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Many scientists have criticized the plausibility of cryptids due to lack of physical evidence, [7] likely misidentifications [8] and misinterpretation of stories from folklore. [9] While biologists regularly identify new species following established scientific methodology, cryptozoologists focus on entities mentioned in the folklore record and ...
Pope Lick Monster (American Folklore) Kentucky Urban Legend – Cryptid, a murderous creature that is part man, sheep, and goat; Popobawa – One-eyed creatures bat-like; Poubi Lai (Meitei mythology) – Evil dragon python from the Loktak lake; Pouākai – Giant bird; Preta (Buddhist, Hindu, and Jain) – Ghosts of especially greedy people
Fiction about cryptids (6 C, 4 P) A. Aquatic cryptids (3 C, 18 P) E. Alleged extraterrestrial beings (1 C, 29 P) F. Cryptid footprints (8 P) H. Hominid cryptids (2 C ...
Each degree 5 vertex gives a charge of 1/5 to each neighbor. We consider which vertices could have positive final charge. The only vertices with positive initial charge are vertices of degree 5. Each degree 5 vertex gives a charge of 1/5 to each neighbor. So, each vertex is given a total charge of at most () /.
The image of P is one-dimensional and spanned by the Perron–Frobenius eigenvector v (respectively for P T —by the Perron–Frobenius eigenvector w for A T). P = vw T, where v,w are normalized such that w T v = 1. Hence P is a positive operator. Hence P is a spectral projection for the Perron–Frobenius eigenvalue r, and is called the ...
Oblivious to the traffic passing overhead, a large creature lurked under a bridge in Ecuador. The “cryptic”-looking creature hunted for food, sought out mates and generally went misidentified.
Urayuli, or "Hairy Men," as translated from most native Yupik languages, [1] are a Cryptid race (similar to Bigfoot or Yeti) of creatures that live in the woodland areas of southwestern Alaska. [2] Stories of the Urayuli describe them as standing 10 feet tall with long shaggy fur and luminescent eyes.
In mathematics, a Pisot–Vijayaraghavan number, also called simply a Pisot number or a PV number, is a real algebraic integer greater than 1, all of whose Galois conjugates are less than 1 in absolute value. These numbers were discovered by Axel Thue in 1912 and rediscovered by G. H. Hardy in 1919 within the context of Diophantine approximation.