What mass of this substance must evaporate to freeze 190 g of water initially at 17 ∘C? (The heat of fusion of water is 334 J/g; the specific heat of water is 4.18 J/(g⋅K).)

[tex]\Delta H_{vap}[/tex] of [tex]CCl_2F_2[/tex] is 289 J/g. What mass of this substance must evaporate in order to freeze 190 g of water initially at 17 degrees C? (heat of fusion of water is 334 J/g; specific heat of water is 4.18 J/g.K).

Answer : The mass of this substance evaporate to freeze must be, 258.2 grams.

Solution :

First we have to calculate the total heat absorbed.

[tex]\text{Total heat absorbed}=[m\times c_{p,l}\times (T_{final}-T_{initial})]+m\times \Delta H_{fusion}[/tex]

where,

m = mass of water = 190 g

[tex]c_{p,l}[/tex] = specific heat of liquid water = [tex]4.18J/g.K[/tex]

[tex]\Delta H_{fusion}[/tex] = enthalpy change for fusion of water = [tex]334J/g[/tex]

[tex]T_{final}[/tex] = final temperature = [tex]17^oC=273+17=290K[/tex]

[tex]T_{initial}[/tex] = initial temperature = [tex]0^oC=273+0=273K[/tex]

Now put all the given values in the above expression, we get:

[tex]\text{Total heat absorbed}=[190g\times 4.18J/g.K\times (290-273)K]+190g\times 334J/g[/tex]

[tex]\text{Total heat absorbed}=76961.4J[/tex]

Now we have to calculate the mass of substance.

As, 298 J of heat are absorbed by 1 g of [tex]CCl_2F_2[/tex]

So, 76961.4 J of heat are absorbed by [tex]\frac{76961.4J}{298J}\times 1g=258.2g[/tex] of [tex]CCl_2F_2[/tex]

Therefore, the mass of this substance evaporate to freeze must be, 258.2 grams.