The formula to calculate the Angles of Bisector of an Isosceles Triangle at the Vertex is:
\[ \angle \text{Bisector} = \frac{\angle \text{Vertex}}{2} \]
The Angles of Bisector of an Isosceles Triangle are the angles formed when the bisector of the vertex angle divides it into two equal parts. The Vertex Angle is the angle included by the legs, opposite to the base of the Isosceles Triangle.
Let's assume the following value:
Using the formula:
\[ \angle \text{Bisector} = \frac{0.698131700797601}{2} \approx 0.349065850398801 \]
The Bisector Angle is approximately 0.349065850398801 Radians.
| Vertex Angle (Radians) | Bisector Angle (Radians) |
|---|---|
| 0.6 | 0.300000000000000 |
| 0.65 | 0.325000000000000 |
| 0.7 | 0.350000000000000 |
| 0.75 | 0.375000000000000 |