It is a skew prism. If the parallelograms are rectangles then it is a right prism.
A dodecagon prism has two decagonal bases which are parallel and congruent to one another. They are joined together by 12 rectangular faces.
No, a trapezoid cannot have 3 bases. A trapezoid is a quadrilateral with exactly one pair of parallel sides. The parallel sides are called bases of the trapezoid. Therefore, there can only be 2 bases.
A triangular prism. :)
Tetrahedron, Hexahedron(cube), Octahedron, Dodecahedron, and Icosahedron
Difference 1: A prism has two bases that are parallel to each other. A pyramid has only one base. Difference 2: The sides of a prism are rectangular (these are the sides that aren't the bases)_. The sides of a pyramid are triangular.
A prism has two congruent parallel bases.
Prism, which a polyhedron with two congruent and parallel faces (the bases) and whose lateral faces are parallelograms.
A rectangular prism has congruent bases and parallelograms as lateral surfaces.
a circle * * * * * A circle is not even a polyhedron! The correct answer is a prism.
Prism, which a polyhedron with two congruent and parallel faces (the bases) and whose lateral faces are parallelograms.
A cylinder is one example.
A prism.
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.
None!! ha
A cylinder would fit such a description of it.
It is a prism. More specifically, "A solid figure that has two bases that are parallel, congruent polygons and with all other faces that are parallelograms." This describes the general prism. Replace "polygons" with "triangles" and you have specified a triangular prism.
A parallelogram or trapezoid.No!A parallelogram or a trapezoid are polygons (2-dimensional). A polyhedron, or 3-dimensional object, with parallel congruent bases is a prism.A prism. To give it fuller description, an "n-gonal prism" where the "n-gon" refers to the 2-d name of the bases.