MultiQuick 9 MQ9038 Spice+ - Блендер BRAUN - Безкоштовний посібник користувача
Знайдіть посібник до пристрою безкоштовно MultiQuick 9 MQ9038 Spice+ BRAUN у форматі PDF.
Питання користувачів про MultiQuick 9 MQ9038 Spice+ BRAUN
0 питання про цей пристрій. Дайте відповідь на ті, що знаєте, або поставте власне.
Поставити нове питання про цей пристрій
Завантажте інструкції для вашого Блендер у форматі PDF безкоштовно! Знайдіть свій посібник MultiQuick 9 MQ9038 Spice+ - BRAUN і поверніть собі контроль над електронним пристроєм. На цій сторінці опубліковані всі документи, необхідні для використання вашого пристрою. MultiQuick 9 MQ9038 Spice+ бренду BRAUN.
ПОСІБНИК КОРИСТУВАЧА MultiQuick 9 MQ9038 Spice+ BRAUN
Будь Ласта, ретелов Вивчіть Вka3iBKN no BИКОпостаHHIO, перш 키кориctуbatисяnpILAДOM.
ybara
Hoxn ouenb octpbie!Bo n36exaHne TpaBM, noxayn- cta, obaaainTeCb C Hoxamn C Oc06oN OCTOPOXHOCTbIO.
- Пи обхоженни 3 Гостримп pixушинохами, снороженни EMHOCTI та пд часнишени слд ДOTРIMyBaTnca obepexHocti.
-Пистрийdo3BOJЯETbCЯВКОпСТOByВATNOCO6aM3OBmexKeHIMNΦi3nHIMNJIceHCOPHIMMOXJIINBOCTaMNUPO3yMOBIMN3I6HOCTaMNU aboOCO6aM,UOHeMaOTbDOCTaTHbOroDOCBiDyTa3HaHb,RAUO BOHNpepe6yBaIbTbPiHaJaOMaO bO OTpMaIIInHCTpyKciI UOdoBVKOpNCTaHHaPnaLyuYCBiIDOMJIIOITbHe6e3NeKy,UOMOxE BuHnKHHTuYepe3 He npabNbHy ekCnIlyaTaCiIO.
-ДiTЯМЗабороно6abNTncb3daHIM npnlaIOM.
-Простризборонов ВИКОПСТОВВATNДITЯМ.
He cnid onyckaTn dTei no npnilady Ta noro mepexhoro shhya. - YnueHHyIOBCnyROByBaHHHe NOBHHI 3DINCHIOBATNCaITbMn 6e3 HaJy.
3aBXn BmKaiTe a6o BiD'EDHyIte npnilad BiD MepeXi nepei MOHTaXem, dEmOHTaxem, uHcEHnM, 36epirAHnM a6o kUo 3aJIuHaTe Ioro 6e3 Hargy
-Якшо мерекнишур пошкоadingи,норocii3amHHTuВИрбн
ka, cepBicHO rpeIcTaBnka a6o anaIorIyHOIOOC6N, 06 yHnKHyTN He6e3neKn.
- Ipeep BkIIOueHnM B Mepexy yneB-HiTbc, 0o Ba7a Hanpyra BiNobidae Hanpy3i, Bka3aHi Ha npila.
-Будъе obepexhi,якшо 3aJIиBaCTe rapaу piINHy B KuxOHn KOMbaH n6blHep, OckiNbKn BOHa MOnke BnIITsc3 npuJaDy BHaCJIIDOK paTTOBOrO napOTBOpeHHra. - Zei npictpiin po3po6neHo IuIe dIy no6yTOBOrO BnKOpNCTaHHra Ta dIy 6p06Kn.
KoII npIIaI npauoe BiI eIeKtpOmepeXi, 3OKpema IId qac po6OTn npBOy, IJI NaKlaIaHnI npOdyKTIB KOpIcTUYTEcI JIWe ITOBxAuem.
-ДетаиnpntpoH He npn3naheHдя BnKOpNCTaHHa Y MikpoXBnIbOBnx nIyKax. - YnueHH npncptpoIO MaE BnKOHyBaTNC3DOpMaHnM iHCTpyKui, ONuCAHNy BiINOBiIDHomy po3diJI.
Деталі та akcesсуари
1 CnHaJIbHa JIaMIOUka
2 Khonka 6e3nekn
3 «Pozymn» nepeMNkauch BvndKocTee Smart Speed / 3miHa qactOnu 6epTaHn
4 Motopn6nok
5 Khonkpo36lokyBaHHaEasyClick
6 CtpnHexeHb ActiveBlade («akTnBnH nix»)
7 CtaKaH
8 HacaKa-BiHnK
a Kopo6ka WbNdkOCTe
6 BiHnK
9 Hacaikka nIy nIope
a Kopo6ka WbNdkOCTe
6 hacaikkaIJIyIIOpe
B JIOnaTeBa 6OBTHnUZ
10 HacaKaIHaHapi3Kn 350mN
a Kpnska
6 HIXdIHaPi3Kn
BEMHICTbIy Hapi3KN
TnpOTNKOB3He rMObe KJIbIe
11 HacaKaIJaHapi3Kn 500Mn «Ca»
a Kpnska (3 Kopo6KOIO WBNKocTei)
6 HIXDNHapi3KN
B EMHicTb DnHaHapi3Kn
r npOTIKOB3He rMoBe KJIbCe
12 HacaJaDnHaHapi3Kn 1250 Ml «bc> aKpnIka (3 Kopo6KOIO WbNdkOcTei) 6 HIX DnA Hapi3Kn B HIX DnA PO3KOJIIOBAHHRA JbOdy F EMHicTb DnA Hapi3Kn
r npOTIKOB3He rMoBe KJIbCe
Ipeed nepuBnKOpncTahHbM BmNte BcI Detani -DunItbcra po3dIn «DorJrTa ChuueHHa?
CnrghaIaMnoOka
Cunha naamnoka (1) noka3ye cTaTyc npncTpoIO, KOI no IiKJIoueHO do eJeKTPnH0I pO3eTKN.
Як ВИКОРиСТОВУВАТИnpиСТPII
PozymnienepemnkauchBvndKocteIJ43MiHuaCTOTNObepTaHHa
OdHe HATnCKaHHBci WbNIOKcTI. Ym 6IbIe Bn HAtnCKaTe, Tm BNIOCTae WbNkICtB. Ym BNue WBnKICTB, Tm CKopiWe BiIDyBaTMetBCr npoec nepemiuYBaHHraHapiaHHr i Tm dpi6HiuMn 6byTb Noro pe3yNbTaTu.
UnpaBlinHЯ OndHieO pykoIO: npeMnKaU WBnKocTei Smart Speed (3)do3BoJae Bam BMnKaTn npncpti Ta KOHTPOJIOBaTI NOro WBNDKICTb OndHieO pykoIO.
Ekcnnyataci pyhoro 6lenepa
Iepwe BnKOpncTaHHa: BuaJIITb TpaHcnpTyBaJIbHn 3amok 3 MOTOPHO 6LOky (4), NOTARHyBUn NOrO 3a YepBOHy CTpiKy.
BmkaHHa(A)
Pnucptpii NOCTabIeTbcS yCTaTKOBaHIM KHOKNIO 6e3neKn Ipyo36NoKyBaHH NepemNkaa 1BnDkoTe Smr Speed. Jny noo 6e3neHoro BMKAHN BnKOHaTe HaCTynHi KpOKn:
- Hatnchitb KhoNky 6e3neKn (2) BeInkum NaJIbIeM. CnHaJIbHa IaMNoUka 3acBITNbCra 3eJIeHIM.
- Odpa3y haTnCHiTB nepemHKaH WBNdkoCTeSmart Speed Ta BCTaHOBIb NOTpi6Hy WBNdkicTB.IPNIMITKA: RaKIO He HATnCHyTu nepemHKaUWBnDKocTee Smart Speed npotrrom 2 cekyH, npncptiH hemoxJIbBO CTAHe BBIMKHHTu 3 npuHH6e3neKn. CnHaJIbHa JAmNoUka 3a6JImMae YepBoHm. UoB BBIMKHHTn pncTpiH, 3HOBy noOHtB 3 nepooro KpOKy.
-Пд ус рбOTи Bam He Notpi6H NoCTiHo TpIMaTи KHOJky 6e3neKn HaTnCHyTOI.
- Почиайу роботу на НИЗькій УВИДКОCTI (Ягке натусянна на постунову 36льшуп'te УВИДКICTь пд уас 36ИВання (сильнише натусянна на посмкay).
- Пи 3биванни BiHнКOM 3aBxДи BИКОриCTOBуNTe CBIXI OXOLOДжЕHI BepшкN, UO6 DoCЯrtN 6iNbIwoTo Ta CTiKlIwoTo 6'Emy.
Приклад рецента дя насадки «hc»: Медовий Чорнocльв (начинka дя минцib abо поста дя 6утербрд):
50 rhopoclinby
100 r kpemonoiohoro meyu
- POKlaɪtB yOphocnVB Ta kpeMOnoɪ6Hm MeJy 3MiUyBaJIbHy EMcKiCTb «hc».
36epiratnpn Temnepaotypi 3^ CBxOIOJbHnky npotraom 24 roDnH.
3MiUyIe npoTgrom 1,5 cekyHd Ha MaKcImaJIbHi IWBnIDKOCTi (HaTnCKaIte nepemkauch Smart Speed do ynopy).
Доглад та чицени (E)
3aBXn peTeIbHO ouuuyte pyHn 6JeHep nicJy BnKOpNCtAHHa.
- Парад очишеним BiД'едни Te npст piB iD Мерекi.
He 3aHypioIte MoTOpHn 6Jok (4) a6o Kopo6Kn SwBnKocTei (8a, 9a) y BODy nn iINu pyiDHy. Ix CIId YNCTNTI JNWe 3a DOnOMOIO BOJOrOI rAnHvipKn.
Kpnuky (11a/12a) moxHa onoJicKyBaTu n i npotoHIO BOIO. He 3aHypioTe ii y BOdy i He KlaIb y nocydomnHy MaunHy.
Bci iHsi deTalmi MoXHa MNTu B NocCyDOMnHi MaunHi. He BnKOpNCToByTe a6pa3NBi ONUyBaJIbHI 3acO6N, kI MOxTyb NopPraNaTINOBepxHIO.
-Дя OсобиBO peTeьHOrO OuHSeHHЯ BIMoKeTe 3HЯТN IpoTnKOB3Hi rYMoBI KInbIa 3DHNUcEMHOCTeI.
-Пид часобрбкпpoюкгИЗВИСОКИМВIMICTOM nirmeHTy (HAnpNKlaI, MOpKBa) akcecyapn MOxTy3He6aPbNIOBAtuCЯ. ПpoTpIb zu DeTaji PocINHHM MaclOM NepeД MTTAM.
IpoekTHi CneuNphiKaui, a TAKoK daHi iHCTpyKui 3 EKcNlyataui MoKe 6yTu 3MiHeNo 6e3 NOpepdHbOro NOBIDOMLeHHra.
Будь Лackа, He yTuJI3yIte npncTpii pa3om i3 no6bYTOBIMn BiIXOdAmn HapnKInci TepmiHy Ioro ekCnPyatauii. 3dTu npncTpii Ha yTuJI3aCiIO MoXHa B CepBICHOMy ueHtri Braun a6o y BiIDNoBIHNx pyHKtax 360py, nepeIb6aueHnx y BaWiI kpaHi.
O6naDHaHHB iDnOBiDaE BnMOram TexHIOHO perIaMeHTy 6mExeHHBnKOpNCTaHHn DeKnx He6e3NeuHX peoBH B eNEKtpnHOMy Ta eNEKTPoHHOMy O6naDHaHHI.
Tapa yaihi 0 800 503-507 (i3BihKni 3i CTauiohaphnx TelefoHIB 6e3KOoTobHi).
$$ \begin{array}{c} \text {s o} _ {\mathrm {i}} \text {j} \text {i}. \text {i} _ {\mathrm {i}} \text {j} \text {i} _ {\mathrm {i}} \text {j} \text {i} _ {\mathrm {i}} \text {j} \text {i} _ {\mathrm {i}} \text {j} \text {i} _ {\mathrm {i}} \text {j} \text {i} _ {\mathrm {i}} \text {j} \text {i} _ {\mathrm {i}} \text {j} \text {1} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j 1} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {1} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {j 1} _ {\mathrm {i}} \text {j} _ {\mathrm {i}} \text {(b c)} (1 2) \text {(a r e a l l g a l)} \ \quad . \quad \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \ \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \quad . \ \quad . \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \quad. \ [ 1 ] ^ {\prime} = d o r a l l a c e g i j e d y. $$
$$ \begin{array}{l} \frac {1}{2} \sum_ {i = 1} ^ {n} \sum_ {j = 1} ^ {m} \sum_ {k = 1} ^ {n} \sum_ {l = 1} ^ {m} \sum_ {m = 1} ^ {n} \sum_ {n = 1} ^ {m} \sum_ {l = 1} ^ {m} \sum_ {m = 1} ^ {n} \sum_ {l = 1} ^ {m} \sum_ {m = 1} ^ {n} \sum_ {l = 1} ^ {m} \sum_ {m = 1} ^ {n} \sum_ {l = 1} ^ {m} \sum_ {m = 1} ^ {n} \sum_ {l = 1} ^ {m} \sum_ {m = 0} ^ {n - 1} \ \frac {\partial f _ {i}}{\partial t} + \frac {\partial f _ {i}}{\partial x _ {i}} + \frac {\partial f _ {i}}{\partial y _ {i}} + \frac {\partial f _ {i}}{\partial z _ {i}} + \frac {\partial f _ {i}}{\partial w _ {i}} + \frac {\partial f _ {i}}{\partial w _ {i}} + \frac {\partial f _ {i}}{\partial w _ {i}} + \frac {\partial f _ {i}}{\partial w _ {i}} + \frac {\partial f _ {i}}{\partial w _ {i}} + \frac {\partial f _ {i}}{\partial w _ {i}} + \frac {\partial f _ {i}}{2} + \frac {\partial f _ {i}}{3} + \frac {\partial f _ {i}}{4} + \frac {\partial f _ {i}}{5} + \frac {\partial f _ {i}}{6} + \frac {\partial f _ {i}}{7} + \frac {\partial f _ {i}}{8} + \frac {\partial f _ {i}}{9} + \frac {\partial f _ {i}}{1 0} + \frac {\partial f _ {i}}{1 1} + \frac {\partial f _ {i}}{1 2} + \frac {\partial f _ {i}}{1 3} + \frac {\partial f _ {i}}{1 4} + \frac {\partial f _ {i}}{1 5} + \frac {\partial f _ {i}}{1 6} + \frac {\partial f _ {i}}{1 7} + \frac {\partial f _ {i}}{1 8} + \frac {\partial f _ {i}}{1 9} + \frac {\partial f _ {i}}{2 0} + \frac {\partial f _ {i}}{2 1} + \frac {\partial f _ {i}}{2 2} + \frac {\partial f _ {i}}{2 3} + \frac {\partial f _ {i}}{2 4} + \frac {\partial f _ {i}}{2 5} + \frac {\partial f _ {i}}{2 6} + \frac {\partial f _ {i}}{2 7} + \frac {\partial f _ {i}}{2 8} + \frac {\partial f _ {i}}{2 9} + \frac {\partial f _ {i}}{3 0} + \frac {\partial f _ {i}}{3 1} + \frac {\partial f _ {i}}{3 2} + \frac {\partial f _ {i}}{3 3} + \frac {\partial f _ {i}}{3 4} + \frac {\partial f _ {i}}{3 5} + \frac {\partial f _ {i}}{3 6} + \frac {\partial f _ {i}}{3 7} + \frac {\partial f _ {i}}{3 8} + \frac {\partial f _ {i}}{3 9} + \frac {\partial f _ {i}}{4 0} + \frac {\partial f _ {i}}{4 1} + \frac {\partial f _ {i}}{4 2} + \frac {\partial f _ {i}}{4 3} + \frac {\partial f _ {i}}{4 4} + \frac {\partial f _ {i}}{4 5} + \frac {\partial f _ {i}}{4 6} + \frac {\partial f _ {i}}{4 7} + \frac {\partial f _ {i}}{4 8} + \frac {\partial f _ {i}}{4 9} + \frac {\partial f _ {i}}{5 0} \ \text {(a)} (x, y) = (x, y) (x, y), (z, w) = (z, w), (r, s) = (r, s), (t, u) = (t, u), (v, w) = (v, w), (w, x) = (w, x), (y, z) = (y, z), (z, w) = (z, w), (u, v) = (u, v), (w, u) = (w, u), (x, y) = (x, y), (z, w) = (z, w), (u, v) = (u, v), (w, u) = (w, u), (x, y) = (x, y), (z, w) = (z, w), (u, v) = (u, v), (w, u) = (w, u), (x, y) = (x, y), (z, w) = (z, w). \ \text {(b)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , t) = (\lambda , t), (\lambda , u) = (\lambda , u), (\lambda , v) = (\lambda , v), (\lambda , w) = (\lambda , w). \ \text {(c)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , u) = (\lambda , u), (\lambda , v) = (\lambda , v), (\lambda , w) = (\lambda , w). \ \text {(d)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , u) = (\lambda , u), (\lambda , v) = (\lambda , v), (\lambda , w) = (\lambda , w), (\lambda , z) = (\lambda , z). \ \text {(e)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , u) = (\lambda , u), (\lambda , v) = (\lambda , v), (\lambda , w) = (\lambda , w); \ \text {(f)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , u) = (\lambda , u), (\lambda , v) = (\lambda , v), (\lambda , w) = (\lambda , w)). \ \text {(g)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , u) = (\lambda , u), (\lambda , v) = (\lambda , v). \ \text {(h)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r), (\lambda , s) = (\lambda , s), (\lambda , u) = (\lambda , u). \ \text {(i)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r). \ \text {(j)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r). \ \text {(k)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q), (\lambda , r) = (\lambda , r). \ \text {(l)} (\lambda , m) = (\lambda , m), (\lambda , n) = (\lambda , n), (\lambda , p) = (\lambda , p), (\lambda , q) = (\lambda , q),(\lambda ,r)=(λ,r)。\ \text {(m)} ((\mathrm {{s i g m a}},\mathrm {{s i g m a}} ) := [ x ] . $$
(E)
Jl
.
$$ \begin{array}{l} g \vdash_ {1 9. 1 8} (\text {I 9 . I 8}) \text {a s s a l l} \text {w o j i c} \text {g} \vdash (4) \text {j o w g o l l} \text {e q} \text {j o w} \text {s} \cdot \ \quad \text {b a s} \text {a l l} \text {m a x} \text {a d} \text {a b} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {a d} \text {\mathrm {i}} \vdash (\text {I 1 2 / I 1 1}) \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \text {a l l} \cdot \ \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \cdot \ \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad \quad - f _ {\mathrm {i n t}} ^ {\prime} (\text {I 1 2 / I 1 1}) \ [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] [ ] ] $$
jgs yzil oio piaaill clalg g aai lclolgo j5 g
