A fish situated at a depth h below the s...

A fish situated at a depth h below the surface of water in a lake ,can see the outside objects in air through a circular aperature of radius r . What is the radius of the aperture in terms of h and n ,where `n = ""_(a) n_(w) `? `[ ""_(a) n_(w)` = R.I. of water w.r.t. air]

Similar Questions

Explore conceptually related problems

A fish at a depth of sqrt(7) cm bleow the surface of water sees the outside world through a circular horizon. What is the radius of the circular horizon? [ ""_(a)mu_(w) = (4)/(3)]

An air bubble is formed at depth h below the surface of water. The pressure inside the bubble is- ( P_(0)= atmospheric pressure, r = radius of bubble)

A fist looking from within water sees the outside world through a circular horizon. If the fish sqrt(7) cm below the surface of water, what will be the radius of the circular horizon

At what depth below the surface of earth, value of accelaration due to gravity is same as the value at height h =R1, where R is the radius of earth.

A bird in air is at a height ‘y’ from the surface of water. A fish is at a depth ‘x’ below the surface of water. The apparent distance of fish from the bird is (The refractive index of water is n )

W is the weight of a man on the surface of the earth. What would be his weight, if he goes to a depth (h) equal to the radius of the earth, below the surface of the earth?

A fish looking up through the water sees the outside world contained in a circular horizon. If the refractive index of water is 4//3 and the fish is 12cm below the surface, the radius of this circle in cm is

For an eye kept at a depth h inside water is refractive index mu , and viewed outside, the radius of circle through which the outer objects can be seen will be

When the surface of a lake is calm , a fish submerged in water will see the entire outside world within an inverted cone whose vertex is situated at the eye of the fish . What is the vertex angle of the cone ? (""_(a) n_(w) = (4)/(3)) and sin 49^(@) = 0.75

A fish situated at a depth h below the surface of water in a lake ,can see the outside objects in air through a circular aperature of radius r . What is the radius of the aperture in terms of h and n ,where `n = ""_(a) n_(w) `? `[ ""_(a) n_(w)` = R.I. of water w.r.t. air]

Similar Questions

Recommended Questions