They have a circumference which is 2*pi*radius or diameter*pi
They have an area which is pi*radius2
They have sectors
They have chords
They have segments
They have a total of 360 degrees around their circumferences
They have arcs which is part of their circumferences
They can have a tangent which is a straight line that touches it at one point
To calculate properties of circles
A sphere, a cylinder and a cone all have properties of a circle in them
It can be any # it wants to.
Little plastic circles that help understand how to do the 4 problems in math and teach students about the properties of negative numbers.
The circular base of a cylinder has the same properties as that of a circle.
Yes.
To calculate properties of circles
Special properties are unusual properties a mineral may have that most minerals don't.
The definition of special properties are the unique features of a substance. They are commonly derived from other intrinsic and extrinsic properties.
Some of the sulfur special properties are odorless, tasteless and its color
Ellipses (and, in the special case circles).
No. A circle is a special kind of ellipse.
Their crystalline structure and physical properties are special.
buttts
Those would be properties like magnetism, fluorescence, triboluminescence.
They are the properties that are unique to certain minerals such as flourescence or radioactivity
They are the properties that are unique to certain minerals such as flourescence or radioactivity