Which of the following is equivalent to the statement 17≡5(mod4)17 \equiv 5 \pmod{4}17≡5(mod4)?
17−5=1217 - 5 = 1217−5=12, and 121212 is divisible by 444
171717 and 555 have different remainders when divided by 444
444 divides 555
17=517 = 517=5