1. Let n be an integer. Show that gcd (n², n² + n + 1) = 1. Note: You must justify every step of your proof using a result shown either in this course or in a previous one. Steps without a proper justification will not account for credit. 2. Express the following in base 10. Show all the necessary work to obtain your answer. (a) 12345 (b) 101012 (c) 11111 3. a) Convert the base 10 number 54321 to base 6. Show all the necessary work to obtain your answer. b) Convert the base 10 number 100 to base 2. Show all the necessary work to obtain your answer. 4. 6. For each of the following equations, find all integral solutions or show that it has none. Show all the necessary work to obtain your answer. (a) 3x+4y= 10 (b) 44x 17y: = 9 (c) 60x+9y= 31 (d) 16x + 24y = 44 I y 5. What is the smallest nonzero value of where x and y are integers? Show all the necessary 36 31 work to obtain your answer. 6. Find the prime factorization of the following integers. Show all the necessary work to obtain your answer. (a) 13736 (b) 1728 7. Let a, b, c be integers. Show that if a + b,b+c, and a + c are multiples of 3, then each of a, b, c is a multiple of 3. Note: You must justify every step of your proof using a result shown either in this course or in a previous one. Steps without a proper justification will not account for credit. 8. Let p be a prime, and let a, b be nonzero integers. Suppose pc | c but pe+1|a, and pd | b but pd+1 | b. a) Show that if c

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1. Let n be an integer. Show that gcd (n², n² + n + 1) = 1. Note: You must justify every step of your proof using a result shown either in this course or in a previous one. Steps without a proper justification will not account for credit. 2. Express the following in base 10. Show all the necessary work to obtain your answer. (a) 12345 (b) 101012 (c) 11111 3. a) Convert the base 10 number 54321 to base 6. Show all the necessary work to obtain your answer. b) Convert the base 10 number 100 to base 2. Show all the necessary work to obtain your answer. 4. 6. For each of the following equations, find all integral solutions or show that it has none. Show all the necessary work to obtain your answer. (a) 3x+4y= 10 (b) 44x 17y: = 9 (c) 60x+9y= 31 (d) 16x + 24y = 44 I y 5. What is the smallest nonzero value of where x and y are integers? Show all the necessary 36 31 work to obtain your answer. 6. Find the prime factorization of the following integers. Show all the necessary work to obtain your answer. (a) 13736 (b) 1728 7. Let a, b, c be integers. Show that if a + b,b+c, and a + c are multiples of 3, then each of a, b, c is a multiple of 3. Note: You must justify every step of your proof using a result shown either in this course or in a previous one. Steps without a proper justification will not account for credit.

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8. Let p be a prime, and let a, b be nonzero integers. Suppose pc | c but pe+1|a, and pd | b but pd+1 | b. a) Show that if c<d, then pc | a+b but pe+1+a+b. b) Give an example to show that if c=d, then it is possible that pe+1 | a+b. Note: You must justify every step of your proof using a result shown either in this course or in a previous one. Steps without a proper justification will not account for credit.