SOLUTION: Find the center of hyperbola defined by
(x+3)^/64 - (y+9)^/25 = 1
Algebra.Com
Question 596117: Find the center of hyperbola defined by
(x+3)^/64 - (y+9)^/25 = 1
Answer by jsmallt9(3758) (Show Source): You can put this solution on YOUR website!
The general form for a hyperbola is:
(horizontally-oriented)
or
(vertically-oriented)
The center of the hyperbola, in both cases, is the point (h, k)
Except for the +'s in your numerators, your equation is already in this form. All you have to do is rewrite the additions as equivalent subtractions:
This makes the center: (-3, -9)
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