1 Answer

Akash Kava · Answer 1 · 2022-06-09T11:54:38+0000

Answer:

(b)

$\displaystyle (2005)/(2006)$

Explanation:

(a)

First, we have to prove that:

$\displaystyle (1)/(x)-(1)/(x+1)=(1)/(x(x+1))$

Operate:

$\displaystyle (1)/(x)-(1)/(x+1)=(x+1-x)/(x(x+1))$

Simplifying:

$\displaystyle (1)/(x)-(1)/(x+1)=(1)/(x(x+1)) [1]$

(b)

Now we use the above expression to find the sum:

$\displaystyle S=(1)/(1* 2)+(1)/(2* 3)+(1)/(3* 4)+...+(1)/(2005* 2006)$

Let's use [1] for each term of the sum:

$\displaystyle (1)/(1* 2)=(1)/(1)-(1)/(2)$

$\displaystyle (1)/(2* 2)=(1)/(2)-(1)/(3)$

$\displaystyle (1)/(3* 4)=(1)/(3)-(1)/(4)$

$\displaystyle (1)/(2005* 2006)=(1)/(2005)-(1)/(2006)$

Substituting:

$\displaystyle S=(1)/(1)-(1)/(2)+(1)/(2)-(1)/(3)+(1)/(3)-(1)/(4)+....+(1)/(2005)-(1)/(2006)$

Note the terms 1/2 and -1/2, 1/3 and -1/3, etc. are canceled out, leaving only the first and last terms:

$\displaystyle S=(1)/(1)-(1)/(2006)=(2006-1)/(2006)$

$\boxed{\displaystyle S=(2005)/(2006)}$

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