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Mathematical Induction!!! (1 Viewer)

plshelp

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hey i need help again...:dog:

The question is
Prove this divisibility result, for even n
n3 (cubed) + 2n is divisible by 12
 

mirakon

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1. Prove it for n=1. Im sure u can do this yourself
2. Assume it is true for n=k. Again u can state this i am sure. You should have something like:

k^3+2k=12m where m is some integer

3. Prove it true for n=k+2. This is because n is even (as in the question) and assuming for n=k+1 would mean n is odd. I'm assuming this is where you're having problems? Ok then. You''re aiming to prove

(k+2)^3+2(k+2)= 12xsomething

LHS= (k+2)^3+2(k+2)

= k^3 + 6k^2 +12k +8 +2k +4

=12m + 6k^2+ 12k + 12

now 6=3x2 therefore 6k^2=3(2xk^2) as k^2 is even therefore 2xeven= something divsible by 4 (this should be clear). As such 2k^2=4j where j is random integer

Therefore

=12m +12j +12k +12

=12(m+j+k+1)
= RHS

4. Just state the standard proof statement.
 

random-1006

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1. Prove it for n=1. Im sure u can do this yourself
2. Assume it is true for n=k. Again u can state this i am sure. You should have something like:

k^3+2k=12m where m is some integer

3. Prove it true for n=k+2. This is because n is even (as in the question) and assuming for n=k+1 would mean n is odd. I'm assuming this is where you're having problems? Ok then. You''re aiming to prove

(k+2)^3+2(k+2)= 12xsomething

LHS= (k+2)^3+2(k+2)

= k^3 + 6k^2 +12k +8 +2k +4

=12m + 6k^2+ 12k + 12

now 6=3x2 therefore 6k^2=3(2xk^2) as k^2 is even therefore 2xeven= something divsible by 4 (this should be clear). As such 2k^2=4j where j is random integer

Therefore

=12m +12j +12k +12

=12(m+j+k+1)
= RHS

4. Just state the standard proof statement.

huh havent seen one like this before, i kept thinking it was a typo lol
 

x jiim

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mirakon, wouldn't you start with n=2, since it's for even n?
 

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