Physics, asked by mreyekiller2, 11 months ago

The apparent depth of a liquid in a party filled tank is 1.5 cm. more liquid is poured in a tank of height 1m. now the apparent depth appears to be 2.1m.find the refractive index of liquid using above data.

Answers

Answered by sonuvuce
0

Answer:

Therefore, the refractive index of the liquid is 0.48

Explanation:

We know that if n is the refractive index of water then

\boxed{n=\frac{\text{Real Depth}}{\text{Apparent Depth}}}

If the real depth is R then

n=\frac{R}{1.5}

or, R = 1.5n

If the liquid is poured in the tank for height 1 m then the real depth becomes

R+100

Then

n=\frac{R+100}{210}

\implies n=\frac{1.5n+100}{210}

\implies 210n=1.5n+100

\implies 208.5n=100

\implies n=\frac{100}{208.5}

\implies n=0.48

Hope this answer is helpful.

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