11 is a good divisor!

A number has 2014 digits in decimal representation, and leaves a remainder 5 when divided by 11.

What is the remainder when the same number formed by reversing it's digits is divided by 11?

Details and Assumptions

\(\bullet\) Number formed by reversing digits of \(12345\) is \(54321\)

\(\bullet\) \(0123\) is a 3-digit number, not \(4\) digit.

This is a part of the set 11≡ awesome (mod remainders)

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