In statistics, a theorem is a statement that has been proven to be true based on axioms and previously established theorems. Theorems play a fundamental role in statistical theory because they provide important results and insights that can be used to understand data, create models, and make inferences.
A tetradic number is a concept from number theory that refers to a specific type of number. A number \( n \) is considered a tetradic number if it can be expressed as the sum of two squares in two different ways.
"Mathematicians by award" typically refers to notable mathematicians recognized for their contributions to the field through various prestigious awards and honors. Here are some of the most renowned awards in mathematics and a few prominent mathematicians associated with those awards: 1. **Fields Medal**: Often referred to as the "Nobel Prize of Mathematics," it is awarded every four years to mathematicians under 40 years of age for outstanding achievements. - Notable recipients: André Weil, John G.
The Perkins Professorship of Astronomy and Mathematics is an academic position that typically exists at certain universities, often associated with significant contributions to the fields of astronomy and mathematics. Named after individuals or families who have made notable impacts in these fields, such professorships are intended to support research, teaching, and scholarship in these areas. The specifics of the Perkins Professorship, including the institution it is affiliated with, the qualifications for the position, and the responsibilities of the professor, can vary widely.
String art is a creative art form that involves creating visual designs or patterns by wrapping string, thread, or yarn around a series of points, typically nailed or pinned to a board or canvas. The process often includes a grid or framework, where the string is manipulated to form geometric shapes, intricate patterns, or images. The basic technique consists of: 1. **Framework Creation**: Points or nails are placed strategically on a surface, usually in a geometric pattern or shape.
Combinatorial computational geometry is a field that deals with the study of geometric objects and their relationships using combinatorial methods and techniques. Here is a list of key topics and areas of study within this domain: 1. **Convex Hulls**: Algorithms for finding the smallest convex polygon that contains a given set of points. 2. **Voronoi Diagrams**: Partitioning a plane into regions based on the distance to a specified set of points.
An index of accounting articles typically refers to a systematic list or catalog of articles, papers, and publications related to the field of accounting. This index may be organized by various criteria such as: 1. **Topics or Subjects**: Grouping articles by specific accounting topics like taxation, auditing, financial reporting, managerial accounting, international accounting, etc. 2. **Authors**: Listing articles according to the authors who wrote them.
Algebraic number theory is a branch of mathematics that studies the properties of numbers through the lens of algebra, particularly with a focus on algebraic integers and number fields. Here’s a list of topics commonly discussed in algebraic number theory: 1. **Number Fields**: - Definition and examples - Finite extensions of the rational numbers - Degree of a field extension 2.
Geodesic polyhedra and Goldberg polyhedra are two related types of geometric structures often studied in mathematics and geometry. ### Geodesic Polyhedra Geodesic polyhedra are structures that are approximations of spherical surfaces, created by subdividing the faces of a polyhedron into smaller, triangular or polygonal faces. This subdivision typically follows geodesic lines on the sphere.
In mathematics, particularly in geometry and topology, points possess several fundamental properties. Here’s a list of key mathematical properties and characteristics associated with points: 1. **Dimensionality**: - A point has no dimensions; it does not occupy space. It is often considered a zero-dimensional object. 2. **Location**: - Points are defined by their coordinates in a coordinate system, determining their position in a geometric space (e.g., Cartesian coordinates, polar coordinates).
The philosophy of statistics is a branch of philosophy that examines the foundations, concepts, methods, and implications of statistical reasoning and practices. It encompasses a range of topics, including but not limited to: 1. **Nature of Statistical Inference**: Philosophers of statistics investigate how we draw conclusions from data and the relationship between probability and statistical inference. This includes discussions on frequentist versus Bayesian approaches and the underlying principles that justify these methods.
"Model makers" can refer to professionals or individuals who create models for various purposes, including: 1. **Architectural Model Makers**: They create physical or digital scale models of buildings or structures. These models help architects and clients visualize the final product. 2. **Industrial Designers**: They may create prototypes or models of products to test design concepts and functionalities before mass production.
In the context of Wikipedia, "physicist stubs" refer to short and incomplete articles about physicists that require expansion and improvement. A stub is a term used on Wikipedia to categorize articles that are too brief to provide comprehensive information on a topic. These articles often contain only basic details, such as the physicist's name, significant contributions, or a brief biography, and lack depth or extensive context.
Physics awards are honors given to individuals or groups who have made significant contributions to the field of physics. These awards can recognize achievements in research, education, teaching, or advancements in specific areas of physics. Some of the most prestigious physics awards include: 1. **Nobel Prize in Physics**: Awarded annually by the Royal Swedish Academy of Sciences to individuals who have made outstanding contributions to the field.
The list of minerals by optical properties refers to a classification of minerals based on their optical characteristics, such as color, luster, birefringence, pleochroism, and refractive index. These properties are significant for mineral identification and characterization, particularly in petrology and mineralogy. Here are some key optical properties that can be used to classify minerals: 1. **Color**: The color of a mineral as seen in transmitted or reflected light.
Albert Einstein was a prolific physicist whose work changed the landscape of modern physics. He published numerous scientific papers throughout his career. Here is a list of some of his most significant publications: 1. **Princeton University Library**: Many of Einstein's papers can be found archived at the Princeton University Library, which houses the Einstein Papers Project.
Pinned article: Introduction to the OurBigBook Project
Welcome to the OurBigBook Project! Our goal is to create the perfect publishing platform for STEM subjects, and get university-level students to write the best free STEM tutorials ever.
Everyone is welcome to create an account and play with the site: ourbigbook.com/go/register. We belive that students themselves can write amazing tutorials, but teachers are welcome too. You can write about anything you want, it doesn't have to be STEM or even educational. Silly test content is very welcome and you won't be penalized in any way. Just keep it legal!
Intro to OurBigBook
. Source. We have two killer features:
- topics: topics group articles by different users with the same title, e.g. here is the topic for the "Fundamental Theorem of Calculus" ourbigbook.com/go/topic/fundamental-theorem-of-calculusArticles of different users are sorted by upvote within each article page. This feature is a bit like:
- a Wikipedia where each user can have their own version of each article
- a Q&A website like Stack Overflow, where multiple people can give their views on a given topic, and the best ones are sorted by upvote. Except you don't need to wait for someone to ask first, and any topic goes, no matter how narrow or broad
This feature makes it possible for readers to find better explanations of any topic created by other writers. And it allows writers to create an explanation in a place that readers might actually find it.Figure 1. Screenshot of the "Derivative" topic page. View it live at: ourbigbook.com/go/topic/derivativeVideo 2. OurBigBook Web topics demo. Source. - local editing: you can store all your personal knowledge base content locally in a plaintext markup format that can be edited locally and published either:This way you can be sure that even if OurBigBook.com were to go down one day (which we have no plans to do as it is quite cheap to host!), your content will still be perfectly readable as a static site.
- to OurBigBook.com to get awesome multi-user features like topics and likes
- as HTML files to a static website, which you can host yourself for free on many external providers like GitHub Pages, and remain in full control
Figure 3. Visual Studio Code extension installation.Figure 4. Visual Studio Code extension tree navigation.Figure 5. Web editor. You can also edit articles on the Web editor without installing anything locally.Video 3. Edit locally and publish demo. Source. This shows editing OurBigBook Markup and publishing it using the Visual Studio Code extension.Video 4. OurBigBook Visual Studio Code extension editing and navigation demo. Source. - Infinitely deep tables of contents:
All our software is open source and hosted at: github.com/ourbigbook/ourbigbook
Further documentation can be found at: docs.ourbigbook.com
Feel free to reach our to us for any help or suggestions: docs.ourbigbook.com/#contact





