Question 566134: In Rhombus ADBC, point A is (6,13) on the coordinate plane, and point B is (13,6) Find the slope-intercept equation of diagonal CD in the rhombus.
Answer by Edwin McCravy(20086)   (Show Source):
You can put this solution on YOUR website!
The rhombus could look like any of these, even the square on the right
(a square is a rhombus). But regardless, the diagonal CD that goes up to
the right is always a segment of the same (green) line, and the green
line is always perpendicular to the red diagonal, because the diagonals
of a rhombus are perpendicular bisectors of each other.
  
We first find the slope of the red diagonal:
Slope formula
m =  with (x1, y1) = (6,13) and (x2, y2) = (13,6)
m =  =  = -1
The slope of the green line will have the slope that is formed by
inverting  as  or -1 and changing the sign to +1
So the slope of the desired green line is +1.
Now we need a point that it goes through. Since the diagonals of any
parallelogram bisect each other, we must find the midpoint of the red
diagonal.
Midpoint formula:
Midpoint = 
Midpoint = 
Midpoint = 
Now we use the point-slope formula:
y - y1 = m(x - x1)
y -  = 1(x - )
y - = x -
y = x
So that's the answer, the equation of the green line.
Edwin
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