Using "log(2) is irrational", prove next statement. For any integer number m, there does not exist maximum or minimum for addend(ex: 0.xxxx) of log(2^m).

sublimnes9

sublimnes9

Answered question

2022-08-08

Using "log(2) is irrational", prove:
For any integer number m, there does not exist maximum or minimum of log(2^m).

Answer & Explanation

Malcolm Good

Malcolm Good

Beginner2022-08-09Added 14 answers

Step 1
log(2) is irrational and using property of log:
log ( 2 m ) = m log ( 2 )
Step 2
For irrational value we cannot reach at any maximum or minimum value.
Hence log ( 2 m ) has no maximum or minimum value.

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