User:Cloudy176/Department of bubbly negative numberbottles/By Edwin Shade

Herbert's Number is a number whose discovery remains shrouded in mystery, but none the less is extensively used in a number of modern mathematical theorems, such as the Alexandriovich-Luputov Nose-Stuffing Theorem.

Defintion

_____________________________________________________________________________________

Herbert's Number is a number equal to 42,308^((299^179)+21). It is a number with a truly marvelous number of digits that the margin of this page is too small to contain.

Origin

_____________________________________________________________________________________

Not much is known about Herbert's Number except that it was coined by the 17th century Scandinavian potato farmer Herhougolblougallothumthunthump D. Belladin, (known as 'Herbert' for short), who shortly after being reprimanded by his wife for snoring too loudly the fifth time in a month, became mentally deranged and lived as a hermit in the Hulopy Mountains, where he scrawled his dying message on the wall of a cave there, which happened to be the above number.

See Also

_____________________________________________________________________________________
 * Matthew's number
 * Graham's number