“Unhappy it is, though, to reflect that a brother’s sword has been sheathed in a brother’s breast and that the once-happy plains of America are either to be drenched with blood or inhabited by slaves. Sad alternative! But can a virtuous man hesitate in his choice?” - George Washington, 1777
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I'm going to suggest a slight change, it is not mathematically impossible, but darn unlikely.
If you flip a coin a 100 times or is not impossible it will land heads every time, but it is highly unlikely.
I had not heard of benford's law until last week. I've since tested it on multiple data sets. Yeah, it seems to work. And yes, the tallies for bidens votes don't follow benford's law while all other candidates do.
I stand by "impossible" for all practical purposes. Another article I read said that the odds of this were 1 in 10^23 against randomly getting the results that were seen in the 5 battle ground states.
3 comments:
I'm going to suggest a slight change, it is not mathematically impossible, but darn unlikely.
If you flip a coin a 100 times or is not impossible it will land heads every time, but it is highly unlikely.
I had not heard of benford's law until last week. I've since tested it on multiple data sets. Yeah, it seems to work. And yes, the tallies for bidens votes don't follow benford's law while all other candidates do.
I stand by "impossible" for all practical purposes. Another article I read said that the odds of this were 1 in 10^23 against randomly getting the results that were seen in the 5 battle ground states.
For all practical purposes 1/10^23 =0
You made me do math. 100 heads in a row is around 10^30. The odds you give are about the same as flipping 76 heads in a row.
Still practically impossible.
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