When a right handed rectangular Cartesian system OXYZ is rotated about the z-axis through an angle `pi/4` in the counter-clockwise, direction it is found that a vector `veca` has the component `2sqrt(3), 3sqrt(2)` and 4.

A vector 4hat i+3hat j rotates about its tail through an angle 53^(@) in anticlockwise direction then the new vector is

A vector hati+sqrt(3)hatj rotates about its tail through an angle 60^(@) in clockwise direction then the new vector is

A vector has component A_(1),A_(2) and A_(3) in a right -handed rectangular Cartesian coordinate system OXY Z .The coordinate system is rotated about the x-axis through an angel pi/2. Find the component of A in the new coordinate system in terms of A_(1),A_(2), and A_(3).

The vector has components 2p and 1 with respect to a rectangular Cartesian system. The axes rotated through system. The axes are rotated through an a about the origin in the anticlockwise sense. If the vector has components (p+1) and 1 unit respect to the new system, then

A vector A has components A_(1),A_(2),A_(3) in a right - handed rectangular Cartesian coordinate system Ox,Oy,Oz .The coordinate system is rotated about the z-axis through an angle ((pi)/(2)) .The components of A in the new coordinate system are

The axes of coordinates are rotated about the z-axis though an angle of pi//4 in the anticlockwise direction and the components of a vector are 2sqrt(2), 3sqrt(2), 4. Prove that the components of the same vector in the original system are -1,5,4.