A : A vector perpendicular to both I + j + k and 2i + j + 3k is 2i - j - k
R : Every vector perpendicular to plane containing a,b is equal to `a xx b`

A unit vector perpendicular to 2i + 3j + 4k and 4i - 3j + 2k is

A unit vector perpendicular to the plane of a = 2i - 6j -3k, b = 4i + 3j - k is

A unit vector perpendicular to each of the vector 3i+2j+4k and 2i+j-k is,

The unit vector perpendicular to each of the vectors 2i - j + k and 3i + 4j - k is

A : The vector equation of the plane passing through the point (2,-1,-4) and perpendicular to the vector 4i - 12j - 3k is [r - (2i - j - 4k)]. (4i - 12j - 3k) = 0 R : the vector equation of the plane passing through the point a and perpendicular to the vector m is (r - a) m = 0

A : The vector equation of the plane which is at a distance of 5 unit from origin and perpendicular to 2i - j + 2k is r. (2i - j + 2k) = 15 R : The vector equation of the plane which is at distance of p from origin and perpendicular to the unit vector n is r.n =p

The vectors 2i - 3j + k, I - 2j + 3k, 3i + j - 2k