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Chapter 10 - Honors Geometry
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Gravity
Terms in this set (69)
Concentric Circles
two or more coplanar circles with the same center
Congruent Circles
if two circles have congruent radii
Chord
a segment joining any two points on the circle
Diameter
a chord that passes through the center of the circle
Distance from the center to a chord =
the measure of the perpendicular segment from the center to the chord
(theorem) If a radius is perpendicular to a chord, then...
it bisects the chord
(theorem) if a radius of a circle bisects a chord that is not a diameter, then...
it is perpendicular to that chord
(theorem) The perpendicular bisector of a chord passes through...
the center of the circle
(theorem) if two chords of a circle are equidistant from the center, then...
they are congruent
(theorem) If two chords or a circle are congruent, then...
they are equidistant from the center of the circle
Arc
two points on a circle and all the points on a circle needed to connect the points by a single path
center of the arc
the center of the circle of which the arc is a part
Central Angle
an angle whose vertex is at he center of a circle
Minor Arc
an arc whose points are on or between the sides of a central angle (0 < x < 180)
Major Arc
an arc whose points are on or outside of a central angle (180 < x < 360)
Semicircle
an arc whose endpoints are the endpoints of a diameter (180)
Measure of a minor arc
the same a s the measure of the central angle that intercepts the arc
Measure of a major arc
360 minus the measure of the minor arc with the same endpoints
Congruent arcs
two arcs that have the same measure and are part of the same circle or congruent circle
(theorem) if two central angles of a circle (of of congruent circles) are congruent, then...
their intercepted arcs are congruent
(theorem) if two arcs of a circle (or of congruent circles) are congruent, then...
the corresponding central angles are congruent
(theorem) if two central angles of a circle (or of congruent circles) are congruent, then...
the corresponding chords are congruent
(theorem) if two chords or a circle (or of congruent circles) are congruent, then...
the corresponding central angles are congruent
(theorem) if two arcs of a circle (or of congruent circles), then...
they corresponding chords are congruent
(theorem) if two chords of a circle (or of congruent circles) are congruent, then...
the corresponding arcs are congruent
Secant
a line that intersects a circle at exactly 2 points (always contains a chord of the circle)
Tangent
a line that intersects a circle at exactly one point
Point of tangency (or point of contact)
the point where the line touches the circle
Facts about tangent lines in relation to radii
- a tangent line is perpendicular to the radius draw to the point of contact
- if a line is perpendicular to a radius at its outer endpoint, then it is tangent to the circle
Tangent Segment
the part of a tangent line between the point of contact and a point outside the circle
Secant Segment
the part of a secant line that joins a point outside the circle to the farther intersection point of the secant and the circle
External Part
the part of a secant line that joins the outside point to the nearer intersection point
(theorem) if two tangent segments are drawn from an external point, then...
those segments are congruent
Tangent Circles
circles that intersect each other at exactly one point
Externally Tangent Circles
if each of the tangent circles lies outside the other
Internally Tangent Circles
if one of the tangent circles lies inside the others
Line of Centers
connect the centers of two circles. For tangent circles, the point of contact lies on it.
Common tangent
a line tangent to two circles (not necessarily at the same point)
Common Internal Tangent
A common tangent that lies between the circles
Common External Tangent
A common tangent that is not between the circles
Central Angle
an angle whose vertex is the center of the circle (angle measure = arc measure)
Inscribed angle
Angle whose vertex is on the circle and sides are a tangent and chord that intersect at the tangent's point of contact
Tangent-chord angle
angle whose vertex is on the circle and sides are a tangent and a chord that intersect at the tangent's point of contact
(theorem) the measure of an inscribed angle or a tangent-chord angle (vertex on the circle) is...
one-half the measure of its intercepted arc
(angle measure = 1/2 arc measure)
chord-chord angle
an angle formed by two chords that intersect inside a circle but not at the center
(theorem) the measure of a chord-chord angle is ______________________________ of the measures of the arcs intercepted by the chord-chord angle and its vertical angle.
1/2 the sum
Secant-secant angle
an angle whose vertex is outside a circle and whose sides are two secants
Secant-tangent angle
an angle whose vertex is outside a circle and sides are a secant and a tangent
Tangent-Tangent Angle
an angle whose vertex is outside a circle and sides are two tangents
(theorem) the measure of a secant-secant angle, a secant-tangent angle, or a tangent-tangent angle (vertex outside the circle) is...
one-half the difference of the measure of the intercepted arcs
(theorem) if two inscribed or tangent-chord angles intercept the same arc...
then they are congruent
(theorem) if two inscribed or tangent-chord angles intercept congruent arcs...
then they are congruent
(theorem) an angle inscribed in a semicircle...
is a right angle
(theorem) the sum of the measures of a tangent-tangent angle and its minor arc is...
180
the root "scribe" means
to write
"in-" means
into
"inscribe" means to
write into
Inscribed Angle
an angle written into a circle (vertex on the circle)
"circum-" means
around
"circumscribe" means
to write around
Circumcenter
the center of a circle circumscribed about a polygon
Incenter
the center of a circle inscribed in a polygon
(theorem) if a quadrilateral is inscribed in a circle...
its opposite angles are supplementary
(theorem) if a parallelogram is inscribed in a circle...
it must be a rectangle
chord-chord power theorem
ab = cd
secant-secant power theorem
(whole) x (external) = (whole) x (external)
tangent-secant power theorem
tangent^2 = (whole thing) x (external part)
Circumference
perimeter of a circle
(pi) x (diameter) OR (2) x (pi) x (radius)
larc
(marc/360) x 2(pi)r
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