View Full Version : Vectorcalculus!! Help Needed B4 Tomorrow!
NOTE: bold characters are vectors
Could somebody please help me to show that:
http://img259.imageshack.us/img259/8651/problem6dx.gif
and to proof:
http://img403.imageshack.us/img403/6641/problem26dw.gif
I haven't had any explanations on vectors & determinants and my teacher asks me to solve this problem... I know how determinants work, but I don't know how to translate this to the vector problem above. Please help me!!! I need to finish this by tomorrow (just heard it today)!!!
vaishakh
Feb8-06, 01:10 PM
Find LHS and RHS indepedently and then prove that you are reaching the same result. If you have a bit more problems please show how you argued so that I can tell what is wrong in your arguement.
finchie_88
Feb8-06, 01:21 PM
For the first problem, expand the determinant of the matrix for the cross product, for example, AxB is the determinant of:
\left(\begin{array}{ccc}i&b_x&c_x\\j&b_y&c_y\\k&b_z&c_z\end{array}\right)
expand that determinant, and then do the dot product of it, and it is quite obviously the determinant of the matrix shown, and obviously C.(AxB) is true, since they relate to the properties of vectors.
* The i,j and k in the matrix represent the components of the vectors.
Did you know that Ax(BxC) = (AxB)xC, etc. Do you thing you can do that one now.
Hope that helps you with most of it.:biggrin:
neurocomp2003
Feb8-06, 01:28 PM
firs tdo the determinant.
change all the vectors to their components. then do each operation.
cross AxB=(aybz-byaz,azbx-bzax,axby-bxay)
Dot A.B=(axbx+ayby+azbz);
Did you know that Ax(BxC) = (AxB)xC, etc. Do you thing you can do that one now.
The cross-product is not associative!
Look at the OP's identity (1)... the Jacobi Identity. Bringing the last term on the LHS of (1) onto the other side is your RHS.
I managed to figure out why A . (B x C) has the give determinant, but why do C . (A x B) and B . (C x A) have the same deteriminant? The drawn determinant is a det(ABC) and the other two would be det(CAB) and det(BCA) ....
What is LHS and RHS actually?!
As to why the three are equal, this is because the parallelepiped created by A, B and C is the absolute value of this (it is called the scalar triple product).
For the second set, first show #2 by xpanding it out. #1 follows from that.
Could you explain a bit more ... I don't get what you're saying....
ghosts_cloak
Feb8-06, 03:23 PM
What is LHS and RHS actually?!
I may be missinterpreting you, but LHS means Left Hand Side, and RHS is the Right Hand Side.
Hope that helps,
Gareth
neurocomp2003
Feb8-06, 04:09 PM
look on line for the image of parallelpipe...best website choice is probably mathworld.com
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