Answer:
The mass of ice melted is: [tex]1.728*10^{-4}(Kg)[/tex]
Explanation:
We need to remember that the latent heat of fusion is related as:[tex]L_{f} =\frac{Q}{m}[/tex], where Lf is the latent heat of fusion, Q is the amount of heat and m is the mass, and when there is a change of phase, e.g ice into liquid water, the temperature remains constant during this process. Now we calculate the kinetic energy of the block as: [tex]E_{k}=\frac{m*v^{2} }{2}=\frac{2.7*6.5^{2} }{2} =57.02(Joules)[/tex], so this energy is used to change ice into liquid water, and knowing [tex]L_{f}=3.3*10^{5}(Joules/Kg)[/tex], then we can replace in the equation the latent heat of fusion and get the mass of ice melted as:[tex]m=\frac{L_{f} }{Q} =\frac{57.04}{3.3*10^{5} } =1.728*10^{-4}(Kg)[/tex]
