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True
No. The only chords that go through the center is a diameter.
The only chords that are diameters are the chords that go through the center of the circle. All of the other chords are shorter.
No, not all chords of a circle pass though the center of that circle. Any cord that does pass through the center of the circle is called diameter of that circle.
A central angle has its vertex at the center of a circle, and two radii form the Arms. Central angle AOC is described as subtended by the chords AC and by the arc AC. An inscribed angle has its vertex on the circle, and two chords form the arms. Inscribed angle ABC is also described as subtended by the chord AC and by the arc AC.
False (Apex)
No, it does not need to pass through the centre.
True
False. The statement was fine until it reached the last requirement. Chords both pass through the center of the circle are diameters. If two of them shared one end point, they would also share the other end point. They would be the same diameter, and the angle between them would be zero.
It's TRUE guys, I took the quiz.
An inscribed angle is an angle formed by two chords in a circle which have a common endpoint. This common endpoint forms the vertex of the inscribed angle.The other two endpoints define an intercepted arc on the circle Any angle inscribed in a semi-circle is a right angle. The proof is simply that the intercepted arc is 180 so the angle must be half of that or 90 degrees.
No. The only chords that go through the center is a diameter.
The only chords that are diameters are the chords that go through the center of the circle. All of the other chords are shorter.
An inscribed angle is an angle with its vertex on a circle and with sides that contain chords of the circle.
false
No, not all chords of a circle pass though the center of that circle. Any cord that does pass through the center of the circle is called diameter of that circle.
A central angle has its vertex at the center of a circle, and two radii form the Arms. Central angle AOC is described as subtended by the chords AC and by the arc AC. An inscribed angle has its vertex on the circle, and two chords form the arms. Inscribed angle ABC is also described as subtended by the chord AC and by the arc AC.