Vector is defined as which quantity has both a magnitude and a direction. Non-vector is defined as a quantity that has only a magnitude. Therefore all physical quantities can be divided into two categories. They are vectors and non-vectors. The length, mass, and time are the non-vectors, and the mass, power, and velocity are the vector quantities. Think of the difference between these two types.
Example as a vector quantity. Consider the distance and displacement between two traveling cities shown as the fig. The shortest distance between the two cities is AB. It is only available in a straight line with a direction. It has a direction and a magnitude.
Therefore it is really a vector. The indirect curve, brown-colored in various directions, is a route to the city between A and B. This is a non-vector quantity because its direction is changed by itself. It has only a magnitude.
Expressing of a vector
The diagram above depicts a vector. is the magnitude of the vector . over line represents as a vector?
Adding vectors (Parallelogram Method)
Draw the a and b so that their initial points coincide. Then draw lines to form a complete parallelogram. The resultant of a + b is the diagonal from the initial point “O” to the opposite vertex “C” of the parallelogram.
Adding vectors (Triangle Method)
Draw the vector b after a, placing the initial point of vector b at the terminal point of vector a. Then draw the resultant from the initial point of vector a to the terminal point of vector b. This method is also called the head-to-tail method. You can see the vector a + b is green colored line OC.
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