In the given figure we can determine the coordinate of point M from the graph, we get:
[tex]M=(\frac{d}{2},\frac{c}{2})[/tex]
We can also determine the coordinates of point N as:
[tex]N=(\frac{a+b}{2},\frac{c}{2})[/tex]
Now, to determine the length of segment MN, we need to subtract the x-coordinate of M from the coordinates of N, we get:
[tex]MN=\frac{a+b}{2}-\frac{d}{2}[/tex]
Subtracting the fractions we get:
[tex]MN=\frac{a+b-d}{2}[/tex]
Now, to obtain the length of AB we need to subtract the x-coordinate of A from the x-coordinate of B.
The coordinates of A are determined from the graph:
[tex]A=(0,0)[/tex]
The coordinates of B are:
[tex]B=(a,0)[/tex]
Therefore, the length of segment AB is:
[tex]AB=a[/tex]
Now we do the same procedure to determine the segment of CD. The coordinates of C are:
[tex]C=(b,c)[/tex]
The coordinates of D are:
[tex]D=(d,c)[/tex]
Therefore, CD is:
[tex]CD=b-d[/tex]
Now, we determine MN as half the sum of the bases. The bases are AB and CD, therefore:
[tex]MN=\frac{1}{2}(a+b-d)[/tex]
Therefore, we have proven that the median of a trapezoid equals half the sum of its bases.
