ypoK
ha n™ k ycnExy

I, K cjieayrauKM	cjiOBaM noflßepHTe cjioBamtní* SKBUBajieHT:		
n03HaK0MMTb		B03HHKáTb	BKJiafl
cjiytiaftHO		MaTepíiK	y^pe^MTejib
Hafle^HHil		3aperacTpHpoBaTb	cTaTyc
coÓeceflHHK		coKpaineHHO	mTaT
lOpKCT		HanpaBJíekne	CBfl3b
KpaTKOCpO^HHÍI		ar^HT	flOXOfl
yjiHÔna		HanpHxeHHuft	CÔHT
nocjioBHí^a		BOCXH^aTbCH	flejioBOň nap
2. Hepe3eÄHTe	Ha cjioBai^KHK H3HK cjieflywmwe cjioBOco^eTaHMH:		


BKJiafl b ycTaBHoft $oha $npMH roflOBoň oßopoT npeflnpnHTHH paöoTaTb b $npMe no KOHTpaKTy pacuiupeHne c^epti flenTejibHocTK npoßajm TOBapoB no o6pa3u,aM
tíMCTaH   npHÖbLJIb  ÍHpMH nOCTOHHHHÍÍ   COTpyflHMK   $HPMH OTKpHTb   npeflCTaBHTeJIBCTBO BKÍiTH  Ha MHpOBOK   PHHOK IIIMpOKHň   pHHOK   CÖHTa

3. K cJioBocoqeTaHKflM b jieBOti KOJiOHKe noflÖepHTe aHTOHHMOTHbie b npaBoft:
06pa3en:  cjrynafiHocTb - 3aK0H0MepH0CTb
KpaTKOcpotmaii BucTaBKa
3aÓHBaTb
noKynKa HaflejKHHŽ
HHHlíHaTHBHtlíi
nOCTOHHHO   fleftCTByiOmaH   BHCTaBKa
npo#aaca
BCnOMHHaTb
6e 3bIHHLyiaTHBHNfÍ
HeHa^escHun
4. 3anoMHnTe cjieg/iogne ynoTpeänTejibHue KOHCTpyKipm;
B OEJIACTM MAPKETMHľA

®IPMA CIMJfIAJIH3HPyETCH B HEM HA MEM
BH3HECA
BHEIHHEK TOPPOBM
MEOTHAPQIIHOrO TYPH31A
H