A vector perpendicular to the vector (i + 2j) and having magnitude `3 sqrt5` units is

Unit vector perpendicular to the vectors hat(i) - hat(j) and hat(i) + hat(j) is

A unit vector perpendicular to vector vecV=(3,-4) is

The algebraic sum of two co - initial vectors is 16 units. Their vector sum is 8 units and the resultant of the vectors are perpendicular to the smaller vector. Then magnitudes of the two vectors are -

The vector in the direction of the vector hat(i) - 2 hat(j) + 2hat(k) that has magnitude 9 units is

The resultant of two vectors is perpendicular to first vector of magnitude 6N. If the resultant has magnitude 6sqrt(3)N , then magnitude of second vector is

The number of unit vectors perpendicular to the vector vec(a) = 2 hat(i) + hat(j) + 2 hat(k) and vec(b) = hat(j) + hat(k) is

Find a unit vector perpendicular to both the vectors hat i-2 hat j+3 hat ka n d hat i+2 hat j- hat kdot

Find the components of a unit vector which is perpendicular to the vectors hat i+2 hat j- hat ka n d2 hat i- hat j+2 hat kdot

Find a unit vector perpendicular to both the vectors 4 hat i- hat j+3 hat k\ a n d-2 hat i+ hat j-2 hat kdot

Find a unit vector perpendicular to each of the vector -> a+ -> b and -> a- -> b where -> a=3 hat i+2 hat j+2 hat k and -> b= hat i+2 hat j-2 hat k