1 kg of ice at `0^(@)C` is mixed with `1.5 kg` of water at `45^(@)C` [latent heat of fusion = 80 cal/g]. Then

1 kg of ice at 0^(@)C is mixed with 1.5 kg of water at 45^(@)C [latent heat of fusion = 80 cal//gl. Then

120 g of ice at 0^(@)C is mixed with 100 g of water at 80^(@)C . Latent heat of fusion is 80 cal/g and specific heat of water is 1 cal/ g-.^(@)C . The final temperature of the mixture is

What will be the final temperature when 150 g of ice at 0^@C is mixed with 300 g of water at 50^@C . Specific heat of water =1 cal//g//^@C . Latent heat of fusion of ice =80 cal//g .

One kg of ice at 0^(@)C is mixed with 1 kg of water at 10^(@)C . The resulting temperature will be

If 10 g of ice at 0^(@)C is mixed with 10 g of water at 40^(@)C . The final mass of water in mixture is (Latent heat of fusion of ice = 80 cel/g, specific heat of water =1 cal/g""^(@)C )

4 kg of ice at -20^(@)C is mixed with 5 kg of water at 40^(@)C . The water content in the equilibrium mixture is (S_("water")=1kcal//kg-C,S_(ice)=0.5kcal//kg-c,L_(f(water))=80kcal//kg)

When 0.15 kg of ice at 0^(@)C is mixed with 0.30 kg of water at 50^(@)C in a container, the resulting temperature is 6.7^(@)C . Calculate the heat of fusion of ice. (s_(water) = 4186 J kg^(-1)K^(-1))

10 g of ice at 0^(@)C is mixed with m mass of water at 50^(@)C . What is minimum value of m so that ice melts completely. (L = 80 cal/g and s = 1 cal/ g-.^(@)C )

2 kg of ice at -15^@C is mixed with 2.5 kg of water at 25^@C in an insulating container. If the specific heat capacities of ice and water are 0.5 cal//g^@C and 1 cal//g^@C , find the amount of water present in the container? (in kg nearest integer)

10 g of ice of 0^(@)C is mixed with 100 g of water at 50^(@)C in a calorimeter. The final temperature of the mixture is [Specific heat of water = 1 cal g^(-1).^(@)C^(-1) , letent of fusion of ice = 80 cal g^(-1) ]