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13 April, 12:42

How many different numbers between 1/1000 and 1000 can be written either as a power of 2 or as a power of 3, where the exponent is an integer?

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Answers (2)
  1. 13 April, 13:40
    0
    FUN Q!

    look for 1/1000 < x < 1000 where x=2^n, n must be an integer

    taking log on the inequalities

    log1/1000 < logx < log1000

    -3 < logx < 3

    take log on x=2^n

    logx=log (2^n) = nlog2=0.301n

    substituting

    -3 < 0.301n < 3

    -9.9658 < n < 9.9658

    n must be an integer: - 9, - 8, ... 0, 1, ... 9

    ans is 19

    u can repeat the same with log (3)
  2. 13 April, 16:30
    0
    following same reasoning as the above ans, log (1/1000) < log (3^n) < log (1000)

    -3 < n*log3 < 3

    -3 < 0.48n < 3

    -6.3 < n < 6.3

    n can be - 6,-5, ... 5,6

    total of 13 possible numbers for 3^n
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