It is usually referred to as a wormhole.
3D
I think such a dimension would be a very boring place to live. I think I'd call that dimension {0}.
It is a measure in 1 dimensional space. No time dimension.
A Euclidean space of dimension greater than three.
Theoretical, infinate, if you travel through warp space.
The Third Dimension is the dimension of space, the one we are in now. The Fourth Dimension is the theoretical dimension of time, which overlaps onto the 3'rd Dimension.
Any integer dimension that you like.
Any integer dimension that you like.
Length IS a dimension (in space). It has no thickness.
It is a measure of 2-dimension space that is contained within the boundaries of the shape.It is a measure of 2-dimension space that is contained within the boundaries of the shape.It is a measure of 2-dimension space that is contained within the boundaries of the shape.It is a measure of 2-dimension space that is contained within the boundaries of the shape.
No, you will not enter another dimension because you still going to be in space. But you can't survive after you have sucked into the black hole. instead you will be torn apart into 5000 - 9000 times. and the pieces of you, will after be demolished into space.
Ingress is another word for entry into a space. Ingress can be accomplished by a door, window, or another kind of opening.
The Fourth dimension in Space is a real distance dimension r, completing the three vector displacement dimensions. Space is a quaternion with one real dimension and three vector dimensions, s= r + Ix + Jy + Kz, where I,J and K denote the vector dimensions. The real dimension r is related to time by r=ct where c is the speed of light. Einstein and Minkowski proposed in Relativity Theory a defective four dimension Space, where the fourth dimension is a vector Ict . This Space is essentially a two dimensional Space and does not exhibit the non-commuttive features of the quaternion Space.
sure, why not
Rational dimension refers to the dimension of a vector space over the field of rational numbers. It is the minimum number of linearly independent vectors needed to span the entire vector space. The rational dimension can differ from the ordinary dimension of a vector space if the vectors are over a field other than the rational numbers.
An "other dimension" is a dimension other than the three dimensions of space and one of time that we normally experience.
A Betti number is a number associated to each topological space and dimension, giving an approximate number of holes of that dimension in that space.