Binomial Q (1 Viewer)

azureus88

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need help with 2 questions:

1. By considering [maths]1+\binom{n}{1}x+\binom{n}{2}x^2+...+\binom{n}{n}x^n=(1+x)^n[/maths], show that [maths]1-\frac{1}{2}\binom{n}{1}+\frac{1}{3}\binom{n}{2}-...+(-1)^n\frac{1}{n+1}\binom{n}{n}=\frac{1}{n+1}[/maths]

2. Prove that [maths]1+\binom{10}{2}3^2+\binom{10}{4}3^4+\binom{10}{6}3^6+\binom{10}{8}3^8+3^{10}=2^9(2^{10}+1)[/maths]

is it just me or is the first question sorta screwd up.
 

azureus88

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lol, so any luck with the question? the first one seems like integration but cant seem to sub in nythin... as for the 2nd one, i got up to (1+3)^10 = 2^20 but dont no what to do with the powers of 1,3,5,7,9
 
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azureus88

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you dont have to give me the full solution. just explain how you got there. i think i'll manage.
 

lolokay

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for the first one, when you integrated did you remember the constant of integration?
 

lolokay

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for the second, you just have to figure out a way that you could get those odd powers to somehow cancel out. (looking at the RHS may give you an idea of something to try)
 

addikaye03

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need help with 2 questions:

1. By considering [maths]1+\binom{n}{1}x+\binom{n}{2}x^2+...+\binom{n}{n}x^n=(1+x)^n[/maths], show that [maths]1-\frac{1}{2}\binom{n}{1}+\frac{1}{3}\binom{n}{2}-...+(-1)^n\frac{1}{n+1}\binom{n}{n}=\frac{1}{n+1}[/maths]

2. Prove that [maths]1+\binom{10}{2}3^2+\binom{10}{4}3^4+\binom{10}{6}3^6+\binom{10}{8}3^8+3^{10}=2^9(2^{10}+1)[/maths]

is it just me or is the first question sorta screwd up.
(1+x)^n=nCo+nC1(x)+nC2(x^2)+nC3(x^3)+...+nCn(x^n)

integrate [(1+x)^n+1]/n+1=nCo(x)+(1/2)nC1(x^2)+(1/3)nC2(x^3)+(1/4)nC3(x^4)+...+(1/n+1)nCn(x^n)+C

Sub in x=-1, then rearrange.

P.S: ill do the rest if u dont get it from there. Basically [(1+x)^n+1/]/n+1 becomes 0 then u rearrange etc.
 

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