Latest news with #ShyamSunderGupta
The Guardian
5 days ago
- Science
- The Guardian
Did you solve it? The world's most fascinating number – revealed!
Earlier today I set three puzzles, and also explained why 108 is possibly the most fascinating number in the universe. Here are some more reasons: 108 = 62 + 62 + 62 108 is the smallest number that can be written as the sum of a square and a cube in two different ways. (108 = 23 + 102 = 33 + 92) Many ratios in Moon-Sun-Earth astronomy seem to be around 108: the distance between the Earth and the Sun is about 108 times the diameter of the Sun; The distance between the Earth and the Moon is about 108 times the diameter of the Moon. The upper frequency of FM radio is 108Mhz. (Examples taken from the book Exploring the Beauty of Fascinating Numbers by Shyam Sunder Gupta. For more reasons click here.) Here are the puzzles again with solutions. 1. Brilliant billions You have ten cards. On each of the cards is one of the digits 0 to 9. When you arrange the cards in a line you get a number between 0123456789 and 987654321 i) How many of these numbers are divisible by 2? ii) How many are divisible by 3? Solution. i) half of them, ii) all of them! The sum of the digits 0-9 is 45, which is divisible by three, hence all numbers made from these ten digits are divisible by three. 2. How low can you go? What is the smallest even number between 1000 and 9999 written with four different digits? Solution 1024 Most people will try to use the three lowest digits, i.e 1032. I hope you didn't fall into that trap. 3. All about me An autobiographical number is one where the first digit describes how many 0s it has, the second digit describes how many 1s it has, and so on, so that the (n + 1)th digit describes how many n's it has. For example, 1210 is an autobiographical number because it has 1 zero, 2 ones, 1 two and 0 threes. Find the only ten digit autobiographical number. Solution 6210001000 Let the solution be ABCDEFGHIJ. Each digit n + 1 describes how many times digit n appears. Since there are only ten possible positions for digits, we can deduce that A + B + C + D + E + F + G + H + I + J = 10. Let's proceed by trial and error. Image A = 9. Then J = 1, since there is a single 9 in the number. But that means A < 9, so we have a contradiction. Let A = 8. Then I is 1, which means B = 1, which means A <8, so this doesnt work either. Let A = 7. Then H = 1, so B must be either 1 or 2. (Since the digits must add up to ten.) If B = 1, then another digit must be 1, but this would mean B = 3, (since thee are three 1s) which is a contradiction. If B = 2, then C = 1 and we have another contridiction. Following this logic, we finally hit a solution that works when A = 6. I've been setting a puzzle here on alternate Mondays since 2015. I'm always on the look-out for great puzzles. If you would like to suggest one, email me. Sources of today's puzzles: 1) Leon Gelkoff, 2) SmartFriends, a daily IQ challenge, 3) An old classic.
The Guardian
5 days ago
- General
- The Guardian
Can you solve it? The world's most fascinating number – revealed!
Before we get to today's puzzles, I'd like to introduce the most interesting number in the universe. 108 Readers of Asian heritage will nod with familiarity. The number has profound significance in Hinduism, Jainism, Sikhism, Buddhism and Chinese culture. It's the number of beads on a rosary, the number of sun salutations performed in a yoga ceremony, the number of Buddhas to be carved on a walnut for good luck, and the phone number of the Indian Emergency Ambulance service. Mathematically, 108 is also a superstar, a fact I only discovered recently in a new book by the former Principal Chief Engineer of Indian Railways, Shyam Sunder Gupta. For example: 108 is 11 x 22 x 33 , the product of the first three numbers raised to themselves. 108 is the smallest number whose divisors when taken together contain every digit at least once. (The divisors are 1, 2, 3, 4, 6, 9, 12, 18, 27, 36, 54 and 108) 108 is the largest known number n such that 2n does not contain a 9. (2108 = 324518553658426726783156020576256) 108 is the internal angle (in degrees) of a regular pentagon 108 is the number of free heptominoes (the Tetris-like shapes made from seven linked squares.) 108 is the number of cards in a UNO deck. I've only scratched the surface. Gupta's book, Exploring the Beauty of Fascinating Numbers, has ten pages of facts about 108, ending with the observation that '1' stands for truth, '0' for emptiness and '8' is the infinity symbol rotated by 90 degrees. 'Thus the sacred number 108 tells us that we are at once something, nothing and everything.' The only other numbers that Gupta devotes an entire chapter to are pi, 13, 666 and 153 (possibly the second most interesting number in the universe). It could be the case that the spiritual importance of 108 led Asian mathematicians to catalogue interesting properties about it. Or it could be that 108 really is a particularly interesting number – it is not too small, not too large, and highly divisible – which helped it gain spiritual importance in the first place. How nice that numerologists and number theorists have something to agree about for once! Today's puzzles are about numbers with interesting properties. 1. Brilliant billions You have ten cards. On each of the cards is one of the digits 0 to 9. When you arrange the cards in a line you get a number between 0123456789 and 9876543210. i) How many of these numbers are divisible by 2? ii) How many are divisible by 3? 2. How low can you go? What is the smallest even number between 1000 and 9999 written with four different digits? 3. All about me An autobiographical number is one where the first digit describes how many 0s it has, the second digit describes how many 1s it has, and so on, so that the (n + 1)th digit describes how many n's it has. For example, 1210 is an autobiographical number because it has 1 zero, 2 ones, 1 two and 0 threes. Find the only ten digit autobiographical number. I'll be back at 5pm UK with the solutions. PLEASE NO SPOILERS – instead tell me why you find 108 such a great number! Exploring the Beauty of Fascinating Numbers by Shyam Sunder Gupta is out now. I've been setting a puzzle here on alternate Mondays since 2015. I'm always on the look-out for great puzzles. If you would like to suggest one, email me. Sources of today's puzzles: 1) Leon Gelkoff, 2) SmartFriends, a daily IQ challenge, 3) An old classic.
The Guardian
5 days ago
- General
- The Guardian
Can you solve it? The world's most fascinating number – revealed!
Before we get to today's puzzles, I'd like to introduce the most interesting number in the universe. 108 Readers of Asian heritage will nod with familiarity. The number has profound significance in Hinduism, Jainism, Sikhism, Buddhism and Chinese culture. It's the number of beads on a rosary, the number of sun salutations performed in a yoga ceremony, the number of Buddhas to be carved on a walnut for good luck, and the phone number of the Indian Emergency Ambulance service. Mathematically, 108 is also a superstar, a fact I only discovered recently in a new book by the former Principal Chief Engineer of Indian Railways, Shyam Sunder Gupta. For example: 108 is 11 x 22 x 33 , the product of the first three numbers raised to themselves. 108 is the smallest number whose divisors when taken together contain every digit at least once. (The divisors are 1, 2, 3, 4, 6, 9, 12, 18, 27, 36, 54 and 108) 108 is the largest known number n such that 2n does not contain a 9. (2108 = 324518553658426726783156020576256) 108 is the internal angle (in degrees) of a regular pentagon 108 is the number of free heptominoes (the Tetris-like shapes made from seven linked squares.) 108 is the number of cards in a UNO deck. I've only scratched the surface. Gupta's book, Exploring the Beauty of Fascinating Numbers, has ten pages of facts about 108, ending with the observation that '1' stands for truth, '0' for emptiness and '8' is the infinity symbol rotated by 90 degrees. 'Thus the sacred number 108 tells us that we are at once something, nothing and everything.' The only other numbers that Gupta devotes an entire chapter to are pi, 13, 666 and 153 (possibly the second most interesting number in the universe). It could be the case that the spiritual importance of 108 led Asian mathematicians to catalogue interesting properties about it. Or it could be that 108 really is a particularly interesting number – it is not too small, not too large, and highly divisible – which helped it gain spiritual importance in the first place. How nice that numerologists and number theorists have something to agree about for once! Today's puzzles are about numbers with interesting properties. 1. Brilliant billions You have ten cards. On each of the cards is one of the digits 0 to 9. When you arrange the cards in a line you get a number between 0123456789 and 987654321 i) How many of these numbers are divisible by 2? ii) How many are divisible by 3? 2. How low can you go? What is the smallest even number between 1000 and 9999 written with four different digits? 3. All about me An autobiographical number is one where the first digit describes how many 0s it has, the second digit describes how many 1s it has, and so on, so that the (n + 1)th digit describes how many n's it has. For example, 1210 is an autobiographical number because it has 1 zero, 2 ones, 1 two and 0 threes. Find the only ten digit autobiographical number. I'll be back at 5pm UK with the solutions. PLEASE NO SPOILERS – instead tell me why you find 108 such a great number! Exploring the Beauty of Fascinating Numbers by Shyam Sunder Gupta is out now. I've been setting a puzzle here on alternate Mondays since 2015. I'm always on the look-out for great puzzles. If you would like to suggest one, email me. Sources of today's puzzles: 1) Leon Gelkoff, 2) SmartFriends, a daily IQ challenge, 3) An old classic.
