The vertex
The name of the point at which all of a triangle's angle bisectors converge is the incenter.
A Vanishing Point
I Dont Know Try Searching It On Google
It is called the "vanishing point". Your question is about the usefulness of vanishing points when drawing horizontal lines in a painting, and the vertical features of whatever you are painting. It's something you learn in Art lessons.
Skew lines
Lines of latitude are all parallel to each other, so do not converge. Lines of longitude do converge, at the north and the south poles.
An asymptote is a straight line that a curve approaches but never intersects.
Because unlike lines of longitude which converge on the poles, lines of latitude are parallel to each other: that is, they never converge.
There is no single characteristic for a place where things meet or converge. I would like to say that the place must be something physical, lines can converge on a page (or a screen), people can converge at a lunch table, rail lines converge in many places. However, that place isn't necessarily physical, you can have a meeting of minds, or ideas that converge in a single mind or in time.
Not quite. Lines of latitude are called parallels, and they never touch each other. The meridians are lines of longitude, and all of them converge at the poles.
It means that they come together and intersect.
Longitude lines show the number of degrees east and west of the Prime Meridian. They are farthest apart at the equator and converge to a single dot at the north and south poles. Latitude lines show distance north and south from the equator. Because they are parallel to the equator, they never converge. Latitude at 90o north and south can be shown only as a dot, not a line.
Parallel lines Never Converge
The point at which horizon lines receding from an observer seem to converge.
In drawing it is the point at which parallel lines appear to converge.
All longitudes converge at the north and south poles.
The name of the point at which all of a triangle's angle bisectors converge is the incenter.