A vector perpendicupar to the vecto `(3hat(i) + 5hat(j))` is

Let m be the unit vector orthogonal to the vector hat(i)- hat(j)+ hat(k) and coplanar with the vectors 2 hat (i)+ hat(j) AND hat(j)- hat hat(k) , If a= hat(i)- hat(k) , then the length of the perpendicular from the origin to the plane r.m=a.m is

If vec(A)=2hat(i)+3hat(j)+6hat(k) and vec(B)=3hat(i)-6hat(j)+2hat(k) then vector perpendicular to both vec(A) and vec(B) has magnitude K times that of 6hat(i)+2hat(j)-3hat(k) . Then K =

If a non-zero vector a is parallel to the line of intersection of the plane determined by the vectors hat(j) - hat(k) ,3 hat(j) - 2 hat(k) and the plane determined by the vectors 2 hat(i) + 3hat(j) , hat(i) - 3hat(j) , then the angle between the vectors a and hat(i) + hat(j) + hat(k) is