Four non-zero vectors will always be

Show that |a|b+|b| a is perpendicular to |a|b-|b| a for any two non- zero vectors a and b.

Let veca, vecb, vecc be three non-zero vectors, which are pair-wise non-collinear. If veca+ 3 vecb is collinear with c and vecb + 2 vecc is collinear with veca, then veca + 3 vecb + 6 vecc is :

In a four-dimensional space where unit vectors along the axes are hati,hatj,hatk and hatl, and a_(1),a_(2),a_(3),a_(4) are four non-zero vectors such that no vector can be expressed as a linear combination of other (lamda-1) (a_(1)-a_(2))+mu(a_(2)+a_(3))+gamma(a_(3)+a_(4)-2a_(2))+a_(3)+deltaa_(4)=0 , then

For non zero vectors veca,vecb, vecc (veca xx vecb). Vecc= |veca| |vecb||vecc| holds iff:

For a non-zero vector a, the set of real number, satisfying |(5-x)a|lt|2a| consists of all x such that

Let veca , vecb,vecc be three non zero vectors which are pair wise non collinear and veca+vec3b is colinear with vecc and vecb+vec2c is colinear with veca then veca+3b+6vecc is

If bara = a_1 hati + a_2 hatj + a_3 hatk , hatb = b_1 hati + b_2 hatk and barc = c_1 hati + c_2 hatj + c_3 hatk are non-zero vectors such that barc is a unit vector perpendicular to both the vectors veca and barb and angle between bara , barb is pi//6 then, |{:(a_1 , a_2 ,a_3),(b_1,b_2,b_3),(c_1 , c_2,c_3):}|^2 =

Answer the followings true or false. (i) vecaand-veca are collinear. (ii) Two collinear vectors are always equal in magnitude. (iii) Two vectors having same magnitude are collinear. (iv) Two collinear vectors having the same magnitude are equal.

If veca is non-zero vector and k is a scalar such that k veca =1, then k is :

If non-zero vectors veca and vecb are equally inclined to coplanar vector vecc , then vecc can be