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Chapter Two – Vectors and Equilibrium

Main focus of this chapter is to understand basic concepts of vectors, its components, vector algebra and equilibrium.
A physical quantity that requires only magnitude is known as scalar quantity whereas a physical quantity that needs both magnitude and direction is called vector.

When two or more vectors are added, we get a single vector (whose effect is same as the original vectors taken together) known as resultant vector. Vector addition is done by head to tail rule, according to which the sum of two vectors can be obtained by joining the tail of first vector to the head of second vector. To represent the direction of a vector in space unit vector is used. Magnitude of a unit vector is one.A vector whose magnitude is zero without any specified direction is null vector. vector is used to describe the location of a particle with respect to origin position.

The scalar or dot product of two vectors is a scalar quantity, and the vector or cross product of two vectors is a vector.
The product of force and moment arm is torque.
If there is no resultant force or resultant torque, system is in equilibrium.

Q.2.1. Suppose in a rectangular coordinate system, a vector A has its tail at the point P(-2,-3) and its tip at Q(3,9).Determine the distance between these two points.

Q.2.2. A certain corner of a room is selected as the origin of a rectangular coordinate system. If an insect is sitting on an adjacent wall at a point having coordinates(2,1), where the units are in metres, what is the distance of the insect from this corner of the room?

Q.2.3. What is the unit vector in the direction of the vector A=4 î +3 ĵ ?

Q.2.4.Two particles are located at r1=3 î +7 ĵ and r2=-2 î +3 ĵ respectively. Find both the magnitude of the vector (r2–r1) and its orientation with respect to the x-axis.

Q.2.5. If a vector B is added to vector A, the result is 6 î + ĵ .If B is subtracted from A, the result is -4î +7ĵ. What is the magnitude of vector A?

Q.2.6. Given that A =2 î +3 ĵ and B = 3 î– 4 ĵ, find the magnitude and angle of (a) C=A+B, and (b) D=3A-2B.

Q.2.7. Find the angle between the two vectors, A=5 î + ĵ and B=2 î + 4 ĵ.

Q.2.8. Find the work done when the point of application of the force 3 î +2 ĵ moves in a straight line from the point (2,-1) to the point (6,4).

Q.2.9. Show that the three vector î + ĵ + ḵ , 2 î -3 ĵ + ḵ and 4 î + ĵ – 5ḵ are mutually perpendicular.

Q.2.10. Given that A = î -2 ĵ +3 ḵ and B = 3 î -4 ḵ , find the projection of A on B.