# Superabundant

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**Seraph**— A seraph (Heb. שׂרף, pl. שׂרפים Seraphim , lat. seraph [us] , pl. seraphi [m] ) is one of a class of celestial beings mentioned once in the Hebrew Bible (Tanakh or Old Testament), in Isaiah . Later Jewish imagery perceived them as having human… …52

**House Sparrow**— Male in Australia Female in England …53

**12 (number)**— ← 11 13 → 12 ← 10 11 12 13 14 15 16 …54

**Highly composite number**— This article is about numbers having many divisors. For numbers factorized only to powers of 2, 3, 5 and 7 (also named 7 smooth numbers), see Smooth number. A highly composite number (HCN) is a positive integer with more divisors than any… …55

**John Fell (clergyman)**— John Fell (June 23, 1625 – July 10, 1686), served as Dean of Christ Church, Oxford, and later concomitantly as Bishop of Oxford.BiographyThe son of Samuel Fell, also Dean of Christ Church, he was born at Longworth, Berkshire (now Oxfordshire) and …56

**Barn Owl**— Tyto alba alba at British Wildlife Centre, Surrey, England Conservation status …57

**Multiply perfect number**— In mathematics, a multiply perfect number (also called multiperfect number or pluperfect number) is a generalization of a perfect number. For a given natural number k, a number n is called k perfect (or k fold perfect) if and only if the sum of… …58

**Deficient number**— In number theory, a deficient number or defective number is a number n for which the sum of divisors σ(n)<2n, or, equivalently, the sum of proper divisors (or aliquot sum) s(n)<n. The value 2n − σ(n) (or n − s(n)) is… …59

**Burrowing Owl**— For the Canadian winery, see Burrowing Owl Estate. Burrowing Owl Adult Florida Burrowing Owl (Athene cunicularia floridana) Conservation status …60

**Michael Oakeshott**— Michael Joseph Oakeshott Full name Michael Joseph Oakeshott Born December 11, 1901(1901 12 11) Chelsfield, London, England Died December 19, 1990 …