- #1
ian2012
- 77
- 0
I've got a problem understanding a line of proof in my lecture notes.
Given that you have a charge of +Q and mass m orbiting a fixed particle of charge -Q' in the presence of a magnetic field B. The particle is moving slowly enough for relativistic effects to be ignored.
Given that:
m\hat{a_{I}}=-\frac{QQ'}{4\pi\epsilon_{0}r^{2}}\hat{r}+Q\hat{v_{I}} \times \hat{B}
where \hat{v_{I}} is the particle's velocity in the inertial frame.
Substituting
\hat{a_{I}}=\hat{a_{R}}+2\hat{\omega} \times \hat{v_{R}}+\hat{\omega} \times (\hat{\omega} \times \hat{r})
into the first equation along with \hat{v_{I}}=\hat{v_{R}}+\hat{\omega} \times \hat{r}
gives:
\hat{a_{R}}+2\hat{\omega} \times \hat{v_{R}}+\hat{\omega} \times (\hat{\omega} \times \hat{r}) = -\frac{QQ'}{4\pi\epsilon_{0}mr^{2}}\hat{r}+(\frac{Q}{m})[\hat{v_{R}}+(\hat{\omega} \times \hat{r})] \times \hat{B}
Apparently the terms porportional to \hat{v_{R}} cancel if \hat{\omega}=-\frac{Q}{2m}\hat{B}
Why is this so? Visualizing the situation will probably help a lot.
Given that you have a charge of +Q and mass m orbiting a fixed particle of charge -Q' in the presence of a magnetic field B. The particle is moving slowly enough for relativistic effects to be ignored.
Given that:
m\hat{a_{I}}=-\frac{QQ'}{4\pi\epsilon_{0}r^{2}}\hat{r}+Q\hat{v_{I}} \times \hat{B}
where \hat{v_{I}} is the particle's velocity in the inertial frame.
Substituting
\hat{a_{I}}=\hat{a_{R}}+2\hat{\omega} \times \hat{v_{R}}+\hat{\omega} \times (\hat{\omega} \times \hat{r})
into the first equation along with \hat{v_{I}}=\hat{v_{R}}+\hat{\omega} \times \hat{r}
gives:
\hat{a_{R}}+2\hat{\omega} \times \hat{v_{R}}+\hat{\omega} \times (\hat{\omega} \times \hat{r}) = -\frac{QQ'}{4\pi\epsilon_{0}mr^{2}}\hat{r}+(\frac{Q}{m})[\hat{v_{R}}+(\hat{\omega} \times \hat{r})] \times \hat{B}
Apparently the terms porportional to \hat{v_{R}} cancel if \hat{\omega}=-\frac{Q}{2m}\hat{B}
Why is this so? Visualizing the situation will probably help a lot.
Last edited:
