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| Title: | Mathematics at DEC |
|
| Moderator: | RUSURE::EDP |
|
| Created: | Mon Feb 03 1986 |
| Last Modified: | Fri Jun 06 1997 |
| Last Successful Update: | Fri Jun 06 1997 |
| Number of topics: | 2083 |
| Total number of notes: | 14613 |
521.0. "solving n unknowns in one equation" by RDGE28::FLASH (project account) Wed Jun 25 1986 09:12
(Simon Clinch...) A A A
1 2 n
Given that P is a sum of terms of the form kx x ...x
1 2 n
with each k a real constant and x all real, and A integers >= 0,
i i
n
(in short P is a polynomial in P ),
prove that there exists such a P so that the single equation:
P(x ,x ,...,x ) = 0
1 2 n
can be solved for all x .
i
(This is easier than it may seem -- use lateral thinking!)
| T.R | Title | User | Personal
Name | Date | Lines |
|---|
| 521.1 | Just squeeze'em down | MODEL::YARBROUGH | | Wed Jun 25 1986 09:38 | 6 |
| How about
2*j1 2*j2 2*j3
x1 +x2 +x3 +... = 0
which has the solution(s) Xi = 0, i=1..n for arbitrary integers
Ji>0.
|