Hyperbola Calculator

Hyperbola Calculator

How to Use the Hyperbola Calculator

Hyperbola Calculator is a mathematical tool that computes and displays the key properties of a hyperbola—such as its equation, vertices, foci, and asymptotes—based on given values of a (semi-major axis) and b (semi-minor axis).

What is a Hyperbola?

hyperbola is a type of conic section formed by intersecting a plane with a double cone. Unlike ellipses or circles, a hyperbola consists of two disconnected curves (branches) that mirror each other. It’s commonly seen in physics, astronomy, and navigation systems (like GPS).

There are two standard forms:

  1. Horizontal Hyperbola:x2a2−y2b2=1a2x2​−b2y2​=1(Opens left and right)
  2. Vertical Hyperbola:y2a2−x2b2=1a2y2​−b2x2​=1(Opens up and down)

Here:

  • a = distance from center to each vertex.
  • b = related to the slope of asymptotes.
  • c = √(a² + b²) = distance from center to each focus.

How to Use the Calculator

  1. Choose the orientation (Horizontal or Vertical) from the dropdown.
  2. Enter the values of a and b (positive numbers only).
    • Example: a = 5b = 3.
  3. Click “Calculate Properties.”
  4. The calculator will show:
    • Equation of the hyperbola
    • Vertices (points on the hyperbola closest to the center)
    • Foci (points used to define the hyperbola)
    • Asymptotes (diagonal lines the hyperbola approaches but never touches)

Example Calculation

If you input:

  • Orientation: Horizontal
  • a = 5
  • b = 3

The calculator outputs:

  • Equation: x2/25−y2/9=1x2/25−y2/9=1
  • Vertices: (5, 0) and (-5, 0)
  • Foci: (5.83, 0) and (-5.83, 0)
  • Asymptotes: y = ±(3/5)x

This helps you understand the shape and position of the hyperbola.

FAQ: Hyperbola Calculator

Q1: What does the calculator need as input?
A: It requires the values of a and b, which represent the semi-axes of the hyperbola. You also select whether it is horizontal or vertical.

Q2: How do I know if my hyperbola is horizontal or vertical?
A: If the x² term is positive in the equation, it’s horizontal. If the y² term is positive, it’s vertical.

Q3: Why is “c” important?
A: “c” is the distance from the center to each focus, and it defines how “stretched” the hyperbola is. It’s calculated with c=√(a2+b2)c=√(a2+b2).

Q4: Can this calculator plot the hyperbola?
A: No, this version only provides the mathematical properties. However, a graphing extension could be added later.

Q5: Where are hyperbolas used in real life?
A: They appear in satellite navigation, astronomy (planetary orbits), acoustics, and optics (reflective properties of hyperbolic mirrors).