Δ ABC is an isosceles triangle such that AB = AC.
The vertical angle of BAC = 2θ
Triangle is inscribed in the circle with center O and radius a.
Draw the AM perpendicular to BC.
Here, Δ ABC is an isosceles triangle, the circumcenter of the circle will lie on the perpendicular from A to BC.
Suppose O be the circumcenter.
BOC = 2 × 2θ = 4θ (On using central angle theorem)
COM = 2θ (here, Δ OMB and Δ OMC are congruent triangles)
OA = OB = OC = a (radius of the circle)
In the Δ OMC,
CM = asin2θ
OM = acos2θ
BC = 2CM (Perpendicular from the center bisects the chord)
BC = 2asin2θ
Height of the Δ ABC = AM = AO + OM
AM = a + acos2θ
Area of Δ ABC = (1/2) x AM x BC
Differentiate this eqaution with respect to θ
So,
To check the whether which point has a maxima, we have to double differentiate it
So, θ = π/6
Both the value of sin are positive, therefore the entire expression is negative.
Thus, there is a maxima at this point
θ = π/2 will not form a triangle. Thus it is discarded.
So, the maxima the exits at;
θ = π/6
