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Prove that log3(2) is irrational.
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Prove that log3(2) is irrational.

User Navid Rahmani
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1 Answer

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Explanation:

  1. Assume that
    \log _(3)2 =
    (p)/(q) ≥ 0 then p and q are positive integers
  2. So, it must comply with
    3^(p) = 2^(q)
  3. If p and q are positive (≥ 0), then LHS is odd and RHS is even which is a clear contradiction.
  4. This shows that
    \log_(2)3 is irrational.
  5. Hence proved

User HalfBrian
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5.5k points
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