Difference between revisions of "2005 JBMO Problems/Problem 4"

m
m
 
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The terms cancel, and thus we get that
 
The terms cancel, and thus we get that
  
For some (m, n, t, j) which are respectively factors of (a, b, c)
+
For some (m, n, t) which are respectively factors of (a, b, c)
  
 
     100m + 10n + t = mnt(m + n + t)j^3
 
     100m + 10n + t = mnt(m + n + t)j^3
  
 
With  0 < m, n, t, j < 10
 
With  0 < m, n, t, j < 10
 +
 +
And (m, n, t) being pairwise relatively prime
  
 
The computation is left to the reader
 
The computation is left to the reader
  
 
-igetit
 
-igetit

Latest revision as of 21:34, 11 April 2019

Let (a, b, c) = k Then a = pk

b = qk

c = rk

100a + 10b + c = abc(a + b + c)

100p + 10q + r = pqr(p + q + r)k^3

We see that if any of (a, b, c) is 0, all the terms are 0, and such (a, b, c) are nonzero

We will show that we can find (m, n, t) such that m, n, and t are factors of a, b, and c respectively, with (m, n, p) being pairwise relatively prime.

Let (p, q) = c with p = cs and q = cy

Then

    c(100s + 10y) + r = (c^2)syr(cs + cu + r)k^3

We see that c is also a factor of r.

We get similar results for (p, r) = c and (q, r) = c

The terms cancel, and thus we get that

For some (m, n, t) which are respectively factors of (a, b, c)

    100m + 10n + t = mnt(m + n + t)j^3

With 0 < m, n, t, j < 10

And (m, n, t) being pairwise relatively prime

The computation is left to the reader

-igetit