[" The tops of two towers of heights "x" and "y," standing on the "],[" level ground subtends angles of "30^(@)" and "60^(@)" respectively at the "],[" centre of the line joining their feet.Find "x:y" ."]

The tops of two towers of height x and y standing on a level ground subtend angles of 30^(@) and 60^(@) respectively at the centre of the line joining their feet. Find x:y

The two towers of heights x and y, standing on level ground, subtend angles of 30^(@) and 60^(@) respectively at the centre of the line joining their feet. Then, find x: y

The tops of two towers of height x and y , standing on level ground, subtend angles of 30^@ and 60^@ respectively at the centre of the line joining their feet, then find x\ : y .

The tops of two towers of height x and y standing on level ground,subtend angles of 30o and 60o respectively at the centre of the line joining their feet,then find x:y .

If two towers of height X and Y subtend angles of 30^(@)" and "60^(@) respectively at the centre of the line joining their feet, then X:Y is equal to

If two towers of height h_(1) and h_(2) subted angle of 60^(@) and 30^(@) respectively at the mid point of the line joining their feet, then find h_(1):h_(2) .

If two towers of heights h_(1) and h_(2) subtend angles 60^(o) and 30^(circ) respectively at the mid poind of the line joining their feet then h_(1): h_(2^(*))

The angles of elevation of the top of two vertical towers as seen from the middle point of the line joining the feet of the towers are 60^(@) and 30^(@) respectively. The ratio of the height of the towers is

The angles of elevation of the top of a tower at the top and the foot of a pole of height 10m are 30^(@) and 60^(@) respectively.The height of the tower is