If `3barP+2barR-5barQ=bar0`, then

If bar(a),bar(b),bar(c) are the position vectors of the points A, B, C respectively and 2bar(a)+3bar(b)-5bar(c)=bar(0) , then find the ratio in which the point C divides line segment AB.

If bara,barb are non-collinear vectors and x,y are scalars such that xbara+ybarb=bar0 , then...a)x = 0 , but y is not necessarily zero b)y = 0 , but x is nont necessary zero c)x = 0 , y = 0 d)None of these

If bara,barb,barc are three non-coplanar vectors and barp,barq,barr are defined by the relations barp=(barbxxbarc)/([bara" "barb" "barc]),barq=(barcxxbara)/([bara" "barb" "barc]),barr=(baraxxbarb)/([bara" "barb" "barc]) then (bara+barb).barp+(barb+barc).barq+(barc+bara).barr=

If bara,barb,barc are three non-coplanar vectors such that barr_1=bara-barb+barc,barr_2=barb+barc-bara,barr_3=barc+bara+barb, barr=2bara-3barb+4barc, if barr=lambda_1 barr_1+lambda_2 barr_2+lambda_3 barr_3 , then

If bara,barb,barc are three non-zero vectors which are pairwise non-collinear. If bara+3barb is collinear with barc and barb+2barc is collinear with bara , then bara+3barb+6barc is: a) barc b) bar0 c) bara+barc d) bara

If bara=2barp+3barq-barr,barb=barp-2barq+2barr and barc=-2barp+barq-2barr and barR=3barp-barq+2barr, where barp,barq,barr are non-coplanar vectors, then barR in terms of bara,bar b,barc is

In a trapezium, if the vectors bar(BC)=lambda(AD),barP=bar(AC)+bar(BD) is collinear with bar(AD) and barP=mubar(AD) , then

Let bara=-overset(^)i-overset(^)k,barb=-overset(^)i+overset(^)j and barc =overset(^)i+2overset(^)j+3overset(^)k be three given vectors. If barr is a vector such that barrxxbarb=barcxxbarb and barr. bara=0 , then the value of barr.barb is

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