Answer:
(4,-8) and (4, 12)
Step-by-step explanation:
The equation of the hyperbola given is:
[tex]\frac{(y-2)^2}{64}-\frac{(x-4)^2}{36}=1[/tex]
The general form of this hyperbola would be:
[tex]\frac{y^2}{a^2}-\frac{x^2}{b^2}=1[/tex]
Thus, we can see that:
a^2 = 64
a = 8
and
b^2 = 36
b = 6
The distance from one focus to center is called "c", it goes by formula:
[tex]c^2=a^2+b^2[/tex]
Let's find c:
[tex]c^2=8^2 + 6 ^2\\c^2=100\\c=10[/tex]
This is a vertical hyperbola and the center is found from the x and y's on the numerator:
(y-2)^2 means y = 2
(x-4)^2 = x = 4
Center is (4, 2)
We go 10 units vertically up, so from y = 2 , ten units up makes it y = 12
x = 4 and y = 12
(4,12)
We go 10 units vertically down, so from y =2, ten units down makes it y = -8
x = 4 and y = -8
(4, -8)
Foci coordinates:
(4,12) and (4,-8)
