Differential Calculus: center, vertices, foci of the ellipse: 16x² + 25y² - 160x - 200y + 400 = 0

This is not really calculus. The question might have been answered more promptly, if asked in the algebra section. You also had a fair chance of an answer in the algebra . com website.
16x² +25y² -160x - 200y + 400 = 0
16x² -160x+25y² - 200y = - 400
16(x² -10x)+25(y² - 8y) = - 400
16(x² -10x)+16(25) +25(y² - 8y) +25(16)= - 400+16(25)+25(16)
16(x² -10x+25)+25(y² - 8y+16) = 400
16(x-5)²+25(y-4)² = 400
16(x-5)²/400+25(y-4)²/400 = 1
(x-5)²/25+(y-4)²/16 = 1
(x-5)²/5²+(y-4)²/4² = 1
You can see that the last equation above represents an ellipse
centered at (5,4),
with horizontal major axis,
a semi-major axis a=5 ,
and a semi-minor axis b=4 .
That means that the vertices, at the ends of the major axis, are
(5-5,4) =(0,4) and (5+5,4) = (10,4) .
The co-vertices, at the end of the minor axis, are
(5,4-4) = (5,0) and (5,4+4) = (5,8) .
The foci are on the major axis, between the center and the vertices,
at (5-c,4) and (5+c,4) .
All that is left to do is find the focal distance, c .
For that you may remember that in an ellipse a² = b² + c² ,
or you may remember the definition of ellipse, and deduce the formula yourself.
In this case, substituting the values found for a and b,
5² = 4² + c² , or
25 = 16 + c² ---> c² = 25-16 = 9 ---> c = 3 .
Then, the foci are at
(5-3,4) = (2,4) and (5+3,4) = (8,4) .