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The Bermuda Triangle, also known as the Devil's Triangle, is a loosely defined region between Florida, Bermuda, and Puerto Rico in the North Atlantic Ocean. Since the mid-20th century, the area has been the subject of an urban legend , which claims that many aircraft and ships have disappeared there under mysterious circumstances.
However there are numerous exceptions; for example the lightest exception is chromium, which would be predicted to have the configuration 1s 2 2s 2 2p 6 3s 2 3p 6 3d 4 4s 2, written as [Ar] 3d 4 4s 2, but whose actual configuration given in the table below is [Ar] 3d 5 4s 1.
According to Bermuda Attractions, over 1,000 ships and planes have disappeared as far back as five centuries ago. Unfortunately for those 1,000 sunken crafts, Czerski's theory does not suggest ...
The following works on the Bermuda Triangle mention the Marine Sulphur Queen: Bermuda Triangle article in Argosy Magazine, February 1964 ; Into the Bermuda Triangle: Pursuing the Truth Behind the World's Greatest Mystery, Gian J. Quasar; The Bermuda Triangle, Charles Berlitz (ISBN 0-385-04114-4) The Bermuda Triangle Mystery Solved (1975).
Og, 118, oganesson : 1s 2 2s 2 2p 6 3s 2 3p 6 4s 2 3d 10 4p 6 5s 2 4d 10 5p 6 6s 2 4f 14 5d 10 6p 6 7s 2 5f 14 6d 10 7p 6 Note that these electron configurations are given for neutral atoms in the gas phase, which are not the same as the electron configurations for the same atoms in chemical environments.
PICK ANY ONE of the more than 50 ships or 20 planes that have disappeared in the Bermuda Triangle in the last century. Each one has a story without an ending, leading to a litany of conspiracy ...
Bohr's original configurations would seem strange to a present-day chemist: sulfur was given as 2.4.4.6 instead of 1s 2 2s 2 2p 6 3s 2 3p 4 (2.8.6). Bohr used 4 and 6 following Alfred Werner's 1893 paper. In fact, the chemists accepted the concept of atoms long before the physicists. Langmuir began his paper referenced above by saying,
The number of integers which are relatively prime to 666 is also 216, () =; [6] and for an angle measured in degrees, = = (where here is the golden ratio). [ 7 ] [ 8 ] [ a ] 666 is also the sum of the squares of the first seven primes (2 2 + 3 2 + 5 2 + 7 2 + 11 2 + 13 2 + 17 2 ) , [ 7 ] [ 10 ] while the number of twin primes less than ...