The formula to calculate the Conjugate Axis of a Hyperbola is:
\[ 2b = 2 \cdot b \]
The Conjugate Axis of a Hyperbola is the line through the center and perpendicular to the transverse axis with the length of the chord of the circle passing through the foci and touching the hyperbola at the vertex. The Semi Conjugate Axis of a Hyperbola is half of the tangent from any of the vertices of the hyperbola and chord to the circle passing through the foci and centered at the center of the hyperbola.
Let's assume the following value:
Using the formula:
\[ 2b = 2 \cdot 12 = 24 \]
The Conjugate Axis of the Hyperbola is 24 meters.
| Semi Conjugate Axis (meters) | Conjugate Axis (meters) |
|---|---|
| 11 | 22.000000000000000 |
| 11.5 | 23.000000000000000 |
| 12 | 24.000000000000000 |
| 12.5 | 25.000000000000000 |
| 13 | 26.000000000000000 |