The Evaluation of Polynomials
نویسنده
چکیده
The following propositions are true: (1) For every natural number n holds 0−′ n = 0. (3)1 Let D be a non empty set, p be a finite sequence of elements of D, and n be a natural number. If 1 ≤ n and n ≤ len p, then p = (p (n−′ 1))a 〈p(n)〉a (p n). Let us observe that every left zeroed add-right-cancelable right distributive left unital commutative associative non empty double loop structure which is field-like is also integral domain-like. Let us note that there exists a non empty double loop structure which is strict, Abelian, addassociative, right zeroed, right complementable, associative, commutative, distributive, well unital, integral domain-like, field-like, non degenerated, and non trivial.
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