Yes they do. The basic 'quantum' of charge is the amount of
negative charge on one electron, and also the amount of
positive charge on one proton. The amount is
0.000 000 000 000 000 000 160 217 646 CoulombThe relationship between positive and negative electric charges is in their number of electrons. This causes them to be attracted or repel each other based on this charge.
Two multiples of any number greater than one can't be co-prime. They would always have that number as a common factor.
All numbers have an infinite amount of multiples.
They are the common multiples of the two numbers.
Four has an infinite number of multiples.
Yes, they do.
Yes, integer multiples of even numbers are always even.
4 is an even number. The multiples can only be even.
an even number
The relationship between positive and negative electric charges is in their number of electrons. This causes them to be attracted or repel each other based on this charge.
Yes.
No number will produce only odd multiples, as any multiple of an even number will always be even. Proofs can be easily created of such a fact.
Multiples of any even number will always stay even.An even number can be divided by 2 evenly. An odd number will have a remainder of 1 when divided by 2. The multiples of 8 are even.
All multiples of 10 end in 0 because if you times a number by 10, you just add a 0 to the end of the number. This means that multiples of 10 will always end in a 0
Two multiples of any number greater than one can't be co-prime. They would always have that number as a common factor.
This question is impossible to answer because the force is dependant on the strength of the electric field. This will depend on how many other charges there are and how far away. The strength of an electric field is proportional to the number of charges and the inverse square of the distance. Strength of field = C x N / D2 where C is some constant, N is the number of charges (-ve will repel +ve will attract for and electron) and D is the distance between the electron and the charges creating the field.
Trying to quantify the highest number of anything in mathematics is often problematic because numbers don't stop. There is no finite amount of factors or multiples. There can always be a higher number of both.