Final answer:
To prove that 3 is a primitive root of 7, we need to show that the powers of 3, modulo 7, cycles through all the possible remainders except for 0.
Step-by-step explanation:
To prove that 3 is a primitive root of 7, we need to show that the powers of 3, modulo 7, cycles through all the possible remainders except for 0. Let's calculate the powers of 3 modulo 7:
- 3¹ mod 7 = 3
- 3² mod 7 = 2
- 3³ mod 7 = 6
- 3⁴ mod 7 = 4
- 3⁵ mod 7 = 5
- 3⁶ mod 7 = 1
- 3⁷ mod 7 = 3
- 3⁸ mod 7 = 2
- ...
We observe that the remainders repeat after every 6 powers, covering all the possible remainders except for 0. Therefore, 3 is a primitive root of 7.