Show that the vectors `a-2b+4c,-2a+3b-6c and -b+2c` are coplanar vector, where a,b,c are non-coplanar vectors.

If three vectors xa-2b+3c, -2a+yb-4c and -zb+3c are coplanar, where a,b and c are unit (or any) vectors then

Show that the vectors 2vec a-vec b+3vec c,vec a+vec b-2vec c and vec a+vec b-3vec c are non-coplanar vectors (where vec a,vec b,vec c are non-coplanar vectors)

If the vectors a+lambda b+3c,-2a+3b-4c and a-3b+5c are coplanar and a,b,c are non-coplanar,then the value of lambda is

Show that points with position vectors 2-2b+3c,-2a+3b-c and 4a-7b+7c are collinear. It is given that vectors a,b and c and non-coplanar.

Property 5: Vectors a; b and c are non- coplanar iff vectors a'; b' and c' are non- coplanar.

Show that the vectors vec a-2vec b+3vec c,vec a-3vec b+5vec c and -2vec a+3vec b-4vec c are coplanar,where vec a,vec b,vec c are non-coplanar.