Prism
Trending Questions
Q. How many edges and vertices does a rectangular prism have?
- 8, 6
- 12, 8
- 6, 12
- 8, 12
Q.
Which of the following are true regarding the given figure?
Which of the following are true regarding the given figure?
- The given solid is a hexagonal prism
- All of the above
- Two faces are hexagons, and the rest are rectangles
- The cross sectional area of the figure is constant
Q.
A prism is a polyhedron whose base and top are different polygons and whose lateral faces are parallelograms in shape.
True
False
Q. The length of the edge of a cube is l. The total length of its edges is:
- 12l
- 4l
- 3l
- 6l
Q.
A football is an example of:
Pyramid
Circle
Sphere
Prism
Q. What is the total number of rectangular faces in a rectangular prism?
- 6
- 7
- 4
- 5
Q. What is the total number of triangular faces in a triangular prism?
- 1
- 2
- 3
- 4
Q. How much is the difference between the number of edges and the number of faces of a cube?
- 0
- 2
- 4
- 6
Q.
I am surrounded by faces, all of equal shape and size, I am ______
Q. The total number of edges of a cube is times the total number of faces of cube.
- 1.5
- 2
- 3
Q. What is the total number of rectangular faces in a rectangular prism?
- 6
- 7
- 4
- 5
Q.
Which of the following is correct for a cube?
Vertices - 8, Faces - 6, Edges - 12
Vertices - 6, Faces - 8, Edges - 12
Vertices - 8, Faces - 6, Edges - 10
Vertices - 8, Faces - 12, Edges - 6
Q.
Which is correct for a square pyramid?
Vertices - 4, Faces - 5, Edges - 8
Vertices - 8, Faces - 4, Edges - 8
Vertices - 5, Faces - 5, Edges - 8
Vertices - 5, Faces - 5, Edges - 10
Q. The number of faces and edges in a triangular pyramid is and respectively.
- 5
- 4
- 6
- 3
Q. For a cube, the number of faces is F, number of edges is E, and number of vertices is V. Find the value of F + E + V.
Q.
For a cube, the number of faces is F, number of edges is E, and number of vertices is V. Find the value of F + E + V.
- 26
- 25
- 24
- 23
Q. Name of the solid having following net diagram is:
- Cuboid
- Prism
- Pyramid
- Cone