How Fast Must a Proton Travel to Cross an Electric Field?

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SUMMARY

The discussion centers on calculating the launch speed required for a proton to cross an electric field between two charged disks. The electric field strength is determined to be E = 1.1 * 10^6 N/C. To find the necessary launch speed, participants suggest using kinematics and energy principles, specifically the equations F = qE and v^2 = vo^2 + 2a(X - Xo). The force on the proton is calculated using its charge and the electric field, leading to the determination of acceleration and the subsequent launch speed.

PREREQUISITES
  • Understanding of electric fields and forces (F = qE)
  • Familiarity with kinematic equations (v^2 = vo^2 + 2a(X - Xo))
  • Knowledge of energy conservation principles (Kinetic energy and potential energy)
  • Basic concepts of proton mass and charge (mass = 1.67 * 10^-27 kg, charge = 1.6 * 10^-19 C)
NEXT STEPS
  • Calculate the potential difference between charged plates using E = V/d
  • Explore the relationship between force, mass, and acceleration in electric fields
  • Investigate the implications of energy conservation in electric fields
  • Learn about the motion of charged particles in electric fields
USEFUL FOR

Students studying physics, particularly those focusing on electromagnetism and kinematics, as well as educators seeking to enhance their understanding of particle motion in electric fields.

Foxhound101
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Homework Statement



Two 4.0 cm diameter disks face each other, 2.0 mm apart. They are charged to +-12 Nc.

Part A
What is the electric field strength between the disks?
E = 1.1 * 10^6 N/C

Part B
A proton is shot from the negative disk toward the positive disk. What launch speed must the proton have to just barely reach the positive disk?

Homework Equations



E=(Q/(epsilon zero * A)
v=x/t

The Attempt at a Solution



I was able to figure out part A. I just need help with part B.
V = ?
x = 2mm
t = ?

Doesn't seem like this part should be difficult, so I must be missing something simple...

Thanks in advance for any help.
 
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Two ways to attack this:

(1) Using kinematics. Hint: What's the proton's acceleration?

(2) Using energy. Hint: What's the potential difference between the plates?
 
So...this is what I have so far.

F = qE

F = (12*10^-9)(1.1*10^6)
F = (.0132N)

F = ma

mass of proton = 1.67*10^-27

.0132 = (1.67*10^-27) (a)
7.9*10^24
 
Foxhound101 said:
So...this is what I have so far.

F = qE

F = (12*10^-9)(1.1*10^6)
F = (.0132N)
Since you need the force on the proton, use the charge of a proton. (Not the total charge on the plate!)
 
F=(1.6*10^-19)(1.1*10^6)
F = 1.76*10^-13

F=ma

1.76*10^-13 = (1.67*10^-27)(a)
1.05*10^14 = a
 
Once you've found the acceleration, it's time for kinematics. You'll need a kinematic equation relating speed and distance.
 
v = x/t
f = m/a

Those aren't it...hm...

Kinetic energy = .5(mass)(velocity)^2

so...(if I remember correctly) total energy = Kinetic energy + potential energy

potential energy = (mgh)

Sadly, if this is the correct approach I do not remember what variables are on the total energy side.

*edit*
O yeah...I forgot I was looking for an equation relating speed and distance. I am having trouble finding one.
 
Hm...perhaps this equation
v^2 = vo^2 + 2a(X - Xo)

*edit*
Yup...that would be the correct equation.

Thanks for the help Doc Al.
 

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