(iv) Newton's law of cooling states that the rate at which temperature T of a body falls is proportional to the difference in temperature between the body and its surroundings. If t is the time and...


Please please solve accurate


(iv) Newton's law of cooling states that the rate at which temperature T of a body falls is<br>proportional to the difference in temperature between the body and its surroundings. If t is the<br>time and the surroundings are at 0°C then the differential equation representing the above<br>information is:<br>dT<br>-kT<br>dt<br>Prove, using integration methods, that the general solution to this differential equation is:<br>T = Ae*<br>where A and k are constant values<br>If the temperature of an aluminium ingot after it has been cast falls from 900°C to 700°C in 30<br>seconds, using the differential equation above find the equation for T at any time(t)<br>

Extracted text: (iv) Newton's law of cooling states that the rate at which temperature T of a body falls is proportional to the difference in temperature between the body and its surroundings. If t is the time and the surroundings are at 0°C then the differential equation representing the above information is: dT -kT dt Prove, using integration methods, that the general solution to this differential equation is: T = Ae* where A and k are constant values If the temperature of an aluminium ingot after it has been cast falls from 900°C to 700°C in 30 seconds, using the differential equation above find the equation for T at any time(t)

Jun 11, 2022
SOLUTION.PDF

Get Answer To This Question

Related Questions & Answers

More Questions »

Submit New Assignment

Copy and Paste Your Assignment Here