JoshW said:
The book we used was Boas. So we may as well have not had a textbook at all.
So I need to find the roots to the equation? I am so lost.
The roots of the
characteristic equation. For example, the differential equation y' - 3y = 0 has a characteristic equation of r - 3 = 0.
The characteristic equation is obtained by assuming there is a solution of the form ##y = e^{rx}##
Differentiating, we get ## y' = re^{rx}##
Substituting into the diff. equation, we have
##y' - 3y = 0##, and ##y = e^{rx}##
##\Rightarrow re^{rx} - 3e^{rx} = 0##
##\Rightarrow (r - 3)e^{rx} = 0##
So r - 3 = 0 is the characteristic equation for the diff. equation y' - 3y = 0
The only root of this char. equation is r = 3, which gives us a solution of ##y = e^{3x}##
The general solution of y' - 3y = 0 is ##y = c_1e^{3x}##.
Another form of notation for the diff. equation uses the differentiation operator D. In this notation, the diff. equation would be (D - 3)y = 0. This notation is useful as you can pick off the characteristic equation directly.
JoshW said:
so for the first my equation will be y"+y?
No, for two reasons.
1. y'' + y is NOT an equation.
2. If the diff. eqn were y'' + y = 0, the characteristic equation would be ##r^2 + 1 = 0##.
JoshW said:
and the second I was correct?
No. At first I didn't think you had even done any work for #2 -- you didn't give any indication that your work was for problem 2.
JoshW said:
or for the second is it just a0x2+a1x+a2
No. The problem is to find a differential
equation. The above is not an equation, nor is it anywhere close to what the differential equation would be whose solutions are 1, x, and x
2.
You have a lot to catch up on. Let's focus on the first question before tackling the second one.
JoshW said:
I apologize I have trouble understanding what I read. I suffered head trauma as a kid and well I have trouble understanding anything unless it is spoken to me.
