Question 756281: write an equation of the ellipse with a vertex at (-8,0), a co-vertex at (0,4), and center at (0,0)
Found 2 solutions by Edwin McCravy, Alan3354:
Answer by Edwin McCravy(20064)   (Show Source):
You can put this solution on YOUR website!
We plot those points, and sketch the ellipse:
  
Count the number of graph units there are between the center (0,0)
and a vertex (-8,0). That's known as the "semi-major" axis, and its
length is represented by the letter " a ". So a = 8. [Incidentally
the ENTIRE major axis is 16 units long, it goes from one vertex (-8,0)
to the other vertex (8,0).]
Count the number of graph units there are between the center (0,0)
and a covertex (0,4). That's known as the "semi-minor" axis, and its
length is represented by the letter " b ". So b = 4. [Incidentally
the ENTIRE minor axis is 8 units long, it goes from one covertex (0,4)
to the other covertex (0,-4).]
The equation of an ellipse that looks like this 
is
    
where (h,k) is the center (0,0) so h=0, k=0, and a=8, b=4
 
 
Edwin
Answer by Alan3354(69443)  (Show Source):
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