Respuesta :
Answer:
73.73°C is the final temperature of the coffee.
Explanation:
Heat lost by the coffee = Q
Mass of the coffee = m
Volume of coffee = V = [tex]150 cm^3=150 mL (1cm^3=1 mL)[/tex]
Density of water = Density of coffee solution = d = 1 g/mL (given)
[tex]Mass =density\times volume[/tex]
[tex]m=1 g/mL\times 150 mL=150 g[/tex]
Heat capacity of the coffee is equal to that of water= c = 4.18 J/g°C
Initial temperature of the coffee = [tex]T_1=85^oC[/tex]
Final temperature of the coffee = T
[tex]Q=mc\times (T-T_1)[/tex]
Heat required to melt 11 grams of melt ice = Q'
Latent heat of ice = [tex]\Delta H_{lat}=334 J/g[/tex]
[tex]Q'=334J/g\times 11g=3674 J[/tex]
Heat absorbed by the ice after melting = q
Mass of ice melted into water = m' = 11 g
Heat capacity of water = c = 4.18 J/g°C
Initial temperature of water =[tex]T_2[/tex] = 0°C
Final temperature of water = T
[tex]q=m'\times c\times (T_2-T)[/tex]
According law of conservation of energy , energy lost by coffee will equal to heat required to melt ice and further to raise the temperature of water.
[tex]-Q=Q'+q[/tex]
[tex]-(mc\times (T-T_1))=m'\times c\times (T-T_2)+3674 J[/tex]
[tex]150 g\times 4.18 J/g^oC\times (85^oC-T)=11 g\times 4.18 J/g^oC\times (T-0^oC)+3674 J[/tex]
On solving we get:
T = 73.73°C
73.73°C is the final temperature of the coffee.
