When we translate a shape on the plane we move it a certain quantity in a certain direction. Vector V is a single arrow which represents all the arrows indicating the magnitude and direction of each of the points of the shape being transformed. If we take one of these arrows, whose origin is at the origin of the axes, and go as far as the coordinates (x,y) at the end of the vector, we get a set of coordinates known as the vector coordinates.

All the arrows which are parallel to this one and go in the same direction are said to be equivalent (or equipollent) to the first arrow. We can see all the arrows associated with the vector (Vx,Vy) in the following Descartes window. The coordinates of the origin and end point of the respective arrows are different but the vector coordinates are always the same.

2.- Draw the vector (-3,-2) in your exercise book and draw four equivalent vectors with their origins in each of the four quadrants.

3.- Do the same thing for the following vectors (4,-3), (-5,3) and (5,2).

Use the Descartes window on the left to help you work out vector coordinates. Random vectors appear each time you click on the Init button. 

The sum of the given vectors U and V is known as vector S, whose coordinates are the sum of the coordinates of the other two vectors.

6.- Work out the sum of the vectors U=(5,2) and V=(1,3). Find the coordinates of the sum vector and draw it in your exercise book. Compare the results you get with those given on the Descartes window.

7.- Repeat the exercise with the following vectors: U=(-2,3) and V=(2,-3).

8.- Two vectors are opposite if their sum is the vector (0,0). What are the coordinates of the vector opposite the vector U=(2,-3)?

9.- What is the connection between the coordinates of a vector and its opposite vector?