When a base is congruent it is the same shape and size, and parallel is when they will never touch. Therefore, on a square the top and bottom are congruent parallel bases. Some other examples are: Cylinders, rectangular prisms, and of course parallelograms.
A hexagonal prism.A hexagonal prism.A hexagonal prism.A hexagonal prism.
That would be some kind of prism. To answer the question more specifically, I would need to know the shape of the bases.
The shape of each base of a cylinder is circle. Also, the base of it can be a pair of congruent or parallel.
No. A trapezoid is a 4-sided flat shape with straight sides that has a pair of opposite sides parallel. The opposite angles not congruent.
parallelogram, because if the two bases are congruent and parallel then the sides will also have to be parallel, so it is a parallelogram
It is a cylinder
a cylinder!
When a base is congruent it is the same shape and size, and parallel is when they will never touch. Therefore, on a square the top and bottom are congruent parallel bases. Some other examples are: Cylinders, rectangular prisms, and of course parallelograms.
No, its a triangularprism
A prism has two parallel and congruent bases in the shape of polygons. Example - a cereal box (is rectangular prism). The top and bottom are rectangles(a polygon). They are the same size and shape (congruent) and also parallel. A cube (think of six sided dice) is a special rectangular prism. Imagine a a box where the top and bottom are triangles (of the shape size and shape). This is called a triangular prism.
Prisms are classified according to the shape of the two congruent and parallel plane shapes which form its bases.
A hexagonal prism.A hexagonal prism.A hexagonal prism.A hexagonal prism.
Each and every prism has two parallel congruent bases. It is the shape of these bases that give the name to the prism: a pentagonal prism has pentagons (not necessarily regular) for its bases.
Sounds like a rectangular solid to me, such as an elongated box.
prism
That would be some kind of prism. To answer the question more specifically, I would need to know the shape of the bases.