Linear Algebra - Underdetermined Systems

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daveyman
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Homework Statement



Every underdetermined system of linear equations has infinitely many solutions. (True/False)


Homework Equations



N/A


The Attempt at a Solution



Every source I have found, including several textbooks, say that underdetermined systems "often" or "usually" have an infinite number of solutions, so I'm assuming the answer is false, but I can't think of an example that shows an underdetermined system that does not have infinitely many solutions.

Any ideas?
 
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Here is the definition straight from my linear algebra book (Moore and Yaqub, 3rd Edition): Systems of linear equations with fewer equations than unknowns are frequently called undetermined systems.
 
daveyman said:
Here is the definition straight from my linear algebra book (Moore and Yaqub, 3rd Edition): Systems of linear equations with fewer equations than unknowns are frequently called undetermined systems.

Well think about it you can have 2 equations of a plane. How can they intersect?
 
Two planes could intersect on a particular line, thus creating an infinite number of solutions. If the planes are parallel, however, they will never intersect and there will be no solution.

So I guess the answer would be false?
 
That would be my guess.
 
One reason for my question, by the way, (besides the absolute importance of precise definitions in mathematics) was that the other reference I found defined "undetermined system" as one having an infinite number of solutions! The definition given here, and the solution to this problem, is the one I would expect.
 
daveyman said:
Here is the definition straight from my linear algebra book (Moore and Yaqub, 3rd Edition): Systems of linear equations with fewer equations than unknowns are frequently called undetermined systems.

I made an error that becomes extremely important in a discussion about definitions. I wrote undetermined but I meant underdetermined. Sorry about this. I don't think this changes the conclusion, however.

Do you agree?