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A cylindrical tank with a radius of 10 ft and a height of 40 ft is filled with gasoline. given a density of 670 kg/m 3 , determine the mass (lbm) of the gasoline in the tank.

Respuesta :

HomertheGenius
Cylinder:
V = r² π h
r = 10 ft = 10 * 0.3048 m = 3.048 m , h = 40 ft = 40 * 0.3084 = 12.336 m.
Density: m / V = 670 kg/m³
V = 3.048 ² · 3.14 · 12.336 = 359.86 m³
m = V · D = 359.86 m² · 670 kg/m³
Answer:
m = 241,106.4 kg.
boffeemadrid

Answer:

[tex]Mass=238,278.8 kg[/tex]

Step-by-step explanation:

Given: radius of cylindrical tank = 10 ft=10×0.3048=3.048m and height of the cylindrical tank=40ft=40×0.3048=12.192m.

Volume of cylindrical tank=[tex]{\pi}r^{2}h[/tex]

=[tex]3.14(3.048)^2(12.192)[/tex]

=[tex]3.14(9.290)(12.192)[/tex]

=[tex]355.64m^3[/tex]

Therefore, the volume of the cylindrical tank=[tex]355.64m^3[/tex]

Now, We know that Density=[tex]\frac{Mass}{Volume}[/tex]

⇒[tex]Mass=Density{\times}volume[/tex]

⇒[tex]Mass=(670){\times}(355.64)[/tex]

⇒[tex]Mass=238,278.8 kg[/tex]

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