TWO MATHEMATi ca, oFFERINGS 125th Birth TWO MATHEMATICAL OFFERINGS 100th Birth anniversary THE ASSOCIATION OF MATHEMATICS TEACHERS OF INDIA 8-19, Vijay Avenue,85/37, Venkatarangam Pillai Street, Triplicane, Chennai - 600005. Telephone: (044)-28441523 E-mail: [email protected] Web site: amtionline.com PYeNnr CONTENTS Between us Report Indispensable Mathematics . Ten Commandments in Mathematics 33 BETWEEN US Dear Reader, We are happy to place a new book in your hands. This is a special publication in honor of the 125th birth anniversary of Srinivasa Ramanujan and the birth centenary of Prof. P.L. Bhatnagar, Founder Professor of Applied Math at |.1.Sc., Bangalore and Former President of the AMT. While we can say, with pardonable pride, that all that we do in The AMTI are to perpetuate the memory of the mathematical genius Srinivasan Ramanujan, in spotting out and encouraging talents. We also joined the country with special programmes during the year 2012. A report of the same is separately included in this book. ‘Two of the significant items of the celebration are published in this book. One is the talk given by Prof. V.G. Tikekar, Retd. Professor & Chairman, Mathematics Dept. Sc. Bangalore-560012 on “Indispensable Mathematics”. The other is the very popular talk of Late Prof. P.L. Bhatnagar, (as indicated above) on the “Ten ‘Commandments in Mathematics". (We are happy to reproduce this earlier publication of the same in our journal The Mathematics Teacher, Vol.1(6), 1965). We hope and trust that our well-wishers will receive this publi also with enthusiasm. With kind regards / best wishes, Yours sincerely, (M. MAHADEVAN) Report on the celebration of National Mathematics Year-2012 1, AMTI celebrated National Mathematics Year on 25" and 26” October 2012 with a special programme involving 38 students and 8 teachers from 7 schools. The new building in Perungalathur was the venue. Though we suspected difficulties of persons reaching the place, the attendance was encouraging indeed. 2. The programme started after breakfast to all with prayer followed by welcome and introductory remarks by the general secretary. Sri R.Athmaraman whose brain wave was this plan, formally inaugurated the same. 3. Prof. R.Sivaraman of DGVaishnav College, Chennai gave a talk titled Ramanujan’s Influence- Life and Work -aided by power point projection. 4, After tea Prof. V.G.Tikekar gave an interesting lecture on “indispensable Mathematics” drawing the attention of the audience to significant aspects of mathematics. (The full article is published as part of this special book) 5, After lunch there was written quiz written by all participants — students and teachers. 6. After tea all went back to their residences. 7. The next day programme started after break-fast with oratorical competition for students with 16 participating adjudged by Prof. V.G.Tikekar, Sri S.RSanthanam and Ku. R.Vijayalakshmi. Three of them were adjudged best speakers on the topic ‘What type of Math education would | like to have’. Each was given Rs. 1000/- as reward. 8 This was followed by a talk by Ku. R. Vijayalakshmi, titled "Centenary Tribute to Prof. P.L.Bhatnagar”. She talked for more than one hour. She eulogized Prof. Bhatnagar by citing some of his views, thoughts and works particularly his favourite "Ten ‘Commandments in Mathematics". (Full article on that title is published as part of this special book). Then lunch was announced. 9 In the post lunch session, in the absence of Prof. Poolan Prasad who was expected to join us, Prof. M. Tamban Nair of IIT Madras gave an interaction session with the children on “infinity” interspersed with power point presentations. It was well received. 410. Then oral quiz was conducted for the selected 4 teams of 4 each based on their written quiz performance. Sri Sadagopan Rajesh was the quiz master and the winning team was given a prize of Rs. 1000/- each and others Rs. 500/- each. 11. Prof. G.Rangan, former executive chairman, Prof. K.SRamachandran, former secretary and Prof. J.Pandurngan, Present executive chairman joined the valedictory function and distributed prizes. The children who won prizes in May workshop related test conducted on 19" August 2012 also received them that day. 12. With vote of thanks by the general secretary and national anthem the function came to a successful end. Formal mathematics is like spelling and grammar -- a matter of correct application of the local rules. Meaningful mathematics is like Journalism -- it tells us an interesting story. Unlike some journalism, the story has to be true. The best mathematics is like literature -- it brings story to life before your eyes and involves you in it, intellectually and emotionally. -an Stewart INDISPENSABLE MATHEMATICS" » Dr. V.G. Tikekar, ets Professor & Chairman, Mathematics Dept. Se Bangoloe 560012 1, PREAMBLE We have all assembled here, under the banner of the AMTI, to mark the 125" Birth Anniversary of the great Ramanujan, India’s Genius Mathematician. The current year 2012 is also the birth centenary year of one of the past presidents of the AMTI, namely Prof. P.L. Bhatnagar, mathematician of a great ability and achievement. Professor P.L. Bhatnagar founded, in 1956, the Dept. of Applied Mathematics (now renamed as Dept of Mathematics) at the Indian Institute of Science, Bangalore. This Professor of Applied Mathematics never applied for any job in his life; he was invited with honour to all the positions that he adorned. All his students, colleagues, and well- wishers are grateful to him for all he did for the growth and progress, of all the organizations he served with distinction and dedication, and for the knowledge and help he imparted to them, and also for the inspiration that he kindled in them. In fact, if they are not grateful to him, then they will be great fools; such was his magnanimity and the greatness of his mind. | salute the great Ramanujan and my guru Prof. P.L. Bhatnagar. * The lecture delivered at the AMTI in Chennai, on Oct.25",2012 as a part of the celebration of the National ‘Mathematics Year 2012. 2. INTRODUCTION Mathematics has grown immensely in many directions over many centuries, and it has attracted the attention of a large number of minds from all walks of human activity. As such, the field of mathematics has different shades, and it is classified in various ways: Pure mathematics, Applied mathematics, Applicable mathematics, Industrial mathematics, Algorithmic mathematics, Discrete mathematics, Continuous mathematics, Ancient mathematics, Modern mathematics, Analog mathematics, Dialectical mathematics, Analytic mathematics, and so on. Out of this big Storage of mathematical knowledge of all hues, which part can be considered as dispensable is a moot point. Because of the extensive period of its existence mankind, could some of its parts have become old- fashioned, or non ~ rigorous, or not of that much use in the present- day advanced techno — savvy world and hence could be dispensed with? | shall discuss here, a problem (or call it an example) and from that discussion, shall point out as to what type of mathematics can just not be dispensable. The problem itself may not be considered by many as mathematical, but the underlying thinking that will be used in the discussion while getting at its solution, will throw sufficiently good light on the type of mathematics that will be necessary and useful in any branch of mathematics, and hence can be considered and taken ispensable. 3. PROBLEM There are in all n persons. Denote them by 1,2,3, ne Each of these n persons has one distinct piece of information, that is, no two pieces of information are the same. We shall denote these distinct pieces of information by the same numbers 1,2, sn. This way we shall take it that the person 1 has the piece of information 1, the person 2 has the piece of information 2,.. .., person n has the piece of information n. Now these persons pass on these pieces of information to each other by making phone calls among themselves. During any such phone call, each person on each side of the conversation, passes on to the other side, all the pieces of information (such as those which he/she might have gathered because of the phone calls that have taken place earlier to the current phone call under consideration) that he/she has at the time of making that phone call. What is the minimum number of phone calls required so that at the end of all of them, all the n persons will have all the pieces of information with them? 4. NOTATION We shall use the symbol (m, p) to denote the phone call between the persons m and p. (m, p = Lye..esM) ‘Suppose that (1,2) is the first phone call. Then at the end of it, person | will have two pieces of information, namely 1 and 2. -We shall denote this fact by writing 1<{1,2}. Similar representation will be employed in respect of the outcome of any phone call. So, if (1,2), (2,6) are the first two phone calls made in that order, then at the end of these two phone calls, we shall have 1-{ 1,2}, 2<-{2,1,6,} and 6<{6, 1,2}. NOTE 1 3, then the achieve the ifn = 3, ie, if the total number of persons following 3 phone calls made in that order wi objective: (1,2), (2.3), 3,1), This means that, at the end of these 3 phone calls, made in that order, all the 3 persons will possess all the three distinct pieces of information that they had with them ( with ith person having ith piece of information, i = 1,2,3,) to start with. The reader should satisfy himself / herself with the correctness of this claim. We further claim that when n = 3, no two phone calls, whatever their order, will achieve the desired objective, and invite the reader to construct, if possible, a counter - example to disprove our claim. We guarantee that he/she will not be able to do that. 5. A SOLUTION TO THE GENERAL PROBLEM ( not necessarily the optimal) Generally we attack any problem step by step, each step leading to achieving a sub-goal so that , at the end of all the steps, we get a solution to the problem, on hand, which we started with. We shall do the same thing in respect of the problem of n persons with n pieces of information (as stated in section 3 above) Let our first sub-goal be: person 1 gets all the n pieces of formation. It is easy to see that this sub-goal can be achieved by the following phone calls made in that order: (1,2), (1,3), (1,4), s(n) 1) 10