Line 10: Line 10:
 
Farhan, I think the series of the eigenfunctions is needed to satisfy both the boundary conditions and the initial conditions (as stated on p 548, a single solution will generally not satisfy the initial conditions). I think it would be hard to come up with a single function that satisfied both (other than the zero function). Please correct me if my thinking is wrong here! -[[User:Mjustiso|Mjustiso]]  
 
Farhan, I think the series of the eigenfunctions is needed to satisfy both the boundary conditions and the initial conditions (as stated on p 548, a single solution will generally not satisfy the initial conditions). I think it would be hard to come up with a single function that satisfied both (other than the zero function). Please correct me if my thinking is wrong here! -[[User:Mjustiso|Mjustiso]]  
  
----
+
-----
 +
For number 11, page 566 (12.5, 12.6)
 +
There is a note in the that says "An is given by (2) in section 11.3" When I go to section 11.3 on page 492, I see (2) and it says y"+0.05y'+25y=r(t)
  
 +
I am not sure how this applies to the problem. Maybe the reference is incorrect. Can anyone help on this one?
 +
 +
Al
 +
 +
 +
-----
 
[[2013 Fall MA 527 Bell|Back to MA527, Fall 2013]]  
 
[[2013 Fall MA 527 Bell|Back to MA527, Fall 2013]]  
  

Revision as of 10:59, 30 November 2013

Homework 12 collaboration area

I am not sure how to start on problem number 10 on page 567. Any hint? Thanks!


From Farhan: This might be a silly question: In the last step of finding a solution to a wave or heat equation, why do we take a SERIES of the eigen functions, and then incorporate the initial condition to get the solution of the entire problem. I know that, sum of the solutions (eigen functions) is also a solution to the PDE, but in the last step, what if we work with ONLY ONE eigen function and impose the initial condition? Will that be wrong?

Farhan, I think the series of the eigenfunctions is needed to satisfy both the boundary conditions and the initial conditions (as stated on p 548, a single solution will generally not satisfy the initial conditions). I think it would be hard to come up with a single function that satisfied both (other than the zero function). Please correct me if my thinking is wrong here! -Mjustiso


For number 11, page 566 (12.5, 12.6) There is a note in the that says "An is given by (2) in section 11.3" When I go to section 11.3 on page 492, I see (2) and it says y"+0.05y'+25y=r(t)

I am not sure how this applies to the problem. Maybe the reference is incorrect. Can anyone help on this one?

Al



Back to MA527, Fall 2013

Alumni Liaison

Ph.D. on Applied Mathematics in Aug 2007. Involved on applications of image super-resolution to electron microscopy

Francisco Blanco-Silva