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Re: [obm-l] IME 55/56

To: obm-l@xxxxxxxxxxxxxx
Subject: Re: [obm-l] IME 55/56
From: Roger <roger.lbd@xxxxxxxxx>
Date: Sat, 16 Dec 2006 16:43:20 -0200
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g(x) = x⁴ – 16x³ + 89x² – 206x + 168
f(x) = x⁴ – 16x³ + 91x² – 216x + 180

Fazendo:

f(x) = g(x) q(x) + r(x)

Se f(x) e g(x) possuem t como uma raiz comum:

f(t) = g(t) q(t) + r(t)

r(t) = 0

r(t) = f(t) - q(t) g(t)

Dividindo f(x) por g(x), encontramos r(x) :

r(x) = 2x^2 -10x + 12

assim:

t1 = 2 e t2=3

Em 16/12/06, arkon <arkon@bol.com.br> escreveu:

Help, nesta questão do IME, me envie a resolução, por favor.

(IME 55/56)

Dadas as equações

(i)                  x⁴ – 16x³ + 89x² – 206x + 168 = 0

(ii)                x⁴ – 16x³ + 91x² – 216x + 180 = 0

(iii)               x⁴ – mx³ + nx² – 462x + 432 = 0

Determinar:

a) As raízes comuns das equações (i) e (ii),

b) Os valores de m e n da equação (iii), sabendo que ela admite as raízes determinadas no item (a).

Follow-Ups:
- Re: [obm-l] IME 55/56
  - From: Roger
- [obm-l] locus dos pes dos bissetores
  - From: Luís Lopes

References:
- [obm-l] IME 55/56
  - From: arkon

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