Proving Parallel Lines with Matrices: Q3

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To prove that the two lines represented by the given matrix equations are parallel, calculating the determinant is crucial. The determinant was found to be zero, indicating that the matrix is singular and does not have a unique solution. This singularity implies that the lines do not intersect, confirming they are parallel. An explanation of this reasoning is essential for clarity. The discussion also invites further assistance on related matrix questions.
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Homework Statement



If

l -1 2 l l x l = l 2 l
l 1 -2 l l y l l 1 l

Show that the two lines are parallel and so never cross.

Homework Equations





The Attempt at a Solution


I have attempted it, and so far all i have done is find the determentant. When i do this, i get zero:

det = ad - bc
= (-1*-2) - (2*1) = 0

So, is this all I have to do to prove that the lines are parallel?
 
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Yes, except you should explain your reasoning. I would explain it as:

If the determinant is 0, the matrix is singular, meaning it doesn't have a unique solution. For a system of two lines in 2D space, this is only possible if they're parallel.
 
okay thanks :) could be please try and help me with my other question i put up? it's called Matrices Question 2...thanks again
 

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