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To divide the line segment AB in the ratio of 2 : 3, first a ray AX is drawn such that angle BAX is an acute angle and then at equal distance, points are marked on the ray AX such that the minimum number of these points is :
minimum number of points = 2 + 3 = 5
To divide a line segment AB of length 7.6 cm in the ratio 5 : 7, a ray AX is drawn first such that angle BAX forms an acute angle and then points \(A_1,A_2,A_3… \) are located at equal distances on the ray AX and the point B is joined to
The minimum points located in the ray AX is 5 + 7 = 1. Hence point B will join point
To construct a triangle similar to a given triangle PQR with its sides \(\dfrac{5}{r} \) of the similar sides of \(\triangle \)PQR, draw a ray QX such that \( \angle \)QRX is an acute angle and X lies on the opposite side or P with respect to QR. Then triangle point \(Q_1,Q_2,Q_3 \)… on QX at equal distances and the next step is to join
In next step we will join the last point to .
To divide a line segment AB in the ratio 5 : 6 draw a ray AX such that angle BAX is an acute angle and draw a ray BY parallel to AX and point \(A_1,A_2,A_3… \) and \( B_1,B_2,B_3,….\) are located at equal distances on ray AX and BY respectively. Then the points joined are
Since the line segment is divided in the ratio 5 : 6. So the points are joined at and
A line segment \(AB \) of length \(7\ cm \), \(A_4CA_7B \) divided it in the ratio 4 : 3 internally
Basic proportionality theorem states that of a line is drawn parallel to one side of a triangle intersecting the other two sides then the other two sides are divided in the same ratio
When a line segment is divided in the ratio 3 : 4, how many parts it is divided into?
Number of parts = 3 + 4 = 7
To divide a line segment AB in the ratio p : q, draw a ray AX so that angle BAX is an acute angle and then mark points an ray AX at equal distances such that minimum number of these points is
Minimum number of points = p + q
In division of a line segment AB, any ray AX making angle with AB is
In order to divide the line segment we need to draw a line which makes acute angle to the given line.
To draw a pair of tangents to a circle which are inclined to each other at an angle of \(65^o \) it is required to draw tangents at the end points of those two radius of the circle, the angle between which is
If two tangents are drawn at the end points of two radii of a circle which are inclined at \(120^o \) to each other, then the pair of tangents will be inclined to each other at an angle of
Angle formed by the pair of tangents