No, all chords are not diameters, though all diameters are chords.
No because the diameter of a circle is its largest chord.
A chord is any line segment going from one side of the circle to another. A diameter is a special chord - it is a chord that goes through the center of the circle. It is also the biggest chord possible in the circle. So all diameters are chords, but not all chords are diameters
Any chord that goes through the center of the circle is a diameter.You can draw an infinite number of diameters in any circle.In one circle, all of the diameters have the same length.
Yes, providing it is the same circle.
There are infinite diameters within a circle.
This question does not make sense. All chords are not, in fact, diameters. Actually, only chords that pass through the center of a circle are diameters.
The only chords that are diameters are the chords that go through the center of the circle. All of the other chords are shorter.
Yes, a diameter can be regarded as a special case of a chord. NB: NOT ALL CHORDS ARE DIAMETERS!
Yes
The diameter of a circle is its largest chord
A diameter is a cord in a circle containing the center of the circle. But some circles are sections of spheres. Not all diameters are diameters of spheres.
just two parallel chords!
Not unless the chords are both diameters.
There are an infinite number of diameters to any circle...
No because the diameter of a circle is its largest chord.
By definition, diameters are lines that reach all the way across the circle, crossing the middle point. The definition of a chord is a line segment that stretches across a circle intersecting at two points that does not cross the middle point. Chords are not diameters, for the property that makes a line segment a diameter is the intersection with the middle point. If the line segment is a diameter, then it automatically means that it is not a chord, for in essence, they are opposite.
If two chords of a circle bisect each other, they must intersect at a point that is equidistant from both endpoints of each chord. By the properties of circles, the perpendicular bisector of any chord passes through the center of the circle. Since the two chords bisect each other at the same point and are both perpendicular to the line connecting their endpoints, this point must also be the center of the circle, making both chords diameters of the circle. Thus, if two chords bisect each other, they are indeed diameters of the circle.