Search results
Results from the WOW.Com Content Network
Mirrors and Reflections: The Geometry of Finite Reflection Groups is an undergraduate-level textbook on the geometry of reflection groups.It was written by Alexandre V. Borovik and Anna Borovik and published in 2009 by Springer in their Universitext book series.
Queries often take the form of a collection of themed questions that are read at the beginning of a time of worship or reflection. Many yearly meetings maintain a set of basic queries in their books of Faith and Practice to provide guidance on certain issues over time.
Reflective practice is the ability to reflect on one's actions so as to take a critical stance or attitude towards one's own practice and that of one's peers, engaging in a process of continuous adaptation and learning.
In the mathematical theory of reflection groups, the parabolic subgroups are a special kind of subgroup.The precise definition of which subgroups are parabolic depends on context—for example, whether one is discussing general Coxeter groups or complex reflection groups—but in all cases the collection of parabolic subgroups exhibits important good behaviors.
Four corners is a collaborative method of teaching and learning that gives the students a platform for various cognitive and affective learnings. This strategy helps the students to think at a higher level, reflect on what they have learned in class, voice opinions safely, learn to critique on various issues, evaluate certain solutions, and communicate better.
1) get a fantastic full-body workout, and 2) safely work toward more advanced variations with this six-move routine that she created for WH. “I wanted to make sure we targeted every muscle group ...
Naikan (Japanese: 内観, lit. ' introspection ') is a structured method of self-reflection developed by Yoshimoto Ishin (1916–1988) in the 1940s. [1] The practice is based around asking oneself three questions about a person in one's life: [2]
In group theory and geometry, a reflection group is a discrete group which is generated by a set of reflections of a finite-dimensional Euclidean space.The symmetry group of a regular polytope or of a tiling of the Euclidean space by congruent copies of a regular polytope is necessarily a reflection group.