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 non-collinear vectors such that for some scalar x,y,z,xbara+ybarb+zbarc=0 , then

The vectors bar a and barb are non-collinear.The value of x for which the vectors barc=(x-2)bara+barb and bard=(2x+1)bara-barb are collinear,is

If bara,barb and barc be three non-zero vectors, no two of which are collinear. If the vectors bara+2barb is collinear with barc and barb+3barc is collinear with bara , then ( lambda being some non-zero scalar) bara+2barb+6barc is equal to: a) lambdabara b) lambdabarb c) lambdabarc d)0

veca and vecb are two non collinear vectors then xveca+yvecb (where x and y are scalars) represents a vector which is (A) parallel to vecb (B) parallel to veca (C) coplanar with veca and vecb (D) none of these

Which of the following is a quadratic equation? a) 9y^2+5=0 b) x+y = 9 c) x^3=8 d)None of these

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

Which of the following is a quadratic equation? a) x^2+5x-2=0 b) x=8y c) y^3+x^3=0 d)None of these

If barx.bara=0,barx.barb=0 and barx.barc=0 for some non-zero vector x, then the TRUE statement is: a) [bara" "barb" "barc]=0 b) [bara" "barb" "barc] ne0 c) [bara" "barb" "barc] =1 d)None of these

If the line a x+b y+c=0 is a normal to the curve x y=1, then a >0,b >0 a >0,b >0 (d) a<0,b<0 none of these

If the position vectors of the points A,B,C are bara,barb and 3bara-2barb respectively, then the points A,B,C are: a)Collinear b)Non-collinear c)Forming a right angled triangle d)None of these