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A wire shaped to a regular hexagon of side x carries a current I ampere. Calculate the strength of the magnetic field at the centre of the hexagon. |
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Answer» `(sqrt3 mu_(0)I)/(pi X)` `B=(mu_(0))/(4pi). (I)/(a) (sin theta_(1) + sin theta_(2))` where a= OP Here, `theta_(1)= theta_(2)= 30^(@)` (from the geometry of the figure), PB= AB=xand a = OP = PB `cos 30^(@)= x.(sqrt3)/(2)` `:. B= (mu_(0))/(4pi) .(I)/(x.(sqrt3)/(2)) (sin 30^(@) + sin 30^(@)) = (mu_(0))/(4pi) .(2I)/(sqrt3x) ((1)/(2) + (1)/(2)` `=(mu_(0))/(2pi).(I)/(sqrt3x)` tesla. The direction of B at POINT P is perpendicular to the plane of the page directed downward. Similarly, the magnetic fields at P due to the other arms of the hexagon, i.e, BC, CD, DE, EF and FA are same and act in the same direction. Therefore, the total magneitc field at `P= 6B = 6 xx (mu_(0))/(2pi).(I)/(sqrt3x)= (sqrt3 mu_(0)I)/(pi x)` tesla acting in a direction perpendicular to the plane of the page direction downward. 
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