The length of the shadow of a tower is 9 metres when the sun's angle of elevation is `30^(@)`. Calculate the height of the tower.

The length of the shadow of tower is equal its height. Then the angle of elevation of the sun.

The height of a tower is 100 m. When the angle of elevation of sun is 30^(@) , then what is the shadow of tower?

If the length of the shadow of a tower is sqrt(3) times its height of then the angle of elevation of the sun is

The shadow of a tower is 16 metre when the angle of elevation of the sun is 30^@ . The length of the shadow when the sun's elevation is 60^@ will be

The length of shadow of a tower standing on the ground is found to be 60 metres more when the Sun's angle of elevation changes from 45^@ to 30^@ . Find the height of the tower.

The length of shadow of a tower standing on the ground is found to be 60 metres more when the sun's angle of elevation changes from 30^(@) to 45^(@) . Find the height of the tower.

The lengths of shadow of a tower standing on the ground is found to be 64 metres more when the sun's angle of clevation changes from 45^@ to 30^@ . Find the height of the tower. ( Let sqrt3 = 1* 732 )

A tower stands on a horizontal plane. The shadow of the tower when the angle of the elevation of the Sun is 30^(@) is 45m more than when the angle of elevation of the Sun is 60^(@) , Then, the height of the tower is……….m

The shadow of a tower is found to be 60 meter shorter when the sun's altitude changes from 30^@ to 60^@ the height of the tower from the ground is appoximately equal to

The length of the shadow of a tower standing on level ground four to be 2x metres longer when the sun's elevation is 30^(@) than where it was 45^(@) . The height of the tower is