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Mathematics

Two isosceles triangles have equal vertical angles and their areas are in the ratio 7 : 16. Find the ratio of their corresponding heights.

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Answer

Let their be two isosceles triangles ABC and DEF.

∠A = ∠D (Given, vertical angles are equal)

Since, triangles are isosceles so,

∠B = ∠C = 180A2\dfrac{180 - ∠A}{2} and ∠E = ∠F = 180D2\dfrac{180 - ∠D}{2}.

Since, ∠A = ∠D so, we can say

∠B = ∠E.

Hence, by AA axiom △ABC ~ △DEF.

We know that, the ratio of the areas of two similar triangles is equal to the ratio of the squares of their corresponding altitudes.

Area of △ABCArea of △DEF=(Height of △ABC)2(Height of △DEF)2716=(Height of △ABCHeight of △DEF)2Height of △ABCHeight of △DEF=716Height of △ABCHeight of △DEF=74.\therefore \dfrac{\text{Area of △ABC}}{\text{Area of △DEF}} = \dfrac{(\text{Height of △ABC})^2}{(\text{Height of △DEF})^2} \\[1em] \Rightarrow \dfrac{7}{16} = \Big(\dfrac{\text{Height of △ABC}}{\text{Height of △DEF}}\Big)^2 \\[1em] \Rightarrow \dfrac{\text{Height of △ABC}}{\text{Height of △DEF}} = \sqrt{\dfrac{7}{16}} \\[1em] \Rightarrow \dfrac{\text{Height of △ABC}}{\text{Height of △DEF}} = \dfrac{\sqrt{7}}{4}.

Hence, the ratio of their corresponding heights is 7:4\sqrt{7} : 4.

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