By geometrical construction, it is possible to divide a line segment in the ratio `sqrt(3):(1)/(sqrt(3))`.

To divide a line segment in a given ratio.

Draw a line segment of 5.6cm. Divide it in the ratio 2:3.

In what ratio y-axis divides the line segment joining the points (3,4) and (–2, 1)?

Draw a line segment of length 5 cm and divide it in the ratio 3:7.

The ratio in which YZ-plane divided the line segment joining (-3,4,-2) and (2,1,3), is

Determine the ratio in which the line 3x+y=9 divides the line segment joining the points (1,3) and (2,7)

The straight line 3x+4y-12=0 meets the coordinate axes at Aa n dB . An equilateral triangle A B C is constructed. The possible coordinates of vertex C (a) (2(1-(3sqrt(3))/4),3/2(1-4/(sqrt(3)))) (b)(-2(1+sqrt(3)),3/2(1-sqrt(3))) (c)(2(1+sqrt(3)),3/2(1+sqrt(3))) (d)(2(1+(3sqrt(3))/4),3/2(1+4/(sqrt(3))))

y -axis divides the line segment joining (1,4) and (-3,5) in the ratio