Question

On constructing a triangle ABC, with AB = 5.6 cm, AC = BC = 9.2 cm, the distance between the points which are both equidistant from AB and AC and also 2 cm from BC is

• A. 4 cm
• B. 4.2 cm
• C. 4.3 cm
• D. 4.4 cm

Answer 1

The correct option is C

4.3 cm

Steps of construction:

• Draw a line segment AB = 5.6 cm
• From A and B as centers and radius 9.2 cm, make two arcs which intersect each other at C.
• Join CA and CB.
• Draw two lines n and m, parallel to BC, at a distance of 2 cm from it.

(We know that the locus of a point which is at a given distance from a given line is a pair of lines parallel to the given line and at a given distance from it. Hence to find the points which are 2 cm from BC, we draw two lines parallel to BC at a distance of 2 cm from it).

• Draw the angle bisector of $\angle BAC$ which intersects m and n at P and Q respectively.

(We know that the locus of a point which is equidistant from two intersecting straight lines is a pair of straight lines which bisect the angles between the given lines. Hence to find the points which are equidistant from AB and AC, we draw the angle bisector of $\angle BAC$ which intersects m and n at P and Q respectively).

Thus P and Q are the required points which are both equidistant from AB and AC and 2 cm from BC.

On measuring, we see that the distance between P and Q is 4.3 cm.