\[\large 29x+27 \equiv 6x+51\pmod5\]

Find all integers \(x\) that satisfy the linear congruence above

Each \(x\) can be written as \(x \equiv a \pmod b\) , where \(a\) and \(b\) are positive integers satisfying \( 0 \leq a < b \). Submit your answer as \(a+b\).

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