In geometry, the snub icosidodecadodecahedron is a nonconvex uniform polyhedron, indexed as U46. It has 104 faces (80 triangles, 12 pentagons, and 12 pentagrams), 180 edges, and 60 vertices. As the name indicates, it belongs to the family of snub polyhedra. The circumradius of the snub icosidodecadodecahedron with unit edge length is where ρ is the plastic constant, or the unique real root of ρ3 = ρ + 1. (Wikipedia).
Inspired by http://www.youtube.com/watch?v=PQOjkuJtBfM
From playlist Projects & Installations
(CCL) 자료원 : CS101 L029 Structures and Pointers https://youtu.be/9F9XMR5eqYY
From playlist c언어
Live CEOing Ep 268: Review of Functions Currently Tagged as "Experimental" in Wolfram Language
Watch Stephen Wolfram and teams of developers in a live, working, language design meeting. This episode is about Review of Functions Currently Tagged as "Experimental" in the Wolfram Language.
From playlist Behind the Scenes in Real-Life Software Design
Live CEOing Ep 186: Polyhedra in Wolfram Language
Watch Stephen Wolfram and teams of developers in a live, working, language design meeting. This episode is about Polyhedra in the Wolfram Language.
From playlist Behind the Scenes in Real-Life Software Design
Forest of the Golden Monkey (Full Episode) | China's Hidden Kingdoms
Meet China's most affectionate and vocal monkeys in the remote, seasonal forests of Central China. Follow the journey of a baby Golden snub-nosed monkey during the first year of her life as she learns all about her forest home and battles the elements to survive. Watch more Destination Wi
From playlist Full Episodes | National Geographic
A Baby Golden Snub-Nosed Monkey | Hidden Kingdoms of China
The golden snub-nosed monkey only lives in the mountains of central China. And, when a baby is born, all the females want a chance to hold her. ➡ Subscribe: http://bit.ly/NatGeoSubscribe #NationalGeographic #Monkeys #HiddenKingdomsOfChina About National Geographic: National Geographic is
From playlist News | National Geographic
Marjorie Wikler Senechal - Unwrapping a Gem - CoM Apr 2021
If the celebrated Scottish zoologist D’Arcy W. Thompson (1860 – 1948) could have met the near-legendary German astronomer Johannes Kepler (1571 – 1630), what would they talk about? Snowflakes, maybe? It is true that both men wrote about their hexagonal shapes. But they both wrote about Arc
From playlist Celebration of Mind 2021
Platonic and Archimedean solids
Platonic solids: http://shpws.me/qPNS Archimedean solids: http://shpws.me/qPNV
From playlist 3D printing
Phi and the TRIBONACCI monster
NEW (Christmas 2019). Two ways to support Mathologer Mathologer Patreon: https://www.patreon.com/mathologer Mathologer PayPal: paypal.me/mathologer (see the Patreon page for details) Today's video is about explaining a lot of the miracles associated with the golden ratio phi, the Fibona
From playlist Recent videos
Do the Nobel Prizes Still Make Sense in the 21st Century?
PBS Member Stations rely on viewers like you. To support your local station, go to: http://to.pbs.org/DonateOKAY ↓ More info and sources below ↓ The Nobel Prizes reward the greatest accomplishments of the human race. Right? Then why haven't they changed much in 100+ years? Do they really
From playlist Be Smart - LATEST EPISODES!
Adam Savage's One Day Builds: Snub-Nosed Blade Runner Blasters!
Adam puts together a beautiful Blade Runner-inspired snub-nosed blaster kit! Both Norm and Adam both work on their kits, each taking a different approach to the paint and finish. Adam goes one step further by adding machined metal parts to his blaster, giving it a brilliant look and some r
From playlist Adam Savage's One Day Builds
Si te gusta la animación, como nosotros en Facebook: http://www.nucleusinc.com/facebook http://www.nucleushealth.com/ - Esta animación corta trata sobre el procedimiento de mamografía para la deteccíon de cambios en el tejido mamario. La animación es ilustrativa demostrando paso a paso el
From playlist Animaciones Médicas de Nucleus en Español
And the haters gonna hate, hate, hate, hate, hate...
If someone ignored you, was it an honest mistake or a deliberate snub? This math problem demonstrates what most people already know: even assuming most people are fair minded and can make honest mistakes, the odds are the person was unfairly hating. #math #maths #mathematics #probability
From playlist Math Shorts
From playlist Japan: soroban and Flash anzan