A fish looking from within water sees the outside world through a circular horizon. If the fish is √7m below the surface of water, then the radius of the circular horizon will be
A
1m
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B
2m
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C
3m
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D
4m
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Solution
The correct option is C3m Retracing the rays of light reaching the fish from outside, we see that there is maximum angle of incidence (called critical angle ic) for which the refracted ray just graces the surface of water.
i.e Angle of refraction r=90∘
So, applying Snell’s law, mud×sinθc=μr×sin90∘ ⇒sinθc=μrμd
Rays incident at angle greater than θc will suffer Total Internal Reflection (TIR) and thus will not go outside.
Using the principle of reversibility of light, we can say the light rays from outside the ocean can reach the fish’s eye at a maximum angle of θc. So the fish will see the outside world through a circle of radius AC.
To determine radius AC, sinθc=μrμd=ACOA
i.e 1μ=r√r2+h2
From this, we get r=h√μ2−1
Substituting h=√7 and μ=43, r=3m