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(a) (b) (c) A current distribution produces a magnetic flux density, B = (-6xz + 4x²y + 3xz²)ax + (y + 6yz - 4xy²)ay + (y²-2³ - 2x² − z)az Wb/m². Calculate magnetic flux through the surface defined by x = 1,0 ≤ y, z ≤ 2. [5 Marks] [CO1, PO1, C3] An infinitely long filamentary wire carries a current of 5 A in the z-direction. Calculate the magnetic flux through the square loop described by 1 ≤p ≤ 6 m and 0.2 ≤z ≤3.2 m. A current distribution gives rise to the vector magnetic potential A = 2y²z ax + xy² ay - 6xyz a₂ Wb/m. (i) (ii) [5 Marks] [CO1, PO1, C3] Compute the magnetic flux density, B Let a loop be described by y = 1 m, 0<x<3 m, 0≤z≤4 m. By computing the flux through this loop, show that B. ds = $ A.dl. [10 Marks]