Prove that the largest isosceles triangle that can be drawn in a circle, is an equilateral triangle?

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Prove that the largest isosceles triangle that can be drawn in a circle, is an equilateral triangle?

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Answer 1 · 2017-03-19T15:21:05

Please see below.

Explanation:

Let their be an isosceles triangle ABC inscribed in a circle as shown, in which equal sides $A C$ $AC$ and $B C$ $BC$ subtend an angle $x$ $x$ at the center. It is apparent that side $A B$ $AB$ subtends an angle $360^{0} - x$ $360^0-x$ at the center (as shown). Note that for equilateral triangles all these angles will be $\frac{2 π}{3}$ $(2pi)/3$ .

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As the area of the triangle portion subtended by an angle $x$ $x$ is $\frac{R^{2}}{2} sin x$ $R^2/2sinx$ ,

the complete area of triangle ABC is

$A = \frac{R^{2}}{2} (sin x + sin x + sin (360 - 2 x)$ $A=R^2/2(sinx+sinx+sin(360-2x)$

= $\frac{R^{2}}{2} (2 sin x - sin 2 x)$ $R^2/2(2sinx-sin2x)$

= $R^{2} (sin x - sin x cos x)$ $R^2(sinx-sinxcosx)$

= $R^{2} sin x (1 - cos x)$ $R^2sinx(1-cosx)$

For maximization we should have $\frac{d A}{d x} = 0$ $(dA)/(dx)=0$

i.e. $R^{2} (cos x (1 - cos x) + sin x \times sin x) = 0$ $R^2(cosx(1-cosx)+sinx xx sinx)=0$

or $cos x - {cos}^{2} x + 1 - {cos}^{2} x = 0$ $cosx-cos^2x+1-cos^2x=0$

or $2 {cos}^{2} x - cos x - 1 = 0$ $2cos^2x-cosx-1=0$

or $2 {cos}^{2} x - 2 cos x + cos x - 1 = 0$ $2cos^2x-2cosx+cosx-1=0$

or $2 cos x (cos x - 1) + 1 (cos x - 1) = 0$ $2cosx(cosx-1)+1(cosx-1)=0$

or $(2 cos x + 1) (cos x - 1) = 0$ $(2cosx+1)(cosx-1)=0$

Hence $cos x = - \frac{1}{2}$ $cosx=-1/2$ or $cos x = 1$ $cosx=1$

i.e. $x = \frac{2 π}{3}$ $x=(2pi)/3$ or $x = 0$ $x=0$

But for a triangle $x \neq 0$ $x!=0$

hence $x = \frac{2 π}{3}$ $x=(2pi)/3$

and hence for maximum area triangle must be equilateral.

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Prove that the largest isosceles triangle that can be drawn in a circle, is an equilateral triangle?

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Explanation:

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