Krakadoros said:
for 4 meters the potential difference across this segment would be 60 millivolts and for 5 meters, 75 millivolts and so on. This means that the potential difference would increase with distance, but this is not logic.
Ι was wrong. Jbriggs 444 was referred to an uniform electric field. As i told before, "meter" in "volt / meter" do not show the distance between the charge-source and the charge at which the source's force, is applied. If this was the case, then, with increase this "meter", then we would have a dicrease of the source's force apply on the second charge and this means that the work produced from the movement of the charge would be smaller which means a smaller potential (or difference potential). But this "meter" shows the distance that the second charge (the "hypothema") runs, because of the force from source charge, apply on it. And the larger is this distance ( the "meter" in "Volt per meter") the larger the work, and the potential (or potential difference). In a uniform electric field, the Strength is stable. But this refers to potential difference between two point and not in potential in one point (that would be everywhere inside the field, the same). This means that if we imagine, two parallel metal plates, where each of them has equals but oposite charges and the distance between them is λ=1meter, between them we will have a uniform electric field with stable Strength and the potential difference between the two plates will be for example V=20volts. If ,inside this field we have an imaginary object with length 10mm, then at the two ends of it, the potential difference will be 0.2 volts. The electric field is uniform, means that if we move this imaginary object in other positions in the field, always the potential difference at its two ends will be the same (0.2volts). But this do not mean that if we put in the field another imaginary object with different length, would have the same potential difference at the two ends of it, with the first object . It just mean that the potential difference between the two ends of it, whichever is it, will be stable in the field. If for examble put in the field an imaginary object with 5mm length, at it's ends will have a potential difference V=0.1volts. And if we move the object , then the potential difference between the two ends of it, would be the same (0.1volts). If the field were not uniform, then when we move the object from one posiotion to the other, then it's potential difference(between the two ends of it) would change. For somebody to understand what i mean, i add a drawing i made.
So now i think i can find volts per meter. Jbriggs444 said that the total potential difference across the three meters to the source could be computed by taking the integral of millivolts per meter across the three meters. But i want to do the oposite. I will measure the total potential difference across a segment, and then i will calculate the Volts per meter, by divide by the distance in meters.
Then, the question somebody may have is : If you know all these, why you ask ? If all these i told, are truth ( and please if somebody read and find wrong things in my thoughts, tell me, for me to understand),
this is because jbriggs444 with his answer, made me to search and read again physic, and i want to say thanks for him. What confused me , was that he tried to explain me the electric field with the 1.5 volt battery hooked up to a uniform 100 meter wire . Is there an electric field in a wire at the ends of which is hooked up a battery ? The definition of electric field is that electric field is a space which in every electric charge that is inside this space exert electric forces. I think it is. If we thought the wire as a space, the charges that are inside it, exert electric forces, if a battery hooked up to its ends. But it would be better, in my opinion, if he tried to explain it using an example like the uniform electric field between the plates of a capacitor where the meaning of word "field" is more tangible, than in a wire.
