Tetrahedron used in a sentence

Tetrahedron in a sentence as a noun

"Look mommy, I made a tetrahedron by welding four planets.

The vertices of each of these triangles is joined to the sphere's centre to form a load of tetrahedrons.

DDG is good enough most of the time: What's the formula for the volume of a tetrahedron?

This is called the fire tetrahedron, and is the primary theory behind fire fighting.

Thanks!The linear tetrahedron is known to lock in structural finite element.

Course, then that makes me wonder if there's a 4-body version with a stable tetrahedron formation?

I'm curious how many points it takes to always be able to find a convex tetrahedron.

The quadratic infinihedron is its own dual, as the tetrahedron is.

In the tetrahedron, the south pole gets overlapped equally from all three radial directions.

Also in the introduction it shows you how to make a tensegretic tetrahedron out of chopsticks and rubber bands.

I don't really care at all if you had an experience that told you that all life existed on a 4 dimensional tetrahedron rotating through time.

You'll need to be more careful about what you're asking for, because 4 points in 3D always gives a convex tetrahedron, as there are no non-convex tetrahedra.

Imagine a 3d tetrahedron with toehold overhangs made entirely of one strand of DNA/RNA that unravel to deliver the payload.

I once wrote a tetrahedron sierpinski gasket... Was very fun, but always made my then GeForce 3 graphics card overheat at about 10 or 11 sub divisions.

Quick answer: "Triangle" becomes "tetrahedron" in 3 dimensions, and "simplex" in any number of dimensions.

It reduces to, why does this construction method always produce symmetry across the equator for the four non-tetrahedron solids?

By ordering the solids correctly—octahedron, icosahedron, dodecahedron, tetrahedron, and cube—Kepler found that the spheres correspond to the relative sizes of each planet's path around the Sun, generally varying from astronomical observations by less than 10%.

The second advantage is power: if you have proved \n something about regular polyhedra, then what you \n have proved automatically holds true for every \n polyhedron, whether it's a cube, a tetrahedron, or \n some polyhedron that you have never even heard about.\n\nIs this worded correctly/true?

My favorite unusual map is probably AuthaGraph:> This rectangular world map called AuthaGraph World Map is made by equally dividing a spherical surface into 96 triangles, transferring it to a tetrahedron while maintaining areas proportions and unfolding it to be a rectangle.> The world map can be tiled in any directions without visible seams.