- #1
domesticbark
- 6
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Homework Statement
y'' +λy=0
y(1)+y'(1)=0
Show that y=Acos(αx)+Bsin(αx) satisfies the endpoint conditions if and only if B=0 and α is a positive root of the equation tan(z)=1/z. These roots <br /> (a_{n})^{∞}_{1} are the abscissas of the points of intersection of the curves y=tan(x) and y=1/z. Thus the eigen values and eigen functions of this problem are the numbers (α^{2}_{n})^{∞}_{1} and the functions {cos(α_{n}x)}^{∞}_{1} respectively.
Homework Equations
See above.
The Attempt at a Solution
So I already showed B=0, what I'm confused about is the α
part. I got y(1)+y'(1)=0 to be Acos(α)-Asin(α)=0 which means tan(α)=1. When I graph the functions of z and find their intersection, I don't get the same values of α as I would expect from what I just solve. I'm kind of just guessing at what the question is really even asking me, because I have not idea where a positive root could even come from. The picture provided makes it seem that α should just be the value of z where they intersect, but that does seem to be right either. Can anyone figure out where a positive root could even come from?
