The vector ` vec a` has the components `2p` and 1 w.r.t. a rectangular Cartesian system. This system is rotated through a certain angel about the origin in the counterclockwise sense. If, with respect to a new system, ` vec a` has components `(p+1)a n d1` , then `p` is equal to a. `-4` b. `-1//3` c. `1` d. `2`

The vector vec a has the components 2p and 1 w.r.t.a rectangular Cartesian system.This system is rotated through a certain angel about the origin in the counterclockwise sense.If,with respect to a new system,vec a has components (p+1) and 1, then p is equal to a.-4 b.-1/3 c.1 d.2

A vector veca has components 3p and 1 with rrespect to a rectangular cartesian system. This system is rotated through a certain angle about the origin in the counter clockwise sense. If, with respect to new system, veca has components p+1 and sqrt10 then a value of p is equal to :

A vector bar(a) has components 2p and 1 w.r.t a rectangular cartesian system. It is rotated through a certain angle about the origin in the counter clockwise direction. With respect to the new system, if bar(a) has components p +1, 1 then p =

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 oversetrarra has components 2p and 1 with respect to a rectangular Cartesian system, this system is rotated through a certain clockwise sense, if we write the new system oversetrarr a has components (p+1) and 1 then

A vector has components p and 1 with respect to a rectangular Cartesian system. The axes are rotated through an angle alpha about the origin in the anticlockwise sense. Statement 1: If the vector has component p+2 and 1 with respect to the new system, then p=-1. Statement 2: Magnitude of the original vector and new vector remains the same.