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- ray_serrano
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- Joined: Mon Mar 23, 2009 10:12 am
NP Chapter 2 Page 62 Exercise 17
I can see how we get to k2 = 4n^2 -4n + 1, using FOIL. But how do we factor to k = 4n(n-1)+1?
- twallack
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Re: NP Chapter 2 Page 62 Exercise 17
I thing that's an error in the book. The left side of the equation shouldn't change.
- RonPurewal
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Re: NP Chapter 2 Page 62 Exercise 17
ah yes, that should be k^2, not k.
we just pulled the 4n out of the first two terms. that's a bit of an ingenious transformation - it's probably not something i would think to do, for instance, and i teach the test!
i'll call attention to the error.
--
by the way, if you ever see something like this on the real test, you're probably better off not looking for this sort of mathe-magic.
instead, just do PATTERN RECOGNITION. plug in a bunch of numbers and look for a pattern.
if k = 2n - 1, then the first k's that come to mind are 1, 3, 5, 7, and 9.
k = 1 --> k^2 = 1, remainder 1
k = 3 --> k^2 = 9, remainder 1
k = 5 --> k^2 = 25, remainder 1
k = 7 --> k^2 = 49, remainder 1
k = 9 --> k^2 = 81, remainder 1
the pattern is clear.
we just pulled the 4n out of the first two terms. that's a bit of an ingenious transformation - it's probably not something i would think to do, for instance, and i teach the test!
i'll call attention to the error.
--
by the way, if you ever see something like this on the real test, you're probably better off not looking for this sort of mathe-magic.
instead, just do PATTERN RECOGNITION. plug in a bunch of numbers and look for a pattern.
if k = 2n - 1, then the first k's that come to mind are 1, 3, 5, 7, and 9.
k = 1 --> k^2 = 1, remainder 1
k = 3 --> k^2 = 9, remainder 1
k = 5 --> k^2 = 25, remainder 1
k = 7 --> k^2 = 49, remainder 1
k = 9 --> k^2 = 81, remainder 1
the pattern is clear.
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