Find the position vector of two points on the line through `P(bar(i)+bar(j)-2bar(k))` at a distance 6 units from P, if the line is parallel to `2bar(i)+2bar(j)+bar(k)`.

The point P on the line passing through A(3bar(i)+2bar(j)-3bar(k)) and parallel to the vectors 2bar(i)-2bar(j)+bar(k) such that AP = 6 is

Find the position vector of the point which divides the line joining the points bar(i)+bar(j)-4bar(k) and bar(i)+bar(j)+bar(k) in the ratio 3 : 2.

Find the vector equation of the plane passing through the points 2bar(i)+bar(j)-bar(k), bar(i)-bar(j)+2bar(k) and parallel to bar(i)-2bar(j)-2bar(k)

Find the vector equation of the line passing through the point 2bar(i)+3bar(j)+bar(k) and parallel to the vector 4bar(i)-2bar(j)+3bar(k)

Find the vector equation of the line passing through the points bar(i)+bar(j)+bar(k) and bar(i)-bar(j)+bar(k) .

Find the equation of the line parallel to the vector 2bar(i)-bar(j)+2bar(k) , and which passes through the point A whose position vector is 3bar(i)+bar(j)-bar(k) . If P is a point on this line such that AP = 15, find the position vector of P.

Find the vector equation of the plane which passes through the points 2bar(i)+4bar(j)+2bar(k), 2bar(i)+3bar(j)+5bar(k) and parallel to the vector 3bar(i)-2bar(j)+bar(k) . Also find the point where this plane meets the line joining the points 2bar(i)+bar(j)+3bar(k) and 4bar(i)-2bar(j)+3bar(k) .

Find the vector equation of the plane passing through the point bar(i)+bar(j)+bar(k) and parallel to the vectors 2bar(i)+3bar(j)+4bar(k), bar(i)-2bar(j)+3bar(k) .