What does my cube look like?
(1 votes)
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This is not good with the round surfaces.
They’re better.
Has to do with this:
What distance do we have to travel on the surface of a spherical body from its fictitious north pole in the south direction to the latitude of its latitude equal to the distance covered?
But this is a dode cakeder with twelve surfaces. Anderlik’s cube wants to have 15 equal areas, which I don’t believe. However, if you look at the picture he has delivered, the round surfaces are actually the same. But I have my doubts about the symmetry of the interspaces. This raises the interesting question of how angular distances can be distributed as equally as possible on a ball. 12 surfaces and 20 surfaces. But for 15 areas, as I mean, you have to hide certain compromises well. This cannot be a fair cube. It would be an interesting task for statisticians, the inevitable accumulation of throwing events, to calculate in advance only from the form of the so-called 15’s throw.
Doesn’t look like a fair dice.
It should not be, but:
What distance do we have to travel on the surface of a spherical body from its fictitious north pole in the south direction to the latitude of its latitude equal to the distance covered?
Implementation of the above-mentioned task
Why shouldn’t he be fair?
He looks rather uneven. But in order to really appreciate that, it would have to be seen in reality.
He’s not a definition cube…
Not so beautiful
Making better
Yes square
How much is 1,34889981 * 80/pi ? Now measure the diameter of my ball grinding, then we can keep talking.
No way, it doesn’t fit
The circumference of the cuts corresponds to the width circle length. (See above)
No explain how the cube fills this
You only understand the station
not so.
Then the task is not fulfilled.
What distance do we have to travel on the surface of a spherical body from its fictitious north pole in the south direction to the latitude of its latitude equal to the distance covered?
I have a spherical cube.