to show that the numbers in question are incongruent modulo n.] 11. Verify that 0, 1, 2, 22, 23, ..., 2° form a complete set of residues modulo 11, but that 0, 12, 22, 32,.. 12. Prove the following 102 do not.

11 . Short and simplified.

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18. If a =b (mod n1) and a =c (mod n2), prove that b =c (mod n), where the integer (a) 7|52n +3-2 5n –2 (b) 13|3"+2 + 42n+1. (c) 27|25n+1 + 5n+2_ (d) 43 6+2 +72n+1. 7. For n > 1, show that 4.3 One spec hear to in (-13)"+1 = (-13)" + (-13)"- (mod 181) sys inte [Hint: Notice that (-13)2 = -13 +1 (mod 181); use induction on n.] 8. Prove the assertions below: (a) If a is an odd integer, then a? = 1 (mod 8). (b) For any integer a, a³ = 0, 1, or 6 (mod 7). (c) For any integer a, a* = 0 or 1 (mod 5). (d) If the integer a is not divisible by 2 or 3, then a2 = 1 (mod 24). 9. If p is a prime satisfying n < p < 2n, show that th (:)- = 0 (mod p) 10. If a1, a2, ..., an is a complete set of residues modulo n and gcd(a, n) = 1, prove that ad¡, aa2, . , aa, is also a complete set of residues modulo n. [Hint: It suffices to show that the numbers in question are incongruent modulo n.] 11. Verify that 0, 1, 2, 2², 2³,..., 2º form a complete set of residues modulo 11, but that 0, 12, 22, 3²,.., 10² do not. 12. Prove the following statements: (a) If gcd(a, n) = 1, then the integers c, c+a, c+ 2a, c + 3a, ... , c + (n – 1)a form a complete set of residues modulo n for any c. (b) Any n consecutive integers form a complete set of residues modulo n. [Hint: Use part (a).] (c) The product of any set of n consecutive integers is divisible by n. 13. Verify that if a = b (mod nj) and a = b (mod n2), then a = b (mod n), where the integer n = lcm(n1, n2). Hence, whenever n¡ and n2 are relatively prime, a = b (mod n¡nɔ). 14. Give an example to show that a = b* (mod n) and k = j (mod n) need not imply that ai = bi (mod n). 15. Establish that if a is an odd integer, then for any n > 1 a2" = 1 (mod 2"+2) [Hint: Proceed by induction on n.] 16. Use the theory of congruences to verify that 89| 244 1 97 | 248 1 and 17. Prove that whenever ab = cd (mod n) and b = d (mod n), with gcd(b, n) = 1. then a =c (mod n). n = gcd(n1, n2).