Question 1141350: Find an equation for the hyperbola with C(2,4), foci F1(2,1) and F2(2,7), and
vertices V1(2,6) and V2(2,2)
Answer by Edwin McCravy(20060)   (Show Source):
You can put this solution on YOUR website! Find an equation for the hyperbola with C(2,4), foci F1(2,1) and F2(2,7), and
vertices V1(2,6) and V2(2,2)
We plot those points:
It's a "vertical" hyperbola, opening up and down, like this:
so its equation is
of the form:
The center (h,k) is C(2,4) so h=2 and k=4, so, substituting:
"a" is the distance from the center to the vertex.
The distance from C(2,4) to V1(2,6) is 2 units and
the distance from C(2,4) to V2(2,2) is also 2 units,
so a=2. So substituting:
"c" is the distance from the center to the focus.
The distance from C(2,4) to F1(2,1) is 3 units and
the distance from C(2,4) to F2(2,7) is also 3 units,
so c=3. So substituting:
We must calculate b using the Pythagorean relation for hyperbolas:
Substituting b²=5
Edwin
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