Plane/Vector space/Intuitive/Example
Let be a "plane“ with a fixed "origin“ . We identify a point with the connecting vector (the arrow from to ). In this situation, we can introduce an intuitive coordinate-free vector addition and a coordinate-free scalar multiplication. Two vectors and are added together by constructing the parallelogram of these vectors. The result of the addition is the corner of the parallelogram which lies in opposition to . In this construction, we have to draw a line parallel to through and a line parallel to through . The intersection point is the point sought after. An accompanying idea is that we move the vector in a parallel way so that the new starting point of becomes the ending point of .
In order to describe the multiplication of a vector with a scalar , this number has to be given on a line that is also marked with a zero point and a unit point . This line lies somewhere in the plane. We move this line (by translating and rotating) in such a way that becomes , and we avoid that the line is identical with the line given by (which we call ).
Now we connect and with a line , and we draw the line parallel to through . The intersecting point of and is .
These considerations can also be done in higher dimensions, but everything takes place already in the plane spanned by these vectors.