E-Lecture - Important Points
  • A quantity which is described by only magnitude is called scalar.
  • Quantities that need both magnitude and direction to describe them are called vector quantities (or simply vectors).
  • A vector is denoted by a directed arrow. Its length is called the magnitude. The direction it points is called the direction of the vector.
  • A vector is represented by an arrow the point O is called the initial point and P is called the terminal point. Sometimes, vectors are represented by using letters or a letter with a bar over it such as etc.
  • The magnitude of a velocity is the speed; the magnitude of a displacement is distance. Thus, speed and distance are scalar quantities
  • A magnitude is always a positive number.
  • Vectors can be described geometrically or algebraically: geometrically as a directed arrow and algebraically as a column vector.
  • Two vectors are said to be equal if they have the same magnitude and the same direction.
  • If two vectors have same or opposite directions then they are parallel. Indeed, two vectors are parallel if one is a scalar multiple of the other.
  • For any two vectors

(the Triangle law)

  • A vector that has no magnitude and direction is called a zero vector or null vector.
  • The diagonal of a parallelogram is the sum of the side vectors. This is called the Parallelogram Law.
  • Subtraction of vectors

is the same as

  • Multiplying a vector by a scalar k either enlarges or shortens the vector. If  it enlarges the vector and if  it shortens the vector. If k > 0,  the direction of the vector is unchanged; multiplying a vector by k< 0 changes the direction of the vector into the opposite direction.
  • If the initial and terminal points of a vector are (x1, y1) and (x2, y2) then its position vector can be calculated as P = (x2x1, y2y1) and is denoted by

  • Any vector

and