Solve for xxx in the congruence x+5≡2(mod6)x + 5 \equiv 2 \pmod 6x+5≡2(mod6).
x≡3(mod6)x \equiv 3 \pmod 6x≡3(mod6)
x≡1(mod6)x \equiv 1 \pmod 6x≡1(mod6)
x≡4(mod6)x \equiv 4 \pmod 6x≡4(mod6)
x≡5(mod6)x \equiv 5 \pmod 6x≡5(mod6)