Mathematical constants | Continued fractions | Mathematical tables
A mathematical constant is a key number whose value is fixed by an unambiguous definition, often referred to by a symbol (e.g., an alphabet letter), or by mathematicians' names to facilitate using it across multiple mathematical problems. For example, the constant π may be defined as the ratio of the length of a circle's circumference to its diameter. The following list includes a decimal expansion and set containing each number, ordered by year of discovery. The column headings may be clicked to sort the table alphabetically, by decimal value, or by set. Explanations of the symbols in the right hand column can be found by clicking on them. (Wikipedia).
4 Calculating some interesting limits
Now that we have got the ball rolling, let's do some examples.
From playlist Life Science Math: Limits in calculus
Infinite Limits With Equal Exponents (Calculus)
#Calculus #Math #Engineering #tiktok #NicholasGKK #shorts
From playlist Calculus
I define one of the most important constants in mathematics, the Euler-Mascheroni constant. It intuitively measures how far off the harmonic series 1 + 1/2 + ... + 1/n is from ln(n). In this video, I show that the constant must exist. It is an open problem to figure out if the constant is
From playlist Series
Some simple functions representing real life models.
From playlist Life Science Math: Limits in calculus
scientific notation greatest value
a scientific notation problem with greatest value
From playlist Common Core Standards - 7th Grade
Limit doesn't exist 2 variables example
Example of how to show a limit doesn't exist for a function of 2 variables.
From playlist Engineering Mathematics
Calculus: Absolute Maximum and Minimum Values
In this video, we discuss how to find the absolute maximum and minimum values of a function on a closed interval.
From playlist Calculus
Describing the common laws of limits. Knowing these will greatly simplify your calculations of limits.
From playlist Life Science Math: Limits in calculus
Ex: Limits Involving the Greatest Integer Function
This video provides four examples of how to determine limits of a greatest integer function. Site: http://mathispower4u.com
From playlist Limits
Complex polynomials and their factors | Linear Algebra MATH1141 | N J Wildberger
We look at the arithmetic of complex polynomials, prove both the Factor theorem and the Remainder theorem, and discuss the contentious "Fundamental theorem of Algebra" from a computational perspective. ************************ Screenshot PDFs for my videos are available at the website htt
From playlist Higher Linear Algebra
Advice Maths| The conjugation connection between the exp polyseries and Hermite on-maxels | Wild Egg
In studying Harriot Pascal maxels in Algebraic Calculus One, we realized that a suitable conjugation simplifies their study significantly, and sheds light on the close connection between the exponential on-series and the Binomial theorem and associated coefficients. Using the same reasonin
From playlist Maxel inverses and orthogonal polynomials (non-Members)
LambdaConf 2015 - Haskell Nuggets Power Series Brought to Life Doug McIlroy
Operations on power series showcase the elegance and expressiveness of overloading and lazy evaluation. Simple one-liners for sum, product, integral, derivative, functional composition, functional inverse, etc. vividly embody the underlying mathematics, and even improve upon it by banishin
From playlist LambdaConf 2015
OCR MEI NEW A Level Maths 2018 Paper 3 Pure Mathematics and Comprehension Walkthrough Q6
Binomial Expansion! Welcome to my walkthrough of the OCR MEI 2018 NEW SPECIFICATION A Level Maths Paper 3, which is Pure Mathematics and Comprehension (H640/03) Find all of the OCR MEI A Level Maths 2018 paper walkthroughs here: OCR MEI NEW SPECIFICATION 2018 A Level Maths Paper 1 Walkt
From playlist OCR MEI NEW A Level Maths 2018 Paper 3 Pure Mathematics and Comprehension Walkthrough
Live CEOing Ep 20: MathematicalConstantData[] in the Wolfram Language
Watch Stephen Wolfram and teams of developers in a live, working, language design meeting. This episode is about MathematicalConstantData[] in the Wolfram Language.
From playlist Behind the Scenes in Real-Life Software Design
Wolfram Physics Project: Working Session Tuesday, Jan. 25, 2022 [Metamathematics]
This is a Wolfram Physics Project working session on metamathematics in the Wolfram Model. Originally livestreamed at: https://twitch.tv/stephen_wolfram Stay up-to-date on this project by visiting our website: http://wolfr.am/physics Check out the announcement post: http://wolfr.am/
From playlist Wolfram Physics Project Livestream Archive
OCR MEI NEW A Level Maths 2018 Paper 3 Pure Mathematics and Comprehension Walkthrough Q5
Welcome to my walkthrough of the OCR MEI 2018 NEW SPECIFICATION A Level Maths Paper 3, which is Pure Mathematics and Comprehension (H640/03) Find all of the OCR MEI A Level Maths 2018 paper walkthroughs here: OCR MEI NEW SPECIFICATION 2018 A Level Maths Paper 1 Walkthrough: https://www.y
From playlist OCR MEI NEW A Level Maths 2018 Paper 3 Pure Mathematics and Comprehension Walkthrough
Sequence Summation and the Difference Transform | Algebraic Calculus One | Wild Egg
Sequence summation is a key tool in the Discrete Calculus, dual to the Difference operation. We can state that the fundamental problem of the Discrete Calculus is summation of sequences, and we derive a few important ways of doing this, including the Fundamental Theorem of Discrete Calcul
From playlist Algebraic Calculus One
Advice for Research Mathematics | Compositional Inverses for polyseries | Wild Egg Maths
We discuss the role of composition and compositional inverses in the world of polyseries. Composition is an important kind of additional operation that is available for polynumbers, and the notion of a compositional inverse becomes available once we move further into polyseries. There i
From playlist Maxel inverses and orthogonal polynomials (non-Members)
Hypergroup definition and five key examples | Diffusion Symmetry 4 | N J Wildberger
We state a precise definition of a finite commutative hypergroup, and then give five important classes of examples, 1) the class hypergroup of a finite (non-commutative) group G 2) the character hypergroup of a finite (non-commutative) group G 3) the hypergroup associated to a distance-tr
From playlist Diffusion Symmetry: A bridge between mathematics and physics
Calculus 1 Lecture 1.2 Part 1: Properties of Limits. Techniques of Limit Computation
From playlist Calculus 1 Playlist 1