Vor fi descries in urmatoarele imagini trecerile de la o curba de ordin x la o curba de ordin x+1:
Ordin $1$ -> Ordin $2$

!task/fractal?image001.gif! !task/fractal?image002.gif! !task/fractal?image003.gif! !task/fractal?image004.gif! !task/fractal?image005.gif!

!problema/fractal?image001.gif! !problema/fractal?image002.gif! !problema/fractal?image003.gif! !problema/fractal?image004.gif! !problema/fractal?image005.gif!

Ordin $2$ -> Ordin $3$

!task/fractal?image006.gif! !task/fractal?image007.gif! !task/fractal?image008.gif! !task/fractal?image009.gif! !task/fractal?image010.gif!

!problema/fractal?image006.gif! !problema/fractal?image007.gif! !problema/fractal?image008.gif! !problema/fractal?image009.gif! !problema/fractal?image010.gif!

Ordin $3$ -> Ordin $4$

!task/fractal?image011.gif! !task/fractal?image012.gif! !task/fractal?image013.gif! !task/fractal?image014.gif! !task/fractal?image015.gif!

!problema/fractal?image011.gif! !problema/fractal?image012.gif! !problema/fractal?image013.gif! !problema/fractal?image014.gif! !problema/fractal?image015.gif!

Ordin $4$ -> Ordin $5$

!task/fractal?image016.gif! !task/fractal?image017.gif! !task/fractal?image018.gif! !task/fractal?image019.gif! !task/fractal?image020.gif!

!problema/fractal?image016.gif! !problema/fractal?image017.gif! !problema/fractal?image018.gif! !problema/fractal?image019.gif! !problema/fractal?image020.gif!

Se dau ca date de intrare din fisierul $fractal.in$ numerele $K, x$ si $y$, unde $K$ este ordinul unei curbe, iar $x$ si $y$ sunt coordanate intregi in interiorul unui patrat de dimensiune $2^K^*2^K^$. Se cere sa scrieti in fisierul de iesire $fractal.out$ in cati pasi se ajunge la coordonatele $(x,y)$ daca punctele din patrat sunt parcurse in ordinea data de curba Hilbert de ordin $K$.