Magnetic Field PocketLab Voyager Helmholtz Coils https://www.thepocketlab.com/support/lesson/science-lab-helmholtz-coils-magnetic-field 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 d dRaw dCal tRaw t t2Raw zRaw z n n-1 tmax 0132 dRaw tRaw 0132 zRaw t2Raw d z dRaw 0.001 dCal dCal n n 1 n-1 0.02 n-1 tmax 0 tmax n tRaw tRaw dCal 2.2 t d zRaw -0.76 z d z