A body cools- from a temperature 3T to 2T in 10 minutes.The room temperature is T. Assume that Newton’s law of cooling is applicable . The temperature of the body at the end of next 10 minutes.

A body cools from 60^@ C to 50^@ C in 10 min of room If the room temperature is 25^@ C and assuming Newton's cooling law holds good, the temperature of the body after 10 more minute.

A solid at temperature T_(1) is kept in an evacuated chamber at temperature T_(2)gtT_(1) . The rate of increase of temperature of the body is propertional to

A cup of coffee at temperature 100^(@)C is placed in a room whose temperature is 20^(@)C and it costs to 60^(@)C in 10 minutes find the temperature after a further interval of 10 minutes .

A cup of coffee at temperature 100^@C is placed in a room whose temperature is 15^@C and it cools to 60^@C in 5 minutes. Find its temperature after a further interval of 5 minutes

Cooling is transfer of heat energy from the body at higher temperature to lower temperature.

The room temperature charges by a small amount from T to T+DeltaT (on Kelvin scale). The fundamental frequency of organ pipe changes from f to f+Deltaf , then

At 10.00 A.M. a woman took a cup of hot instant coffe from her microwave oven and placed it on a nearby Kitchen counter to cool. At this instant the temperature of the coffee was 180^(@)F , and 10 minutes later it was 160^(@)F . Assume that constant temperature of the kitchen was 70^(@)F . (i) What was the temperature of the coffee at 10.15 A.M. ?

A hot body placed in a surrounding of temperature theta_(0) obeys Newton's law of cooling (d theta)/(dt)=-k(theta-theta_(0)) . Its temperature at t=0 is theta_(1) the specific heat capacity of the body is s and its mass is m . Find (a) the maximum heat that the body can lose and (b) the time starting from t=0 in which it will lose 90% of this maximum heat.

Water at temperature 100^(@)C cools in 10 minutes to 80^(@)C in a room temperature of 25^(@)C . Find (i) The temperature of water after 20 minutes [log_(e).(11)/(15)=-0.3101, log_(e)5=1.609]