In a parallelogram OABC with position vectors of A is `3hat(i)+4hat(j) and C is 4hat(i)+3hat(j)` with reference to O as origin. A point E is taken on the side BC which divides it in the the ratio of `2:1`. Also, the line segment AE intersects the line bisecting the `angleAOC` internally at P. CP when extended meets AB at F.
Q. The position vector of P is

In a parallelogram OABC with position vectors of A is 3hat(i)+4hat(j) and C is 4hat(i)+3hat(j) with reference to O as origin. A point E is taken on the side BC which divides it in the the ratio of 2:1 . Also, the line segment AE intersects the line bisecting the angleAOC internally at P. CP when extended meets AB at F. Q. The equation of line parallel of CP and passing through (2, 3, 4) is

In a parallelogram OABC vectors a,b,c respectively, THE POSITION VECTORS OF VERTICES A,B,C with reference to O as origin. A point E is taken on the side BC which divides it in the ratio of 2:1 also, the line segment AE intersects the line bisecting the angle angleAOC internally at point P. if CP when extended meets AB in points F, then Q. The ratio in which F divides AB is

In a parallelogram OABC, vectors vec a, vec b, vec c are respectively the positions of vectors of vertices A, B, C with reference to O as origin. A point E is taken on the side BC which divide the line 2:1 internally. Also the line segment AE intersect the line bisecting the angle O internally in point P. If CP, when extended meets AB in point F. Then The position vector of point P, is

The vector projection of a vector 3hat(i)+4hat(k) on y-axis is

The position vector of a point C with respect to B is hat i +hat j and that of B with respect to A is hati-hatj . The position vector of C with respect to A is

A vector equally inclined to the vectors hat(i)-hat(j)+hat(k) and hat(i)+hat(j)-hat(k) then the plane containing them is

If the position vectors of the point A and B are 3hat(i)+hat(j)+2hat(k) and hat(i)-2hat(j)-4hat(k) respectively. Then the equation of the plane through B and perpendicular to AB is

Find the angle between vec(P) = - 2hat(i) +3 hat(j) +hat(k) and vec(Q) = hat(i) +2hat(j) - 4hat(k)

Find a unit vector perpendicular to both the vectors (2hat(i)+3hat(j)+hat(k)) and (hat(i)-hat(j)-2hat(k)) .

If vectors vec(A)=(hat(i)+2hat(j)+3hat(k))m and vec(B)=(hat(i)-hat(j)-hat(k))m represent two sides of a triangle, then the third side can have length equal to :