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Re: [obm-l] TRINOMIO

To: obm-l@xxxxxxxxxxxxxx
Subject: Re: [obm-l] TRINOMIO
From: Iuri <iurisilvio@xxxxxxxxx>
Date: Tue, 25 Apr 2006 22:50:23 -0300
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É possivel demonstrar pelo PIF.

Hipotese: f(n)=k² --> f(n+1) = (k+1)²
Tese: f(n+1)=(k+1)² --> f(n+2)=(k+2)²

f(n)=n²+an+b=k²

f(n+1)=(n+1)²+a(n+1)+b=(k+1)²
n²+2n+1+an+a+b = n²+an+b+2n+a+1 = k²+2k+1
k²+2n+a+1=k²+2k+1
2n+a=2k

f(n+2)=(n+2)²+a(n+2)+b = n² +4n +4 +an +2a +b = (n²+an+b) +2(2n+a) +4 = k² + 2*2k +4=(k+2)² cqd

On 4/25/06, Klaus Ferraz <klausferraz@yahoo.com.br> wrote:

Os numeros inteiros a e b sao tais que para dois valores inteiros consecutivos a funcao f(x)=x^2+ax+b assume valores quadrados perfeitos, tambem consecutivos. Prove que f(x) assume valores quadrados perfeitos para todo valor inteiro de x.

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References:
- [obm-l] TRINOMIO
  - From: Klaus Ferraz

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