Példatár: Give me a problem!

Problem 346 (difficulty: 5/10)

Prove that if \(\displaystyle |a_{n+1} -a_n |\leq 2^{-n}\) for all \(\displaystyle n\), then \(\displaystyle (a_n )\) is convergent.

Subject, section:
Requested difficulty:
Request for a concrete problem:	I want problem no.

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