http://unapologetic.wordpress.com Mathematics for the interested outsider Wed, 11 Nov 2009 17:32:47 +0000 http://wordpress.com/ hourly 1 http://unapologetic.wordpress.com/2009/10/06/vector-valued-functions/#comment-15230 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 17:32:47 +0000 http://unapologetic.wordpress.com/?p=3624#comment-15230 [...] some open region in . That is, if we pick a basis and coordinates of , then the function is a vector-valued function of real variables with components . The differential, then, is itself a vector-valued function [...] [...] some open region in . That is, if we pick a basis and coordinates of , then the function is a vector-valued function of real variables with components . The differential, then, is itself a vector-valued function [...]

]]> http://unapologetic.wordpress.com/2009/01/02/calculating-the-determinant/#comment-15229 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 16:50:06 +0000 http://unapologetic.wordpress.com/?p=2274#comment-15229 [...] to as the Jacobian, or the Jacobian matrix. Since this matrix is square, we can calculate its determinant, which is also referred to as the Jacobian, or the Jacobian determinant. I’ll try to be clear [...] [...] to as the Jacobian, or the Jacobian matrix. Since this matrix is square, we can calculate its determinant, which is also referred to as the Jacobian, or the Jacobian determinant. I’ll try to be clear [...]

]]> http://unapologetic.wordpress.com/2009/09/28/euclidean-spaces/#comment-15228 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 16:49:07 +0000 http://unapologetic.wordpress.com/?p=3529#comment-15228 [...] rule, the differential at the point defines a linear transformation from the -dimensional space of displacement vectors at to the -dimensional space of displacement vectors at , and the matrix entries with respect to [...] [...] rule, the differential at the point defines a linear transformation from the -dimensional space of displacement vectors at to the -dimensional space of displacement vectors at , and the matrix entries with respect to [...]

]]> http://unapologetic.wordpress.com/2009/10/07/the-chain-rule-2/#comment-15227 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 16:48:07 +0000 http://unapologetic.wordpress.com/?p=3665#comment-15227 [...] like we said when discussing the chain rule, the differential at the point defines a linear transformation from the -dimensional space of [...] [...] like we said when discussing the chain rule, the differential at the point defines a linear transformation from the -dimensional space of [...]

]]> http://unapologetic.wordpress.com/2009/09/24/differentials/#comment-15226 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 16:46:50 +0000 http://unapologetic.wordpress.com/?p=3514#comment-15226 [...] function of real variables with components . The differential, then, is itself a vector-valued function whose components are the differentials of the component [...] [...] function of real variables with components . The differential, then, is itself a vector-valued function whose components are the differentials of the component [...]

]]> http://unapologetic.wordpress.com/2009/11/02/parallelepipeds-and-volumes-i/#comment-15225 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 16:45:34 +0000 http://unapologetic.wordpress.com/?p=3890#comment-15225 [...] Now that we’ve used exterior algebras to come to terms with parallelepipeds and their transformations, let’s come back to apply these ideas to the [...] [...] Now that we’ve used exterior algebras to come to terms with parallelepipeds and their transformations, let’s come back to apply these ideas to the [...]

]]> http://unapologetic.wordpress.com/2009/10/27/exterior-algebras/#comment-15224 The Jacobian « The Unapologetic Mathematician Wed, 11 Nov 2009 16:44:29 +0000 http://unapologetic.wordpress.com/?p=3947#comment-15224 [...] Now that we’ve used exterior algebras to come to terms with parallelepipeds and their transformations, let’s come back to apply [...] [...] Now that we’ve used exterior algebras to come to terms with parallelepipeds and their transformations, let’s come back to apply [...]

]]> http://unapologetic.wordpress.com/2009/11/10/the-cross-product-and-pseudovectors/#comment-15222 Qiaochu Yuan Tue, 10 Nov 2009 17:44:13 +0000 http://unapologetic.wordpress.com/?p=4246#comment-15222 Thank you! I've always wanted to see a clear explanation of this online, and I think the Wikipedia articles are a little too intimidating. Thank you! I’ve always wanted to see a clear explanation of this online, and I think the Wikipedia articles are a little too intimidating.

]]> http://unapologetic.wordpress.com/2008/12/23/antisymmetric-tensors/#comment-15221 The Cross Product and Pseudovectors « The Unapologetic Mathematician Tue, 10 Nov 2009 17:02:12 +0000 http://unapologetic.wordpress.com/?p=2215#comment-15221 [...] we can see exactly what’s going on. These are just the spaces , , , and , along with their representations of the orthogonal group . And the “pseudo” means we’ve used the Hodge star [...] [...] we can see exactly what’s going on. These are just the spaces , , , and , along with their representations of the orthogonal group . And the “pseudo” means we’ve used the Hodge star [...]

]]> http://unapologetic.wordpress.com/2009/07/27/orthogonal-transformations/#comment-15220 The Cross Product and Pseudovectors « The Unapologetic Mathematician Tue, 10 Nov 2009 17:01:05 +0000 http://unapologetic.wordpress.com/?p=3044#comment-15220 [...] and inner product-preserving transformations, but we can also throw in reflections to get the whole orthogonal group, of all transformations from one orthonormal basis to [...] [...] and inner product-preserving transformations, but we can also throw in reflections to get the whole orthogonal group, of all transformations from one orthonormal basis to [...]

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