1. A central angle is an angle with its vertex at the center of the circle and its two sides are radii. Show 2. For example : m∠POQ is a central angle in circle P shown below.  3. The sum of all central angle is 360°. 4. The measure of the arc formed by the endpoints of a central angle is equal to the degree of the central angle. In the above diagram, m∠arc PQ = 85° m∠arc PRQ = 360° - 85° = 275° 5. The measure of the arc formed by the endpoints of the diameter is equal to 180°. In the above diagram, m∠arc PRQ = 180° Example 1 : From the diagram shown above, find the following arc measures. (i) m∠arc BC (ii) m∠arc ABC Solution : (i) m∠arc BC : AB is the diameter of the above circle. m∠arc AB = 180° m∠arc BC + m∠arc CA = 180° m∠arc BC + 123° = 180° m∠arc BC = 57° (ii) m∠arc ABC : m∠arc ABC = m∠arc AB + m∠arc BC = 180° + 57° = 237° Example 2 : From the diagram shown above, find the following measures. (i) m∠arc
CD (ii) m∠AOC (iii) m∠arc BD (iv) m∠arc ABC (v) m∠arc CBD Solution : (i) m∠arc CD : m∠AOB and m∠COD are vertical angles. m∠COD = m∠AOB m∠arc CD = m∠arc AB m∠arc CD = 55° (ii)
m∠AOC : BC is the diameter of the above circle. m∠arc BAC = 180° m∠arc BA + m∠arc AC = 180°. 55° + m∠arc AC = 180°. m∠arc AC = 125°. m∠AOC = 125°. (iii) m∠arc BD : m∠BOD and m∠AOC are vertical angles. m∠BOD = m∠AOC m∠BOD = 125° m∠arc BD = 125° (iv) m∠arc ABC : m∠arc ABC = m∠arc ABD + m∠arc DC = 180° + 55° = 235° (v) m∠arc CBD : m∠arc CBD = m∠arc CAB + m∠arc BD = 180° + 125° = 305° Example 3 : Find the value of x in the diagram shown below. From the diagram shown above, find the m∠arc QTR. Solution : Find m∠arc QP : PS is the diameter of the above circle. m∠arc PTS = 180° m∠arc PT + m∠arc TS = 180° 135° + m∠arc TS = 180° m∠arc TS = 45° Find m∠arc QTR : m∠QTR = m∠arc QT + m∠arc TS + m∠arc SR = 180° + 45° + 81° = 306° Example 4 : From the diagram shown above, find the following measures. m∠BOD, m∠BOE and m∠BOC Solution : Find m∠BOD
: In the circle above, m∠arc AB + m∠arc BCD + m∠arc DE + m∠arc EA = 360° 60° + m∠arc BCD + 86° + 154° = 360° m∠arc BCD + 300° = 360° m∠arc BCD = 60° m∠BOD = 60° Find m∠BOE : m∠BOE = m∠arc BCD + m∠arc DE = 60° + 86° = 146° Find m∠BOC : In the above diagram, m∠BOC = m∠COD. m∠BOC + m∠COD = m∠BOD m∠BOC + m∠BOC = m∠BOD 2m∠BOC = 60° m∠BOC = 30° Example 5 : From the diagram shown above, find the following measures. m∠KOL and m∠arc MNK Solution : In the diagram above, m∠JON and ∠KOM are vertical angles. m∠KOM = m∠KOM m∠KOM = 126° m∠KOL + m∠LOM = 126° In the above diagram, m∠KOL = m∠LOM. m∠KOL + m∠KOL = 126° 2m∠KOL = 126° m∠KOL = 63° Find m∠arc MNK : m∠arc MNK = 360° - m∠arc KLM m∠arc MNK = 360° - m∠KOM m∠arc MNK = 360° - 126° m∠arc MNK = 234° Kindly mail your feedback to We always appreciate your feedback. ©All rights reserved. onlinemath4all.com How do you find the central angle of a minor arc?Since the size of the central angle of an arc determines its size, we define major and minor arcs in terms of their central angles. If the central angle is greater than 1 8 0 ∘ , then the arc is major. If the central angle is less than 1 8 0 ∘ , then the arc is minor.
Which angle is a central angle?A central angle is an angle whose apex (vertex) is the center O of a circle and whose legs (sides) are radii intersecting the circle in two distinct points A and B.
What is the measure of the inscribed angle if its intercepted arc measures 80?For example, let's take our intercepted arc measure of 80° . If the inscribed angle is half of its intercepted arc, half of 80 equals 40 . So, the inscribed angle equals 40° .
|
Central angles and arc measures worksheet answer key
Related Posts
Copyright © 2024 nguoilontuoi Inc.
