Given three vectors `veca, vecb` and `vecc` are non-zero and non-coplanar vectors. Then which of the following are coplanar.

If veca and vecb are two non- zero collinear vectors then …… is correct .

If a and b are two non-zero and non-collinear vectors then a+b and a-b are

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

Statement 1 : Let A(veca), B(vecb) and C(vecc) be three points such that veca = 2hati +hatk , vecb = 3hati -hatj +3hatk and vecc =-hati +7hatj -5hatk . Then OABC is tetrahedron. Statement 2 : Let A(veca) , B(vecb) and C(vecc) be three points such that vectors veca, vecb and vecc are non-coplanar. Then OABC is a tetrahedron, where O is the origin.

Three vectors veca,vecb and vecc satisfy the relation veca.vecb=0 and veca.vecc=0 . The vector veca is parallel to

If a,b and c are non-coplanar vectors, prove that 3a-7b-4c, 3a-2b+c and a+b+2c are coplanar.

If vec(a) is a vector and x is a non-zero scalar, then

Column-I show vector diagram relating three vectors veca, vecb " and " vecc . Match the vector equation in column -II, with vector diagram in column-I:

The angle between vectors (vecA xx vecB) and (vecB xx vecA) is :

If veca, vecb and vecc are any three non-coplanar vectors, then prove that points l_(1)veca+ m_(1)vecb+ n_(1)vecc, l_(2)veca+m_(2)vecb+n_(2)vecc, l_(3)veca+m_(3)vecb+ n_(3)vecc, l_(4)veca + m_(4)vecb+ n_(4)vecc are coplanar if |{:(l_(1),, l_(2),,l_(3),,l_(4)),(m_(1),,m_(2),,m_(3),,m_(4)), (n_1,,n_2,, n_3,,n_4),(1,,1,,1,,1):}|=0