In mathematics, a de Rham curve is a certain type of fractal curve named in honor of Georges de Rham. The Cantor function, Cesàro curve, Minkowski's question mark function, the Lévy C curve, the blancmange curve, and Koch curve are all special cases of the general de Rham curve. (Wikipedia).
Using the pythagorean theorem to a rhombus
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
What are the properties that make up a rhombus
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
Applying the properties of a rhombus to determine the length of a diagonal
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
Using the properties of a rhombus to determine the side of a rhombus
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
Using the properties of a rhombus to determine the missing value
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
Area of a Rhombus: Without Words
GeoGebra Resource Link: https://www.geogebra.org/m/acfbyxaw
From playlist Geometry: Dynamic Interactives!
How to find the missing angle of a rhombus
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
Polynumbers and de Casteljau Bezier curves | Algebraic Calculus and dCB curves | N J Wildberger
The Algebraic Calculus is an exciting new approach to calculus, not reliant on "infinite processes" and "real numbers". The central objects are polynomially parametrized curve, which turn out to be the same as the de Casteljau Bezier curves which play such a big role in design, animation,
From playlist Algebraic Calculus One Info
Determining a missing length using the properties of a rhombus
👉 Learn how to solve problems with rhombuses. A rhombus is a parallelogram such that all the sides are equal. Some of the properties of rhombuses are: all the sides are equal, each pair of opposite sides are parallel, each pair of opposite angles are equal, the diagonals bisect each other,
From playlist Properties of Rhombuses
De Rham Cohomology: PART 1- THE IDEA
Credits: Animation: I animated the video myself, using 3Blue1Brown's amazing Python animation library "manim". Link to manim: https://github.com/3b1b/manim Link to 3Blue1Brown: https://www.youtube.com/channel/UCYO_jab_esuFRV4b17AJtAw Beyond inspecting the source code myself, this channel
From playlist Cohomology
Lars Hesselholt: Around topological Hochschild homology (Lecture 7)
The lecture was held within the framework of the (Junior) Hausdorff Trimester Program Topology: "Workshop: Hermitian K-theory and trace methods" Introduced by Bökstedt in the late eighties, topological Hochschild homology is a manifestation of the dual visions of Connes and Waldhausen to
From playlist HIM Lectures: Junior Trimester Program "Topology"
Einstein Might Have Been Wrong About Gravity... Here’s Why
The universe is expanding, and fast. And this new theory could explain why. » Subscribe to Seeker! http://bit.ly/subscribeseeker » Watch more Elements! http://bit.ly/ElementsPlaylist » Visit our shop at http://shop.seeker.com The universe is expanding, and that expansion is speeding up.
From playlist Elements | Seeker
Cycles in the de Rham cohomology of abelian varieties - Yunqing Tan
Topic: Cycles in the de Rham cohomology of abelian varieties Speaker: Yunqing Tang, Member, School of Mathematics Time/Room: 2:15pm - 2:30pm/S-101 More videos on http://video.ias.edu
From playlist Mathematics
Voisin Claire "From Analysis situs to the theory of periods"
Résumé The talk will focus on the pairing between singular homology and de Rham cohomology: Combinatorics of cells of a triangulation on one side, differential forms on the other side. The two aspects of the subject were already present in Poincaré's work, but the fact that this pairing i
From playlist Colloque Scientifique International Poincaré 100
Alexander Petrov - Automatic de Rhamness of p-adic local systems and Galois action on the (...)
Given a $p$-adic local system $L$ on a smooth algebraic variety $X$ over a finite extension $K$ of $Q_p$, it is always possible to find a de Rham local system $M$ on $X$ such that the underlying local system $L|_{X_{\overline{K}}}$ embeds into $M|_{X_{\overline{K}}}$. I will outline the pr
From playlist Franco-Asian Summer School on Arithmetic Geometry (CIRM)
Andrea Pulita: An overview on some recent results about p-adic differential equations ...
Abstract: I will give an introductory talk on my recent results about p-adic differential equations on Berkovich curves, most of them in collaboration with J. Poineau. This includes the continuity of the radii of convergence of the equation, the finiteness of their controlling graphs, the
From playlist Algebraic and Complex Geometry
Xinwen Zhu - Principle B for de Rham representations
Let X be a smooth connected algebraic variety over a p-adic field k and let L be a Q_p étale local system on X. I will show that if the stalk of L at one point of X, regarded as a p-adic Galois representation, is de Rham, then the stalk of L at every point of X is de Rham. This is a joint
From playlist A conference in honor of Arthur Ogus on the occasion of his 70th birthday
A p-adic monodromy theorem for de Rham local systems - Koji Shimizu
Joint IAS/Princeton University Number Theory Seminar Topic: A p-adic monodromy theorem for de Rham local systems Speaker: Koji Shimizu Affiliation: Member, School of Mathematics Date: February 27, 2020 For more video please visit http://video.ias.edu
From playlist Mathematics
Quadratic de Casteljau-Bezier Curves (Ch7 Pr12)
An introductory mathematical description of Quadratic de Casteljau-Bezier curves. This is Chapter 7 Problem 12 from the MATH1131/1141 Calculus notes. Presented by Dr Daniel Mansfield from the UNSW School of Mathematics and Statistics.
From playlist Mathematics 1A (Calculus)
Dmitry Kaledin - 3/3 Motives from the Non-commutative Point of View
Motives were initially conceived as a way to unify various cohomology theories that appear in algebraic geometry, and these can be roughly divided into two groups: theories of etale type, and theories of cristalline/de Rham type. The obvious unifying feature of all the theories is that the
From playlist Summer School 2020: Motivic, Equivariant and Non-commutative Homotopy Theory