prove that n3- n is divisible by 24 for any odd n
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Q: Prove by induction that n3−n is divisible by 24 for all odd positive integers
After proving the first part for n=1
Assume true for some positive integer n=k
ie k3−k=24x where x is an integer
Prove true for n=k+2
ie (k+2)3−(k+2)=24y where y is an integer
=k3+6k2+11k+6
=24x+12k+6k2+6 But how do I get this in the form 24y? Am i supposed to use 2k+1 instead?
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