A tank is filled with liquid of density p= 1000 (in kg/m^3). Its shape is obtained by rotating the curve y=√,0 ≤ ≤ 4 around the y-axis. Set up the Integral to find the work that is required to pump all the liquid out of the tank (from the top of the tank). All the lengths are in units of meter (m). Do -ot forget to use gravitational constant, g A. W 1000 9.8- B. None of these ** √z (4-3) Ox -S₁²²² (2-y) dy D. W 1000-9.8 r ₁2(4-2) d dx E. W 1000-9.8 m - v² (2-y) dy c. W 1000 9.8 m preview answers

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.A tank is filled with liquid of density p= 1000 (in kg/m^3). Its shape is obtained by rotating the curve y= √,0 ≤ z S 4 around the y-axis. Set up the Integral to find the work that is required to pump all the liquid out of the tank (from the top of the tank). All the lengths are in units of meter (m). Do ot forget to use gravitational constant, g A. W 1000 9.8 m B. None of these c. W ** √2 (4-2) ox A 1000-9.8 m Vª(2-1) dy **2(4-2) dx D. W 1000-9.8 m E. W 1000 9.8 m * 1² (2-v) dy preview answers