The points - a + 4b - 3c, 3a + 2b + 5c, -3a + 8b - 5c, -3a + 2b + c are

The vectors 3a - 2b - 4c, -a + 2c, - 2a + b + 3c are

The vectors a + 2b + 3c, 2a + b - 2c, 3a - 7c are

The vectors 5a + 6b + 7c, 7a - 8b + 9c, 3a + 20b + 5c are

The linear relation between the vectors a + 3b + 4c, a - 2b + 3c, a + 5b - 2c, 6a + 14b + 4c is

A : The centroid of the triangle formed by the points 2a + 3b, 5a + 4b, 2a - b is 3a + 2b. R : The centroid of the triangle formed by the points a, b, c is (a + b + c)/(3)

If the vectors 2a - b + c, a + 2b - 3c, 3a + mb + 5c are linearly dependent, then m =

If the points 2a+3b-c, a-2b+3c, 3a+lambda b-2c and a-6b+6c are coplanar, then the direction cosines of the vector lambda hat(i)-2lambda hat(j)+hat(k) are