What will be the maximum area of an isosceles triangle inscribed in the ellipse x^2/a^2 + y^2/b^2 = 1 if its vertex at one end of the major axis?(a) 3√3/4 ab sq units(b) 3√3/2 ab sq units(c) √3/2 ab sq units(d) 3/4 ab sq unitsThe question was posed to me in an online quiz.Enquiry is from First Order Derivative topic in division Limits and Derivatives of Mathematics – Class 11

What will be the maximum area of an isosceles triangle inscribed in th

1.	What will be the maximum area of an isosceles triangle inscribed in the ellipse x^2/a^2 + y^2/b^2 = 1 if its vertex at one end of the major axis?(a) 3√3/4 ab sq units(b) 3√3/2 ab sq units(c) √3/2 ab sq units(d) 3/4 ab sq unitsThe question was posed to me in an online quiz.Enquiry is from First Order Derivative topic in division Limits and Derivatives of Mathematics – Class 11
Answer» The correct option is (a) 3√3/4 ab SQ units Easiest explanation: LET A, B, C be the vertices of the isosceles triangle. Let B = (a cosθ, b sinθ) => C – (a cosθ. -b sinθ)(by SYMMETRY). Now, area of a triangle is given by A = ½(BC)(AD) = ½(2b sinθ)(1 + cosθ) => dA/dθ = ab[cosθ(1 + cosθ) – sin^2θ] = ab(1 + cosθ)(2 cosθ – 1) Now, putting dA/dθ = 0, We get, θ = π/3, π Now, for θ = π, triangle ABC is not possible. And, dA/dθ]θ = π/3 < 0, Thus, for θ = π/3, the area of isosceles triangle will be maximum. So, A = 3√3/4 ab sq units.

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