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by BRG on June 11, 2020

Project Euler Problem 917 – Number Splitting

We define an S-number to be a natural number, \(n\), that is a perfect square and its square root can be obtained by splitting the decimal representation of n into 2 or more numbers then adding the numbers.

For example, 81 is an S-number because \(\sqrt{81} = 8 + 1\).
6724 is an S-number: \(\sqrt{6724} = 6 + 72 + 4\).
8281 is an S-number: \(\sqrt{8281} =8 + 2 + 81 = 82 + 8 + 1\).
9801 is an S-number: \(\sqrt{9801} = 98 + 0 + 1\).

Further we define \(T(N)\) to be the sum of all S numbers \(n ≤ N\).  You are given \(T(10^4) = 41333\).

Find \(T(10^{12})\).

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