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shehry1
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Homework Statement
The question concerns a square loop in the presence of an infinitely long sinusoidally varying line current.
The complete problem is http://physics.indiana.edu/~berger/p506_fall2008/p507ps11.pdf"
Homework Equations
The retarded potential.
The Attempt at a Solution
I defined J along the z direction [tex] = I * \delta (\rho') \delta ( \cos (\phi')) / \rho' [/tex]
Then I find the vector potential
[tex] A = {\mu_o \over 4 \pi} \int_{-\infty}^{\infty} {J_{ret} \over |x-x'|} d^3x [/tex]
with the Sin in J having the retarded time of course. But this leaves me with the integral:
[tex] \int_{-\infty}^{\infty} \sin ( w(t - \sqrt (\rho^2 + (z-z')^2))) \over \sqrt(\rho^2+(z-z')^2)[/tex]
Did I go wrong? If not then can someone tell me how to get rid of this.
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