Question 1037746: E is the ellipse with foci at (4,−2) and (4,8) and whose major axis has length 20.
Answer by KMST(5328)   (Show Source):
You can put this solution on YOUR website! So, that is E, but what is the question?
Write the equation?
Locate vertices and co-vertices?
graph?
Both foci are on the vertical line  ,
so this is an ellipse with foci and vertices on the vertical major axis .
The center is the midpoint of the segment connecting the foci.
That is point (4,3), with coordinates
 and 
the averages of the foci coordinates.
The focal distance,  , is the distance from one focus to the center:
 .
Since the major axis has length  ,
the semi-major axis is  .
Since the major axis is vertical, the vertices of the ellipse are  units above and below center (4,3), at (4,-7) and (4,13).
The semi-minor axis,  , can be calculated using the relation
 .
100-9=b^2}}}
The equation of an ellipse with major axis parallel to the y-axis,
center at point (h,k), is
In this case, with  ,
the equation is
 .
The co-vertices are on the horizontal minor axis,
a distance  to the left and rihjt of center (4,3),
at    and  .
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