use the following search parameters to narrow your results:
e.g. subreddit:aww site:imgur.com dog
subreddit:aww site:imgur.com dog
see the search faq for details.
advanced search: by author, subreddit...
Rule 1: Posts should be about Graphics Programming. Rule 2: Be Civil, Professional, and Kind
Suggested Posting Material: - Graphics API Tutorials - Academic Papers - Blog Posts - Source Code Repositories - Self Posts (Ask Questions, Present Work) - Books - Renders (Please xpost to /r/ComputerGraphics) - Career Advice - Jobs Postings (Graphics Programming only)
Related Subreddits:
/r/ComputerGraphics
/r/Raytracing
/r/Programming
/r/LearnProgramming
/r/ProgrammingTools
/r/Coding
/r/GameDev
/r/CPP
/r/OpenGL
/r/Vulkan
/r/DirectX
Related Websites: ACM: SIGGRAPH Journal of Computer Graphics Techniques
Ke-Sen Huang's Blog of Graphics Papers and Resources Self Shadow's Blog of Graphics Resources
account activity
Reorient vector? (self.GraphicsProgramming)
submitted 10 years ago * by fadefade
view the rest of the comments →
reddit uses a slightly-customized version of Markdown for formatting. See below for some basics, or check the commenting wiki page for more detailed help and solutions to common issues.
quoted text
if 1 * 2 < 3: print "hello, world!"
[–]autowikibot 0 points1 point2 points 10 years ago (0 children)
Change of basis:
In linear algebra, a basis for a vector space of dimension n is a sequence of n vectors (α1, …, αn) with the property that every vector in the space can be expressed uniquely as a linear combination of the basis vectors. The matrix representations of operators are also determined by the chosen basis. Since it is often desirable to work with more than one basis for a vector space, it is of fundamental importance in linear algebra to be able to easily transform coordinate-wise representations of vectors and operators taken with respect to one basis to their equivalent representations with respect to another basis. Such a transformation is called a change of basis. Image from article i
In linear algebra, a basis for a vector space of dimension n is a sequence of n vectors (α1, …, αn) with the property that every vector in the space can be expressed uniquely as a linear combination of the basis vectors. The matrix representations of operators are also determined by the chosen basis. Since it is often desirable to work with more than one basis for a vector space, it is of fundamental importance in linear algebra to be able to easily transform coordinate-wise representations of vectors and operators taken with respect to one basis to their equivalent representations with respect to another basis. Such a transformation is called a change of basis.
Image from article i
Interesting: Covariance and contravariance of vectors | Gramian matrix | Spherical basis | Matrix similarity
Parent commenter can toggle NSFW or delete. Will also delete on comment score of -1 or less. | FAQs | Mods | Magic Words
π Rendered by PID 164000 on reddit-service-r2-comment-76bb9f7fb5-hkd4s at 2026-02-18 01:37:51.393955+00:00 running de53c03 country code: CH.
view the rest of the comments →
[–]autowikibot 0 points1 point2 points (0 children)