OABC is a tetrahedron. The position vectors of A, B and C are `i, i+j and j+k`, respectively. O is origin. The height of the tetrahedron (taking ABC as base) 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

The position vectors of the four angular points of a tetrahedron OABC are (0, 0, 0), (0, 0, 2), (0, 4, 0) and (6, 0, 0) , respectively. A point P inside the tetrahedron is at the same distance 'r' from the four plane faces of the tetrahedron. Then, the value of 9r 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 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

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

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 position vectors of the points A and B are respectively hat i - hat j + 3 hat k and 3 hat i + 3 hat j + 3 hat k . The equation of the plane bar r. (5 hat i + 2 hat j - 7 hat k ) + 9 =0 Then points A and B.

A particle is moving in a plane with velocity given by vec(u)=u_(0)hat(i)+(aomega cos omegat)hat(j) , where hat(i) and hat(j) are unit vectors along x and y axes respectively. If particle is at the origin at t=0 . Calculate the trajectory of the particle :-

Find the equaiton of the sphere described on the joint of points A and B having position vectors 2hat(i)+6hat(j)-7hat(k) and -2hat(i)+4hat(j)-3hat(k) , respectively, as the diameter. Find the centre and the radius of the sphere.

A boat is moving with a velocity 3 hat i+ 4hat j with respect to ground. The water in the river is moving with a velocity -3 hat i - 4 hat j with respect to ground. The relative velocity of the boat with respect to water is.