136,680 views
38 votes
38 votes
In the figure below, the segments IJ and IK are tangent to the circle centered at O. Given that IK=13.5 and OI=15.9, find OJ.

In the figure below, the segments IJ and IK are tangent to the circle centered at-example-1
User Endolith
by
2.2k points

1 Answer

17 votes
17 votes

Solution:

Given;

Triangle OJI is a right angle triangle where the hypotenuse is OI. Also,


OI=IJ=13.5............\text{ Two tangents drawn from a point to a circle are equal}

Thus, using Pythagorean Theorem;


\begin{gathered} OJ=√(15.9^2-13.5^2) \\ \\ OJ=8.4 \end{gathered}

ANSWER: OJ=8.4

In the figure below, the segments IJ and IK are tangent to the circle centered at-example-1
User Randomsequence
by
2.9k points
Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.