Let `bara,barb` and `barc` be non coplanar vectors if
`[2bara-barb+3barc,bara+barb-2barc,bara+barb-3barc]=lamda[bara barb barc]` then find `lamda`.

Let bara,barb and barc be non coplanar vectors if [bara+2barb 2barb+barc 5barc+bara]=lamda[bara barb barc] then find lamda

[bara barb barc]+[bara barc barb] =

If bara,barb,barc are non-coplanar vectors and (bara+2barb+barc).(bara-barb)xx(bara-barb-barc)=lamda[barabarbbarc] then lamda =

Show that [2bara +barb +barc bara +2barb +barc bara +barb +2barc] = 4[bara barb barc]

If bara,barb,barc are unit coplanar vectors, then find [ 2bara-barb 2barb-barc 2barc -bara] .

i) Let bara, barb and barc be non - coplanar vectors and baralpha=bara+2barb+3barc,barbeta=2bara+barb-2barc and bargamma=3bara-7barc , then find [baralphabarbetabargamma] (ii) If bara,barbbarc are non coplanar vectors, then find ((bara+2barb-barc).[(bara-barb)xx(bara-barb-barc)])/([barabarbbarc])

(bara+2barb-barc).(bara-barb)xx(bara-barb-barc)=

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

Let bara ,barb,barc be non coplanar vectors and bara^(1)=(barbxxbarc)/([bara barb barc]),barb^(1)=(barcxxbara)/([bara barb barc]) and barc^(1)=(baraxxbarb)/([bara barb barc]) then prove that (bara+barb+barc).(bara^(1)+barb^(1)+barc^(1))=3

Let bara ,barb,barc be non coplanar vectors and bara^(1)=(barbxxbarc)/([bara barb barc]),barb^(1)=(barcxxbara)/([bara barb barc]) and barc^(1)=(baraxxbarb)/([bara barb barc]) then prove that bara.bara^(1)=barb.barb^(1)=barc.barc^(1)=1