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Name a chord congruent to chord ZT.

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12y ago

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Name a chord congruent to chord ZT?

Name a chord congruent to chord ZT. Cough A*S*S**H*O*L*E Try QV


True or False if a radius of a circle is perpendicular to a chord then it bisects that chord?

true, because both distances of the chord are congruent


How can 2 segments be congruent?

When they have the same chord lengths


Does a diameter that is perpendicular to a chord bisect the chord?

Yes, any diameter which is perpendicular to a chord bisects said chord. This can be proved most easily with a picture, but is proved using a congruent triangle proof. Both triangles include the points at the center of the circle and the intersection of the diameter and chord. The other points should be the endpoints of the chord. They are congruent by hypotenuse leg; it was given that they are right triangle by the "perpendicular", the "leg" is the segment between the center of the circle and the intersection, and it is equal in both triangles because it is the same segment in both triangles. The hypotenuses are equal because both are radii of the circle. Because the triangles are congruent, their sides must be so the two halves of the chord are congruent, and therefore the chord is bisected by the diameter.


Are all chords congruent?

Not always unless it is the diameter of a circle which is its largest chord


Are diameters always congruent to chords?

No because the diameter of a circle is its largest chord.


What does the ZT mean in the court order of CO ZT?

Co zt court order mean


What is CO ZT court order?

CO ZT (Court Order )


When was MG ZT created?

MG ZT was created in 2001.


What is CO ZT Court Order means?

CO ZT (Court Order )


If two chords in the circle are congruent then they are?

If two chords in a circle are congruent, then they are equidistant from the center of the circle. This means that the perpendicular distance from the center to each chord is the same. Additionally, congruent chords subtend equal angles at the center of the circle.


Do Congruent central angles have congruent chords?

Yes, congruent central angles in a circle have congruent chords. This is because the length of a chord is determined by the angle subtended at the center of the circle; when two central angles are equal, the arcs they subtend are also equal, leading to chords of the same length. Thus, congruent central angles correspond to congruent chords.