In GMB 8/2005, pages 378 (romanian version) and 380 (english version)
"C : 2909. For any positive integer $n$ let
$S_n=1\cdot 2\cdot 3+2\cdot 3\cdot 4+\dots +n(n+1)(n+2).$ Prove that :
a) $\sqrt{S_n}\in\mathbb{R}\setminus \mathbb{Q}$ , for all $n\in \mathbb{N^*}$ ; b) $\sqrt{\frac{1}{4}+S_n}\in\mathbb{Q}$ , for all $n\in\mathbb{N^*}.$
{author :} Petre SIMION, Bucharest"
ANSWER CiP
$$S_n=\sum_{k=1}^nk\cdot (k+1) \cdot (k+2)=\fbox{$\frac{n(n+1)(n+2)(n+3)}{4}$} \tag{1}$$
a) It should be (cf. Lemma) $\sqrt{S_n}\in\mathbb{N}$ , but $\frac{n^2+3n}{2}<\sqrt{S_n}<\frac{n^2+3n}{2}+1$ (2)
b) $\sqrt{\frac{1}{4}+S_n}=\frac{n^2+3n+1}{2} \tag{3}$
Solution CiP , with COPILOT help
(for the help given by COPILOT see the draft at the end)
We observe that
$k(k+1)(k+2)=\frac{k(k+1)(k+2)\cdot 4}{4}=k(k+1)(k+2)\cdot \frac{(k+3)-(k-1)}{4}$
so
$k(k+1)(k+2)=\frac{(k+3)(k+2)(k+1)k}{4}-\frac{(k+2)(k+1)k(k-1)}{4} \tag{4}$
Summing in (4) from $k=1\; to\;k=n$ , we obtain on the right the telescopic sum
$\left ( \color{Blue}{\frac{4\cdot 3\cdot 2\cdot 1}{4}}-\frac{3\cdot 2\cdot 1\cdot 0}{4}\right )+\left (\color{Orange}{\frac{5\cdot 4\cdot 3\cdot 2}{4}}-\color{Blue}{\frac{4\cdot 3\cdot 2\cdot 1}{4}}\right)+$
$+\left (\frac{6\cdot 5\cdot 4\cdot 3}{4}-\color{Orange}{\frac{5\cdot 4\cdot 3\cdot 2}{4}} \right )+\dots +\left (\frac{(n+3)(n+2)(n+1)n}{4}-\frac{(n+2)(n+1)n(n-1)}{4}\right)$
Terms of the same color are reduced and the result from (1) remains.
a) $\sqrt{S_n}=\frac{\sqrt{n(n+1)(n+2)(n+3)}}{2}$ so according to Lemma , we must have
$\sqrt{n(n+1)(n+2)(n+3)}\in\mathbb{N}\tag{5}$.
But the number in (5) is even because out of four consecutive numbers $n\;,\;n+1\;,\;n+2\;,\;n+3\;$ , one is a multiple of 4 , so
$\frac{\sqrt{n(n+1)(n+2)(n+3)}}{2}\in\mathbb{N} \tag{5'}$
But it is easy to show that we have the inequalities (2)
[ $\color{Red}{n(n+3)}=n^2+3n<\color{Red}{n^2+3n+2}\;\;\Leftrightarrow $$\Leftrightarrow\;\;\color{Red}{n(n+3)<(n+1)(n+2)} \tag{6}$
$\Rightarrow\; n^2(n+3)^2<n\color{Red}{(n+1)(n+2)}(n+3)\;\Rightarrow\;\frac{n(n+3)}{2}<\sqrt{S_n}$ so the left side in (2). It also results from (6) $\color{Red}n(n+1)(n+2)\color{Red}{(n+3)}<(n+1)^2(n+2)^2\;\Rightarrow\;\sqrt{S_n}<\frac{(n+1)(n+2)}{2}=\frac{n^2+3n}{2}+1$ so the right side in (2). Note that $\frac{n^2+3n}{2}\in\mathbb{N}\;(\forall) n\in\mathbb{N}.$ ]
Then (5) is impossible, because it is strictly contained between two consecutive integers.
b) We can write $S_n=\frac{n(n+3)(n+1)(n+2)}{4}=\frac{(n^2+3n)(n^2+3n+2)}{4}=$
$=\frac{[(n^2+3n+1)-1][n^2+3n+1)+1]}{4}=\frac{(n^2+3n+1)^2-1}{4}$ so $\sqrt{\frac{1}{4}+S_n}$ has the value from (3).
$\blacksquare$
Remark CiP Draft of the discussion with COPILOT :
<<
Suma
[ S = 1\cdot 2\cdot 3 ;+; 2\cdot 3\cdot 4 ;+; \dots ;+; n(n+1)(n+2) ]
are o expresie închisă foarte elegantă:
[ \boxed{S = \frac{n(n+1)(n+2)(n+3)}{4}} ]
De ce funcționează formula
Termenul general este:
[ k(k+1)(k+2) = k^3 + 3k^2 + 2k ]
Suma devine:
[ S = \sum_{k=1}^n (k^3 + 3k^2 + 2k) ]
Folosind formulele standard pentru
(suma;cuburilor),
(suma;pătratelor),
(suma;primelor;n;numere),
și simplificând, totul se reduce exact la:
[ S = \frac{n(n+1)(n+2)(n+3)}{4} ]
Verificare rapidă pentru n = 1, 2, 3
n = 1:
Stânga: (1\cdot 2\cdot 3 = 6)
Dreapta: (\frac{1\cdot 2\cdot 3\cdot 4}{4} = 6)n = 2:
Stânga: (6 + 24 = 30)
Dreapta: (\frac{2\cdot 3\cdot 4\cdot 5}{4} = 30)n = 3:
Stânga: (6 + 24 + 60 = 90)
Dreapta: (\frac{3\cdot 4\cdot 5\cdot 6}{4} = 90)
Totul se potrivește perfect.
Dacă vrei, pot și demonstra formula prin:
- inducție
- metoda diferențelor finite
- identități telescopice
Vrei o demonstrație completă printr-una dintre aceste metode?
Telescopica
Hai să o facem telescopic, „curat”, cu combinații.
1. Scriem termenul general în formă combinatorică
Observăm că
[ k(k+1)(k+2) = 6 \cdot \binom{k+2}{3} ]
pentru că
[ \binom{k+2}{3} = \frac{(k+2)(k+1)k}{6}. ]
Deci suma devine
[ S = \sum_{k=1}^n k(k+1)(k+2) = 6 \sum_{k=1}^n \binom{k+2}{3}. ]
2. Transformăm suma într-o sumă telescopică
Folosim identitatea clasică:
[ \binom{m}{r} = \binom{m+1}{r} - \binom{m+1}{r-1}. ]
Aplicată pentru (r = 3), obținem:
[ \binom{k+2}{3} = \binom{k+3}{4} - \binom{k+2}{4}. ]
Deci
[ \sum_{k=1}^n \binom{k+2}{3} = \sum_{k=1}^n \left[\binom{k+3}{4} - \binom{k+2}{4}\right]. ]
Aceasta este o sumă telescopică: termenii se anulează în lanț.
Scriem câțiva termeni:
[ \begin{aligned} &\left[\binom{4}{4} - \binom{3}{4}\right] + \left[\binom{5}{4} - \binom{4}{4}\right] + \left[\binom{6}{4} - \binom{5}{4}\right] + \dots + \left[\binom{n+3}{4} - \binom{n+2}{4}\right]. \end{aligned} ]
Tot ce e „intermediar” se taie, rămâne doar:
[ \sum_{k=1}^n \binom{k+2}{3} = \binom{n+3}{4} - \binom{3}{4}. ]
Dar (\binom{3}{4} = 0), deci
[ \sum_{k=1}^n \binom{k+2}{3} = \binom{n+3}{4}. ]
3. Punem totul la un loc
Revenim la suma inițială:
[ S = 6 \sum_{k=1}^n \binom{k+2}{3} = 6 \binom{n+3}{4}. ]
Acum calculăm:
[ 6 \binom{n+3}{4} = 6 \cdot \frac{(n+3)(n+2)(n+1)n}{4!} = 6 \cdot \frac{(n+3)(n+2)(n+1)n}{24} = \frac{n(n+1)(n+2)(n+3)}{4}. ]
Concluzie
[ \boxed{ \sum_{k=1}^n k(k+1)(k+2) = \frac{n(n+1)(n+2)(n+3)}{4} } ]
Dacă vrei, putem face și o versiune pur algebrică de telescopare, găsind direct un polinom (F(k)) cu (F(k+1)-F(k)=k(k+1)(k+2)).
>>
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