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Oscur
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Hello all, I'm doing a question for the maths module in my physics degree (I'm a second year undergrad) and there's a question I'm doing on basis functions.
Verify that functions of the type f_{n}(x) = A cos \frac{2\pi n x}{L} where n = 0,1,2... can be used as a basis function for 0<x<L.
There are then three parts:
i. Normalise (I've done this part, I found a normalising factor of A=\sqrt{\frac{2}{L}}
ii. Check orthogonality (this is the part causing the trouble)
iii. Would it be possible to use f_{n}(x) as the basis for all functions in this interval? (this clearly follows from the other two parts, so once I've done ii, I should be able to answer this)
To check orthogonality, I need to demonstrate that the condition:
\int f_{n}(x) f_{m}(x)dx=\delta_{n,m}, where the limits of the integral are the same as the interval of interest, is met.
This means I need to integrate the product of two cosines with different arguments, and if I try and do this with integration by parts, I end up in an infinite loop with products of cyclic functions. Is there an identity for this?
Thanks in advance!
Matt
Homework Statement
Verify that functions of the type f_{n}(x) = A cos \frac{2\pi n x}{L} where n = 0,1,2... can be used as a basis function for 0<x<L.
There are then three parts:
i. Normalise (I've done this part, I found a normalising factor of A=\sqrt{\frac{2}{L}}
ii. Check orthogonality (this is the part causing the trouble)
iii. Would it be possible to use f_{n}(x) as the basis for all functions in this interval? (this clearly follows from the other two parts, so once I've done ii, I should be able to answer this)
Homework Equations
To check orthogonality, I need to demonstrate that the condition:
\int f_{n}(x) f_{m}(x)dx=\delta_{n,m}, where the limits of the integral are the same as the interval of interest, is met.
The Attempt at a Solution
This means I need to integrate the product of two cosines with different arguments, and if I try and do this with integration by parts, I end up in an infinite loop with products of cyclic functions. Is there an identity for this?
Thanks in advance!
Matt
