The volume of parallelopiped with vector
`bara+2barb-barc,bara-barb and bara-barb-barc` is equal to `k[bar(a)bar(b)bar(c)]`
then `k=`

The vectors bara,barb and bara+barb are

bara.[barb+barc)xx(bara+barb+barc)] is equal to

For any three vectors bara,barb and barc,(bara-barb) .[(barb+barc)xx(barc+bara)] is equal to:

If bara,barb and barc are non-coplanar vectors and the four points with position vectors 2bara+3barb-barc,bara-2barb+3barc,3bara+4barb-2barc,kbara-6barb+6barc are coplanar, then k

(bara+barb).(barb+barc)xx(bara+barb+barc)=

If bara,barb,barc are three vectors, then [bara, barb, barc] is not equal to

If bara , barb , barc are three vectors,then [bara barb barc] is not equal to

The value of [bara-barb,barb-barc,barc-bara] , where |bara|=1,|barb|=5 and |barc|=3 is