As a student in year 11 mathematics (where my most famous memory is learning that A times B ≠ B times A) is learnt that the function nn obtained by multiplying an integer by itself n times grew more prapidly than n factorial: indeed the series of n!/nn I knew to converge by experiment on my calculator.
However, whereas the largest factorial below a given power of 1010 is easily given by the following sequence, finding the largest number for which nn can be calculated with an ordinary hand calculator is quite hard.
Whilst a simple test will show it to be between 56 and 57, it becomes very hard when one wants a precise value of the integer n for which nn = 10100. Working with my Casio fx-82MS, it gave errors after about eight decimal places, and turning to a computer calculator which can go above 10100, I found that the best approximation is
This would be a great curio for someone interested in number theory like myself. I never see nn discussed serious despite its rapid growth, so I wonder what people think of the simple piece of work I did recently?!
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