Extensions Page 3c

Page 3c

Using the Standard Equation of a Hyperbola to
Determine the Location of the Focal Points

Remember that when the hyperbola is centered at the origin, the focal points are located either at (0, c) and (0, -c) or at (c, 0) and (-c, 0).
Recall that on the previous page, in the General Derivation of the standard equation section, b satisfied b² = c² - a².
Rearranging this equation we arrive at c² = a² + b².
Solving this for c, we get c = (a² + b²)^½.
We can now use this formula to calulate the location of the focal points.

EXAMPLE 1:
Given the equation x²/60 - y²/40 = 1, what is the location of the focal points?

FIGURE 1

Since the x² term is positive and the y² term is negative, we know that the hyperbola opens to the left and right. This means that the focal points will lie on the x-axis (since it's also centered at the origin).

We see by inspection that a² = 60 and b² = 40. Using this information in the formula defined above, we have:

c = (a² + b²)^½
c = (60 + 40)^½
c = 100^½
c = 10

Thus, the focal points are located at (10, 0) and (-10, 0).