From a point a metres above a lake the angle of elevation of a cloud is `alpha` and the angle of depression of its reflection is `beta`. Prove tha the height of the cloud is
`(a sin(alpha + beta))/(sin(beta-alpha))` metres.

From a point 200 m above a lake , the angle of elevation of a cloud is 30^@ and the angle of depression of its reflection in take is 60^@ then the distance of cloud from the point is

If the angle of elevation of a cloud from a point h metres above the surface of a lake is alpha and the angle of depression of its reflexion in the lake is beta , prove that the height of the cloud is (h (tan beta + tan alpha))/(tan beta - tan alpha) metres.

The angle of elevation of a cloud from a point h meter above the surface of the lake is alpha , the angle of depression of its reflection in the lake is beta . Prove that height of the cloud from observation points is (2hsecalpha)/(tanbeta-tanalpha) .

If the angle of elevation of a cloud from a point h metre above the lake is alpha and the angle of depression of its reflection in the lake is beta , prove that the height of the cloud above the lake is (h(tan beta+tan alpha))/(tan beta- tan alpha)

If the angle of elevation of a cloud from a point h metres above a lake is alpha and the angle of depression of its reflection in the lake is beta , prove that the height of the cloud is (h(tanbeta+t a nalpha))/(tanbeta-t a nalpha)

If the angle of elevation of a cloud from a point h metres above a lake is alpha and the angle of depression of its reflection in the take is beta , prove that the height of the cloud is (h(tanbeta+t a nalpha))/(tanbeta-t a nalpha)

If the angle of elevation of a cloud from a point h metres above a lake is alpha and the angle of depression of its reflection in the take is beta prove that the height of the cloud is h(tan beta+tan alpha)quad tan beta-tan alpha

The angle of elevation of a cloud from a point 'h' metres above a lake is alpha and the angle of deprssion of its reflection in the lake is beta . Pover that the distance of the cloud from the point of observation is (2hsecalpha)/(tanbeta-tanalpha) .