Run hard@thehsc
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Proof questions that I wanna make sure I got right! (1 Viewer)
- Thread starter Run hard@thehsc
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yanujw
Well-Known Member
8. Suppose the two factors are a, b > root(n)
ab > n, which is a contradiction since ab = n as we define them as a pair of factors to n.
9.
a) n^2 = 4m - 2
n^2 = 2(2m-1)
The RHS is even, implying the LHS is even. For n^2 to be even, n is even.
b) Let n=2p.
4p^2 + 4 = 2
2p^2 +2 = 1
2(p^2 +1) = 1
The LHS is even, while 1 is odd. Hence there is a contradiction and no n satisfies the condition.
ab > n, which is a contradiction since ab = n as we define them as a pair of factors to n.
9.
a) n^2 = 4m - 2
n^2 = 2(2m-1)
The RHS is even, implying the LHS is even. For n^2 to be even, n is even.
b) Let n=2p.
4p^2 + 4 = 2
2p^2 +2 = 1
2(p^2 +1) = 1
The LHS is even, while 1 is odd. Hence there is a contradiction and no n satisfies the condition.
Run hard@thehsc
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Got it! Thank you...
GhoulGhost
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Just a quick note, "For n^2 to be even, n is even." also works for testing whether n is divisible by other integers if the integer itself has square-free factors.