The first step in solving
this problem is to calculate for the volume of ice:
V = A w
V = 1 m^2 (0.010 m)
V = 0.010 m^3
At 0°C, the density of solid block of ice is: d = 917 kg /
m^3
Therefore the mass of the solid ice is:
m = 917 kg / m^3 * 0.010 m^3
m = 9.17 kg
The heat of fusion of ice is equivalent to 333.55 kJ/kg,
therefore:
Phase change enthalpy = 333.55 kJ/kg (9.17 kg)
Phase change enthalpy = 3,058.65 kJ = 3,058,650 J
Using 1kW/m^2 insolation energy:
1kW/m^2 * (.05) * sin(90°-37°) = 39.93 Watts = 39.93 Joule/s
m²
Therefore the time required to melt the ice is:
t = (3,058,650 J) / [39.93
Joule/s m² * (1 m^2)]
t = 76,600.3 s = 21 hours 16 min 40 seconds
