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I'm finding myself getting back into math related stuff for the first time in a while. So please be patient with me.

How does $\frac{(n-i)(n-i+1)}{2}$ expand out to:

$\frac{n^2 - (2i - 1)n - i + i^2}{2}$

If you could show me step by step, I would really appreciate it.

Also, I apologise, but I really didn't know what to tag this with.

  • 2
    Retagged as (algebra-precalculus).2012-08-02

3 Answers 3

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We use the distributive property: $(a+b)c=ac+bc$ and $a(b+c)=ab+ac$.

Step by step, this gives us that

$\frac{(n-i)(n-i+1)}{2}= \frac{n(n-i+1)-i(n-i+1)}{2}$

$\frac{(n-i)(n-i+1)}{2}= \frac{n^2-ni+n-ni+i^2-i}{2}$

$\frac{(n-i)(n-i+1)}{2}= \frac{n^2-2ni+n-i^2-i}{2}$

Now, grouping $n-2ni = -(2i-1)n$, we get that

$\frac{(n-i)(n-i+1)}{2}= \frac{n^2-(2i-1)n-i^2-i}{2}$

  • 0
    You're welcome. Glad I could help.2012-08-02
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$(n-i)(n-i+1)=n(n-i+1)-i(n-i+1)=nn-ni+n-in+ii-i=n^2+(-i+1-i)n+i^2-i=n^2+(-2i+1)n+i^2-i$

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$(n-i)(n-i+1) = (n-i)n - (n-i)i + (n-i)$ $= n^2 - ni - ni + i^2 + n - i = n^2 - 2ni + n - i = n^2 - n(2i + 1) - i$