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Geometry – Inscribed and Other Angles. Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A. A. C. C. A. B. B. C. B. All three of these inscribed angles intercept arc AB. Geometry – Inscribed and Other Angles.
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Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A C C A B B C B All three of these inscribed angles intercept arc AB.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A C C A B B C B All three of these inscribed angles intercept arc AB. Theorem : An inscribed angle is equal to half of its intercepted arc.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A 32° C 1 C 200° A 2 B 40° 3 B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE : Find the measure of angles 1 , 2 and 3.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A 32° C 1 C 200° A 2 B 40° 3 B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE : Find the measure of angles 1 , 2 and 3.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A 32° C 1 C 200° A 2 B 40° 3 B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE : Find the measure of angles 1 , 2 and 3.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A 32° C 1 C 200° A 2 B 40° 3 B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE : Find the measure of angles 1 , 2 and 3.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A ? C 86° C ? A 25° B 18° ? B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE #2 : Find the measure of arc AB in each example.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A ? C 86° C ? A 25° B 18° ? B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE #2 : Find the measure of arc AB in each example. Take notice that the arc is two time bigger than the angle.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A ? C 86° C ? A 25° B 18° ? B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE #2 : Find the measure of arc AB in each example. Take notice that the arc is two times bigger than the angle.
Geometry – Inscribed and Other Angles Inscribed Angle – an angle whose vertex lies on the circle and its sides are chords of the circle. A A 36° C 86° C ? A 25° B 18° 50° B C B Theorem : An inscribed angle is equal to half of its intercepted arc. EXAMPLE #2 : Find the measure of arc AB in each example. Take notice that the arc is two times bigger than the angle.
Geometry – Inscribed and Other Angles Theorem : An angle formed by a tangent line and a chord is equal to half of its intercepted arc. A 1 B
Geometry – Inscribed and Other Angles Theorem : An angle formed by a tangent line and a chord is equal to half of its intercepted arc. A 1 B EXAMPLE : If arc AB = 65°, find the measure of angle 1.
Geometry – Inscribed and Other Angles Theorem : An angle formed by a tangent line and a chord is equal to half of its intercepted arc. A 1 B EXAMPLE : If arc AB = 65°, find the measure of angle 1.
Geometry – Inscribed and Other Angles Theorem : An angle formed by a tangent line and a chord is equal to half of its intercepted arc. X A 1 B EXAMPLE #2 : If arc AXB = 300°, find the measure of angle 1.
Geometry – Inscribed and Other Angles Theorem : An angle formed by a tangent line and a chord is equal to half of its intercepted arc. X A 1 B EXAMPLE #2 : If arc AXB = 300°, find the measure of angle 1.
Geometry – Inscribed and Other Angles Theorem : An angle formed by two chords is equal to half of the sum of the intercepted arcs C A X B D
Geometry – Inscribed and Other Angles Theorem : An angle formed by two chords is equal to half of the sum of the intercepted arcs C 40° A X B D 42° EXAMPLE : Arc AC = 40° and arc BD = 42°. Find the measure of angle CXA.
Geometry – Inscribed and Other Angles Theorem : An angle formed by two chords is equal to half of the sum of the intercepted arcs C ? A X B D 50° EXAMPLE # 2 : Angle CXA = 40° and arc BD = 50°. Find the measure of arc CA.
Geometry – Inscribed and Other Angles Theorem : An angle formed by two chords is equal to half of the sum of the intercepted arcs C y A X B D 50° EXAMPLE # 2 : Angle CXA = 40° and arc BD = 50°. Find the measure of arc CA.
Geometry – Inscribed and Other Angles Theorem : An angle formed by two secants is equal to half of the difference of the intercepted arcs. ( a secant is a line that cuts through a circle ) D C X A B
Geometry – Inscribed and Other Angles Theorem : An angle formed by two secants is equal to half of the difference of the intercepted arcs. ( a secant is a line that cuts through a circle ) D C 75° 23° X A B EXAMPLE : Arc BD = 75° and arc CA = 23°. Find the measure of angle “x” .
Geometry – Inscribed and Other Angles Theorem : An angle formed by two secants is equal to half of the difference of the intercepted arcs. ( a secant is a line that cuts through a circle ) D C 75° 23° X A B EXAMPLE : Arc BD = 75° and arc CA = 23°. Find the measure of angle “x” .
