Jay Zarna then you'd have to guess a solution that has a form similar to that of Q(x), {i.e., const, 1°, 2°, exponential, or wave). in this case, -3x-5 is a 1°function plus a constant function. so Yp = (Ax+B)+(C). Then solve for the missing terms. it can pretty much be anything (hence particular solution). It just has to check out.
My question is what happens when the solution for the first, second and third derivative of a nonhomogeneous equation equals zero? I.e c=0, c should be the value you multiply by the right rt hand side of your equation then add on the value to the left hand side of your homogeneous equation
Woow. Cant believe all this while, there was a video like this out here. Thanks
DaveAcademy, you are awesome. My uni should just be referring us to you, rather than giving their own lectures (which suck in comparison).
Great Explanation.!!!!
What if you are not given a yp and you have solve a yp?
Jay Zarna then you'd have to guess a solution that has a form similar to that of Q(x), {i.e., const, 1°, 2°, exponential, or wave). in this case, -3x-5 is a 1°function plus a constant function. so Yp = (Ax+B)+(C). Then solve for the missing terms. it can pretty much be anything (hence particular solution). It just has to check out.
My question is what happens when the solution for the first, second and third derivative of a nonhomogeneous equation equals zero? I.e c=0, c should be the value you multiply by the right rt hand side of your equation then add on the value to the left hand side of your homogeneous equation
you're canadian right ?
gatosexo