how do we place three dimensional shapes on a page and identify and name the sphere and then how do we sort the shapes on the sorting mat and decribe the sphere
The English language noun 'sphere' comes from the classical (and modern) Greek word sphaira- σφαίρα.Any word in Latin using the root syllable sphaer-' for 'globe, sphere', as 'sphaeristerium for 'place for playing ball games' or 'sphaeromachia' for 'boxing with iron balls strapped to the boxers' hands', were loan-words from Greek.
A great circle is any circle whose center is also the center of the sphere. You could try this way: Spread ink on a sheet of paper. Set the sphere on the paper so that it picks up a mark from the ink, and at the same time, place a mark on the highest point of the sphere. Then draw any circle on the sphere that includes those two points. As we read the question, we were fascinated by the implication that you have spheres with more or less than 3 dimensions.
the biosphere
Treat the 3D sphere as a 2D circle. The radius for the sphere is the same radius as for the circle. No matter where on the sphere you place a mark, the distance (radius) from the mark to the centre of the sphere will always be the same as the circle.
A glacier is a place you can visit, a thing that shapes the landscape.
Plato Users: Troposphere.
The Lithosphere. +++ But not "in" - "on" instead. On the surfaces of hills and mountains.
A shadow? Many people are fat and thin, tall and short. This stands for different shapes and sizes. We have shapes, like our oval head, and he curve at our hips. The only right place for it is right behind or in front of us.
A shadow? Many people are fat and thin, tall and short. This stands for different shapes and sizes. We have shapes, like our oval head, and he curve at our hips. The only right place for it is right behind or in front of us.
When two sides (called faces) of a 3-dimensional shape meet, they meet at an edge.
Since a "face" is usually defined as a flat area and no area of a sphere is flat, the answer would be NO. It is possible to place two planes tangent to the surface of the sphere and parallel to each other, but each plane will only touch the surface of the sphere at a single point rather than coinciding with a "face".
Pole