Answer:
The correct answer is C. IJ = JK
Step-by-step explanation:
- Given: AB is the perpendicular bisector of IK.
⇒ AB divides the line segment IK in two equal parts i.e. IJ = JK and the angle formed at the point of intersection J is 90° ⇒ ∠AJI = 90°.
- In ΔAIJ, By angle sum property of a triangle
∠AJI + ∠AIJ + ∠IAJ = 180° ( But ∠AJI = 90° )
∠AIJ + ∠IAJ = 90° ⇒ ∠IAJ < 90°
So, ∠IAJ is not a right angle.
- Its not given IK is a perpendicular bisector so AJ = BJ need NOT be true.
- As A does not lie on the line IK so A can not be the mid point of IK.
Hence, we conclude the correct statement is IJ = JK
