Name: Anonymous 2010-01-14 23:36
I see a lot of threads in here about babies asking for help with their algebra homework and crap. So, for anybody here aching for something more challenging, I have a question for you. I don't need your help, I already solved the problem, but I thought you might like it.
If [eqn] \vec[A] \times \vec[X] = \vec[B] [\eqn]
and
[eqn] \vec[A] \cdot \vec[X] = \phi [\eqn]
what is [math]\vec[X][\math] in terms of [math]\vec[A], \vec[B],[\math] and [math]\phi[\math]
If [eqn] \vec[A] \times \vec[X] = \vec[B] [\eqn]
and
[eqn] \vec[A] \cdot \vec[X] = \phi [\eqn]
what is [math]\vec[X][\math] in terms of [math]\vec[A], \vec[B],[\math] and [math]\phi[\math]