50 g ice at `0^(@)C` is dropped into a calorimeter containing 100 g water at `30^(@)C`. If thermal . capacity of calorimeter is zero then amount of ice left in the mixture at equilibrium is

10 gm of ice at -20^(@)C is dropped into a calorimeter containing 10 gm of water at 10^(@)C , the specific heat of water is twice that of ice. When equilibrium is reached the calorimeter will contain:

10 gm of ice at -20^(@)C is dropped into a calorimeter containing 10 gm of water at 10^(@)C , the specific heat of water is twice that of ice. When equilibrium is reached the calorimeter will contain:

1 g ice at 0^@C is placed in a calorimeter having 1 g water at 40^@C . Find equilibrium temperature and final contents. Assuming heat capacity of calorimeter is negligible small.

500 gm of ice at – 5^(@)C is mixed with 100 gm of water at 20^(@)C when equilibrium is reached, amount of ice in the mixture is:

Ice at -20^(@)C mixed with 200g water at 25^(@)C . If temperature of mixture is 10^(@)C then mass of ice is -

Steam at 100^@C is passed into a calorimeter of water equivalent 10 g containing 74 cc of water and 10 g of ice at 0^@C . If the temperature of the calorimeter and its contents rises to 5^@C , calculate the amount of steam passed. Latent heat of steam =540 kcal//kg , latent heat of fusion =80 kcal//kg .

An electrically heated coil is immersed in a calorimeter containing 360 g of water at 10^@C . The coil consumes energy at the rate of 90 W. The water equivalent of calorimeter and coil is 40 g. The temperature of water after 10 min is

An electrically heated coil is immersed in a calorimeter containing 360 g of water at 10^@C . The coil consumes energy at the rate of 90 W. The water equivalent of calorimeter and coil is 40 g. The temperature of water after 10 min is

A calorimeter containes 50g of water at 50^(@)C . The temperature falls to 45^(@)C in 10 minutes. When the calorimeter contains 100g of water at 50^(@)C it takes 18 minutes for the temperature to become 45^(@)C . Find the water equivalent of the calorimeter.

15 g ice at 0^@C is mixed with 10 g water at 40^@C . Find the temperature of mixture. Also, find mass of water and ice in the mixture.