Answer : The volume of the cube submerged in the liquid is, 29.8 mL
Explanation :
First we have to determine the mass of ice.
Formula used :
[tex]\text{Mass of ice}=\text{Density of ice}\times \text{Volume of ice}[/tex]
Given:
Density of ice = [tex]0.9000g/cm^3=0.9000g/mL[/tex]
Volume of ice = 45.0 mL
[tex]\text{Mass of ice}=0.9000g/mL\times 45.0mL[/tex]
[tex]\text{Mass of ice}=40.5g[/tex]
The cube will float when 40.5 g of liquid is displaced.
Now we have to determine the volume of the cube is submerged in the liquid.
[tex]\text{Volume of ice}=\frac{\text{Mass of liquid}}{\text{Density of liquid}}[/tex]
[tex]\text{Volume of ice}=\frac{40.5g}{1.36g/mL}[/tex]
[tex]\text{Volume of ice}=29.8mL[/tex]
Thus, the volume of the cube submerged in the liquid is, 29.8 mL
