Answer:
x²/23 +y²/144 = 1
Step-by-step explanation:
You want an equation of the ellipse with foci at (0, ±11) and a vertex at (0, 12).
Minor axis
The given vertex is in line with the foci, so represents one end of the major axis. The length of the semi-minor axis will be ...
a = √(b² -f²) . . . . . . where f is the center-to-focus distance
a = √(12² -11²) = √(144 -121) = √23
Equation
The equation is ...
x²/a² +y²/b² = 1
x²/23 +y²/144 = 1
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