Induction Question (1 Viewer)

Valentino25 · Sep 7, 2012

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 · Sep 7, 2012

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

nightweaver066 · Sep 7, 2012

Do you mean divisible by 3 and prove for $n \geq 2$ ?

seanieg89 · Sep 7, 2012

That isn't true either.

nightweaver066 · Sep 7, 2012

seanieg89 said:
That isn't true either.

lol right. Checked wrongly. Will just wait for OP

Valentino25 · Sep 8, 2012

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

Timske · Sep 8, 2012

Valentino25 said:
Damn it. I meant n⁵-n divisible by 30.
D'oh. I have no idea why i put squared :|

Prove true for n=2

barbernator · Sep 8, 2012

ok ill latex up solution

Trebla · Sep 8, 2012

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)

asianese · Sep 9, 2012

This is my go

$Assume true for n=k$\\k^5-k=30M, $ some integer M $\\$Try n=k+1$\\$RTP:$ (k+1)^5-(k+1)=30J, $ some integer J$\\ \begin{align*}LHS&=(k+1)((k+1)^4-1)\\&=(k+1)((k+1)^2-1)((k+1)^2+1)\\&=(k+1)k(k+2)(k^2+2k+2)\\&=k(k+1)(k+2)((k^2+1)+2k+1)\\&=k(k+1)(k+2)(k^2+1)+k(k+1)(k+2)(2k+1)\\&=k(k+1)(k^2+1)((k-1)+3)+k(k+1)(k+2)(2k+1)\\&=k(k+1)(k^2+1)(k-1)+3k(k+1)(k^2+1)+k(k+1)(k+2)(2k+1)\end{align*}\\$By assumption,$\\k(k^2+1)(k+1)(k-1)=30M\\\therefore LHS=30M+3k(k+1)(k^2+1)+k(k+1)(k+2)(2k+1)\\ $same result as trebla!$

nightweaver066 · Sep 9, 2012

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?

$k^5 - k = k(k + 1)(k - 1)(k^2 + 1)$

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

D94 · Sep 9, 2012

nightweaver066 said:
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?

$k^5 - k = k(k + 1)(k - 1)(k^2 + 1)$

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.

Induction Question (1 Viewer)

Valentino25

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