In the x-y plane, a vector is given by
\(\overrightarrow๐น (๐ฅ, ๐ฆ) = \frac{โ๐ฆ๐ฅฬ + ๐ฅ๐ฆฬ}{๐ฅ^ 2 + ๐ฆ^2} . \)
The magnitude of the flux of \(\overrightarrowโ ร\overrightarrow ๐น\) , through a circular loop of radius 2, centered at the origin, is:
\(\overrightarrow๐น (๐ฅ, ๐ฆ) = \frac{โ๐ฆ๐ฅฬ + ๐ฅ๐ฆฬ}{๐ฅ^ 2 + ๐ฆ^2} . \)
The magnitude of the flux of \(\overrightarrowโ ร\overrightarrow ๐น\) , through a circular loop of radius 2, centered at the origin, is:
- ฯ
- 2ฯ
- 4ฯ
- 0
The Correct Option is B
Solution and Explanation
The flux of the curl of a vector field through a surface is given by:
\[ \Phi = \iint_S (\nabla \times \vec{F}) \cdot d\vec{A} \]
Using Stokesโ Theorem, this flux can be related to the circulation around the boundary of the surface, which in this case is a circular loop of radius 2 centered at the origin.
Since \( \vec{F}(x, y) \) is a vector field in the x-y plane, the curl of \( \vec{F} \) in the z-direction can be evaluated using the given components.
Upon solving for the flux, we find that the magnitude of the flux through the circular loop is:
\[ 2\pi \]
Conclusion:
Thus, the correct answer is (B).
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