For a string with fixed ends, which normal modes are missing?

Join the discussion
Ask a follow-up here, or get your own question answered by working scientists, mathematicians and engineers — people, not an autocomplete.
Real named experts · corrections over time · the nuance an AI answer skips
1 reply · 2K views
snickersnee
Messages
30
Reaction score
0

Homework Statement



Here's the problem. I was able to find the a_n and b_n values, my question is mainly on part (c), how do I find which modes are missing? The function is odd, so even modes should disappear, but cos(n*pi) doesn't disappear, it's either +1 or -1. I'd greatly appreciate any help.

upload_2015-11-22_12-58-32.png
[/B]

Homework Equations



upload_2015-11-22_12-57-15.png

b_n = 0 because released from rest[/B]

The Attempt at a Solution



upload_2015-11-22_13-1-13.png


upload_2015-11-22_13-13-11.png

[/B]
 

Attachments

  • upload_2015-11-22_13-11-10.png
    upload_2015-11-22_13-11-10.png
    1.6 KB · Views: 445
  • upload_2015-11-22_13-12-38.png
    upload_2015-11-22_13-12-38.png
    1 KB · Views: 474
Physics news on Phys.org
When it says fixed ends, are we to assume that at x = 0 and x = L, the ends are fixed at ##\xi(0,t) = \xi(L,t) = 0##?
If so, then you should be able to say something about ##\xi( L/2,t)##.

Using your equation for a_n, break that into two integrals, one from 0 to L/2 and one from L/2 to L. Then enforce an appropriate matching condition for ##\xi(L/2,t) ## and ##\xi_t(L/2,t)##