Asimov Pupil Posted September 7, 2005 Posted September 7, 2005 can someone please introduce me to Hyperplanes. thank you
Dave Posted September 7, 2005 Posted September 7, 2005 The more pertanent question is, what do you want to know about them?
ydoaPs Posted September 7, 2005 Posted September 7, 2005 would they be like a full rectangular prism?
Dave Posted September 7, 2005 Posted September 7, 2005 According to MathWorld, a hyperplane can be more than 4-dimensional (it's an n-dimensional object), so you can't really say what it would "look" like.
Dave Posted September 7, 2005 Posted September 7, 2005 How would you have a hyperplane in 3 dimensions? Do you mean the projection onto 3 dimensions?
Dave Posted September 7, 2005 Posted September 7, 2005 No, a plane is 3-dimensional. A line is 2-dimensional
matt grime Posted September 8, 2005 Posted September 8, 2005 A hperplane in any vector space of dimension n is an n-1 dimensional subspace, ie a line in R^2, a plane (through the origin) in R^3, a copy of R^3 in R^4. Sometimes that is simplified to any subspace of "codimension 1" which allows for infinite dimensional definitions as well. The simplest examples that occur "naturally" are in hilbert spaces, or an inner product space, where we can use any element z to define a hyperplane as the {x : <x,z>=0}
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