[tex]\it 1+\dfrac{1}{1+2} +\dfrac{1}{1+2+3}+ ... +\dfrac{1}{1+2+3+ ...+n} =\dfrac{4024}{2013} [/tex]
[tex]\it \dfrac{1}{1+2} +\dfrac{1}{1+2+3}+ ... +\dfrac{1}{1+2+3+ ...+n} =\dfrac{4024}{2013} -1[/tex]
[tex]\it \dfrac{1}{1+2} +\dfrac{1}{1+2+3}+ ... +\dfrac{1}{1+2+3+ ...+n} =\dfrac{2011}{2013}[/tex]
[tex]\it \dfrac{1}{1+2+3+ ... +n} = \dfrac{1}{\dfrac{n(n+1)}{2}} = \dfrac{2}{n(n+1)} \ \ \ (*) [/tex]
Aplicăm relația (*) și ecuația devine:
[tex]\it \dfrac{2}{2\cdot3} +\dfrac{2}{3\cdot4}+ ... +\dfrac{2}{n(n+1)} = \dfrac{2011}{2013} \Leftrightarrow [/tex]
[tex]\it \Leftrightarrow 2\left(\dfrac{1}{2\cdot3} +\dfrac{1}{3\cdot4}+ ... +\dfrac{1}{n(n+1)}\right) = \dfrac{2011}{2013}\Leftrightarrow[/tex]
[tex]\it 2\left(\dfrac{1}{2}-\dfrac{1}{3}+\dfrac{1}{3}-\dfrac{1}{4} + ...+\dfrac{1}{n}-\dfrac{1}{n+1}\right) =\dfrac{2011}{2013} \Leftrightarrow [/tex]
[tex]\it 2(\dfrac{1}{2}-\dfrac{1}{n+1}) = \dfrac{2011}{2013}\Leftrightarrow 2\cdot\dfrac{n+1-2}{2(n+1)}=\dfrac{2011}{2013}\Leftrightarrow \dfrac{n-1}{n+1} =\dfrac{2011}{2013}\Leftrightarrow [/tex]
[tex]\it \Leftrightarrow \dfrac{n-1}{n+1} = \dfrac{2012-1}{2012+1} \Leftrightarrow n = 2012 [/tex]
