nasu said:
You mean that the potential difference will be positive between any two points in that field?
No, only that the potential of both points relative to a third "reference" point could both be positive. The potential difference could be positive, zero, or negative. Note - I cleaned up my previous post.
For the potential from a charged point or sphere (for the field outside the sphere), a convenient reference distance from that charged source would be ∞, with the potential defined as zero at ∞ distance, and increasing as distance from the charged source decreases. Note that voltage is potential energy per unit charge, so for a negatively charged particle, the electrical potential energy would become increasingly negative as distance from the charged source decreases.
For the potential between two oppositely charge plates, the surface of the negatively charged plate could be used as a reference where the potential is defined to be zero, and potential would increase as distance from the negative plate increases, until the positive plate was reached.
For the potential from an infinite plane or disc with a uniform charge per unit area, the surface of the plane or disc could be used as a reference point where the potential would be defined as zero. For a positively charged infinite plane or disc, the potential would become more negative as distance from the plane or disc increases.
For the potential from an infinitely long wire with uniform charge per unit length = λ, the potential at radius r versus a reference radius r0 is - 2 k λ ln(r / r0), so choosing r0 = 1 depending on the unit of distance (meter, foot) would result in a potential of zero at r = r0.
