Electric field due to infinite long straight wire of linear charge density λ varies with ⊥ distance of point from the wire as *
Answers
Answer:
Given:
An infinite long wire of linear charge density λ
To Find:
Variation of electric field with perpendicular distance of a point from the wire
Solution:
Imagine a cylindrical gaussian surface around the wire.
Refer to the attached diagram
Curved surface area of the cylinder = 2πrl
(where 'r' is the radius and 'l' is the length of the cylinder)
Since the electric field is radial, electric flux through both the flat ends of the cylindrical gaussian surface is zero.
⇒ Flux through the total gaussian surface = Flux through the cylindrical part
⇒ \oint E.dScos0 = \oint EdS∮E.dScos0=∮EdS
⇒ E \oint dSE∮dS
⇒ E.2πrl
The surface includes a charge (q) = λl
Hence, according to gaussian law,
E2πrl = λl/ε₀
⇒ E = λ/2πε₀r
Thus, Electric field due to infinite long straight wire of linear charge density λ varies with ⊥ distance of point from the wire as E = λ / 2πε₀r
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