Yes, intersecting chords do form a pair of supplementary vertical angles. When two chords intersect, the angles opposite each other at the intersection point are equal (vertical angles), and their sum is 180 degrees, making them supplementary. Therefore, the vertical angles created by intersecting chords are always supplementary to each other.
True. When two lines intersect, they form vertical angles, and the chords created by these intersecting lines can be considered supplementary if the angles formed by the chords at the intersection add up to 180 degrees. Thus, intersecting chords can indeed correspond to supplementary vertical angles.
Yes, intersecting chords in a circle create a pair of vertical angles, which are always congruent. However, these angles are not supplementary; supplementary angles are those that sum to 180 degrees. Vertical angles formed by intersecting chords are equal to each other, meaning they are not supplementary unless they each measure 90 degrees, which would make them right angles.
True. When two chords intersect, they form vertical angles, and if those angles are supplementary (add up to 180 degrees), the intersecting chords will create pairs of angles that also relate to the properties of those angles. Specifically, the angles formed by the intersecting chords can be analyzed using the relationship between the angles and the arcs they subtend in a circle.
Not unless the chords are both diameters.
true
Yes, intersecting chords in a circle create a pair of vertical angles, which are always congruent. However, these angles are not supplementary; supplementary angles are those that sum to 180 degrees. Vertical angles formed by intersecting chords are equal to each other, meaning they are not supplementary unless they each measure 90 degrees, which would make them right angles.
false
true
apex= True
Not true. If the associated central angles are equal, the two chords would be equal.
Not unless the chords are both diameters.
Sometimes
true
It is the measure of half the intercepted arc.
yes
yes
If two chords intersect within a circle, the product of the two segments of one chord equals the product of the two segments of the other chord. In short, if two chords intersect in a circle, their length is equal.