In geometry, a 10-cube is a ten-dimensional hypercube. It has 1024 vertices, 5120 edges, 11520 square faces, 15360 cubic cells, 13440 tesseract 4-faces, 8064 5-cube 5-faces, 3360 6-cube 6-faces, 960 7-cube 7-faces, 180 8-cube 8-faces, and 20 9-cube 9-faces. It can be named by its Schläfli symbol {4,38}, being composed of 3 9-cubes around each 8-face. It is sometimes called a dekeract, a portmanteau of tesseract (the 4-cube) and deka- for ten (dimensions) in Greek, It can also be called an icosaxennon or icosa-10-tope as a 10 dimensional polytope, constructed from 20 regular facets. It is a part of an infinite family of polytopes, called hypercubes. The dual of a dekeract can be called a 10-orthoplex or decacross, and is a part of the infinite family of cross-polytopes. (Wikipedia).
Calculating the side of a square that is resting inside a cube.
From playlist Middle School - Worked Examples
What is the Cube of a Number? | Don't Memorise
To learn more about Cube and Cube Roots, enrol in our full course now: https://bit.ly/CubesAndCubeRoots In this video, we will learn: 0:00 Introduction 0:12 cube of a number 0:37 applications of a cube of a number 2:21 sign of the cube of the number is the same as the sign of the number
From playlist Cubes and Cube roots Class 08
Convert Numbers in Different Bases to Base Ten
In the last example 7^4=2401, not 2410 as shown. This is not used in the conversion to base 10 and therefore does not affect the answer. This lesson explains how to convert numbers in different bases to base ten. Site: http://mathispower4u.com
From playlist Historical Counting Systems
Model Whole Numbers Using Base 10 Block
This video explains how to model whole numbers using base 10 blocks.
From playlist Introduction to Whole Numbers
Powered by https://www.numerise.com/ Cube numbers
From playlist Indices, powers & roots
u07_l3_t1_we1 Identifying Geometric Solids
From playlist Developmental Math
Google Brain Teaser - The 10 Puzzle
Can you get to 10 from the numbers 1, 1, 5, 8? You have to use all the numbers, and you have to each number exactly once. You can use + - ÷ × and parentheses (). You are not allowed to use exponents, so 10 = 8 + 1 + 1^5 is not a valid solution. This problem went viral when Google Japan u
From playlist Everyday Math
Illustrative Mathematics Grade 6 - Unit 1- Lesson 17
Illustrative Mathematics Grade 6 - Unit 1- Lesson 17 Open Up Resources (OUR) If you have any questions, please contact me at dhabecker@gmail.com
From playlist Illustrative Mathematics Grade 6 Unit 1
CubeMatic: Addition in base 10 is faster than no base { SoME1}
An algorithmic approach to numbers, addition, subtraction. One cube, then one more cube makes two cubes. That is the idea of CubeMatic. Actually, math started with no-base systems. Base-10 comes much later. We can do arithmetic without using a base. It works but it would be complex repres
From playlist Summer of Math Exposition Youtube Videos
The Trick That Solves Rubik’s Cubes and Breaks Ciphers (Meet in the Middle)
What do the Rubik's cube and a cipher from the 70s have in common? Let's find out. 0:00 Rubik's cube 9:40 DES ------------------------ Links: Feliks setting the 4.73 record https://www.youtube.com/watch?v=R07JiT0PlcE&ab_channel=FeliksZemdegs webpage "God's number is 20" http://www.cub
From playlist Algorithms
Many Cubes! - OpenGL with PyOpenGL Python and PyGame - 6
In this OpenGL programming tutorial with Python and PyOpenGL we cover how to add many cubes into our 3D environment to add to the challenge of our game. PyOpenGL playlist: http://youtu.be/R4n4NyDG2hI?list=PLQVvvaa0QuDdfGpqjkEJSeWKGCP31__wD PyGame with Python 3 Playlist: http://www.youtub
From playlist PyGame with Python 3 Game Development
Induction Inequality Proof: 2^n greater than n^3
Induction Inequality Proof: 2^n greater than n^3 In this video we do an induction proof to show that 2^n is greater than n^3 for every integer n greater than or equal to 10. If you enjoyed this video please consider liking, sharing, and subscribing. Udemy Courses Via My Website: https
From playlist Principle of Mathematical Induction
Algebra Rational Expressions Long Division
Algebra Rational Expressions Long Division
From playlist Algebra
Gravitation: Kepler’s Laws of Planetary Motion, Example Problems
This video goes through six example worked example problems for Kepler's third law of planetary motion. Social Media for Step by Step Science: Teacher Pay Teachers Store: https://tinyurl.com/y6d2cdfj Instagram: https://www.instagram.com/stepbystepscience101/ Website: https://stepbysteps
From playlist Gravitation: Orbital Velocity, Orbital Period, Potential Energy, Kinetic Energy, Mass and Weight
The problem: f(x) = x³ + 2. Find the derivative of the inverse of f at x-10. The problem is solved both graphically and algebraically.
From playlist Calculus Ch 3 - Derivatives
Binomial Expansion | Algebra | A-Level Maths Series
A video revising the techniques and strategies for working with binomial expansions (A-Level Maths). This video is part of the Algebra module in A-Level maths, see my other videos below to continue with the series. 👑 Everything you Need to Pass your AS Pure Maths Exam! A* | AS Pure Maths
From playlist A-Level Maths Series - Pure Mathematics
Negative and Fractional Indices (Higher Only) | GCSE Maths Tutor
A video revising the techniques and strategies surrounding the laws of indices, focusing on negative and fractional indices for the higher tier paper. This video is part of the Number module in GCSE maths, see my other videos below to continue with the series. These are the calculators t
From playlist Aiming for Grades 7-9 Maths Series