Self Powers

Problem Statement

The series, $1^1 + 2^2 + 3^3 + \cdots + 10^{10} = 10405071317$.

Find the last ten digits of the series, $1^1 + 2^2 + 3^3 + \cdots + k^k$, where $k = 11^N$. Enter your answer without leading zeros.

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You need to submit in the format: "N:problem(N)", possibly with multiple values at once, separated by commas, with $N$ between $1$ and $100$.

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1
hacatu
$g(7)$, $10$ digits 1 month, 2 weeks ago
2
hacatu
$g(100)$, $10$ digits 1 month, 2 weeks ago
3
hacatu
$g(99)$, $10$ digits 1 month, 2 weeks ago
4
hacatu
$g(98)$, $10$ digits 1 month, 2 weeks ago
5
hacatu
$g(94)$, $10$ digits 1 month, 2 weeks ago