Hello I am stuck on a homework problem for the question of trying to prove that for any integer n,n^2 +5 is not divisible by 4. I looked at a step by step guide and i'm confused by the answer.

The step by step solution resulted in 2 cases with even resulting in

n^2 + 5 = 4m+1 for n is even as proof that n^2 + 5 is not divisible by 4. Shouldn’t the 4m indicate that it is divisible? Thank you I am somewhat confused by this math concept.

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### Explanation of Solution #### Given information: Any integer \( n \). #### Formula used: - \( x \) is even if and only if there exists an integer \( k \) such that \( x = 2k \). - \( x \) is odd if and only if there exists an integer \( k \) such that \( x = 2k + 1 \). #### Proof: Suppose integer \( n \). We divide into cases accordingly: #### Case 1: \( n \) is even. If \( n \) is even, then \( n \) is divisible by 2. So, \( n = 2k \), where \( k \) is any integer. When \( n \) is divisible by 2, then \( n^2 \) is also divisible by 2. \[ n^2 + 5 = (2k)^2 + 5 \] \[ n^2 + 5 = 4k^2 + 5 = 4k^2 + 4 + 1 = 4(k^2 + 1) + 1 \] let \( k^2 + 1 = m \) \[ n^2 + 5 = 4m + 1 \] When \( n \) is even, we can see that \( n^2 + 5 \) is not divisible by 4. #### Case 2: \( n \) is odd By the definition of odd, for integer \( k \) such that, \[ n = 2k + 1 \] \[ n^2 + 5 = (2k + 1)^2 + 5 \] \[ n^2 + 5 = 4k^2 + 4k + 1 + 5 = 4k^2 + 4k + 6 = 4k^2 + 4k + 4 + 2 = 4(k^2 + k + 1) + 2 \] let \( m = k^2 + k + 1 \) \[ n^2 + 5 = 4m + 2 \] When \( n \) is odd, we can see that \( n^2 + 5 \) is not divisible by 4. Hence for any integer \( n \), \( n^2