A vector a has components 2p and 1 with respect 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 a has components p + 1 and 1 then
a) p ≠ 0
b) p = 1 or p =
c) p = −1 or
d) p = 1 or p = −1
e) None of these
Your Answer
Angle between vectors are unit vectors satisfying
If form a triangle then the internal angle of the triangle between a and b is
Let P, Q, R and S be points on the plane with position vectors respectively. The quadrilateral PQRS must be a
a) Parallelogram which is neither a rhombus nor a rectangle
b) Square
c) Rectangle but not a square
d) Rhombus but not a square
The adjacent sides of a parallelogram ABCD are given by and . The side AD is rotated by an angle α in the plane of the parallelogram so that AD become AD´. If AD´ makes a right angle with the side AB, the cosine of the angle α is given by
a)
b)
c)
d)
and are reciprocal systems of vectors, prove that
Let and be three non-zero vectors such that c is a unit vector perpendicular to both the vectors a and b and the angle between the vectors a and b is then is equal to
a) 1
d) None of these
If are three non–coplanar vectors, then
equals
a) 0
Let p, q, r be three mutually perpendicular vectors of the same magnitude. If x satisfies the equation p ((x – q) p) + q ((x – r) q) + r ((x – p) r) = 0 then x is given by
For three vectors which of the following expressions is not equal to any of the remaining three
Let and a unit vector c be coplanar. If c is perpendicular to a then c is equal to
A unit vector which is orthogonal to the vectors and
coplanar with the vectors and is
Multiple choice
Let be three vectors. A vector in the plane of b and c whose projection on a is of magnitude is
The vector is
a) A unit vector
b) Makes an angle with the vector
c) Parallel to vector
d) Perpendicular to the vector
Let A be vector parallel to the line of intersection of planes P1 and P2. Plane P1 is parallel to the vectors and and that P2 is parallel to and , then the angle between vector A and a given vector is
A1, A2, …… , An are the vertices of a regular polygon with n sides and O is the centre. Show that
A vector A has components A1, A2, A3 in a right handed rectangular cartesian coordinate system OXYZ. The coordinate system is rotated about the X–axis through an angle . Find the components of A in the new co-ordinate system in terms of A1, A2, A3.
In a triangle OAB, E is the midpoint of BO and D is a point on AB such that AD : DB = 2 : 1. If OD and AE intercept at P determine the ratio OP : PD using vector methods.
If the vectors b, c, d, are not coplanar then prove that a is parallel to the vector
The position vectors of the vertices A, B, C of a tetrahedron are respectively. The altitude from the vertex D to the opposite face ABC meets the median line through A of the triangle ABC at E. If the length of the side AD is 4 and the volume of the tetrahedron is . Find the position vector of E or all possible positions.
If A, B, C are such that |B| = |C|. Prove that
Let be non–coplanar unit vectors equally inclined to one another at an angle θ. If find p, q, r in terms of θ
Prove by vector method or otherwise, that the point of intersection of the diagonals of a trapezium lies on the line passing through the mid points of the parallel sides (you may assume that the trapezium is not a parallelogram)
For any two vectors u and v prove that
i)
ii)