Applications Of Derivatives

To find the condition for which the area of the isosceles triangle is maximum when inscribed in a circle, we need to understand the geometrical properties involved.

Given that an isosceles triangle is inscribed in a circle with radius , and the vertex angle of the triangle is , we denote the vertices of the triangle as , , and with at the vertex angle, such that . Since the triangle is isosceles, . These sides act as the radii of a circle.

The area of triangle can be calculated using the formula for the area of a triangle formed by three points inscribed in a circle with center :


Since and , the area formula becomes:



To maximize the area, we need , which occurs when . Thus, . However, this condition implies that the value of will further depend on the maximum validity for an inscribed circle, which typically lies under the scenario where reaches based on the geometric properties and perimeter optimization of the triangle.

Therefore, comparing , the triangle optimally inscribed provides maximum sway to incorporate the maximum possible area based on geometrical restrictions and holistic radial lengths conundrum.

Hence, the area of the isosceles triangle is maximum when is .