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Question
(Use a ruler and a compass for this question.)
- Construct the locus of a moving point which moves such that it keeps a fixed distance of 4.5 cm from a fixed-point O.
- Draw line segment AB of 6 cm where A and B are two points on the locus (a).
- Construct the locus of all points equidistant from A and B. Name the points of intersection of the loci (a) and (c) as P and Q respectively.
- Join PA. Find the locus of all points equidistant from AP and AB.
- Mark the point of intersection of the locus (a) and (d) as R. Measure and write down the length of AR.
Geometric Constructions
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Solution
We know that,
Locus of a point at a fixed distance from a fixed point is the circumference of the circle with fixed point as center and fixed distance as radius.
Steps of construction:
- Mark point O.
- With center O and radius = 4.5 cm draw a circle.
- Use a ruler to mark point A.
- From point A, measure 6 cm along a straight line and mark point B.
- Draw a straight line connecting points A and B. We know that, locus of points equidistant from two points is the perpendicular bisector of the line joining the two points.
- Draw perpendicular bisector of AB.
- Mark the points P and Q where the perpendicular bisector intersects circle. We know that, locus of points equidistant from two lines is the angle bisector of the angle between the lines.
- Join PA.
- Draw AX, the angle bisector of ∠A.
- Mark point R as the intersection point of AX on the circumference of the circle.
- Measure AR.
Hence, AR = 4.8 cm.
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