An interesting equation!

Jai Ganesh · 2009-01-13 19:06:40

By chance, it occured to me

where a=1, b=2, c=3, d=4, and e=5.

Can any of you think of why this may not be the only solution to the equation? I think it is a unique solution since the values of cubes of numbers grow at a much more rapid rate than the squares.

Views/Comments please.

JaneFairfax · 2009-01-14 00:58:11

Presumably you mean are all positive integers.

Well, I found another solution:

Last edited by JaneFairfax (2009-01-14 02:16:15)

Ricky · 2009-01-14 01:05:04

SOSASOC (squares of sums and sums of cubes)

This is an old problem (18th century maybe?), and new results have been published on it recently. If you work out the induction, you'll find that (1, ..., n) is always a solution. Given a number n, (d_1, d_2, ..., d_n) where each d_i is the number of divisors of a divisor of n is also a solution. There is also a way to multiply to solutions together to find a new third solution. Under a certain mapping, all solutions can be viewed as the kernel of a homomorphism from a direct sum of integers to the rationals.

This link has some of these results, and is an easy read, perhaps even those without much of a mathematical background.

JaneFairfax · 2009-01-14 01:12:25

Jai Ganesh · 2009-01-14 02:12:06

Thanks Ricky, for that link. It seems pretty interesting.
Thanks Jane, for taking the trouble of finding alternate solutions. You always manage to find a flaw in what I do, ha! Just kiddin'.

JaneFairfax · 2009-01-14 14:53:31

Jai Ganesh · 2009-01-14 17:57:30

Maybe I should've added

Math Is Fun Forum

#1 2009-01-13 19:06:40

An interesting equation!

#2 2009-01-14 00:58:11

Re: An interesting equation!

#3 2009-01-14 01:05:04

Re: An interesting equation!

#4 2009-01-14 01:12:25

Re: An interesting equation!

#5 2009-01-14 02:12:06

Re: An interesting equation!

#6 2009-01-14 14:53:31

Re: An interesting equation!

#7 2009-01-14 17:57:30

Re: An interesting equation!

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