Sequences and series question (1 Viewer)

sinophile · Feb 28, 2009

A) Find A and B such that 1/(x-1)x = A/(x-1) + B/x

B) Let Sn= 1/(1x2) + 1/(2x3) + 1/(3x4) +...+ 1/(n-1)n.
Show that Sn=1-1/n

C) Hence or otherwise evaluate
infinity
(SIGMA) 1/(n-1)n
n=2

lyounamu · Feb 28, 2009

sinophile said:
A) Find A and B such that 1/(x-1)x = A/(x-1) + B/x

B) Let Sn= 1/(1x2) + 1/(2x3) + 1/(3x4) +...+ 1/(n-1)n.
Show that Sn=1-1/n

C) Hence or otherwise evaluate
infinity
(SIGMA) 1/(n-1)n
n=2

a)

1/((x-1)x = Ax/((x-1)x) + B(x-1)/((x-1)x)
1 = Ax + B(x-1)
1 = Ax + Bx - B
therefore, A+B = 0 and -B = 1
B = -1 and A = 1

b)

sinophile · Feb 28, 2009

lyounamu said:
a)

1/((x-1)x = Ax/((x-1)x) + B(x-1)/((x-1)x)
1 = Ax + B(x-1)
1 = Ax + Bx - B
therefore, A+B = 0 and -B = 1
B = -1 and A = 1

b)

b?

lyounamu · Feb 28, 2009

sinophile said:
b?

doing it now

hm..I cannot find any special relationship...

c)

Sn = 1-1/n
n -> infinity

Sn = 1.

Trebla · Feb 28, 2009

sinophile said:
A) Find A and B such that 1/(x-1)x = A/(x-1) + B/x

B) Let Sn= 1/(1x2) + 1/(2x3) + 1/(3x4) +...+ 1/(n-1)n.
Show that Sn=1-1/n

C) Hence or otherwise evaluate
infinity
(SIGMA) 1/(n-1)n
n=2

b)
$$Using $\dfrac{1}{(x-1)x} = \dfrac{1}{x-1}-\dfrac{1}{x}\\S_n = \dfrac{1}{1\times 2} + \dfrac{1}{2\times 3} + \dfrac{1}{3\times 4}.... + \dfrac{1}{(n-1)\times n}\\= \left (\dfrac{1}{1} - \dfrac{1}{2}\right ) + \left (\dfrac{1}{2} - \dfrac{1}{3}\right ) + \left (\dfrac{1}{3} - \dfrac{1}{4}\right )..... + \left (\dfrac{1}{n-1} - \dfrac{1}{n}\right )\\=1 + \left (\dfrac{1}{2}-\dfrac{1}{2}\right ) + \left (\dfrac{1}{3} - \dfrac{1}{3}\right ) + ..... + \left (\dfrac{1}{n-1} - \dfrac{1}{n-1}\right )-\dfrac{1}{n}\\= 1 - \dfrac{1}{n}$

lyounamu · Feb 28, 2009

Trebla said:
b)
$$Using $\dfrac{1}{(x-1)x} = \dfrac{1}{x-1}-\dfrac{1}{x}\\S_n = \dfrac{1}{1\times 2} + \dfrac{1}{2\times 3} + \dfrac{1}{3\times 4}.... + \dfrac{1}{(n-1)\times n}\\= \left (\dfrac{1}{1} - \dfrac{1}{2}\right ) + \left (\dfrac{1}{2} - \dfrac{1}{3}\right ) + \left (\dfrac{1}{3} - \dfrac{1}{4}\right )..... + \left (\dfrac{1}{n-1} - \dfrac{1}{n}\right )\\=1 + \left (\dfrac{1}{2}-\dfrac{1}{2}\right ) + \left (\dfrac{1}{3} - \dfrac{1}{3}\right ) + ..... + \left (\dfrac{1}{n-1} - \dfrac{1}{n-1}\right )-\dfrac{1}{n}\\= 1 - \dfrac{1}{n}$

That question is stupid then.

You cannot really use 2 unit method to get it out.

I thought of partial fraction, but using that isn't really right because this is 2 unit question.

Trebla · Feb 28, 2009

Well the partial fraction bit came from part a), so it's just a matter of using part a) to apply on part b)...

lyounamu · Feb 28, 2009

Trebla said:
Well the partial fraction bit came from part a), so it's just a matter of using part a) to apply on part b)...

Ah, okay. I didn't see that they were in part A, B and C...

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Sequences and series question (1 Viewer)

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