- #1
Antoha1
- 25
- 2
- Homework Statement
- A proton and an alpha particle begin to move in an electric field with a potential difference (voltage) of U.
After passing through this field, the mass of the proton is three times less than the mass of the alpha particle. What is this potential difference?
- Relevant Equations
- q is charge;
Applying conservation of energy law:
Both particles got energy ##A## from eletric fiel: ##A_{p}=eU## and ##A_{\alpha}=2eU##.
Lets say particles weren't moving before accelerating them.
1)
Proton energy: ##E_{p}=m_{p}c^2+eU##
Alpha particle energy: ##E_{\alpha}=m_{\alpha}c^2+2eU##
Before acceleration ##\frac{m_{p}}{m_{\alpha}} \approx \frac{1}{4}##
2) After acceleration:
##E_{p}=\gamma_{p}m_{p}c^2##
##E_{\alpha}=\gamma_{\alpha}m_{\alpha}c^2##
But it is said that after acceleration ##\frac{M_{\alpha}}{M_{p}}=3##
So, how can I solve for U, I don't know how to deal with this rest mass relation and relativistic mass relation also thinking if I extract gamma, speeds of the particles won't cancel out and I'd be left with two more not known values. Maybe different way of solving there is?
Both particles got energy ##A## from eletric fiel: ##A_{p}=eU## and ##A_{\alpha}=2eU##.
Lets say particles weren't moving before accelerating them.
1)
Proton energy: ##E_{p}=m_{p}c^2+eU##
Alpha particle energy: ##E_{\alpha}=m_{\alpha}c^2+2eU##
Before acceleration ##\frac{m_{p}}{m_{\alpha}} \approx \frac{1}{4}##
2) After acceleration:
##E_{p}=\gamma_{p}m_{p}c^2##
##E_{\alpha}=\gamma_{\alpha}m_{\alpha}c^2##
But it is said that after acceleration ##\frac{M_{\alpha}}{M_{p}}=3##
So, how can I solve for U, I don't know how to deal with this rest mass relation and relativistic mass relation also thinking if I extract gamma, speeds of the particles won't cancel out and I'd be left with two more not known values. Maybe different way of solving there is?