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Show that if n is an integer and n^3 + 5 is odd then n is even
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Show that if n is an integer and n^3 + 5 is odd then n is even

User Sandro Palmieri
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If n is odd then its cube is also odd because odd times odd is odd. When we add 5, an odd number, we get an even number.
If n is even, its cube is also even so adding an odd number makes the sum odd. So if the expression is odd, n must be even.
User Peter Shaburov
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