0 vertices 0edges 2 flat surfaces
There are 2 flat surfaces, both are circles.
The description given fits that of a cylinder
V= number of vertices E= number of edges F= number of faces For ALL convex polyhedra V-E+F=2 (Euler Characteristic of closed convex polyhera is 2; the genus is 2-2=1) For a torus (donut shape) V-E+F = 3 (genus is 3-2= 1)
that is impossible!!! you cant have 2 edges make a shape
a cylinder l
0 vertices 0edges 2 flat surfaces
a cylinder
A cylinder.
A cylinder
A paper cup typically has three flat surfaces: the bottom, which is circular, and the two sides which are usually straight and flat. These surfaces are necessary for the cup to hold its shape and be able to stand upright.
There is no shape that has only 2 edges and 2 faces.
There are 2 flat surfaces, both are circles.
The description given fits that of a cylinder
V= number of vertices E= number of edges F= number of faces For ALL convex polyhedra V-E+F=2 (Euler Characteristic of closed convex polyhera is 2; the genus is 2-2=1) For a torus (donut shape) V-E+F = 3 (genus is 3-2= 1)
2 flat surfaces unless it is rolled up in which case it has 2 curved surfaces.
A cylinder would seem to fit the given description