(New page: == Hints from Bell about Legendre Polynomials == See p. 180 for a list of the first few Legendre Polynomials. The even numbered Legendre Polynomials only involve even powers of x, so the...)
 
 
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== Hints from Bell about Legendre Polynomials ==
 
== Hints from Bell about Legendre Polynomials ==
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See p. 180 for a list of the first few Legendre Polynomials.
 
See p. 180 for a list of the first few Legendre Polynomials.
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Here are some basic facts about the polynomials that you can use in your homework.
  
 
The even numbered Legendre Polynomials only involve even powers of  x,
 
The even numbered Legendre Polynomials only involve even powers of  x,
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<math>x=\cos\theta</math>
 
<math>x=\cos\theta</math>
  
and convert the integral to one in  x  over the interval [-1,1], where you can use the orthogonality of the Legendre Polynomials.
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and convert the integral to one in  x  over the interval [-1,1], where you can use the orthogonality of the Legendre Polynomials. (You don't have to show that the Legendre Polynomials are orthogonal on [-1,1].  That's a given.)
  
 
p. 216, problems 1 and 3 ask you to expand a given function in terms of Legendre Polynomials.  Here, you will use the fact that if  Q(x)  is a polynomial of degree  N, then
 
p. 216, problems 1 and 3 ask you to expand a given function in terms of Legendre Polynomials.  Here, you will use the fact that if  Q(x)  is a polynomial of degree  N, then
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if  n  is odd.  Recall that if n is odd,  P_n  is odd.  An even times an odd is a ... etc.
 
if  n  is odd.  Recall that if n is odd,  P_n  is odd.  An even times an odd is a ... etc.
  
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(Question: p. 216, problems 1 and 3)
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Professor, is it acceptable to expand the first 2-3 terms to completion by hand and then use a computational tool to do the rest or do we need to write out all the integrals and their evaluations in full detail, to get full credit?
  
[[HWK92010MA527Bell|Back to the HWK 9 collaboration area]]
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[[HWK9MA527Fall2010|Back to the HWK 9 collaboration area]]
  
 
[[2010 MA 527 Bell|Back to the MA 527 start page]]  
 
[[2010 MA 527 Bell|Back to the MA 527 start page]]  

Latest revision as of 18:28, 26 October 2010

Hints from Bell about Legendre Polynomials

See p. 180 for a list of the first few Legendre Polynomials.

Here are some basic facts about the polynomials that you can use in your homework.

The even numbered Legendre Polynomials only involve even powers of x, so they are even functions.

The odd numbered Legendre Polynomials only involve odd powers of x, so they are odd functions.

The Legendre Polynomials are orthogonal on the interval [-1,1].

p. 209, 5. asks you to show that

$ P_n(\cos\theta) $

are orthogonal on [0,pi] with respect to the weight function

$ \sin\theta, $

i.e., to show that

$ \int_0^\pi P_n(\cos\theta)P_m(\cos\theta)\sin\theta\ d\theta=0 \qquad\text{if }n\ne m. $

The key here is to use the change of variables

$ x=\cos\theta $

and convert the integral to one in x over the interval [-1,1], where you can use the orthogonality of the Legendre Polynomials. (You don't have to show that the Legendre Polynomials are orthogonal on [-1,1]. That's a given.)

p. 216, problems 1 and 3 ask you to expand a given function in terms of Legendre Polynomials. Here, you will use the fact that if Q(x) is a polynomial of degree N, then

$ Q(x)=\sum_{n=0}^N c_nP_n(x) $

where the coefficients c_n are computed via orthogonality:

$ \int_{-1}^1 Q(x)P_m(x)\ dx=c_m\int_{-1}^1 P_m(x)P_m(x)\ dx. $

You will need to use the fact given on page 212 that

$ \int_{-1}^1 P_m(x)^2\ dx=\frac{2}{2m+1}. $

p. 216, 5. asks you to show that if f(x) is even, then all the odd coefficients in its Legendre expansion must vanish, i.e., that

$ \int_{-1}^1 f(x)P_n(x)\ dx=0 $

if n is odd. Recall that if n is odd, P_n is odd. An even times an odd is a ... etc.

(Question: p. 216, problems 1 and 3) Professor, is it acceptable to expand the first 2-3 terms to completion by hand and then use a computational tool to do the rest or do we need to write out all the integrals and their evaluations in full detail, to get full credit?

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