circle
In geometry, a circle is a two-dimensional object, so it does not have a surface. Only three-dimensional objects have surfaces. A disc is a flat, circular three-dimensional object.
Surface area is the total space that a three-dimensional object occupies. When using the mathematical formula for its shape you get the surface area measurement.
The perimeter is the distance around the outer limits of any two dimensional object.
A three dimensional object
No the area is when you are dealing with a 2-dimensional figure. Surface area formulas vary depending on if the object is a rectangular prism, a pyramid, a cone, or a triangular prism. a.k.a. the object needs to be 3-D to have a surface area.
That is a sphere.
A sphere perhaps?
Sphere.
That is called a sphere.
A sphere, globe, or ball.If the word missing from the question is "distance",then the object is a sphere,
A circle
The mass of the Moon, the mass of the object, and the distance to the center of the Moon.
In geometry, a circle is a two-dimensional object, so it does not have a surface. Only three-dimensional objects have surfaces. A disc is a flat, circular three-dimensional object.
-- the mass of the object -- the distance between the object and the earth's center (or the object's height off the surface)
A box is not any kind of surface because a box is a 3-dimensional object whereas a surface is 2 dimensional.
Area is a two-dimensional measurement. It tells you how big a two dimensional object is or how large the surface of a three-dimensional object is.Volume is a three dimensional measurement. It tells you how big the inside of a three-dimensional object is or how much a three-dimensional object can hold inside.
A circle is two dimensional; a sphere is three dimensionalAnswerA circle is a simple shape consisting of points in a plane (flat surface) which are equidistant from a given point called the center. A sphere is a perfectly round geometrical object in three-dimensional space, such as the shape of a round ball. Like a circle in three dimensions, a perfect sphere is completely symmetrical around its center, with all points on the surface lying the same distance r from the center point.