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JEE Advance - Physics (2020 - Paper 2 Offline - No. 1)

A train with cross-sectional area St is moving with speed vt inside a long tunnel of cross-sectional area S0 (S0 = 4St). Assume that almost all the air (density $$\rho $$) in front of the train flows back between its sides and the walls of the tunnel. Also, the air flow with respect to the train is steady and laminar. Take the ambient pressure and that inside the train to be p0. If the pressure in the region between the sides of the train and the tunnel walls is p, then
p0 - p = $${7 \over {2N}}\rho v_t^2$$. The value of 𝑁 is ________.
ΠžΠ΄Π³ΠΎΠ²ΠΎΡ€ΠΈΡ‚ΠΈ
9

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Applying Bernoulli's equation,

$${p_0} + {1 \over 2}\rho v_1^2 = p + {1 \over 2}\rho {v^2}$$

$${p_0} - p = {1 \over 2}\rho ({v^2} - v_1^2)$$ .... (i)

From equation of continuity,

$$4{S_t}{v_t} = v \times 3{S_t}$$

$$ \Rightarrow v = {4 \over 3}{v_t}$$ ..... (ii)

From Eqs. (i) and (ii), we get

$${p_0} - p = {1 \over 2}\rho \left( {{{16} \over 9}v_t^2 - v_t^2} \right) = {1 \over 2}\rho {{7v_t^2} \over 9}$$

$$\therefore$$ N = 9

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