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23 November, 16:16

Suppose $x$,$y$, and $z$ form a geometric sequence. if you know that $x+y+z=18$ and $x^2+y^2+z^2=612$, find the value of $y$.

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  1. 23 November, 19:11
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    Because x, y, z form a geometric sequence, therefore the common ratio is

    r = y/x = z/y

    That is,

    y² = xz (1)

    We are given:

    x + y + z = 18

    Therefore

    x + z = 18 - y (2)

    Also,

    x² + y² + z² = 612

    Therefore, from (1), obtain

    x² + z² + xz = 612

    (x + z) ² - xz = 612

    From (1) and (2), obtain

    (18 - y) ² - y² = 612

    324 - 36y + y² - y² = 612

    -36y = 288

    y = - 8

    Answer: y = - 8
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