Thanks so much for that video :), it's so helpul, especially since my math teacher right now seems more interested in impressing the class by overcomplicating the material than he is in breaking it down to help my class with getting a good understanding of what's going on. Your clear, excellently explained example is extremely helpful! Thanks!
Yes, if the boundary values are constant in time, then the steady-state heat distribution is a linear function. If the boundary values are time-dependent, then there is no meaning to a "steady-state" solution, and the solution will be much more complicated.
Thanks so much for that video :), it's so helpul, especially since my math teacher right now seems more interested in impressing the class by overcomplicating the material than he is in breaking it down to help my class with getting a good understanding of what's going on. Your clear, excellently explained example is extremely helpful! Thanks!
baranlomiel 1 year ago
thankyou very much for this, it's was very helpful, I look forward to watching the rest of your playlist
madameneruda 1 year ago
Thanks for the video. I suppose in the straight line distribution the boundary conditions must be kept constant at all times. Am I right?
nikan4now 2 years ago
Yes, if the boundary values are constant in time, then the steady-state heat distribution is a linear function. If the boundary values are time-dependent, then there is no meaning to a "steady-state" solution, and the solution will be much more complicated.
davidmetzler 2 years ago
Very helpfull thnx aloot Got a midterm in that stuff tommorow:(
ssbahaggag 2 years ago