Answer:
(y - 3)²/9 - (x - 1)²/27 = 1
Step-by-step explanation:
1. Identify the centre of the hyperbola.
The centre is half-way between the two vertices.
((x₂ + x₁)/2, (y₂ + y₁)/2) = ((1 + 1)/2, (6 + 0)/2) = (2/2, 6/2) = (1, 3)
The centre is at (1, 3).
(1, 3) = (h, k), so
h = 1, k = 3
2. Identify the type of hyperbola.
Plot the vertices, foci, and centre.
We can see from Fig. 1 that we have a vertical hyperbola.
The equation for a vertical hyperbola is
(y - k)²/a² - (x - h)²/b² = 1
3. Identify the value of a
Count from the centre to either vertex.
a = 3
4. Identify the value of c.
Count from the centre to either focus.
c = 6
5. Identify the value of b
a² + b² = c²
3² + b² = 6²
9 + b² = 36
Subtract 9 from each side
b² = 27
Take the square root of each side
b = √27
6. Write the equation for the hyperbola
We now have all the values needed: h, k, a, and b
The equation for the hyperbola is
(y - 3)²/9 - (x - 1)²/27 = 1
The graph of your hyperbola is shown in Fig. 2.
