Well, allow me to carefully and considerately correct you then.
Imagine you are at the intersection of a two-by-two grid. If every square is expanding uniformly (maybe, one unit/second), then the edges of the grid recede from you at equal rates.
However, if you add an row of squares to the top (now 2x3) but remain in your current position (not the center), then that row is moving away, firstly at one unit/second from the original two-by-two grid, but now this row is expanding also! So the farthest edge is now moving away from you at two units/second!
Allow me to try to diagram it using some simply arrow (so I don't have to link a bunch of pictures).
Let's imagine that arrows expand at the rate of "one hyphen/per line." That is to say, that every type I type a new line, every arrow will expand by one hyphen. We can imagine that each arrow is a "lightyear" or some other unit of distance in the universe. Let's start with a symmetrical example (where we are at the center of the arrows) by imagining that we are located in a univser that has five bodies: the '#', the '$', the '%', the '*', and us. We are located at the big 'U'.
#<- <- $<- U ->% -> ->*
#<-- <-- $<-- U -->% --> -->*
#<--- <--- $<--- U --->% ---> --->*
#<---- <---- $<---- U ---->% ----> ---->*
The distance between "U" (which stands for Us!) and the '$' or the '%' increases by "one hyphen/per line." Since they are an equal distance from us on both sides, they appear to be moving away at the same rate.
The distance between us and the '#' or the '*' increases by "three hyphens/per line." Since they are an equal distance from us on both sides, they appear to be moving away at the same rate. Notice that the distance between the '*' and the '%' is increasing by "two hyphens/per line. This is also the rate at which the '%' and the '$' a re moving away from each other.
So, if we were in the the place of the '%', we wouldn't see the edges moving away at the same rate. The '#' would move away at an amazing "four hyphens/per line"! So we can conclude, that things seem to recede equally on all sides only if you are in the middle of the expanding medium.
(The wild card here, is that if something moves away from you at faster than the speed of light because of aggregated expansion, then you don't get to see it.)