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Are intersecting chords form a pair of 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.
When chords intersect in a circle are the vertical angles formed intercept congruent arcs?
Not unless the chords are both diameters.
Measure of an angle formed by intersecting chords is half the sum of measures of the intercepted arcs?
true
If two chords intersect inside a circle are the angles formed called inscribed angles?
yes
If two chords intersect inside a circle the angles formed are called inscribed angles.?
yes
Are intersecting chords form a pair of 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.
Intersecting chords form a pair of supplementary vertical angles?
false
Intersecting chords form a pair of congruent vertical angles.?
true
Intersecting chords form a pair of congruent are they called vertical angles?
apex= True
Are two chords congruent if and only if the associated central angles are supplementary?
Not true. If the associated central angles are equal, the two chords would be equal.
When chords intersect in a circle are the vertical angles formed intercept congruent arcs?
Not unless the chords are both diameters.
When chords intersect in a circle the vertical angles formed intercept conruent arcs always sometimes never?
Sometimes
Measure of an angle formed by intersecting chords is half the sum of measures of the intercepted arcs?
true
The measure of an angle formed by intersecting chords is of the sum of the measures of the intercepted arcs?
It is the measure of half the intercepted arc.
If two chords intersect inside a circle are the angles formed called inscribed angles?
yes
If two chords intersect inside a circle the angles formed are called inscribed angles.?
yes
How are lengths of intersecting chords related?
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.
