Problem #PRU-98299

Problems Algebra and arithmetic Methods Examples and counterexamples. Constructive proofs

Problem

a) Could an additional \(6\) digits be added to any \(6\)-digit number starting with a \(5\), so that the \(12\)-digit number obtained is a complete square?

b) The same question but for a number starting with a \(1\).

c) Find for each \(n\) the smallest \(k = k (n)\) such that to each \(n\)-digit number you can assign \(k\) more digits so that the resulting \((n + k)\)-digit number is a complete square.