Position of a particle in a rectangular -co-ordinate `(3,2,5)`. Then its position vector will be

Assertion (A) : The position of a particle on a rectangular coordinate system is (3,2,5). Then its position vector be 2hat(i)+5hat(j)+3hat(k) . Reason (R ) : The displacement vector of the particle that moves from point P(2,3,5) to point Q(3,4,5) is hat(i)+hat(j) .

A particle lies in space at point ( 2,3,4) find the magnitude of its position vector.

A particle lies in space at point ( 2,3,4) find the magnitude of its position vector.

Show the position vector for a particle in two dimensional motion. Write an expressionfor this position vector.

Assertion : A particle is under SHM along the x - axis. Its mean position is x = 2 , amplitude is A = 2 and angular frequency omega . At t = 0 , particle is at origin, then x - co-ordinate versus time equation of the particle will be x = -2 cos omega t + 2 . Reason : At t = 0 , particle is at rest.

Assertion : Aparticle is under SHM along the x - axis. Its mean position is x = 2 , amplitude is A = 2 and angular frequency omega . At t = 0 , particle is at origin, then x - co-ordinate versus time equation of the particle will be x = -2 cos omega t + 2 . Reason : At t = 0 , particle is at rest.

Show that the rectangular components of displacement vectors are the differences of the rectangular components of the position vector at two instants.

If the position vector of one end of the line segment AB be 2hati+3hatj-hatk and the position vector of its middle point be 3(hati+hatj+hatk) , then find the position vector of the other end.

If the position vector of one end of the line segment AB be 2hati+3hatj-hatk and the position vector of its middle point be 3(hati+hatj+hatk) , then find the position vector of the other end.

If the position vector of one end of the line segment AB be 2hati+3hatj-hatk and the position vector of its middle point be 3(hati+hatj+hatk) , then find the position vector of the other end.