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Induction (is the devil) help please ;A; (1 Viewer)

tooyoungforthis

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hi everyone,

I was wondering if I could get some help for induction, it's a fairly simple question but I'm having a hard time with it.

1. Prove by M.I that the sum of consecutive odd positive integers is divisible by 4.
(I can't get the equation you start with :( )

and as for inequalities...:frown2:
I don't understand the steps and how it turns out to be an equal sign or how you multiply both sides with the number and it's just a mess >.< can someone please break it down for me?

you can use : 3n >/ 2n + n for all n>/1 as an example

thanks in advance!
 

SpiralFlex

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First question specify how many consecutive integers you are after

Second question

 

tooyoungforthis

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First question specify how many consecutive integers you are after

Second question

the first question didn't have any specification, I got it from my text book and it says just that.

and thank you for the second question! I'm starting to understand it now, I've just got to practice a lot more
(btw, I love your handwriting)
 

phoenix159

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hi everyone,

I was wondering if I could get some help for induction, it's a fairly simple question but I'm having a hard time with it.

1. Prove by M.I that the sum of consecutive odd positive integers is divisible by 4.
(I can't get the equation you start with :( )

and as for inequalities...:frown2:
I don't understand the steps and how it turns out to be an equal sign or how you multiply both sides with the number and it's just a mess >.< can someone please break it down for me?

you can use : 3n >/ 2n + n for all n>/1 as an example

thanks in advance!
There must be something missing in question 1 otherwise it wont work
 

phoenix159

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You can start by finding the sum of consecutive odd integers:

1 + 3 + 5 + ... + (2n - 1)

Sn = n/2 (2a + (n-1)d) = n/2 (2x1 + (n - 1)x2) = n/2 (2 + 2n - 2) = n * n = n2

But this is not always divisible by 4
 

SpiralFlex

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As an exercise try proving the result without mathematical induction
 

SpiralFlex

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The result is for the sum of two consecutive odd integers
 

SpiralFlex

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More generally you may want to see if you can prove the sum of n consecutive odd integers is divisible by n.
 

phoenix159

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More generally you may want to see if you can prove the sum of n consecutive odd integers is divisible by n.
1 + 3 + 5 + ... + (2n + 1) = n/2 (2a + (n-1)d) = n/2(2 + (n-1)2) = n(1 + n - 1) = n^2, which is divisible by n
 

SpiralFlex

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But unfortunately, HSC papers like to get you to prove via induction (which can be tedious). For example a common induction problem is prove that is divisible by 6.

But it can be achieved using one a couple of lines (or less). Equivalent of proving for some integer





 
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Carrotsticks

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But unfortunately, HSC papers like to get you to prove via induction (which can be tedious). For example a common induction problem is prove that is divisible by 6.

But it can be achieved using one a couple of lines (or less). Equivalent of proving for some integer





 

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