ZuoTi.Pro
Question

prove the BAC-CAB identity using these equations

Tmn eimm 26 jmn eijk6. ikevh ijk

science   physics   
0 0
Add a comment Improve this question Transcribed image text
Next > < Previous
Sort answers by oldest

Homework Answers

Answer #1

The BAC - CAB identity is
  \vec{A}\times (\vec{B}\times \vec{C})=\vec{B} (\vec{A}. \vec{C})-\vec{C} (\vec{A}. \vec{B})

We use the fact that
   \vec{A}=A_i\hat{e}_i=A_i\hat{e}_{j}\delta_{ij}
And
  \vec{A}.\vec{B}=A_iB_i=A_iB_j\delta_{ij}
And
   \hat{e}_i.\hat{e}_j=\delta_{ij}
And
  \hat{e}_i\times \hat{e}_j=\epsilon_{ijk}\hat{e}_k
And so,
   \vec{A}\times (\vec{B}\times \vec{C})=A_i\hat{e}_i\times (B_j\hat{e}_j\times C_k\hat{e}_k)
  \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=A_iB_jC_k\hat{e}_i\times (\hat{e}_j\times \hat{e}_k)
  \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=A_iB_jC_k\hat{e}_i\times \epsilon_{jkl}\hat{e}_l
  \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=A_iB_jC_k\epsilon_{jkl}\hat{e}_i\times \hat{e}_l
   \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=A_iB_jC_k\epsilon_{jkl}\epsilon_{ilm}\hat{e}_m
   \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=A_iB_jC_k(-\delta_{ij}\delta_{km}+\delta_{ik}\delta_{jm})\hat{e}_m
   \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=-(A_iB_j\delta_{ij})(C_k\delta_{km}\hat{e}_m)+(A_{i}C_k\delta_{ik})(\delta_{jm}B_j\hat{e}_m)
  \Rightarrow \vec{A}\times (\vec{B}\times \vec{C})=-(\vec{A}.\vec{B})\vec{C}+ (\vec{A}.\vec{C})\vec{B}

0 0
Add a comment
Know the answer?
Add Answer to:
prove the BAC-CAB identity using these equations Tmn eimm 26 jmn eijk6. ikevh ijk
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Log In

Sign Up

Not the answer you're looking for? Ask your own homework help question. Our experts will answer your question WITHIN MINUTES for Free.
Similar Homework Help Questions
ADVERTISEMENT
Free Homework Help App
Download From Google Play
Scan Your Homework
to Get Instant Free Answers
Need Online Homework Help?
Ask a Question
Get Answers For Free
Most questions answered within 3 hours.
ADVERTISEMENT
ADVERTISEMENT
ADVERTISEMENT