How Does an Electron Move in the Field of a Uniformly Charged Ring?

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A uniformly charged ring with a radius of 10.0 cm and a total charge of +12.0 nC has an electron placed on its axis at a distance of 25.0 cm from the center. The discussion revolves around calculating the speed of the electron as it passes through the center of the ring, using electric potential and kinetic energy principles. Participants highlight the need to correctly convert charge units from nanoCoulombs to Coulombs and clarify the constants involved, particularly the value of Ke. There is confusion regarding the calculations, with one participant obtaining an incorrect result due to unit conversion errors. Ultimately, the correct approach involves determining the potential energy difference to find the electron's speed.
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ok here goes,

A uniformly charged ring has a radius equal to 10.0cm and a total charge of +12.0nC. An electron is placed on the ring's axis at a distance of 25.0cm from the center of the ring and is constrained to stay on the axis of the ring. The electron when it reaches the center of the ring?

ok so
Q=+12.0nC
r=0.10m
x=0.25m

here's what I got so far

dE=Ke*dq/r^2
r=(x^2+a^2)^(1/2)
<after integration>
=Ke^x/(x^2+a^2)^(3/2)
I can't figure out how to find Ke> Am I heading in the right direction?
 
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I am not sure what the question is. Is it: "what is the speed of the electron when it passes through the centre of the ring"?

If so, try using electric potential. What is the potential energy at a distance d along the axis? What is the potential energy at the centre of the ring? What is the difference? That has to be the kinetic energy of the electron.

AM
 
woops, determine speed :)
 
Ok this is what I got Ke(Q/(x^2+a^2) <--- square root over the donominator.
Q= 12.0 nC
a= 25.0cm => 0.25m
r= 10.0cm => 0.10m

the answer given is 1.19x10^7, I keep getting 1.488x10^12, however I see where I wen't wrong because Ke=8.99x10^9 Nm^2/C^2, so this means I have to convert 12.0 nC to C, and I don't know how?
 
defineNormal said:
Ok this is what I got Ke(Q/(x^2+a^2) <--- square root over the donominator.
Q= 12.0 nC
a= 25.0cm => 0.25m
r= 10.0cm => 0.10m

the answer given is 1.19x10^7, I keep getting 1.488x10^12, however I see where I wen't wrong because Ke=8.99x10^9 Nm^2/C^2, so this means I have to convert 12.0 nC to C, and I don't know how?

I assume if it really is nC it means nanoCoulombs or 10^-9C
 
but then the exponants cancel each other out?
 
defineNormal said:
but then the exponants cancel each other out?

Did you use the charge of the electron? Your equation below is not correct. The RHS is just K, not Ke

defineNormal said:
Ke=8.99x10^9 Nm^2/C^2

Other than that, check your computations. You appear to have the correct distances and the correct PE.
 

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