ColtonMootiaco
New member
- Joined
- Feb 3, 2018
- Messages
- 1
I understand how to solve the ODE used in newtons law of cooling, assuming that the ambient temperature remains constant, but what are you supposed to do when the ambient temperature is itself a function of time? Say we have an ODE (dT/dt) = K(T-Ta(t)), where the ambient temperature (Ta) varies with time, as well as the temperature of the object in question. I am having difficulty getting the equation to separate or getting it into standard form so that I can use the integrating factors technique to solve the ODE. Anyone know how to solve this?