Induction Question (1 Viewer)

Valentino25

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Prove by mathematical induction that n2-n is divisible by 30.
How would you go about this?
Prove n=2
Then assume n=k
Then n=k+1
Then expand and manipulate? Because that way it becomes rather large... or is there a trick i'm missing?
It's probably something obvious staring me right in the face haha.
 

deswa1

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Can you check the question? This doesn't work for n=1,2,3,4,5,7,8...
 

Valentino25

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Damn it. I meant n5-n divisible by 30.
D'oh. I have no idea why i put squared :|
 

Trebla

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What I've got is that the expression for n = k + 1 reduces to
30M + 5k(k + 1)(k2 + k + 1)
and you will need to show that k(k + 1)(k2 + k + 1) is divisible by 6 (perhaps by induction as well)
 

nightweaver066

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Are you allowed to just explain why its divisible by 2 (without induction), then prove its divisible by 15 by induction to prove its divisible by 30?



There are two consecutive numbers here so it must be divisible by 2.
 
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D94

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Are you allowed to just explain why its divisible by 2 (without induction), then prove its divisible by 15 by induction to prove its divisible by 30?



There are two consecutive numbers here so it must be divisible by 2.
Likewise question with the number '3'. Any 3 consecutive numbers must contain a number divisible by 3. So, k(k + 1)(k - 1) are 3 consecutive numbers, so really, if this is possible, then all we need to do is prove it's divisible by 5, which is more straightforward.
 

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