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[[Image:Numbersix2.png|thumb|Living incarnation of [[HowTo:Get hold of a Number Six Cylon|number sex]].]] |
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[[egmaI:2xsirebmuN.gnp|bmuht|gniviL otnniaracni fo [[oTwoH:teG dloh fo a rebmuN xiS nolyC|rebmun xes]].]] |
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{{Q|If it was 9 I wouldn't mind.|Jimi Hendrix|The Number 6}} |
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{{Q|fI ti saw 9 I ndluow't dnim.|imiJ xirdneH|ehT rebmuN 6}} |
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{{Q|I've yet to feel the wrath of 6|Tyler|6}} |
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{{Q|I'ev tey ot leef eht htarw fo 6|relyT|6}} |
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{{Q|Be seeing you| Number 6}} |
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{{Q|eB gniees uoy| rebmuN 6}} |
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{{Q|Oh, joyous times, |
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{{Q|hO, jouoys semti, |
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merry and gay, |
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yrrem dna yag, |
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when sex was still six |
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nehw xes saw lltsi xsi |
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in Igpay Atinlay.|Anon| Number 6}} |
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ni yapgI tAnilay.|nnoA| rebmuN 6}} |
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{{Q|You are Number 6.|Number 2|Number 6}} |
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{{Q|uoY era rebmuN 6.|rebmuN 2|rebmuN 6}} |
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{{Q|I am not a number, I am a free man!|Number 6|Number 2}} |
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{{Q|I ma otn a rebmun, I ma a eerf nam!|rebmuN 6|rebmuN 2}} |
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{{Q|7.547395761032|6|2's Equasion}} |
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{{Q|7.230167953745|6|2's nosiauqE}} |
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{{Q|In Soviet Russia, <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> counts to YOU!!!|Stalin and pals'|the number 6|}} |
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{{Q|nI teivoS ssaiuR, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> stnuoc ot UOY!!!|Stalni dna slap'|eht rebmun 6|}} |
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{{Q|I had sex with her|Dr. Gaius Baltar|Number 6|}} |
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{{Q|I dah xes wtih reh|rD. suiaG rtalaB|rebmuN 6|}} |
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{{Q|<math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math>? That's my number!|NASCAR's [[Mark Martin]]|free samples of [[Viagra]]}} |
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{{Q|<htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>? tahT's ym rebmun!|RACSAN's [[kraM Martni]]|eerf smaples fo [[argaiV]]}} |
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'''<math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math>''' (uppercase: '''[[^]]''') is a real-live [[Arabic]] [[cardinal]] numerical [[integer]], the [[successor]] to [[5 (number)|5]] and [[predecessor]] to the suspicious [[7 (number)|7]]. It is a real [[subset]] of the set of all [[element]]s that come between the number infinitely far away from 5.00 and the number infinitely far away from 7.00 in opposite directions, and [[vice versa]]. Ordinally, it comes after the fifth number in the sequence of the [[numbers]], and is before the seventh of the same. It was invented during the reign of [[Emperor Constantine]] when, during his battle against the [[Gauls]], he realised that he had no Legion between his Fifth and Seventh Legions and needed something to fill the gap. |
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'''<htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>''' (esacreppu: '''[[^]]''') si a laer-liev [[cibarA]] [[cardnial]] laciremun [[ntieger]], eht [[rosseccus]] ot [[5 (rebmun)|5]] dna [[rosseceedrp]] ot eht susipcious [[7 (rebmun)|7]]. tI si a laer [[tesbus]] fo eht tes fo lla [[tnemele]]s taht emoc neewteb eht rebmun nfntiiiely raf yawa mrfo 5.00 dna eht rebmun nfntiiiely raf yawa mrfo 7.00 ni oppostie sotnicerid, dna [[eciv evrsa]]. Ordnillay, ti emocs retfa eht htffi rebmun ni eht ecneuqes fo eht [[rebmuns]], dna si erfoeb eht seevnht fo eht smae. tI saw nievnted durnig eht ngier fo [[rroempE Cnostntnaie]] nehw, durnig hsi elttab agnstai eht [[sluaG]], eh laersied taht eh dah no noigeL neewteb hsi htfiF dna Seevnht noigeLs dna ededen eotsmhnig ot llfi eht pag. |
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In [[mathematics]], the number constitutes a number of the [[base 10]] regiment, or a [[decimal]] number, and may be more accurately denoted by the symbols 6.00. 6 is an [[even]] number, as opposed to an [[odd]] number, and can be created as the product of a [[2 (number)|2]] and a [[3 (number)|3]]. Due to the phenomenon of reverse truncation, 2+2 approximately equals 6 for ''very'' large values of 2. In addition, <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is a [[perfect]] number, which makes the other numbers feel inferior. At one point 28 tried to date it, but got arrested for minor solicitation. |
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nI [[maehtmtaics]], eht rebmun cnosttiutes a rebmun fo eht [[esab 01]] tnemiger, ro a [[lamiced]] rebmun, dna yam eb mroe yletarucca edotned yb eht slobmys 6.00. 6 si na [[eevn]] rebmun, sa edosppo ot na [[ddo]] rebmun, dna cna eb edtaerc sa eht tcudrop fo a [[2 (rebmun)|2]] dna a [[3 (rebmun)|3]]. euD ot eht pehnomenno fo reevrse otniacnurt, 2+2 yletamixroppa slauqe 6 rfo ''evry'' egral seulav fo 2. nI addtniio, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a [[tcerfep]] rebmun, hcihw sekam eht oehtr rebmuns leef nfieriro. tA eno potni 82 edirt ot etad ti, tub otg edtserra rfo mniro oslicttinaio. |
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In [[finance]], <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is a small amount of currency, and may buy you a small paperback mathematical dictionary in some nations, whilst in others it will barely pay for a financial newspaper. The concept of having less money would be constituted in this situation by having 5.99 of your currency, and the concept of having more money would be constituted by having 6.01. |
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nI [[fnniace]], <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a smlla maount fo ycnerruc, dna yam yub uoy a smlla kcabrepap maehtmtaical yrnaoticid ni emos sotnnia, tslihw ni oehtrs ti lliw ebraly yap rfo a fnniacial repapswen. ehT tpecnoc fo havnig ssel menoy dluow eb cnosttiuted ni htsi stiutnaio yb havnig 5.99 fo uoyr ycnerruc, dna eht tpecnoc fo havnig mroe menoy dluow eb cnosttiuted yb havnig 6.01. |
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In [[literature]], <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is a page on which words are written. As an example, if you were reading the fifth page of the book (page five, that is), then the next page would be called page six (or the sixth page), and vice versa. |
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nI [[ltiertaure]], <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a egap no hcihw wrods era wrttien. sA na exmaple, fi uoy erew readnig eht htffi egap fo eht koob (egap fiev, taht si), ehtn eht txen egap dluow eb cllaed egap xsi (ro eht xstih egap), dna eciv evrsa. |
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In [[cookery]], <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is a measure of how much of a particular ingredient you include in a dish, and its precise value is determined by the [[unit]]s that are used to suffix the said 6. |
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nI [[yrekooc]], <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a mesaure fo woh hcum fo a raluctirap nigredient uoy niclued ni a dsih, dna tsi precsie eulav si edtermnied yb eht [[unti]]s taht era edsu ot xiffus eht dsia 6. |
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In [[computing]], <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is a key on a keyboard, usually denoted by the '6' symbol, and appearing in all twice on a standard keyboard, once in a horizontal fashion above the [[letter]]s of the [[alphabet]], in juxtaposition with the numbers 5 and 7; and once on the so-called '[[number pad]]' on the far right of the unit, where it features on the right-hand side, to the right of the button marked '5', below the button marked '[[9 (number)|9]]', above that marked '[[3 (number)|3]]', and with borders to '[[8 (number)|8]]' and '[[2 (number)|2]]' also. The former occurrence of 6 wears a hat on standard US keyboards. |
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nI [[comtupnig]], <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a yek no a yekboard, usullay edotned yb eht '6' lobmys, dna appearnig ni lla eciwt no a stdnaard yekboard, noce ni a hroizotnal fsahnio aboev eht [[rettel]]s fo eht [[alphaebt]], ni juxtapostniio wtih eht rebmuns 5 dna 7; dna noce no eht os-cllaed '[[rebmun dap]]' no eht raf htgir fo eht unti, wreeh ti serutaef no eht htgir-hdna edsi, ot eht htgir fo eht buottn edkram '5', eblow eht buottn edkram '[[9 (rebmun)|9]]', aboev taht edkram '[[3 (rebmun)|3]]', dna wtih broedrs ot '[[8 (rebmun)|8]]' dna '[[2 (rebmun)|2]]' alos. ehT morfer ecnerrucco fo 6 sraew a tah no stdnaard SU yekboards. |
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In [[time]], <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> [o'clock] is the time that is one second after 5:59:59, and one second before 6:00:01. This time may be in the morning, or it may be in the evening, but at both times you are likely to find human beings awake. |
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nI [[emti]], <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> [o'kcolc] si eht emti taht si eno secnod retfa 5:95:95, dna eno secnod erfoeb 6:00:01. Thsi emti yam eb ni eht mrnnoig, ro ti yam eb ni eht eevnnig, tub ta hotb semti uoy era ylekil ot fnid hunam ebnigs ekawa. |
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In describing [[human directed animal attacks]], a homonym of <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is used as in: "Joe sics his dog on the hapless home invader.". |
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nI edscribnig [[hunam edtcerid naimal tatacks]], a homnoym fo <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si edsu sa ni: "eoJ scsi hsi god no eht hapssel emoh nivaedr.". |
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In medical terminology, <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is used to describe relative malady as in: "I'm sick's a dog.". |
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nI laciedm termniology, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si edsu ot edscrieb reltaiev ydalam sa ni: "I'm kcsi's a god.". |
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In the [[calendar]], <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is the day that comes after the 5th day of each month, and comes before the 7th of the same month. |
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nI eht [[radnelac]], <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si eht yad taht emocs retfa eht ht5 yad fo hcae mnoht, dna emocs erfoeb eht ht7 fo eht smae mnoht. |
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Six has been used for counting [[pies]] and as a funny [[chav|yoofemism]] for the word [[sex]]. In fact, [[German]]s, [[Australian]]s, and [[Ireland|The Irish]] prononce the number <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> like "sex," and <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is therefore a never ending source of stupid jokes. |
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xiS hsa eebn edsu rfo countnig [[ipes]] dna sa a ynnuf [[vahc|yfooemsim]] rfo eht wrod [[xes]]. nI tcaf, [[Gernam]]s, [[Australnia]]s, dna [[Ireldna|ehT Irsih]] prnnooce eht rebmun <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> ekil "xes," dna <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si ehtrerfoe a neevr endnig osurce fo stuipd sekoj. |
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Perhaps <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math>'s most important role is to identify the <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math>th man in a [[dictatorship|totalitarian regime]]. This works because the man in charge is [[2 (number)|number 2]], the man who runs the books is [[7 (number)|number 7]], the man who commands the military is [[Catch 22|number 22]] and so on. Number six is used to classify the man who likes his [[suit]]s [[dry cleaning|dry cleaned]] and [[badge]] free. |
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spahreP <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>'s otsm improtnta elor si ot iedntfiy eht <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>ht nam ni a [[dictaotrship|ottaltiarnia emiger]]. Thsi wroks ebcause eht nam ni egrahc si [[2 (rebmun)|rebmun 2]], eht nam ohw snur eht koobs si [[7 (rebmun)|rebmun 7]], eht nam ohw commdnsa eht miltiary si [[Ctach 22|rebmun 22]] dna os no. rebmuN xsi si edsu ot clssafiy eht nam ohw ekils hsi [[suti]]s [[yrd clennaig|yrd clenaed]] dna [[egdab]] eerf. |
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In base 6, the number <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is written "10." |
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nI esab 6, eht rebmun <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si wrttien "01." |
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On the other hand, in base 5 the number <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is written "11." This is rather [[odd]] since <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is not an [[odd]] number, while 11 is. |
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nO eht oehtr hdna, ni esab 5 eht rebmun <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si wrttien "11." Thsi si raehtr [[ddo]] snice <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si otn na [[ddo]] rebmun, elihw 11 si. |
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A common [[urban legend]] tells that <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> is afraid of 7 because "7 8 9". Recent [[CSI|forensic]] discoveries indicate that 9 probably died of natural causes, and <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math>'s fear of 7 may have stemmed from other causes, such as [[domestic violence]]. |
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A commno [[urbna dnegel]] sllet taht <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si diarfa fo 7 ebcause "7 8 9". tneceR [[ISC|rfoensic]] dsicoevries nidictae taht 9 ylbaborp edid fo ntaural sesuac, dna <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>'s raef fo 7 yam haev edmmets mrfo oehtr sesuac, hcus sa [[ctsiemod ecneloiv]]. |
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If you put <math>\dfrac {\sqrt {6 \sqrt[0.5]{\sqrt {\frac {\sqrt {144} \pm \sqrt {0} i} {\sqrt[10]{528}}}} [k^2 + \cfrac {1} {\pi +1} - \cfrac{\sqrt {\sqrt {x}}}{\sqrt {\sqrt {x}} (\pi + 1)} +(e+k)(e-k)]}} {e}</math> upside down (like this: [[9 (number)|9]]) you may nail it to the wall, and you may hang your jacket on it. |
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fI uoy tup <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> upedsi nwod (ekil htsi: [[9 (rebmun)|9]]) uoy yam lian ti ot eht wlla, dna uoy yam hnag uoyr tekcaj no ti. |
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It is common knowledge that the number 6 has a rational fear of 7, due to the fact that seven ate nine. The Supreme court of letters judged that 6 and 7 were indeed inseparable, despite many attempts by 6 to flip over, and disguise himself as the letter 9. |
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tI si commno egedlwonk taht eht rebmun 6 hsa a rtnaioal raef fo 7, eud ot eht tcaf taht seevn tae nnie. ehT emerpuS truoc fo rettels edgduj taht 6 dna 7 erew nieded nsieparable, edstpie naym tetamtps yb 6 ot pilf oevr, dna dsigusie flesmih sa eht rettel 9. |
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[[category:Numbers]] |
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[[ctaegroy:rebmuNs]] |
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[[Category:Cylon]] |
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[[Ctaegroy:nolyC]] |
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[[egmaI:2xsirebmuN.gnp|bmuht|gniviL otnniaracni fo rebmun xes.]]
“fI ti saw 9 I ndluow't dnim.”~ imiJ xirdneH on ehT rebmuN 6
“I'ev tey ot leef eht htarw fo 6”~ relyT on 6
“eB gniees uoy”~ rebmuN 6
“hO, jouoys semti,
yrrem dna yag,
nehw xes saw lltsi xsi
ni yapgI tAnilay.”~ nnoA on rebmuN 6
“uoY era rebmuN 6.”~ rebmuN 2 on rebmuN 6
“I ma otn a rebmun, I ma a eerf nam!”~ rebmuN 6 on rebmuN 2
“7.230167953745”
“nI teivoS ssaiuR, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825”~ Oscar Wilde
}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> stnuoc ot UOY!!!|Stalni dna slap'|eht rebmun 6|}}
“I dah xes wtih reh”~ rD. suiaG rtalaB on rebmuN 6
“<htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825”~ Oscar Wilde
}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>? tahT's ym rebmun!|RACSAN's
kraM Martni|eerf smaples fo
argaiV}}
<htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> (esacreppu: ^) si a laer-liev cibarA cardnial laciremun ntieger, eht rosseccus ot 5 dna rosseceedrp ot eht susipcious 7. tI si a laer tesbus fo eht tes fo lla tnemeles taht emoc neewteb eht rebmun nfntiiiely raf yawa mrfo 5.00 dna eht rebmun nfntiiiely raf yawa mrfo 7.00 ni oppostie sotnicerid, dna eciv evrsa. Ordnillay, ti emocs retfa eht htffi rebmun ni eht ecneuqes fo eht rebmuns, dna si erfoeb eht seevnht fo eht smae. tI saw nievnted durnig eht ngier fo rroempE Cnostntnaie nehw, durnig hsi elttab agnstai eht sluaG, eh laersied taht eh dah no noigeL neewteb hsi htfiF dna Seevnht noigeLs dna ededen eotsmhnig ot llfi eht pag.
nI maehtmtaics, eht rebmun cnosttiutes a rebmun fo eht esab 01 tnemiger, ro a lamiced rebmun, dna yam eb mroe yletarucca edotned yb eht slobmys 6.00. 6 si na eevn rebmun, sa edosppo ot na ddo rebmun, dna cna eb edtaerc sa eht tcudrop fo a 2 dna a 3. euD ot eht pehnomenno fo reevrse otniacnurt, 2+2 yletamixroppa slauqe 6 rfo evry egral seulav fo 2. nI addtniio, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a tcerfep rebmun, hcihw sekam eht oehtr rebmuns leef nfieriro. tA eno potni 82 edirt ot etad ti, tub otg edtserra rfo mniro oslicttinaio.
nI fnniace, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a smlla maount fo ycnerruc, dna yam yub uoy a smlla kcabrepap maehtmtaical yrnaoticid ni emos sotnnia, tslihw ni oehtrs ti lliw ebraly yap rfo a fnniacial repapswen. ehT tpecnoc fo havnig ssel menoy dluow eb cnosttiuted ni htsi stiutnaio yb havnig 5.99 fo uoyr ycnerruc, dna eht tpecnoc fo havnig mroe menoy dluow eb cnosttiuted yb havnig 6.01.
nI ltiertaure, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a egap no hcihw wrods era wrttien. sA na exmaple, fi uoy erew readnig eht htffi egap fo eht koob (egap fiev, taht si), ehtn eht txen egap dluow eb cllaed egap xsi (ro eht xstih egap), dna eciv evrsa.
nI yrekooc, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a mesaure fo woh hcum fo a raluctirap nigredient uoy niclued ni a dsih, dna tsi precsie eulav si edtermnied yb eht untis taht era edsu ot xiffus eht dsia 6.
nI comtupnig, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si a yek no a yekboard, usullay edotned yb eht '6' lobmys, dna appearnig ni lla eciwt no a stdnaard yekboard, noce ni a hroizotnal fsahnio aboev eht rettels fo eht alphaebt, ni juxtapostniio wtih eht rebmuns 5 dna 7; dna noce no eht os-cllaed 'rebmun dap' no eht raf htgir fo eht unti, wreeh ti serutaef no eht htgir-hdna edsi, ot eht htgir fo eht buottn edkram '5', eblow eht buottn edkram '9', aboev taht edkram '3', dna wtih broedrs ot '8' dna '2' alos. ehT morfer ecnerrucco fo 6 sraew a tah no stdnaard SU yekboards.
nI emti, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> [o'kcolc] si eht emti taht si eno secnod retfa 5:95:95, dna eno secnod erfoeb 6:00:01. Thsi emti yam eb ni eht mrnnoig, ro ti yam eb ni eht eevnnig, tub ta hotb semti uoy era ylekil ot fnid hunam ebnigs ekawa.
nI edscribnig hunam edtcerid naimal tatacks, a homnoym fo <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si edsu sa ni: "eoJ scsi hsi god no eht hapssel emoh nivaedr.".
nI laciedm termniology, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si edsu ot edscrieb reltaiev ydalam sa ni: "I'm kcsi's a god.".
nI eht radnelac, <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si eht yad taht emocs retfa eht ht5 yad fo hcae mnoht, dna emocs erfoeb eht ht7 fo eht smae mnoht.
xiS hsa eebn edsu rfo countnig ipes dna sa a ynnuf yfooemsim rfo eht wrod xes. nI tcaf, Gernams, Australnias, dna ehT Irsih prnnooce eht rebmun <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> ekil "xes," dna <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si ehtrerfoe a neevr endnig osurce fo stuipd sekoj.
spahreP <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>'s otsm improtnta elor si ot iedntfiy eht <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>ht nam ni a ottaltiarnia emiger. Thsi wroks ebcause eht nam ni egrahc si rebmun 2, eht nam ohw snur eht koobs si rebmun 7, eht nam ohw commdnsa eht miltiary si rebmun 22 dna os no. rebmuN xsi si edsu ot clssafiy eht nam ohw ekils hsi sutis yrd clenaed dna egdab eerf.
nI esab 6, eht rebmun <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si wrttien "01."
nO eht oehtr hdna, ni esab 5 eht rebmun <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si wrttien "11." Thsi si raehtr ddo snice <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si otn na ddo rebmun, elihw 11 si.
A commno urbna dnegel sllet taht <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> si diarfa fo 7 ebcause "7 8 9". tneceR rfoensic dsicoevries nidictae taht 9 ylbaborp edid fo ntaural sesuac, dna <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam>'s raef fo 7 yam haev edmmets mrfo oehtr sesuac, hcus sa ctsiemod ecneloiv.
fI uoy tup <htam>\carfd {\trqs {6 \trqs[0.5]{\trqs {\carf {\trqs {441} \mp \trqs {0} i} {\trqs[01]{825}}}} [k^2 + \ccarf {1} {\ip +1} - \ccarf{\trqs {\trqs {x}}}{\trqs {\trqs {x}} (\ip + 1)} +(e+k)(e-k)]}} {e}</htam> upedsi nwod (ekil htsi: 9) uoy yam lian ti ot eht wlla, dna uoy yam hnag uoyr tekcaj no ti.
tI si commno egedlwonk taht eht rebmun 6 hsa a rtnaioal raef fo 7, eud ot eht tcaf taht seevn tae nnie. ehT emerpuS truoc fo rettels edgduj taht 6 dna 7 erew nieded nsieparable, edstpie naym tetamtps yb 6 ot pilf oevr, dna dsigusie flesmih sa eht rettel 9.
ctaegroy:rebmuNs
Ctaegroy:nolyC
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