behind all previous personal paradigms and prejudices about mathematic.

James T. Glover is head of mathematic at St. James Independent Schools in London where he has been a teacher for eighteen years. He is director of mathematical studies at the School of Economic Science and a Fellow of the Institute of Mathematics and its Applications. He has been researching Vedic mathematics and its use in education for more than twenty years and has run public courses in London on the subject. Other books by the author are: An introductory Course in Vedic Mathematics. Vedic Mathematics for Schools, Book 1, 2 and Foundation Mathematic, Books 1, 2 and 3.

Vedic mathematics for Schools Book 2 is a text for the first-year at senior school. Book 1 of the series is for primary schools and does not have to be read first since each of the methods in the present work are introduced from their inception. These books are based on the fundamental ancient Hindu system which used few simple rules and principles which in Sanskrit are called sutras. The sutras enable fast and easy methods of calculation.

**On the discovery and nature of Vedic mathematics**

This system of mathematics was recreated by the late Sri Bharati Tirthaji (1884-1960) a brilliant scholar and exponent of the spiritual teachings of the Veda (he held the seat of Sankaracharya of Puri for many years). The Vedas are ancient texts of India written in Sanskrit. They are concerned with both the spiritual and secular aspects of the life because. In that time, no essential difference was perceived between the two. The Veda deals with many subject but the texts are frequently difficult to understand. Tirthaji made great efforts to dig out the system of mathematic from these texts and came up with sixteen sutras and about thirteen sub-sutras. A sutra is a pithy statement containing a governing principle, a method of working and the ones which he discovered relate to mathematics. Not long before he died, Trithaji wrote an illustrative volume on the subject entitled Vedic mathematics which was published posthumously in 1995 (Motilal Banarsidass, Delhi).

Sri Tirthaji applied the sutras to the mathematics of his day and so in his book we find a good deal of arithmetic and algebra. It has since been shown that the system is equally applicable to more up-to-date aspects of mathematics both at an elementary level as well as in more sophisticated fields. The reason that this is possible relies on the nature of the sutras. They frequently describe how the mind approaches, or deals with a problem in the easiest way. To take a very simple example, consider the sum of 267 and 98. The blanket method involves cumbersome arithmetic. Most people would realize that the easiest method is to add 100 and take off 2. The answer of 365 is than found using a comple. The Vedic system teacher this sort of approach systematically rather then leaving it to chance and hence we find a number of different possible methods for any particular sum. This is of tremendous use because it enhances variety of strategy. It also enables the subject to be kept alive by the attention towards underlying pattern and relationship. Of course, with children, some mastery of the different method must be accomplished before this more creative approach can be adopted. The sutras, which are used in translation in this book, provide easily remembered word-formulae for saving problems in arithmetic, algebra, geometry and their various applications. The methods are fast and effective because they rely on mental working. In many applications answers are found in one line and for this reason the mathematics can often appear to be intuitively based. Nevertheless, it is all quite logical and systematic.

**Vedic mathematics in education**

In the United Kingdom there the growing Singh of dissatisfaction with the lack of training in numeracy and the accompanying degeneration of algebraic and other mathematical skills. Some would argue that is due to missed educational methods whish others lay blame on the widespread use of electronic calculating aids. During this century, the treatment of mathematics in education has seen a decline in rigor and, more recently, a move away from the so called ‘drudgery’ of sums.

Vedic Mathematics for Schools aims at providing a good mathematical training without the necessity of relying on calculating aids. It also aims to relate mathematics to the natural laws expressed in the Vedic sutras. As with the boys, exercise and training are required to develop health, strength, agility and skill, do too with the young mind, training is required for development of knowledge, creativity and the ability to reason. Mathematics and, in particular, the experience of working with number, provide one of the powerful tools to accomplish this. For this purpose, these Vedic methods are used for basic numerical skills. Not only are they enjoyable, but they also encourage the use of mental arithmetic. For example, there are method which replaces long multiplication and division whereby the answere to any such sum can be obtained in one line. Experience of teaching these methods to children has shown that a high degree of mathematical ability can be attained from an early age while the subject is enjoyed for its own merits.

I have received criticism that Vedic mathematics only provides a few interesting techniques and is not really relevant to a core curriculum. They have also been the comment that children do not understand these methods are merely tricks. None of these comments has ever come from anyone who has studied and practised the system but only from those who seem to be looking at it from the outside and therefore have little understanding. themselves. A soup packet has the name, cooking instructions and even a picture printed on the outside. Until the soup has been tasted, howere, there is only peripheral knowledge and certainly no basis from which to make a sound judgment.

Nevertheless, in reply to the first criticism it has to be understood that in the Vedic system there are general methods for all calculations and algebraic manipulations, and also short easy ways for particular cases, for instance in multiplying or dividing number close to a power of ten. Where such particular methods are introduction at an early stage it is because they usually relate to more general aspects of the system at a later stage. The correct methods of calculating which have been adopted by most schools are ‘blanket’ methods and no short cut methods or even intuitive approaches, are systematically used. For example, with division only one method is taught and although it will suffice in all cases, it may often be difficult to use. The Vedic system in the book teaching there basic method for division which are applied to meet the particular case although each could be used for any division sum.

The second criticism raises an important issue in relation to school mathematics. This concerns the use and understanding of set formulae to solve problems. There are many instance in education where in the student are rewired to learn a formula to solve a particular type of problem whilst not understanding the mathematics behind the formula. We could take as an example the well known formula used for solving questions equations, there are few who understand how it has been derived. The usual practice is to gain some familiarity with its application before learning how it arises. Another example which is even more stark concerns the formula for finding the volume of a pyramid with a polygonal base. The formula is Volume equals one third of the base times the perpendicular height and is leant quit early on in the school curriculum. But to prove or derive result the student needs to be adept either in there dimensional geometry or in the calculus. The formula is simple but the derivation requires mathematics of a much more advanced character. Much of school mathematics is like and there is nothing amiss. When a student is faced with a problem which can be solved using a simple well-known formula then, by all means, it should be used. We accept the validity of such formulae on trust and that and it works is magical. The magic becomes mathematic when the formula is understood.

Vedic mathematics appears, at first, to have a magical quality. When the methods are understood, particularly in reaction to one another, then it is unified mathematics.

**On the nature of mathematics**

Mathematics is a practical science as it helps us with daily life. It also helps us to understand the mysteries of the universe.

The study of mathematics may be seen as having two direction, an other an outer and an inner. The outer direction moves us to appling number, order and mathematical relationships in the world around us. It is practical, useful and beneficial. This includes the everyday activities of shopkeepers, accountants, technicians, engineers, scientists, etc., etc. In fact our lives, in the ordinary sense, would be very limited were it not for the applicability of number. This carries with it the responsibility of those with some understanding of the structure of mathematics to ensure that institutions are retained which enhance and disseminate mathematics as a structured body of knowledge.

In this book the Vedic techniques are applied to ordinary school mathematics for eleven and twelve years-old. The arithmatic introduced in books 1 & 2 is extended. The book also deals with the initial stages of solving equations, coordinate geometry, approximations, indices, parallels, triangles, ratio and proportion as well as other topics.

Once a basic grounding has been established with the Vedic methods the next stage is the beginning of discrimination. A problem is set and, armed with several techniques, the student must choose the easiest or most relevant for achieving the solution. This book deals with some of the steps required for this training.

This book is intended as the sequel to Vedic Mathematics For Schools Book 2. It assumes at most of the basic methods have been mastered although many are reintroduced or revised.

The methods are based on the system of Vedic mathematical sutras or rules as they are called in the text. There are said to be sixteen of these sutras and about thirteen sub-sutras. They are to be found in the text of Vedic Mathematics by Sri Bharati Krishna Tirthaji. Due to flexibility in both meaning and application, no distinction is made here between a sutra and a sub-sutra.

The sutras embody laws, principles or methods of working and do not always easily succumb to rigid classification. Some of them have many applications. Transpose and adjust is one such rule. It applies to solving equations, division in fractions and dividing numbers close to a base. It has many other uses at later stages in mathematics and indicates, not a single or particular algorithm, but a general mental procedure. There are other sutras, such as, When the final digits add up to ten, for which the uses appear to be very limited.

It is because of the many faceted quality of the sutras, and that there are so few of them, mat the subject becomes greatly unified and simplified.

As well as developing further the methods for multiplication and division using All from nine and the last from ten there are also further special methods particularly suited to mental computation. New topics are also introduced. These are equations of straight lines, approximations, parallel lines, compound arithmetic, indices, construction of formulae, brackets, factorisation, decimal conversions, direct and inverse proportion, percentage increase and decrease, pie charts, recurring decimals and the geometry of the octahedron.

The text also contains revision chapters and practice examination papers.

Preface by His Excellency Dr. L.M. Singhvi, High commissioner for India in the UK | v | |

Introduction | vii | |

Chapter 1 | I Simple Practice of number | 1 |

Chapter 2 | Multiplication by Nikhilam | 9 |

Chapter 3 | Division | 19 |

Chapter 4 | Digital Roots | 27 |

Chapter 5 | Multiplication by Vertically and Crosswise | 32 |

Chapter 6 | Subtraction by Nikhilam | 39 |

Chapter 7 | Vulgar Fractions | 46 |

Chapter 8 | Decimal Fractions | 58 |

Chapter 9 | The Meaning of Number | 72 |

Chapter 10 | vinculums | 83 |

Chapter 11 | Algebra | 91 |

Answers | 101 |

1 Multipying by All from 9 and the last from 10 | 1 | ||

2 | Multiplication by Vertically and Crosswise | 13 | |

3 | Division | 23 | |

4 | Subtraction by All from 9 and the last from 10 | 36 | |

5 | Prime and Composite Numbers | 43 | |

6 | Fractions | 51 | |

7 | Algebra | 61 | |

8 | Practice and Revision 1 | 75 | |

9 | Geometry 1 | 83 | |

10 | Digital Roots | 100 | |

11 | Divisibility | 106 | |

12 | Addition and Subtraction of Fractions | 112 | |

13 | Decimal Fractions | 121 | |

14 | Perimeters and Areas | 128 | |

15 | Straight Division | 140 | |

16 | Practice and Revision 2 | 147 | |

17 | Working Base Multiplication | 153 | |

18 | Ratio and proportion | 159 | |

19 | Geometry 2- The Rectangle Propositions | 168 | |

20 | Order of Operations | 180 | |

21 | Multiplication and Division of Decimals | 186 | |

22 | Percentages | 194 | |

23 | Averages | 200 | |

24 | Graphs | 205 | |

25 | Calculations Using Vinculums | 213 | |

26 | Geometry 3-Angles | 218 | |

27 | Practice and Revision 3 | 226 | |

Appendix-Tables of Weights and Measures | 231 | ||

Answers | 235 |

Chapter 1 | Simple arithmetic | 1 |

Chapter 2 | Multiplication by All from 9 and the last from 10 | 10 |

Chapter 3 | Division | 17 |

Chapter 4 | Algebra | 23 |

Chapter 5 | Coordinate geometry | 33 |

Chapter 6 | Approximations | 42 |

Chapter 7 | Practice and revision 1 | 46 |

Chapter 8 | Geometry | 49 |

Chapter 10 | Compound arithmetic | 72 |

Chapter 11 | Indices | 81 |

Chapter 12 | Further division | 89 |

Chapter 13 | Factors and multiples | 95 |

Chapter 14 | Triangles | 104 |

Chapter 15 | Vulgar fractions: addition and subtraction | 111 |

Chapter 16 | Vulgar fractions: multiplication and division | 121 |

Chapter 17 | Discrimination in division | 127 |

Chapter 18 | Further algebra | 136 |

Chapter 19 | Ratio and proportion | 147 |

Chapter 20 | Fractions to decimals | 160 |

Chapter 21 | The octahedron | 171 |

Chapter 22 | Practice and revision 2 | 183 |

Answers | 197 |

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