There are Infinitely many Primes
TIKEKAR, V G (2013) There are Infinitely many Primes. At Right Angles, 2 (3). pp. 14.

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Abstract
Numbers have been a subject of fascination from the most ancient times, and people keep coming up with families of numbers: integers, rational numbers, numbers, real numbers, complex numbers, prime numbers, Fermat numbers, Bernoulli numbers, . . . . Mathematics teacher D R Kaprekar (1905–1985) found many new families, giving them curious names like Dattatreya numbers, Demlo numbers, monkey numbers, and so on. India’s great mathematician S Ramanujan who made a large number of discoveries in number theory found a new family of numbers which he called ‘highly composite numbers’. Back in the Greek era, Pythagoras, steeped in mysticism, referred to numbers as sacred, lucky, evil and so on. (Sacred numbers are difficult to find these days. But 13 continues to be unlucky!) For the rest of this article, when we use the word ‘number’ we mean natural number or positive integer, i.e., one of the numbers 1,2,3,4,5, . . . . . V
Item Type:  Articles in APF Magazines 

Uncontrolled Keywords:  s: Numbers, prime, composites, infinite, factorial, coprime, Euclid, contradiction, Pólya, Fermat number 
Subjects:  Natural Sciences Natural Sciences > Mathematics 
Divisions:  Azim Premji University > University publications > At Right Angles 
Depositing User:  Mr. Sachin Tirlapur 
Date Deposited:  29 Oct 2018 15:19 
Last Modified:  29 Oct 2018 15:23 
Related URLs:  
URI:  http://publications.azimpremjifoundation.org/id/eprint/1677 
Publisher URL:  http://apfstatic.s3.apsouth1.amazonaws.com/s3fs... 
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