I'm writing some software, and I came across an interesting mathematical problem.
How many right-angled tetrahedrons does it take to construct any irregular tetrahedron?
>>9102375
Four
>>9102378
He has no image
He has no proof
Anon has a funny truth
No one?
>>9102375
the answer is 2
>>9102545
Everyone here is a brainlet who don't know how to answer cool questions like yours.
Sorry dude. But so far, yeah, try four.
>>9102578
But what arrangement?
>>9102375
Are you sure it's eve possible to fill any irregular tetrahedron with a finite amount of right-angled tetrahedrons?
I'm trying to sketch something, but I always end up dividing the problem into smaller tetrahedrons
>>9102375
Is this proven to be possible?
I can't think of any construction that doesn't end up with a smaller tetrahedron or more complex shapes.
I did find a construction that yields a tetrahedron that has two right angles that don't intersect, but all further constructions remove one of them.
>>9102394
A-NON
A-NON WRONG
A-NON
ANON'S FUCKING WRONG.
>>9102778
That doesn't cover all tetrahedrons.