Let p be prime. (a) If a 1 (mod p), show that 1+ a + ...+ aP-1 = 1 (mod p). (b) If a -1 (mod p), show that 1 – a + a? (mod p). – a³ + ...+ aP¬1 = 1

Can you do #4?

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Example 4.4.5. If p = has a solution. The proof is an application of the theorems of Fermat and Lagrange. Write p = 4k +1. By Fermat's Theorem, the equation x4k = 1 (mod p) has Ak solutions in a complete residue system. We can factor a4k – 1 = (22k – 1)(x2k + 1) (mod p). - 1 = 0 (mod p) or a Every root of the left-hand side is either a root of x2k root of r2k. (mod p) has exactly 2k solutions. Therefore, the congruence x2k + 1 = 0 (mod p) has 2k solutions. If a is a root, then (ak)2 = -1 (mod p), so ak is a solution to the congruence x² = -1 (mod p). The assertion of this example has many consequences. It can be used to show that a prime p of the form 4k + 1 can be written as a sum of 2 squares. (See Section 14.4 for a proof.) +1 = 0 (mod p). By Corollary 4.4.3, the congruence x2k –1 = 0 Exercises for Section 4.4 1. Find the four solutions of x = 1 (mod 13). 2. Suppose p is prime and d p - 1. Show that xd - 1 = 0 (mod p) has exactly (d, p – 1) solutions. Conclude that if 4 | p- 1, then x2 = -1 (mod p) has two solutions, and if 4 p- 1, then x2 = -1 (mod p) has no solutions. 3. Suppose p = xk = -1 (mod p) have? 6k + 1 is prime. How many solutions does the congruence 4. Let p be prime. (a) If a 1 (b) If a z -1 (mod p), show that 1 – a + a? - a³ + · . . + aP-1 = 1 (mod p). mod p), show that 1 + a + ...+ aP-1 = 1 (mod p). 5. Let p be an odd prime and let f (x) = (x – 1)(x – 2) . . - (x – (p – 1)) = rP-1 + ap-2xP-2 +...+ a1x + ao.