X-Received: by 2002:a05:622a:1d2:b0:31e:b6ec:be76 with SMTP id t18-20020a05622a01d200b0031eb6ecbe76mr3693837qtw.550.1657568882427; Mon, 11 Jul 2022 12:48:02 -0700 (PDT) X-Received: by 2002:a25:d74e:0:b0:66e:2e1a:c90c with SMTP id o75-20020a25d74e000000b0066e2e1ac90cmr19115122ybg.72.1657568882171; Mon, 11 Jul 2022 12:48:02 -0700 (PDT) Path: ...!news.misty.com!weretis.net!feeder6.news.weretis.net!usenet.blueworldhosting.com!feed1.usenet.blueworldhosting.com!peer01.iad!feed-me.highwinds-media.com!news.highwinds-media.com!news-out.google.com!nntp.google.com!postnews.google.com!google-groups.googlegroups.com!not-for-mail Newsgroups: fr.sci.maths Date: Mon, 11 Jul 2022 12:48:01 -0700 (PDT) In-Reply-To: Injection-Info: google-groups.googlegroups.com; posting-host=77.132.49.246; posting-account=T6s06goAAADtJZc1N3udMhONcz_CVxT6 NNTP-Posting-Host: 77.132.49.246 References: <7d121e0b-dee4-4394-aab8-6a4d929ceb85n@googlegroups.com> User-Agent: G2/1.0 MIME-Version: 1.0 Message-ID: <39114fd8-09e2-4943-bfd0-e60952c02331n@googlegroups.com> Subject: =?UTF-8?Q?Re=3A_Abscisses_de_discontinuit=C3=A9?= From: did Injection-Date: Mon, 11 Jul 2022 19:48:02 +0000 Content-Type: text/plain; charset="UTF-8" Content-Transfer-Encoding: quoted-printable X-Received-Bytes: 4341 Bytes: 4628 Lines: 75 Oui, j'avais remarqu=C3=A9 que la fonction est impaire, sauf aux points de = discontinuit=C3=A9.=20 J'aurais d=C3=BB le pr=C3=A9ciser. Merci pour la d=C3=A9monstration.=20 Pour les abscisses de discontinuit=C3=A9 (et la hauteur des sauts), je ne v= ois pas comment=20 m'y prendre.=20 On Monday, 11 July 2022 at 21:23:45 UTC+2, Olivier Miakinen wrote: > Le 11/07/2022 20:41, Olivier Miakinen a =C3=A9crit :=20 > > Le 11/07/2022 20:31, did a =C3=A9crit :=20 > >> J'ai ajout=C3=A9 le PS trop vite sans v=C3=A9rifier.=20 > >> f n'est pas impaire,=20 > >=20 > > En effet. f(1) =3D f(1/2) =3D -6 alors que f(-1) =3D 5 et f(-1/2) =3D -= 1=20 > >=20 > >> c'est une autre fonction dans=20 > >> laquelle elle apparait. En fait, la fonction qui=20 > >> m'int=C3=A9resse vraiment est=20 > >> F(x) =3D 1/2 + [ x + 1/2 ] + [ x - 2 * pi * [ x + 1/2 ] ],=20 > >> qui semble =C3=AAtre impaire d'apr=C3=A8s son graphe,=20 > >> mais cela reste =C3=A0 d=C3=A9montrer. > Alors.=20 >=20 > Cette fonction n'est *pas* impaire, parce que par exemple f(0) =3D 1/2 = =E2=89=A0 0.=20 > En revanche je peux montrer que F(=E2=88=92x) =3D =E2=88=92F(x) partout /= sauf/ aux points de=20 > discontinuit=C3=A9 !=20 >=20 > D=C3=A9j=C3=A0, pardon pour l'anglais, je vais noter floor(x) =3D =E2=8C= =8Ax=E2=8C=8B et ceil(x) =3D =E2=8C=88x=E2=8C=89,=20 > =C3=A7a me semble plus facile =C3=A0 =C3=A9crire et m=C3=AAme =C3=A0 lire= ..=20 >=20 >=20 > 1. Quelques remarques pr=C3=A9liminaires=20 >=20 > Aux points de discontinuit=C3=A9, on a ceil(x) =3D floor(x) =3D x. Ces po= ints ne vont=20 > pas nous int=C3=A9resser.=20 >=20 > En dehors d'un point de discontinuit=C3=A9, on a :=20 > (I) ceil(x) =3D floor(x) + 1 =3D floor(x + 1).=20 >=20 > Par ailleurs, pour tout x, on a :=20 > (II) floor(x) =3D =E2=88=92 ceil(=E2=88=92x) et ceil(x) =3D =E2=88=92 flo= or(=E2=88=92x).=20 >=20 >=20 > 2. Allons-y pour les calculs=20 >=20 > On part de :=20 > F(x) =3D 1/2 + floor(x + 1/2) + floor(x =E2=88=92 2 pi floor(x + 1/2))=20 >=20 > En dehors de tout point de discontinuit=C3=A9, on doit avoir :=20 > F(=E2=88=92x) =3D 1/2 + floor(=E2=88=92x + 1/2) + floor(=E2=88=92x =E2=88= =92 2 pi floor(=E2=88=92x + 1/2))=20 > F(=E2=88=92x) =3D 1/2 =E2=88=92 ceil(x =E2=88=92 1/2) + floor(=E2=88=92x = + 2 pi ceil(x =E2=88=92 1/2)) (par II)=20 > F(=E2=88=92x) =3D 1/2 =E2=88=92 floor(x =E2=88=92 1/2 + 1) + floor(=E2=88= =92x + 2 pi floor(x =E2=88=92 1/2 + 1)) (par I)=20 > F(=E2=88=92x) =3D 1/2 =E2=88=92 floor(x + 1/2) + floor(=E2=88=92x + 2 pi = floor(x + 1/2))=20 > F(=E2=88=92x) =3D 1/2 =E2=88=92 floor(x + 1/2) =E2=88=92 ceil(x =E2=88=92= 2 pi floor(x + 1/2)) (par II)=20 > F(=E2=88=92x) =3D 1/2 =E2=88=92 floor(x + 1/2) =E2=88=92 floor(x =E2=88= =92 2 pi floor(x + 1/2)) =E2=88=92 1 (par I)=20 > F(=E2=88=92x) =3D =E2=88=921/2 =E2=88=92 floor(x + 1/2) =E2=88=92 floor(x= =E2=88=92 2 pi floor(x + 1/2))=20 > F(=E2=88=92x) =3D =E2=88=92 F(x), CQFD=20 >=20 >=20 > --=20 > Olivier Miakinen