Volume of parallelopiped determined by vectors `bara` and `barb` and `barc` is 2.
Then the volume of the parallelepiped determined by vectors `2 (bara xx barb), 3 (barb xx barc)` and `(barc xx bara)` is

Volume of parallelepiped determined by vectors bara,barb and barc is 5. Then the volume of the parallelepiped determined by the vectors 3(bara +barb). (barb + barc) and 2( barc + bara) is

Volume of parallelepiped determined by vectors bara,barb and barc is 5. Then the volume of the parallelepiped determined by the vectors 3(bara +barb). (barb + barc) and 2( barc + bara) is

(3bara xx 2barb)·barc + (3barb xx 2barc)·bara + (4barc xx 3barb)·bara =

If V is the volume of the parallelopiped having three coterminous edge, as, bara ,barb and barc then the volume of the parallopiped having three coterminous edges as baralpha=(bara.bara)bara+(bara.barb)barb+(bara.barc)barc barbeta=(barb.bara)bara+(barb.barb)barb+(barb.barc)barc bargamma=(barc.bara)bara+(barc.barb)barb+(barc.barc)barc is

If bara xx barb=barc and barbxx barc=bara , then

Find the volume of the parallelopiped having coterminus edges as 2bara - barb + barc , -bara+ 2barb + 2barc and bara-3barb +barc if [bara barb barc]=-2 .

The value of (bara-barb).[(barb-barc)xx(barc-bara)] is