Guest phaedrus Posted June 11, 2005 Posted June 11, 2005 i am new to this forum and not exactly sure if this post belongs here. i need a concrete idea for a determinant. i understand the determinant as the volume of the parallelopiped in the n dimensions corresponding to the order of the determinant. but is there an alternate idea? while working with polygonal numbers and determinants i found that the 3*3 order determinant of any 9 consecutive n-polygonal numbers is -(3*(n-2))^3. i was trying to understand what this result could mean but since my idea of the determinant is vague i was trying to go backwards and understand the determinant. anyway does this result have anysignificance? i proved this by obtaining a general form for an n- polygonal number and then estimating its determinant.
MetaFrizzics Posted August 1, 2005 Posted August 1, 2005 Show me how you derived your original definition of a determinant: I haven't seen that way of looking at them. Is that from Analytical Geometry?
DQW Posted August 1, 2005 Posted August 1, 2005 Show me how you derived your original definition of a determinant: Unless I'm completely misunderstanding phaedrus, I don't see where s/he claims to have derived a new definition of a determinant. More on determinants :http://mathworld.wolfram.com/Determinant.html Phaedrus, I don't see any reason why your result should mean anything special. In general, the k-th n-gonal number is linear in n. So a 3X3 determinant of n-gonal numbers will be a cubic in n. What exactly do you find interesting ?
matt grime Posted August 2, 2005 Posted August 2, 2005 the determinant is the linear action of the inherited action of the map on the last component of the exterior algebra. does that help?
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