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  •  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
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Page 1:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 2:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 3:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 4:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 5:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 6:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 7:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the
Page 8:  · 9 Prove algebraically that the sum of the squares of any 2 even positive integers is always a multiple of 4. (Total for question 9 is 2 marks) 10 Prove algebraically that the

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