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Rajan@2021
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In a cyclic quadrilateral ABCD, ∠A=(2x+4), ∠B=(y+3), ∠C=(2y+10), ∠D=(4x−5). Find the four angles.

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An important question from linear equations in two variables as it was already asked in various examinations in which we have been asked to find the angles of a cyclic quadrilateral ABCD if it is given that in a cyclic quadrilateral ABCDA=(2x+4),B=(y+3),C=(2y+10),D=(4x5).

Kindly solve the above problem by using the properties of linear equations in two variables

RS Aggarwal, Class 10, chapter 3E, question no 53

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1 Answer

  1. Let ABCD be a cyclic quadrilateral.
    A=2x+4,B=y+3,C=2y+10,D=4x5
    In cyclic quadrilateral the sum of the opposite angles in 180°. Therefore,
    A+C=180°
    2x+4+2y+10=180°
    2x+2y=166°
    x+y=83°1
    B+D=180°
    y+3+4x5=180°
    4x+y=182°2
    Solving 1 and 2, we get
    4x+yxy=182°83°
    3x=99°
    x=33°
    33°+y=83°
    y=83°33°
          =50°
    A=2×33°+4=70°,
    B=50°+3=53°
    C=2×50°+10=110°,
    D=4×33°5=127°

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