In a room, a piece of ice at an initial temperature of T1 was placed into a glass containing water of mass mw. After leaving it undisturbed for a while, the ice completely melted into water, and the temperature of all the water in the glass stabilized at T2.
From this state, the glass was left in the room for a further period of time, during which water vapor from the air condensed on the outside of the glass, forming water droplets with a mass of md. After a sufficient amount of time had elapsed, the water inside the glass and the water droplets on the outside combined to reach thermal equilibrium, and the overall temperature became T3. In this process, the following conditions are assumed:
・Heat transfer is considered only in terms of the latent heat released when water vapor condenses into liquid water on the outside of the glass; direct heat conduction from the surrounding air, the heat capacity of the glass itself, and the evaporation of water can be neglected. ・Let L be the amount of heat of condensation released when water vapor undergoes a phase transition to liquid water. ・Let cw be the specific heat of water.
Derive the temperature T3 at thermal equilibrium using an algebraic expression, then substitute the given constraint values to find the value of T3.
Enter the value of the temperature T3 at thermal equilibrium as a natural number.
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