Question: Consider the following statement. If a and b are any odd integers, then a2 + b2 is even. Construct a proof for the statement by
Consider the following statement. If a and b are any odd integers, then a2 + b2 is even. Construct a proof for the statement by selecting sentences from the following scrambled list and putting them in the correct order. Let k = 2(r + s) + 2(r + s) + 1. Then k is an integer because sums and products of integers are integers.Thus, a + b = 2k, where k is an integer.By substitution and algebra, a + b = (2r) + (2s) = 2(2r + 2s).Let k = 2r + 2s. Then k is an integer because sums and products of integers are integers.Suppose a and b are any integers.By substitution and algebra, a + b = (2r + 1) + (2s + 1) = 2[2(r + s) + 2(r + s) + 1].Suppose a and b are any odd integers.By definition of odd integer, a = 2r + 1 and b = 2r + 1 for any integers r and s.By definition of odd integer, a = 2r + 1 and b = 2s + 1 for some integers r and s.Hence a + b is even by definition of even. Proof: 1. ---Select--- 2. ---Select--- 3. ---Select--- 4. ---Select--- 5. ---Select--- 6. ---Select
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