The bisectors of ABC and ACB intersesct at O.
Prove that BOC = 90+A
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The bisectors of ABC and ACB intersesct at O. Prove that BOC = 90+A
The bisectors of ABC and ACB intersesct at O.
Prove that BOC = 90+A
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Answer:
If the bisectors of angles of ∠ ABC and ∠ ACB of a triangle ABC meet at point O, then prove that ∠ BOC =90o+12∠A. Hint: A bisector is described that cuts an object into two equal parts. It is used to line segments and angles. The bisectors of an angles means a line that splits an angle into two equal angles.
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Answer:
If the bisectors of angles of ∠ ABC and ∠ ACB of a triangle ABC meet at point O, then prove that ∠ BOC =90o+12∠A. Hint: A bisector is described that cuts an object into two equal parts. It is used to line segments and angles. The bisectors of an angles means a line that splits an angle into two equal angles.