
Oneworld
DR EVIL (aka ) walked up to a blackboard in front of a packed auditorium at the Massachusetts Institute of Technology and wrote a single 1. It was a slow but tactical start to the 2007 , an event described on its posters as: 鈥淭wo competitors. One chalkboard. Largest integer wins.鈥
The Mexican Multiplier (aka ) wasn鈥檛 happy with such a slow start, so he filled in the blackboard with 1s. Dr Evil countered by turning almost every 1 into the factorial sign 鈥!鈥. This clever mathematics trick soon transformed the figures on the board into impenetrably large numbers, containing more digits than there are particles in the universe. The pair had moved into the world of googology 鈥 the study of extremely large numbers.
鈥淚f you love journeying into imagined mathematical worlds, then you鈥檒l find this book pure escapism鈥
Advertisement
Googology is a mind-boggling subject, and the topic of a wonderful new book, The Biggest Number in the World: A journey to the edge of mathematics by and . The co-authors met when Banerjee was a teenage mathematics prodigy and Darling, an eminent science writer, became his tutor. Banerjee went on to get a perfect score at the International Mathematical Olympiad, one of only two out of 594 contestants from more than 100 countries to do so.
The Biggest Number in the World starts out by tackling such 鈥渘ormal鈥 big numbers as the number of stars in the observable universe (70 billion trillion) or the number of ways to shuffle a pack of playing cards (8.0658 脳 1067). But then it quickly introduces the tools needed to write far larger values.
Numbers are like interstellar travel, write the duo. If spacecraft are too slow 鈥 and they are 鈥 it could take us tens of thousands of years to reach other solar systems. The same is true when writing massive numbers, so we need the mathematical equivalent of better propulsion methods, such as .
This notation is named after computer scientist Donald Knuth, and emerges from a simple pattern. Recall that multiplication is simply repeated addition (5 脳 3 = 5 + 5 + 5) and exponentiation is just repeated multiplication (53 = 5 脳 5 脳 5). Up-arrow notation uses a single up arrow to mean exponentiation, so that 5鈫3 = 53. Two arrows then mean repeated exponentiation 5鈬3 = 5鈫(5鈫5) = 55^5.
This pattern continues, with each new arrow meaning the steps before should be repeated, resulting swiftly in immense numerical power. The number 2鈫戔啈鈫戔啈4, for example, is so large it is 鈥渂eyond the capacity of the universe to display in digital decimal form鈥, write the authors.
If you are someone who needs real-world applications to get excited about mathematics, this probably isn鈥檛 the book for you. But if you love journeying into imagined mathematical worlds and simply exploring, then it is pure, unadulterated escapism.
In different hands, the book could have been too jargon-packed to hold the attention of the average reader, but Darling and Banerjee have done a brilliant job mixing big ideas and analogies with the tools needed to understand up arrows and other approaches to notation, each more powerful than the last.
Darling and Banerjee don鈥檛 shy away from their book鈥檚 title, and eventually deliver a number so large it is very likely to earn the accolade of biggest number in the world. This number is so huge that when the Mexican Multiplier wrote it on the blackboard in the Big Number Duel, it was considered to be a knockout blow.
on his quest for unfathomably large numbers at New 杏吧原创 Live on 8 October