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| Progressions with perfect squares! (Posted on 2007-12-20) |
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Let's consider an arithmetical or geometrical progression with all elements natural numbers, which starts with a perfect square.
Prove that the progression includes an infinity of perfect squares!
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Submitted by Chesca Ciprian
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Rating: 4.0000 (1 votes)
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Solution:
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First, is easy to prove, in both case (arithmetical or geometrical progression) that because all elements are natural numbers, the ratio is a natural number too.
Let note
r = ration;
a(n) = the n elements for arithemtical progression;
b(n) = the n elements for geometrical progression;
p = any natural number;
a^2 = first element;
Prove for arithmetical progression :
If we take n = p^2*r+2*p*a+1 we find that
a(n) = a^2+r*(p^2*r+2*p*a+1-1) = a^2+p^2*r^2+2*p*a*r = (p*r+a)^2 a perfect square.
Prove for geometrical progression :
If we take n = 2*p+1 then
b(n) = a^2*r^(n-1) = a^2*r^2*p = (a*r^p)^2 a perfect square.
Because p can be any natural number there are a infinity elements who are perfect square!
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