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7 September, 23:50

If g (n) varies inversely with n and g (n) = 8 when n = 3, find the value of n when g (n) = 6.

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Answers (2)
  1. 8 September, 02:39
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    n = 4 when g (n) = 6

    Step-by-step explanation:

    If g (n) varies inversely with n

    g (n) α 1/n

    g (n) = k/n where k is the constant of proportionality

    if g (n) = 8 when n = 3, then

    8 = k/3

    k = 24

    g (n) = 24/n

    when g (n) = 6

    6 = 24/n

    6n = 24

    n = 24/6

    n = 4
  2. 8 September, 03:22
    0
    4

    Step-by-step explanation:

    g (n) varies inversely with n.

    This can be expressed alternatively as / [g (n) = / frac{k}{n}/] where k is a constant value.

    Given that when n = 3, g (n) = 8.

    This implies, / [8 = / frac{k}{3}/]

    Simplifying the equation to solve for k, k = 8 * 3 = 24

    Now when g (n) = 6, / [g (n) = / frac{k}{n}/]

    /[6 = / frac{24}{n}/]

    Calculating the value of n, / [n = / frac{24}{6}/] = 4

    So the required value of n is 4.
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