Let be a strictly increasing sequence of positive integers. Prove that the series , where denotes the least common multiple, converges.
Solution
We have successively:
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Let be a strictly increasing sequence of positive integers. Prove that the series , where denotes the least common multiple, converges.
Solution
We have successively:
Let denote the – th Fibonacci number. Prove that:
Solution
The result follows.
Prove that
Solution
We have successively:
Prove that
Solution
We recall the product identity
Thus,
Let such that . Prove that
Solution
We have successively:
since whenever