Prove that
Refractive index=`("real depth")/("apparent depth")`

A vesse of depth x is half filled with oil of refractive index mu_(1) and the other half is filled with water of refrative index mu_(2) . The apparent depth of the vessel when viewed above is

A vessel of depth 2d cm is half filled with a liquid of refractive index mu_(1) and the upper half with a liquid of refractive index mu_(2) . The apparent depth of the vessel seen perpendicularly is

A small object is placed at the centre of the bottom of a cylindrical vessel of radius 3 cm and height 4 cm filled completely with water. Consider the ray leaving the vessel through a corner. Suppose this ray and the ray along the axis of the vessel are used to trace the image. Find the apparent depth of the image and the ratio of real depth to the apparent depth under the assumptions taken. Refractive index -of water = 1-33.

A vessle of depth d is first filled to ( (2)/( 3))^(rd) of its depth with a liquid of refractive index ( 3)/( 2) and the rest of the vessel is filled with a liquid of refractive index ( 4)/( 3) . What is the apparent depth of the inner surface of the bottom of the vessle.

A vessle of depth d is first filled to ( (2)/( 3))^(rd) of its depth with a liquid of refractive index ( 3)/( 2) and the rest of the vessel is filled with a liquid of refractive index ( 4)/( 3) . What is the apparent depth of the inner surface of the bottom of the vessle.

A vessel is quarter filled with a liquid of refractive index mu . The remaining parts of the vessel is filled with an immiscible liquid of refractive index 3mu//2 . The apparent depth of the vessel is 50% of the actual depth. The value of mu is

A parallel sided block of glass of refractive index 1.5 which is 36 mm thick rests on the floor of a tank which is filled with water (refractive index = 4/3). The difference between apparent depth of floor at A and B when seen from vertically above is equal to

A tank contains three layers of immiscible liquids. The first layer is of water with refractive index 4//3 and thickness 8cm. The second layer is of oil with refractive index 3//2 and thickness 9cm while the third layer is of glycerine with refractive index 2 and thickness 4cm. Find the apparent depth of the bottom of the container.

The value of refractive index of diamond

In a pond of water, a flame is held 2 m above the surface of the water. A fish is at depth of 4 m from the water surface. Refractive index of water is (4)/(3) . The apparent height of the flame from the eyes of fish is -