Author Question: For the two resistors shown in the figure below, rank the currents at points a through f from ... (Read 52 times)

jlmhmf · **on:** Jul 28, 2018

For the two resistors shown in the figure below, rank the currents at points a through f from largest to smallest.

Question 2

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 />
1. Ia = Ib > Ie = If > Ic = Id
2. Ia = Ib > Ic = Id > Ie = If
3. Ie = If > Ic = Id > Ia = Ib"