Given \qquad m \angle AOC = 96^\circm∠AOC=96 ∘ m, angle, A, O, C, equals, 96, degrees \qquad m \angle BOC = 8x - 67^\circm∠BOC=8x−67 ∘ m, angle, B, O, C, equals, 8, x, minus, 67, degrees \qquad m \angle AOB = 9x - 75^\circm∠AOB=9x−75 ∘ m, angle, A, O, B, equals, 9, x, minus, 75, degrees Find m\angle BOCm∠BOCm, angle, B, O, C:

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Newton9022 Newton9022 · Answer 1 · 2020-03-20T03:34:05+01:00

Answer:

124.2°

Step-by-step explanation:

Given

∠AOC=96°

∠BOC=8x−67°

∠AOB=9x−75°

We notice that the angles are all centred at point O.

Therefore,

∠AOC+∠BOC+∠AOB=360° (Sum of Angles at a point)

Substituting the values:

96°+8x−67°+9x−75°=360°

8x+9x=360+75+67-96

17x=406°

x=23.9°

Next we find ∠BOC

∠BOC=8x−67°

=(8 X 23.9)-67°

=191.2-67

=124.2°

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nwandukelechi nwandukelechi · Answer 2 · 2020-03-20T04:10:53+01:00

Step-by-step explanation:

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