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XB is the angle bisector of ZAXC. MZAXB= 23°BVC сFind the following:mZBXC =MZAXC =
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XB is the angle bisector of ZAXC. MZAXB= 23°BVC сFind the following:mZBXC =MZAXC =

XB is the angle bisector of ZAXC. MZAXB= 23°BVC сFind the following:mZBXC =MZAXC =-example-1
User Basavaraj Hampali
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1 Answer

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\begin{gathered} \measuredangle BXC=23 \\ \measuredangle AXC=46 \end{gathered}

Step-by-step explanation

bisector of an angle is the line or line segment that divides the angle into two equal parts,so

So, let


\measuredangle AXB+\measuredangle BXC=AXC
\begin{gathered} \measuredangle AXB=23 \\ as\text{ the angles are equal} \\ \measuredangle AXB=\measuredangle BXC=23 \end{gathered}

replace


\begin{gathered} \measuredangle AXB+\measuredangle BXC=\measuredangle AXC \\ 23+23=\measuredangle AXC \\ 46=\measuredangle AXC \end{gathered}

I hope this helps you

XB is the angle bisector of ZAXC. MZAXB= 23°BVC сFind the following:mZBXC =MZAXC =-example-1
User Jon Bringhurst
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