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categoryرياضيات schoolبكالوريوس event_available2026-07-13

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√3/2 cos(0.6-P40.6)| cos(0.6-P40.6)| 111** f(n+1)(t)(x - Laplace form : R₂(x) = f(n+1) (t)(x − t)" dt; 1 a Lagrange form : Rn(x) = (n + 1)! f(n+1) (c) (x − a) n+1 - for a certain cЄ J :=] min(a, x), max(a, x)[, arks 3.2 From (3.5) we have the error estimate (3.5) - | Rn(x)|≤ |x − an+1 (n+1)! tЄJ max | f(n+1)(t)|. (3.6) where J = [min(a, x), max(a, x)]. The relation (3.5) can be seen as a generalization of the mean value the- prem since for n = 0 we have Ro(x) = f(x) - Po(x) = f(x) = f(a) = f'(c)(x - a). le 3.1 we give the Taylor polynomials of degree n at a = 0 for a few

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