Let A and B be two towers with same base. From the midpoint of the line joining their feet, The angle of elevation of the tops of A and B are `30^@` and `60^@`, respectively. The ratio of the height of B and A is :

Let A and B be two towers with the same base. From the mid point of the line joining their feet, the angle of elevation of the tops of A and b are 30^@ and 45^@ , respectively. The ratio of the heights of A and B is, A और B एक ही आधार के साथ दो टॉवर हैं। उनके आधार से जुड़ने वाली रेखा के मध्य बिंदु से, A और B के शीर्ष के कोण क्रमशः 30 और 45 हैं। A और B की ऊंचाइयों का अनुपात है ज्ञात करे |

Two posts are k metres apart. If from the middle point of the line joining their feet, an observer finds the angles of elevations of their tops to be 60^(@) and 30^(@) respectively, then the ratio of heiht of the posts respectively is

The angle of elevation of the top of two vertialtowers as seen from the middle point of the linejoining the foot of the towers are 60^(@) and 30^(@) respectively.The ratio of the height of the towers is

Two points A and B are on the ground and on opposite sides of a tower. A is closer to the foot of tower by 42 m than B. If the angles of elevation ofthe top of the tower, as observed from A and B are 60∘ and 45∘, respectively. then the height of the tower is closest to:

Two hagstaffs stand on a horizontal plane. A and B are two points on the line joining their feet and between them. The angles of elevation of the tops of the flagstaffs as seen from A are 30^@ and 60^@ and as seen from B are 60^@ and 45^@ . If AB is 30 m, then the distance between the flagstaffs is

Two points A and B are on the same side of a tower and in the same straight line with its base. The angles of depression of these points from the top of the tower are 60^(@)" and "45^(@) respectively. If the height of the tower is 15 m, then find the distance between these points.