Show that `(btimesc)*(atimesd)+(atimesb)*(ctimesd)+(ctimesa)*(btimesd)=0`

If atimes(btimesc)=(atimesb)timesc , then

If atimes(btimesc)=0 , then

If a, b and c are three vectors such that [a b c]=1, then find the value of [a+b b+c c+a]+[ atimesb btimesc ctimesa ]+[ atimes(btimesc) btimes(ctimesa) ctimes(atimesb) ]

If a, b and c are three non-coplanar vectors, then find the value of (a*(btimesc))/(ctimes(a*b))+(b*(ctimesa))/(c*(atimesb)) .

Show that (x)/((1+x)) 0

show that (x)/(1+x) 0

Let a, b and c are non-zero vectors such that they are not orthogonal pairwise and such that V_1 =atimes(btimesc) and V_2=(atimesb)timesc, are collinear then which of the following holds goods?

If alpha(atimesb)+beta(btimesc)+gamma(ctimesa)=0 , then

Show that f(x)=|x| is continuous at x=0