Answer:
[tex]D=792.3\ kg/m^3[/tex]
Explanation:
Average Density
The density of an object of mass m and volume V is
[tex]\displaystyle D=\frac{m}{V}[/tex]
If we know the density and the volume occupied by the object, the mass can be computed as
[tex]m=D.V[/tex]
The tank can hold 20 L of gasoline when full. Converting to cubic meters
[tex]V_g=20*0.001=0.02\ m^3[/tex]
That's the volume of the gasoline it contains. Knowing the density of the gasoline, we get the mass of gasoline.
[tex]m_g=680*0.02=13.6\ kg[/tex]
To know the total mass of both, we add the 2.5 kg of the tank
[tex]m=m_t+m_g=13.6+2.5=16.1\ kg[/tex]
The volume of the tank is computed solving for V
[tex]\displaystyle V=\frac{m}{D}[/tex]
[tex]\displaystyle V_t=\frac{2.5}{7800}=3.205\times 10^{-4}\ m^3[/tex]
The total volume is
[tex]V=V_g+V_t=0.02+3.205\times 10^{-4}=0.0203\ m^3[/tex]
The average density is
[tex]\displaystyle D=\frac{16.1}{0.0203}[/tex]
[tex]\boxed{D=792.3\ kg/m^3}[/tex]
