Let `barA=(x+4y)bara+(2x+y+1)barb and barB=(y-2x+2)bara+(2x-3y-1)barb`, where `bara and barb` are non-collinear vectors, if `3barA=2barB,` then

If bara and barb are non-collinear vectors, then

IF the vector bara and barb are non-coplanar then bara/|bara|+barb/|barb| is

If bara and barb be parrallel vectors, then [bara" "barc" "barb]=

If barp=(barbxxbarc)/(bara" "barb" "barc),barq=(barcxxbara)/(bara" "barb" "barc),barr=(baraxxbarb)/(bara" "barb" "barc) , where bara,barb,barc are three non-coplanar vectors, then the value of (bara+barb+barc).(barp+barq+barr) is given by

The vectors bara,barb and bara+barb are

Let bara = i - k, barb =x i+ j + ( 1 - x) k , and barc = yi + xj + ( 1 + x - y ) k . Then bara ,barb and barc are non-coplanar for

If the points P(bara+2barb+barc).Q(2bara+3barb) and R(barb+tbarc) are collinear, where bara,barb,barc are three non-coplanar vectors, then the value of t is

Find the vector equation of the line of intersection of the planes. barr=lamda_1(bara+barb)+mu_1(bara-barc)and barr=-2barb+lamda_2(bara+2barb-barc)+mu_2bara where bara,barb,barc are non-coplanar vectors.

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

Angle between vectors bara and barb , where bara, barb, barc are unit vectors satisfying bara + barb + sqrt3.barc=bar0 , is