When he finishes counting, The Count laughs and announces his total (which sometimes appears on screen). In one song, he stated that he sometimes even counts himself. The Count has a compulsive love of counting ( arithmomania, an affliction of legendary vampires) he will count anything and everything, regardless of size, amount, or how much annoyance he causes others around him. He first appeared on the show in the Season 4 premiere in 1972, counting blocks in a sketch with Bert and Ernie. The Count with two Honkers, for the cover of the home video Learning About Numbers.Ĭount von Count is a mysterious but friendly vampire-like Muppet on Sesame Street who is meant to parody Bela Lugosi's portrayal of Count Dracula. The Count celebrates his birthday in a Daryl Cagle illustration from the October 1983 issue of Sesame Street Magazine with Cookie Monster, Ernie, Bert, Betty Lou, Mona Monster, Little Bird, Big Bird, Grover, and Prairie Dawn.ĭetail on the Count's face as he appeared during his first year on Sesame Street. New York Mets Mookie Wilson and Keith Hernandez. The Count's debut from the Season 4 premiere ( Episode 406).Ĭount operates an elevator for Kermit the Frog. The Count in his youth, as seen in the song " The First Day of School." The Count's animated alter ego in The Street We Live On. So my guess is that the Count is able to take the square root of $34969$ in his head then do the $23$ reversals and get the palindrome, but hasn't yet managed to do the same with $38416=196^2$.The Count laughing with his personal thundercloud. Most of the $3$-digit numbers require only a few reversals. Anderton has taken this up to $70,928$ digits, also without success. Leyland has performed $50,000$ reversals, producing a number of more than $26,000$ digits with no palindrome appearing, and P. $196$ is the only number less than $10,000$ that by this process has not yet produced a palindrome. The procedure is to reverse a number's digits and add the resulting number to the original.ĭo all numbers become palindromes eventually? The answer to this problem is not known. This is then followed by the entry for $196$, which includes an explanation of palindromes by reversal. The smallest of a group of $3$-digit numbers that require $23$ reversals to form a palindrome. Presumably if it's a square root thing, we're allowed to consider its square root, which, as other answers have noted, is $187$.Īccording to David Wells, The Penguin Dictionary of Curious and Interesting Numbers, (Penguin, 1986), $187$ is Murder squared: was the Count trying to tell us something? ![]() ![]() Anīut both he and Toby Lewis hinted at darkness behind the Count'sĬarefree laughter and charming flashes of lightning: 187 is also the What, he asked, could be lovelier?Īnd Simon Philips calculated that 187 is 94 squared minus 93 squared -Īnd of course 187 is also 94 plus 93 (although that would be true ofĪny two consecutive numbers, as reader Lynn Wragg pointed out). Which makes 34,969 a very fine number indeed, being 11 squared timesġ7 squared. Of a Scrabble game, speculating that the Count might have countedĭavid Lees noticed that 187 is the product of two primes - 11 and 17. Toby Lewis noted that 187 is the total number of points on the tiles More or Less turned to its listeners for help. The following is taken verbatim from the link: ![]() There are some speculations in the following article:
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