5) Consider four points A, B, C, and D whose geometrical locations correspond to the corners of a square with sides of length 1 mm. Calculate the potential differences (in mV) VAB, VBA, VAC, VCA, VAD, VDA, VBC, VCB, VBD, VDB, VCD, VDc between the points in a uniform electric field of 3 V/m parallel to the two sides (and perpendicular to the other two) of the square. (Show your work) B VAB= VAC= VAD= VBA= VCA= VDA= VCB= VDB= VDC = VBC= VBD= VcD= E=3 V/m D

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Chapter2: Second-order Linear Odes
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5) Consider four points A, B, C, and D whose geometrical locations correspond to the corners of a square with sides of length 1 mm. Calculate the potential differences (in mV) VAB, VBA, VAC, VCA, VAD, VDA, VBC, VCB, VBD, VDB, VCD, VDC between the points in a uniform electric field of 3 V/m parallel to the two sides (and perpendicular to the other two) of the square. (Show your work)
5) Consider four points A, B, C, and D whose geometrical locations correspond to the corners of a
square with sides of length 1 mm. Calculate the potential differences (in mV) VAB, VBA, VAC, VCA,
VAD, VDA, VBC, VCB, VBD, VDB, VcD, VDc between the points in a uniform electric field of 3 V/m parallel
to the two sides (and perpendicular to the other two) of the square. (Show your work)
VAB=
VBA=
VCA=
VAC=
VAD=
VBC=
VBD=
VcD=
VDA=
VCB=
VDB=
VDc =
E = 3 V/m
Transcribed Image Text:5) Consider four points A, B, C, and D whose geometrical locations correspond to the corners of a square with sides of length 1 mm. Calculate the potential differences (in mV) VAB, VBA, VAC, VCA, VAD, VDA, VBC, VCB, VBD, VDB, VcD, VDc between the points in a uniform electric field of 3 V/m parallel to the two sides (and perpendicular to the other two) of the square. (Show your work) VAB= VBA= VCA= VAC= VAD= VBC= VBD= VcD= VDA= VCB= VDB= VDc = E = 3 V/m
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