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Use the diagram of point O. What is the length of OY to the nearest 10th of an Inch? XZ = 10 and OX= 10

Use the diagram of point O. What is the length of OY to the nearest 10th of an Inch-example-1
User Mellissa
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1 Answer

22 votes
22 votes

From the diagram above,

XZ = 10 in and OX = 10 in

we are to find length of OY

XZ is a chord and line OY divides the chord into equal length

Hence, ZY=YX= 5 in

Now we solve the traingle OXY

To find OY we solve using pythagoras theorem


(Hyp)^2=(Opp)^2+(Adj)^2

applying values from the triangle above


\begin{gathered} OX^2=XY^2+OY^2 \\ 10^2=5^2+OY^2 \\ 100=25+OY^2 \\ OY^2\text{ = 100 -25} \\ OY^2\text{ = 75} \\ OY\text{ = }\sqrt[]{75} \\ OY\text{ = }\sqrt[]{25\text{ }*\text{ 3}} \\ OY\text{ = 5}\sqrt[]{3\text{ }}in \end{gathered}

Therefore,

Length of OY =


5\sqrt[]{3}

Use the diagram of point O. What is the length of OY to the nearest 10th of an Inch-example-1
Use the diagram of point O. What is the length of OY to the nearest 10th of an Inch-example-2
User Josh Gagnon
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2.5k points