The discussion focuses on rearranging complex differential equations into standard linear form, specifically the equations (2e^y - x) dy/dx = 1 and (x + y^2)dy = ydx. The key transformation involves recognizing that dy/dx can be rewritten as 1/(dx/dy), leading to the equation dx/dy + x = 2e^y. The integrating factor is identified as I(y) = e^∫(2e^y) dy, which is crucial for solving the equation. Despite initial confusion regarding variable switching, the solution derived is x = e^y + Ce^-y, which may not match the solution manual's answer.
PREREQUISITESStudents studying differential equations, mathematics educators, and anyone seeking to deepen their understanding of solving complex linear differential equations.
ch2kb0x said:Homework Statement
(2e^y -x) dy/dx = 1
Also, for both of these questions, they are asking to consider x as function of x = x(y).
ch2kb0x said:So, if I were to solve, would it be like this:
dx/dy + x = 2e^y
I(x) = e^integral dy = e^y
multiply integrating factor on both sides will give: e^y (x) = e^(2y) + C
=> x = e^y + Ce^-y.
That was the answer I got for x, but it does not match answer in the back.
help.
ch2kb0x said:Hmmm ok, still kind of confused. this is what I did after your correction:
dx/dy + x = 2e^y
I(y) = e^integral (2e^y) dy = e^(2e^y)
multiply integrating factor on both sides will give: e^(2e^y) x = Integral e^(2e^y) (2e^y) dy...i am unsure on how to solve that integral on the right side.
What is the answer in the book? Knowing that might help us!ch2kb0x said:So, if I were to solve, would it be like this:
dx/dy + x = 2e^y
I(x) = e^integral dy = e^y
multiply integrating factor on both sides will give: e^y (x) = e^(2y) + C
=> x = e^y + Ce^-y.
That was the answer I got for x, but it does not match answer in the back.
help.