HOW MANy DIDGETS ARE IN THE Graham's number NOT INCLUDING COMMAS?
http://www-users.cs.york.ac.uk/susan/cyc/g/graham.htm
http://mathforum.org/library/drmath/view/68592.html
umm... ok! WOW!
Unbelievable, isn't it? <g>
To determine the number of digits in Graham's number without including commas, we first need to understand what Graham's number is.
Graham's number is an extremely large number that was demonstrated by Ronald Graham as a solution to a problem in the field of mathematics called Ramsey theory. It is so large that even the number of digits in Graham's number is difficult to comprehend.
Since Graham's number is known to be a massive number, it is most commonly represented using a type of mathematical notation called the Knuth up-arrow notation. This notation is used to represent repeatedly increasing exponentiation operations.
In the case of Graham's number, it is typically represented as "3↑↑↑↑3" or "G1" using Knuth up-arrow notation. The number of arrows represents the number of times the exponentiation operation is applied. Each arrow signifies another level of nested exponentiation.
To calculate the exact number of digits in Graham's number without including commas, we need to evaluate the expression "3↑↑↑↑3" or "G1." However, this computation is beyond the capabilities of most calculators and computers due to its enormous size.
Thus, we cannot directly determine the precise number of digits in Graham's number. However, we can say with certainty that it consists of an incredibly large number of digits. The exact number of digits has not been determined, and it is difficult to comprehend the magnitude of this number.