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Master E

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If (1+x)^n = sigma(r=0-->n) (nCr)(x^r) then show by integration that

sigma (r=0-->n) ((-1)^n)(nCr)/(r+1) = 1/(n+1).

Writing it out might be easier to understand.

I integrated both sides, the LHS is easy, the RHS i can get, but i cant work out what to do after that.

Thanks
 

Trebla

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(1 + x)n = Σ nCr xr
Integrate both sides wrt x
(1 + x)n + 1/(n + 1) = Σ nCr xr + 1/(r + 1) + c
To find c, let x = 0, which gives c = 1/(n + 1)
(1 + x)n + 1/(n + 1) = Σ nCr xr + 1/(r + 1) + 1/(n + 1)
Let x = -1
Σ nCr (-1)r + 1/(r + 1) + 1/(n + 1) = 0
Σ nCr (-1)(-1)r/(r + 1) + 1/(n + 1) = 0
- Σ nCr (-1)r/(r + 1) + 1/(n + 1) = 0
Σ nCr (-1)r/(r + 1) = 1/(n + 1)

I assume you mean (-1)r rather than (-1)n...
 

Master E

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Trebla said:
(1 + x)n = Σ nCr xr
Integrate both sides wrt x
(1 + x)n + 1/(n + 1) = Σ nCr xr + 1/(r + 1) + c
To find c, let x = 0, which gives c = 1/(n + 1)
(1 + x)n + 1/(n + 1) = Σ nCr xr + 1/(r + 1) + 1/(n + 1)
Let x = -1
Σ nCr (-1)r + 1/(r + 1) + 1/(n + 1) = 0
Σ nCr (-1)(-1)r/(r + 1) + 1/(n + 1) = 0
- Σ nCr (-1)r/(r + 1) + 1/(n + 1) = 0
Σ nCr (-1)r/(r + 1) = 1/(n + 1)

I assume you mean (-1)r rather than (-1)n...
That was the problem! Darn i copied the question out wrong.

Thanks for the help anyhow
 

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