The answer is NOT 3763200 J (integral from 0 to 4) nor is it 3528000 J (integral from 0 to 5).
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Calculate the work (in joules) required to pump all water out of a full tank.
Calculate the work in joules) required to pump all of the water out of a full tank. The distances (a = 8, b = 4, C = 3, and d = 1) are in meters, and the density of water is 1000 kg/m². In the rectangular tank in the figure below, the water exits through the spout. Assume that acceleration due to gravity is g = 9.8 m/s2. Round your answer to three decimal places.) * 106]
A tank is full of water. Find the work W required to pump the water out of the spout. (Use 9.8 for g.) W = J Enter an exact number. a=4 b = 4 C = 15 d = 4 | Om dm † a m 1 Cm When gas expands in a cylinder with radius r, the pressure P at any given time is a function of the volume V: P = P(V). The force exerted by the gas...
A tank is full of water. Find the work w required to pump the water out of the spout. (Use 9.8 m/s for 9. Use 1000 kg/m as the weight density of water. Assume that = 4 m, 4 m, c = 12 m, and d = m.) W- Enhanced Feedback Please try again. Try dividing the tank into thin horizontal slabs of height Ax. Let x be the distance between each slab and the sout. If the top surface...
A tank is full of water. Find the work required to pump the water out of the spout. Use the fact that water weighs 62.5 (Assumer 6, R-12 it, and h 12 ft.) It-b R. frustum of a cone
How much work is required to pump the water out of the top of a half-full 10 foot long horizontal cylindrical tank that has radius 3 ft. ? The weight density of the water is 62.4 lb/ft3. Round to a whole number. ANSWER IS 37,697. Please write out every step.
Answer quick and show work please thank you! The tank shown is full of water. Given that water weighs 62.5 Ib/ft and R = 5, find the work (in lb-ft) required to pump the water out of the tank. Rft hemisphere Show all steps clearly. Set up an integral. Do not evaluate.
(2) The work required to pump the fluid from a tank (between a units and b units above the bottom of a tank) of constant mass-density p out to a height h above the bottom of the tank is given by W- pg(cross-sectional area at y)(distance fluid at y needs to be lifted) dy where g is the acceleration due to gravity and y is the distance from bottom of the tank. Note: Water has a mass-density of p 10...
a tank is full of water. Find the work recquired to pump the water out of different tank shapes. Use the fact that water weighs 62.5 lf/ft^3 2.(a) Spherical tank full of water (b) Spherical tank is half-full of oil that has a density of (c) Compare work found in part a and b, take into account different units used for each part. 3 m sphere 2.(a) Spherical tank full of water (b) Spherical tank is half-full of oil that...
please show all work 1. DETAILS Use the Divergence Theorem to calculate the surface integral SI F.ds, that is, calculate the flux of F across S. F(x, y, z) -e'sin(y)i + e cos(y)j + yzik, S is the surface of the box bounded by the planes x=0, x= 3, y = 0, y = 4, 2 = 0, and 2 = 2 Submit Answer
The shape of a container is obtained by rotating the curve y = x^2 over the interval 0 ≤ x ≤ 2 about the y-axis. If the tank is full of water, the work required for pumping all water to the top of the tank can be expressed as an integral W = f(b,a) f(y)dy. Use trapezoidal rule on four subintervals of equal length to estimate the work. (Assume that water density is ρ kg/m3, and gravity acceleration g m/s2.)...