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The figure shows ∆ABC inscribed in circle D. If m ∠CBD = 32°, find m ∠BAC, in degrees.
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The figure shows ∆ABC inscribed in circle D. If m ∠CBD = 32°, find m ∠BAC, in degrees.

The figure shows ∆ABC inscribed in circle D. If m ∠CBD = 32°, find m ∠BAC, in degrees-example-1
User Season
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1 Answer

4 votes
ANSWER


m\angle BAC =63 \degree.

Step-by-step explanation

From isosceles triangle CBD,


m \angle \: CBD = m\angle BCD=32\degree

This implies that,


m\angle BDC + 32 \degree + 32 \degree = 180 \degree


m\angle BDC + 64\degree = 180 \degree


m\angle BDC = 180 \degree - 64\degree


m\angle BDC = 126\degree


m\angle BAC = (1)/(2)( m\angle BDC ) = (1)/(2) (126\degree) = 63 \degree
User Hendrikswan
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