A frustum of a square pyramid is like a slightly distorted cuboid. It has 12 edges.
A hexahedron. A parallelepiped, cuboid, quadrilateral frustum are examples.
as as amny as you want it to have!
Yes, it must because a frustum is only a part of a cone.
A frustum is a three-dimensional geometric shape that is formed by slicing the top off a cone or pyramid, resulting in two parallel bases: one larger and one smaller. The properties of a frustum include its height, the radii (or side lengths) of the two bases, and the slant height, which connects the edges of the bases. The volume of a frustum can be calculated using the formula ( V = \frac{1}{3} h (A_1 + A_2 + \sqrt{A_1 A_2}) ), where ( A_1 ) and ( A_2 ) are the areas of the two bases. Additionally, the surface area includes the areas of both bases and the lateral surface area connecting them.
There are 12 edges.
A frustum of a square pyramid is like a slightly distorted cuboid. It has 12 edges.
A hexahedron. A parallelepiped, cuboid, quadrilateral frustum are examples.
3 faces: two plane and one curved,2 edgesno vertices.3 faces: two plane and one curved,2 edgesno vertices.3 faces: two plane and one curved,2 edgesno vertices.3 faces: two plane and one curved,2 edgesno vertices.
A frustum of a cone, or a sphere sliced by two planes are a couple of examples.
i have an answer for both a frustum of a pyramid and a frustum of a cone which do you need frustum of a cone just give both of them
Most likely, a frustum of a sphere.Most likely, a frustum of a sphere.Most likely, a frustum of a sphere.Most likely, a frustum of a sphere.
There is no frustum of a cone. There is a frustum, which is a cone with the top cut off parallel to the ground.
as as amny as you want it to have!
A cylinder, a frustum, a sphere with two slices cut off, a torus (doughnut) with a wedge removed are some examples.
The length of a solid conical frustum is the distance from the top to the bottom of the frustum along its central axis.
Since a frustum is a portion of a solid, three-dimensional figure, and a rectangle is a plane, two-dimensional figure, there can be no such thing as the frustum of a rectangle.