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4 May, 20:41

Solve using cross multiplication method, ax + by = a^2; bx + ay = b^2

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  1. 4 May, 23:30
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    x=a²+ab+b²/a+b, y=-ab/a+b

    Step-by-step explanation:

    The system of the given equation may b written as:

    ax+by-a²=0

    bx+ay-b²=0

    Here,

    a1=a, b1=b, c1 = - a²

    a2=b, b2=a and c2 = - b²

    By cross multiplication we get

    x/b * (-b²) - (-a²) * a = - y/a * (-b²) - (-a²) * b = 1/a*a-b*b

    x/-b³+a³ = - y/-ab²+a²b = 1/a²-b²

    Now

    x/-b³+a³ = 1/a²-b²

    x=a³-b³/a²-b²

    x = (a-b) (a²+ab+b²) / (a-b) (a+b)

    x=a²+ab+b²/a+b

    And,

    -y/-ab²+a²b = 1/a²-b²

    -y=a²b - ab²/a²-b²

    y=ab²-a²b/a²-b²

    y=ab (b-a) / (a-b) (a+b)

    y = - ab (a-b) / (a-b) (a+b)

    y = - ab/a+b

    Hence x=a²+ab+b²/a+b, y=-ab/a+b ...
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