BBy Bot
Nov 03'24
Exercise
[math]
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- lab{6.8.9a}
Solve the homogeneous differential equation
[[math]] \deriv2y - 8 \dydx + 12y = 0 . [[/math]]
- lab{6.8.9b}
Substitute the linear polynomial [math]Ax+B[/math] for [math]y[/math]
in the nonhomogeneous differential equation
[[math]] \deriv2y - 8\dydx + 12y = 24x + 12 . [[/math]]Hence find values of [math]A[/math] and [math]B[/math] for which this polynomial is a particular solution of the differential equation.
- Show that the function which is the sum of the solutions found in \ref{ex6.8.9a} and \ref{ex6.8.9b} is also a solution to the differential equation in \ref{ex6.8.9b}.