Write direction ratios of the vector `bar(r ) = bar(i) + bar(j) - 2bar(k)` and hence calculate its direction cosines.

Find unit vector in the direction of vector bar(a) = (2bar(i)+3bar(j)+bar(k))

Find the unit vector in the direction of the sum of the vectors bar(a) = 2bar(i)+ 2bar(j) - 5bar(k) and bar(b) = 2bar(i) + bar(j) + 3bar(k) .

Find a vector in the direction of vector bar(a) = bar(i) - 2bar(j) has magnitude 7 units.

bar(r)=2bar(i)+3bar(j)-6bar(k)" then find "abs(bar(r)) .

A non-zero vector bar(a) , is parallel to the line of intersection of the plane determined by the vectors bar(i), bar(i) + bar(j) and the plane determined by the vectors bar(i)- bar(j), bar(i) + bar(k) Find the angle between bar(a) and the vector bar(i)- 2bar(j) + 2bar(k)

If the position vectors of A, B are 2bar(i)-9bar(j)-4bar(k), 6bar(i)-3bar(j)+8bar(k) then the unit vector in the direction of vec(AB) is