The points with position vectors `veca + vecb, veca-vecb and veca +k vecb` are collinear for all real values of k.

Show that the points having position vectors (veca-2vecb+3vecc),(-2veca+3vecb+2vecc),(-8veca+13vecb) re collinear whatever veca,vecb,vecc may be

For vectors vecA and vecB , (vecA + vecB). (vecA xx vecB) will be :

Show that the points whose position vectors are veca,vecb,vecc,vecd will be coplanar if [veca vecb vecc]-[veca vecb vecd]+[veca vecc vecd]-[vecb vecc vecd]=0

If veca and vecb are non zero, non collinear vectors and veca_(1)=lambda veca+3 vecb, vecb_(1)=2veca+lambda vecb, vec c_(1)=veca+vecb . Find the sum of all possible real values of lambda so that points A_(1), B_(1), C_(1) whose position vectors are veca_(1), vecb_(1), vec c_(1) respectively are collinear is equal to.

The vertices of a triangle have the position vectors veca,vecb,vecc and p( r) is a point in the plane of Delta such that: veca.vecb+ vecc.vecr = veca.vecc + vecb.vecx = vecb.vecc+veca.vecx then for the Delta , P is the:

Vector veca is prepedicular to vecb , componets of veca- vecb along veca + vecb will be :

If veca , vecb are unit vectors such that the vector veca + 3vecb is peependicular to 7 veca - vecb and veca -4vecb is prependicular to 7 veca -2vecb then the angle between veca and vecb is

If veca, vecb and vecc are three non-zero vectors, no two of which are collinear, veca +2 vecb is collinear with vecc and vecb + 3 vecc is collinear with veca , then find the value of |veca + 2vecb + 6vecc| .