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Yes. But depending on the characteristic of 1729 that is chosen, there are different answers:
1729, the Ramanujan-Hardy number is the smallest sum of two different pairs of positive cubes. Being the smallest such number, there cannot be another LIKE it because the other won't be the smallest.
Also, if negative numbers are allowed, there is a much smaller solution:
63 + (-5)3 = 216 - 125 = 91
and
43 + 33 = 64 + 27 = 91
This can also be presented as four consecutive integers, the sum of the smaller two cubed being the same as the difference of the larger two cubed.
The 1729th decimal place is the beginning of the first occurrence of all ten digits consecutively in the decimal representation of e, the base of natural logariths. This is not unique because it would apply to e+0.5 or e plus any decimal that terminates before 1729 places, it is unique in the sense that few mathematicians will come across memorable transcendental numbers other than e and pi.
1729 is one of only 4 positive integers such that the sum of its digits multiplied by the reversal of the answer gives the original number.
This 1+7+2+9 = 19 and 19*91 = 1729. In this case, then, there are three other numbers, although one of them is trivial: it is 1.
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Why is Ramanujan's favourite number 1729?
1729 is the Ramanujan's favorite number because 1729 is the sum of two consecutive cubes. 12³+1³ 1728+1= 1729 10³+9³ 1000+729= 1729
Is 1729 a prime number or a composite number?
ANSWER: 1729 is a composite number.It is divisible by 7.
Why the number 1729 is special?
(9*9*9) + (10*10*10)= 1000+729=1729
Importance of the number 1729 in the lives of srivasa ramanujan and ghhardy?
It is 1729. Discovered by mathemagician Srinivas Ramanujan, 1729 is said to be the magic number because it is the sole number which can be expressed as the sum of the cubes of two different sets of numbers. Ramanujan's conclusions are summed up as under: 1) 10 3 + 9 3 = 1729 and 2) 12 3 + 1 3 = 1729.
What is the LCM of 35 and 1729 and 15953?
The LCM is 19,701,955
