4 24.djvu | Oraux X Ens Analyse

The integral term: ( \left| \int_0^1 f'(t) \cos(nt) , dt \right| \leq \int_0^1 |f'(t)| dt < \infty ), hence it is bounded. Thus the whole integral term is ( O(1/n) ). Wait — but we need ( o(1/n) ), not just ( O(1/n) ).

[ J_n = \left[ f'(t) \frac\sin(nt)n \right]_0^1 - \frac1n \int_0^1 f''(t) \sin(nt) dt. ] Boundary: at ( t=1 ): ( f'(1) \sin n / n ); at ( t=0 ): ( f'(0) \cdot 0 / n = 0 ). So ( J_n = O(1/n) ). Oraux X Ens Analyse 4 24.djvu

I cannot directly access external files such as Oraux X Ens Analyse 4 24.djvu . However, if you provide the text or a specific exercise from that document (e.g., by copying the statement or describing the problem), I can certainly help produce a detailed solution, commentary, or a synthetic correction typical of an oral examination at ENS/X level in analysis. The integral term: ( \left| \int_0^1 f'(t) \cos(nt)