From the pycnometer that weighs 20.455g empty and 31.486g when filled with water at 25oC; we can infer that the density of the alloy in this system is 7.89 g/mL
From the parameters given;
To determine the mass of the water, we have:
However, we need to find the volume of the water, since density is given as 0.99704 g/mL
Now, using the relation:
[tex]\mathbf{Density = \dfrac{mass}{volume}}[/tex]
[tex]\mathbf{0.99704 g/mL = \dfrac{11.031 g}{volume}}[/tex]
[tex]\mathbf{volume = \dfrac{11.031 \ g}{0.99704 \ g/mL}}[/tex]
[tex]\mathbf{volume \ of \ water = \dfrac{11.031 \ g}{0.99704 \ g/mL}}[/tex]
volume of water = 11.064 mL
Since the volume of the water is equivalent to the volume of the pycnometer;
Similarly, given that:
∴
Here, from the entire system, the volume of the water again is calculated as follows:
[tex]\mathbf{Density = \dfrac{mass}{volume}}[/tex]
[tex]\mathbf{0.99704 g/mL = \dfrac{9.994 g}{volume}}[/tex]
[tex]\mathbf{volume = \dfrac{9.994 \ g}{0.99704 \ g/mL}}[/tex]
[tex]\mathbf{volume \ of \ water = \dfrac{11.031 \ g}{0.99704 \ g/mL}}[/tex]
Volume of water = 10.02 mL
Finally, by applying the volume of the pycnometer as well as the volume of the water to determine the volume of the alloy, we have:
Recall that:
From the parameters above, we can deduce the mass of the alloy as follows;
Mass of alloy = 28.695 g - 20.455 g
Mass of alloy = 8.24 g
We know now that:
[tex]\mathbf{Density = \dfrac{mass}{volume}}[/tex]
∴
[tex]\mathbf{Density \ of \ the \ alloy = \dfrac{8.24 \ g}{1.044 \ mL}}[/tex]
Density of the alloy = 7.89 g/mL
Therefore, from the above calculation, we can conclude that the density of the alloy = 7.89 g/mL
Learn more about density, mass and volume here:
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