S:E18.122: Difference between revisions

S:E18.122 (Florin Bojor)

Verificați dacă numărul ${\displaystyle a={1^{{3}^{{5}^{{\cdots }^{2019}}}}}+{3^{{5}^{{7}^{{\cdots }^{2019}}}}}+{5^{{7}^{{9}^{{\cdots }^{2019}}}}}+\ldots +{2017^{2019}}+2019}$ este divizibil cu ${\displaystyle 10}$.

Soluție.

Notăm cu ${\displaystyle u\left(n\right)}$ ultima cifră a numărului natural ${\displaystyle n}$, iar prin ${\displaystyle {\overline {n}}}$ notăm numărul ${\displaystyle n^{{n+2}^{{n+4}^{\ldots 2019}}}}$. Cu această notație, avem

$${\displaystyle a={\overline {1}}+{\overline {3}}+{\overline {5}}+\ldots +{\overline {2019}}}$$

Dacă ${\displaystyle u\left(n\right)=1}$, atunci ${\displaystyle u\left(n^{x}\right)=1}$ oricare ar fi ${\displaystyle x\in \mathbb {N} }$. Deci

$${\displaystyle u\left({\overline {1}}\right)=u\left({\overline {11}}\right)=u\left({\overline {21}}\right)=\ldots =u\left({\overline {2011}}\right)=1,}$$

${\displaystyle 202}$

Dacă ${\displaystyle u\left(n\right)=5}$, atunci ${\displaystyle u\left(n^{x}\right)=5}$ oricare ar fi ${\displaystyle x\in \mathbb {N} }$. Deci

$${\displaystyle u\left({\overline {5}}\right)=u\left({\overline {15}}\right)=u\left({\overline {25}}\right)=\ldots =u\left({\overline {2015}}\right)=5,}$$

${\displaystyle 202}$

Cum ${\displaystyle u\left(9^{2x+1}\right)=9}$ oricare ar fi ${\displaystyle x\in \mathbb {N} }$, avem că

$${\displaystyle u\left({\overline {9}}\right)=u\left({\overline {19}}\right)=u\left({\overline {29}}\right)=\ldots =u\left({\overline {2019}}\right)=9,}$$

${\displaystyle 202}$

Cum ${\displaystyle u\left(3^{4x+1}\right)=3}$ și ${\displaystyle u\left(3^{4x+3}\right)=7}$ oricare ar fi ${\displaystyle x\in \mathbb {N} }$, avem ${\displaystyle 101}$ pentru care au loc egalitățile

$${\displaystyle u\left({\overline {3}}\right)=u\left({\overline {23}}\right)=u\left({\overline {43}}\right)=\ldots =u\left({\overline {2003}}\right)=3}$$

${\displaystyle 101}$

$${\displaystyle u\left({\overline {13}}\right)=u\left({\overline {33}}\right)=u\left({\overline {53}}\right)=\ldots =u\left({\overline {2013}}\right)=7.}$$

${\displaystyle u\left(7^{4x+1}\right)=7}$

${\displaystyle u\left(7^{4x+3}\right)=3}$

${\displaystyle x\in \mathbb {N} }$

${\displaystyle 101}$

$${\displaystyle u\left({\overline {7}}\right)=u\left({\overline {27}}\right)=u\left({\overline {47}}\right)=\ldots =u\left({\overline {2007}}\right)=7}$$

${\displaystyle 101}$

$${\displaystyle u\left({\overline {17}}\right)=u\left({\overline {37}}\right)=u\left({\overline {57}}\right)=\ldots =u\left({\overline {2017}}\right)=3.}$$