https://complex-pictures.com/aktuelles-neue-bilder-new-pictures/https://complex-pictures.com/wp-content/uploads/2025/12/image.pngimagehttps://complex-pictures.com/wp-content/uploads/2020/04/sumsin6kxovk-k1bis1000.pngSum((sin(6kx)ovk, k=1bis1000Abb.: I- 1- 17 F = Summe( sin( 6*k*x)) / k , k=1 : 1000 https://complex-pictures.com/wp-content/uploads/2020/04/summ2kxovk-2000e-e1587753652873.pngsumm((2kx)ovk-2000eAbb.: I- 1- 17 ditohttps://complex-pictures.com/wp-content/uploads/2020/04/summ2kxovk-1000-1.pngsumm((2kx)ovk-1000Ahttps://complex-pictures.com/wp-content/uploads/2020/04/summ2kxovk-1000.pngsumm((2kx)ovk-10002023-10-08T19:21:49+00:00weekly0.6https://complex-pictures.com/kontakt/2023-04-25T18:01:17+00:00weekly0.6https://complex-pictures.com/i-5-7-spezial-themen-in-arbeit/https://complex-pictures.com/wp-content/uploads/2020/07/ablgamma2k_i.pngablgamma2k_iFig. 2.Derv. Phi-funct * gamma funct. ^i , vgl Fig ... , n =0:2000, https://complex-pictures.com/wp-content/uploads/2020/07/ablgamma2k-1.pngablgamma2kFig. 20 f = 1 st derivative of gamma function , see Fig ... .https://complex-pictures.com/wp-content/uploads/2020/06/gammprod_a4000.pnggammprod_a4000Γ-Funct. (Euler) f = ( 1/z ) * Prod.((1 + 1/n)^z) /(1 + z/n) , n=0:4000https://complex-pictures.com/wp-content/uploads/2020/06/1overgammamasch1000.png1overgammaMasch1000Γ-function Euler/Mascherni Abb.: I- 6- f = Σ 1/(z * exp(0.577216*z) * (1 + z/n)^-1 *exp(z/n) , n=1 :4000https://complex-pictures.com/wp-content/uploads/2020/06/abltg_g_3terme.pngAbltg_g_2TermeAbb.: I- 6- f = derivative of gammafunction two correction terms, Stirling-formulahttps://complex-pictures.com/wp-content/uploads/2020/06/zz_loggamma2term-i.pngzz_loggamma2term-if = log(gammaf. two correction terms ) ^i .https://complex-pictures.com/wp-content/uploads/2020/06/zz_loggamma2corrterme.pngzz_loggamma2corrtermef = log(gammafuction two correction terms)https://complex-pictures.com/wp-content/uploads/2020/05/zetares80_480.pngzetares80_480Versuch Nr 2a 35200 Einzelwerte Bereich wie vorher, f(z) ^ i .https://complex-pictures.com/wp-content/uploads/2020/05/zetares80_440.pngzetares80_440weitere Versuche Zeta(80*440) 35.200 Einzelwerte https://complex-pictures.com/wp-content/uploads/2020/05/zetares200_90i.pngzetares200_90iwie vorher potenziert mit i2023-04-08T16:51:42+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/kombinierte-funktionen-seite-5-1-1a-combined-functions-page-i-5-1a/https://complex-pictures.com/wp-content/uploads/2019/05/coslogz163piovz-1-3pi-k03-i-2.pngcoslogz16+3piovz-1 -3pi-k03-i (2)Abb.: I-5-1-1a-y f = (cos(log((z ^16 + 3*pi) / (z^- 1 -3*pi))) ^i , k=0:3 .https://complex-pictures.com/wp-content/uploads/2019/05/coslogz-3overz6exp5k00-i-2.pngcoslogz-3overz6exp5k00-i (2)Abb.: I-5-1-1a- x f = (cos(log((z ^-3 + phi^k) / (z ^6 )))) , exp(2*pi*i/5), k=0:0 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1160-2.pngbild1160 (2)Abb.: I-5-1-1a-x f = (cos(log(z ^-12 + 3*pi))) ^i , k=0:0 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1158-2.pngbild1158 (2)Abb.: I-5-1-1a-x f = (cos(log(1 / z ^-12 + 3*pi))) ^i , k=0:0 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1157-2.pngbild1157 (2)Abb.: I-5-1-1a-x f = (cos(log(z ^12 - 1))) ^i , k=0:2 .https://complex-pictures.com/wp-content/uploads/2019/05/bildsp-2a-2.pngbildSp-2a (2)Abb.: I-5-1-1a-y f = (log(g ^(g ^-2)) ; g=(log(z ^(z ^-2)) ^i , k=0:0 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1156-2.pngbild1156 (2)Abb.: I-5-1-1a f = (cos(log((z ^+3 + 3*pi) / (z ^-9 - 3*pi)))) ^i , k=0:2 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1133-2.pngbild1133 (2)Abb.: I-5-1a f = (cos(tan((z ^-24 +1) / (z - 1)))) ^i ,k=0:0 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1142-k022.pngbild1142 k02(2)Abb.: I-5-1a-x f = (log(log(z ^-24 +1) / (z - 1)))) ^i , k=0:2 .https://complex-pictures.com/wp-content/uploads/2019/05/bild1163-2.pngbild1163 (2)Abb.: I-5-1a-x f = (log(cos(log(z ^-12 -2)))) ^i , k=0:22023-01-17T18:20:59+00:00weekly0.6https://complex-pictures.com/einfache-formeln-und-bilder/https://complex-pictures.com/wp-content/uploads/2020/03/logcoshz.pnglog(cosh(z)f = log(cosh(z)) https://complex-pictures.com/wp-content/uploads/2020/03/logcosz-i-e1585074040537.pnglog(cos(z))-if = log(cos(z)) ^ ihttps://complex-pictures.com/wp-content/uploads/2020/03/logcosz-2pii-e1585073934282.pnglog(cos(z))-2piif = log(cos(z)) - 2pi* ihttps://complex-pictures.com/wp-content/uploads/2020/03/logcosz2pii-e1585073905473.pnglog(cos(z))+2piif = log(cos(z)) + 2*pi * ihttps://complex-pictures.com/wp-content/uploads/2020/03/logcosz-e1585074002342.pnglog(cos(z))f = log(cos(z)) https://complex-pictures.com/wp-content/uploads/2019/06/logz5-1-2.pnglogz5-1 (2)https://complex-pictures.com/wp-content/uploads/2019/06/logz5-2.pnglogz5 (2)Abb.: f= log(z^5)https://complex-pictures.com/wp-content/uploads/2018/12/zupi.0002-008-e1545318735695.pngzupi.0002-008f = z ^i Eine weitere Vergrößerung um ca 1:10 . Vielleicht ist diese "einfache Funktion doch nicht so einfachhttps://complex-pictures.com/wp-content/uploads/2018/12/zupi.001-007.pngzupi.001-007https://complex-pictures.com/wp-content/uploads/2018/12/zupi.002-006.pngzupi.002-0062022-11-08T14:13:36+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/potenzieren-mit-i-seite-5-functions-inspired-by-cleve-moler/https://complex-pictures.com/wp-content/uploads/2019/12/logzupcotz-iv-i.pnglog(zupcotz)-IV-iAbb.: I-5-5-nx f = log(z ^ cot(z))-Iteration-4, -^ i .https://complex-pictures.com/wp-content/uploads/2019/12/zcotzup-1coszup3-iii-i-pars.pngzcotzup-1coszup3-III-i-parsAbb:: enlarged at P(x,y) =(1,1)https://complex-pictures.com/wp-content/uploads/2019/12/zcotzup-1coszup3-iii-i.pngzcotzup-1coszup3-III-iAbb.: I-5-5-nx f = z*cot(z ^-1. *cos(z ^ 3))-Iteration-3, - ^ i .https://complex-pictures.com/wp-content/uploads/2019/12/logtanzup102pi-tanlog...-i.pnglogtanzup10+2pi-tanlog...-iAbb.: I-5-5-nx f = (log(tanz ^10 +2pi) - tan(log(z ^10 +2pi)) ^i .https://complex-pictures.com/wp-content/uploads/2019/12/xcotzup0bis-5-i.pngxcotzup0bis-5-iAbb.: V-5-nx f = z*cot(z ^0)* cot(z ^-1)..........................https://complex-pictures.com/wp-content/uploads/2019/12/tansinzup-1-sintanzup-1-i-1.pngtansinzup-1 -sintanzup-1-iAbb.: V-5-nx f = (tan(sin(z ^-1) - sin(tan( z ^-1)) ^i .https://complex-pictures.com/wp-content/uploads/2019/12/newborders-1a.pngnewborders-1aAbb.V-5-nx Detailhttps://complex-pictures.com/wp-content/uploads/2019/12/tanlogzup-3-logtanzup-3-i.pngtanlogzup-3-logtanzup-3-iAbb-.: I-5-5-nx f = (tan(log( z ^-3) - log(tan(z ^-3)) ^i .https://complex-pictures.com/wp-content/uploads/2019/12/zlogcos1ovzz-iii-i-1.5a.pngzlogcos1ovzz-III-i-1.5aAbb.: I-5-5-nx f = z*log(cos( z ^-2)) , dreifache Iteration , -^i .https://complex-pictures.com/wp-content/uploads/2019/12/logzcoszup2-iv-i.pnglog(zcoszup2))-IV-iAbb.: V-5-5-12 f = log(z*cos( z ^2) , Iteration-4 , ^i .2021-10-17T19:41:00+00:00weekly0.6https://complex-pictures.com/i-3-funktionen-y-fx/https://complex-pictures.com/wp-content/uploads/2019/08/cosxupcosxup.1logx-.pngcosxupcosxup.1logx-y = cos(x) ^ cos(x) ^(0.1*log(x)https://complex-pictures.com/wp-content/uploads/2019/08/sinxuplogx-90-0-a.pngsinxuplogx-90-0-ay = sin(x) ^ log(x) , yz-Projkt.https://complex-pictures.com/wp-content/uploads/2019/08/sinxuplogx-090-a.pngsinxuplogx-090-ay = sin(x) ^ log(x) , xy-Projkt.https://complex-pictures.com/wp-content/uploads/2019/08/sinxuplogx-00.pngsinxuplogx-00y = sin(x) ^ log(x) , xz-Projkt.https://complex-pictures.com/wp-content/uploads/2019/08/sinxuplogx-3d-a.pngsinxuplogx-3d-ay = sin(x) ^ log(x)https://complex-pictures.com/wp-content/uploads/2019/08/bildtitlt-2c.pngBildtitlt-2cy = cos(x) * tan(1/x) ^ i , yz-Projkt.https://complex-pictures.com/wp-content/uploads/2019/08/bildtitlt-2b.pngBildtitlt-2by= cos(x) * tan(1/x) ^ i , xy-projkt.https://complex-pictures.com/wp-content/uploads/2019/08/bildtitlt-2a.pngBildtitlt-2ay = cos(x) ^ tan(1/x) ^ i , yz projkt.https://complex-pictures.com/wp-content/uploads/2019/08/bildtitlt-2.pngBildtitlt-2y = cos(x) * tan(1/x) ^ i , x>0 .https://complex-pictures.com/wp-content/uploads/2019/08/xsinxupx.pngxsinxupxy = (x * sin(x) ) ^ x , x>;0 .2021-02-08T13:00:45+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/the-loga/https://complex-pictures.com/wp-content/uploads/2021/01/bbbbzmallogz-e1610056994113.pngbbbbzmallogzf = z * log( z ) 2021-01-31T13:58:56+00:00weekly0.6https://complex-pictures.com/2018/10/19/443/2021-01-23T21:23:44+00:00monthlyhttps://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/potenzieren-mit-wurzel-1/https://complex-pictures.com/wp-content/uploads/2019/01/costanz-1z-3exp07k06.pngcostanz-1z-3exp07k06Abb.: 5-1- 4 f = (cos(tan((z^-1 + phi. ^k) / (z ^-3 - phi ^k)))) ^i , phi=exp(2pi*i/7), k=0:6 .https://complex-pictures.com/wp-content/uploads/2019/01/coscotz4z2exp5k04i.pngcoscotz4z2exp5k04iAbb.: 5-1- 3 f = (cos(cot((z. ^4 + phi. ^k). / (z. ^2 - phi. ^k)))). ^i , phi=exp(2pi*i/5), k=0:4 .https://complex-pictures.com/wp-content/uploads/2019/01/costanz-1-3.pngcostanz-1 (3)cos(tan(z)) enlargedhttps://complex-pictures.com/wp-content/uploads/2019/01/costanz-1-2.pngcostanz-1 (2)Abb.: I-5-1-2 f = cos(tan(z)) https://complex-pictures.com/wp-content/uploads/2019/01/sinsinz-4-2.pngsinsinz-4 (2)Abb.: I-5-1-1dhttps://complex-pictures.com/wp-content/uploads/2019/01/coscosz-4-2.pngcoscosz-4 (2)Abb.: I-5-1-1chttps://complex-pictures.com/wp-content/uploads/2019/01/cossinx-4.pngcossinx-4Abb.: f = cos(sin(x))https://complex-pictures.com/wp-content/uploads/2019/01/coscosx-4.pngcoscosx-4Abb.: f = cos(cos(x))https://complex-pictures.com/wp-content/uploads/2019/01/sinsinx-4-e1547995868551.pngsinsinx-4Abb.: f = sin(sin(x))https://complex-pictures.com/wp-content/uploads/2019/01/sincosx-4-1-e1547995851212.pngsincosx-4Abb.: f = sin(cos(x))2021-01-23T20:18:32+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/potenzieren-mit-i-seite-2/https://complex-pictures.com/wp-content/uploads/2019/01/cotzupcotz-i-Ä-500.pngcotzupcotz-i-Ä-500Abb.: 5-2-19 F = cot(z 1 cot(z)), g = cot(z ^cot(z)), k=0:=, -500500 .https://complex-pictures.com/wp-content/uploads/2018/12/bild024hochi-ii.pngbild024hochi-IIAbb.: 5-2-13 f =tan(z^(z ^-2)), g=(tan(f^(f^-2))) ^i , k=0:0 .https://complex-pictures.com/wp-content/uploads/2018/12/bild0022-k00-zzzii.pngBild0022-k00-zzzIIAbb.: 5-2-12 f = tan(z ^(z ^3)) , g= (tan(f ^(f ^3)) , k=0:0 ..https://complex-pictures.com/wp-content/uploads/2018/12/bild0021hochizzzz-ii.pngBild0021hochizzzz-IIAbb.: 5-2-11 f = tan(z^(z ^2)) , g = tan(f^(f^2)) ^i , k=0:0 .https://complex-pictures.com/wp-content/uploads/2018/11/tanzuplogzhochib-2.pngtanzuplogzhochib (2)Abb.: 5 - 227 f =(tan(z ^ log(z)) ^ihttps://complex-pictures.com/wp-content/uploads/2018/10/bild0026hochi-2.pngbild0026hochi (2)Abb.: 5 - 28 f = sin(z ^(z ^-1)) , g = sin(f ^(f ^-1))) ^i , k=0:0 .2021-01-23T20:06:17+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/cyclische-strukturen-cyclic-structures/https://complex-pictures.com/wp-content/uploads/2018/12/bild0027hochia.pngbild0027hochiaAbb.: 5-2-15 f = cot(z ^(1/z)) , g = cot(f ^(1/f)) , k=0:0 .https://complex-pictures.com/wp-content/uploads/2018/12/bild0027hochi-2.jpgbild0027hochi (2)Abb.: f = cot(z ^(1/z)) -dreimal angewendethttps://complex-pictures.com/wp-content/uploads/2018/12/bild0020-k00-ii.pngBild0020-k00-IIAbb.: 5-2-14 f = tan(z ^z) , g =tan(f ^f) ^i , k=0:0https://complex-pictures.com/wp-content/uploads/2018/12/bild016hochi.pngbild016hochiAbb.: 5-2-13 f = cot(z ^(exp(z ^-1))) ^i , k=0:0 .https://complex-pictures.com/wp-content/uploads/2018/11/bild0013k00.pngbild0013k00Abb.: 5-3-5 f . s. oben k=0:0https://complex-pictures.com/wp-content/uploads/2018/11/kreis010exp5k04.pngkreis010exp5k04Abb.: 5-3-4b cos((z ^2 + phi ^k) / (z ^2 - phi ^k)) , phi=exp(2pi*i/5), k=0:4 .https://complex-pictures.com/wp-content/uploads/2018/11/kreis009k11.pngKreis009k11Abb.: 5-3-2 https://complex-pictures.com/wp-content/uploads/2018/11/bild-5k001.pngbild-5k00Abb.: 5-3-2a f s. oben k=0:0 .https://complex-pictures.com/wp-content/uploads/2018/11/kreis004k04.pngkreis004k04Abb.: 5-3-2a f=cosh((z^2 + phi ^ k) / (z ^2 + phi ^k)) , phi=exp(2pi*i/5) , k=0:4 .https://complex-pictures.com/wp-content/uploads/2018/11/kreis005k041.pngkreis005k04Abb.: 5-3-2 f=cos(tan((z^6 + phi^k) / (z^-4 -phi^k))) , phi=exp(2pi*i/12) , k=0:11 .2021-01-23T19:54:07+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/potenzieren-mit-i-seite-3/https://complex-pictures.com/wp-content/uploads/2019/01/cot-zzzovercot-zzzexp5k09-i-2.pngcot-zzzovercot-zzzexp5k09-i (2)Abb.:I-5-4-xy f = (cot((z ^-3 +phi^k) / (z^-3 -phi^k))) ^i , phi=exp(2pi*i/5), k=0:9 .https://complex-pictures.com/wp-content/uploads/2019/01/cot-zovercot-zexp5k09-i-2.pngcot-zovercot-zexp5k09-i (2)Abb.: I-5-4-xx (cot((z ^-1 + phi ^k) / cot(z ^-1 -phi ^k))) î ,phi=exp(2pi*i/5), k=0:9 .https://complex-pictures.com/wp-content/uploads/2019/01/bild05hochi.pngbild05hochihttps://complex-pictures.com/wp-content/uploads/2019/01/exp24k023i-2.pngexp24k023i (2)Abb.: f = ((cos(^4 +phi^k) / (z ^8 -phi ^8))) , phi=.............???????????????https://complex-pictures.com/wp-content/uploads/2019/01/exp3k03i-2.pngexp3k03i (2)Abb.: f = (cos((z ^1.7 + phi^k) / (z ^4.7 -phi^k))) ,phi=exp(2*pi*i/7), k=0:6https://complex-pictures.com/wp-content/uploads/2019/01/ditoexp4k03i-2.pngditoexp4k03i (2)Abb.: f = (cos(( z ^4 + phi^k) / (z^8 - phi^k))) ^i , phi=exp(2*pi*i/4), k=0:3 .https://complex-pictures.com/wp-content/uploads/2019/01/cosz4omkoverz8-omkexp12k0111-2.pngcosz4omkoverz8-omkexp12k0111 (2)Abb.: f = (cos((z ^4 +phi^k) / (z ^8 -phi^k))) , phi=exp(2*pi*i/12), k=0:11https://complex-pictures.com/wp-content/uploads/2019/01/pic-00012-2.pngpic-00012 (2)Abb.: I-5- 4 -14 f= (tan((z ^5 + phi ^k) / tan(z ^5 - phi ^k)) )^i , phi=exp(2pi*i/5), k=0:4 .https://complex-pictures.com/wp-content/uploads/2019/01/cotzzovercozzzk04exp5-2.pngcotzzovercozzzk04exp5 (2)Abb.: I-5-4-2-x1 f = cot(z ^2 +phi ^k) / cot(z ^2 - phi ^k)), phi=exp(2pi*i/5), k=0:4 .https://complex-pictures.com/wp-content/uploads/2019/01/cot-zzovercot-zzexp5k09-i-2.pngcot-zzovercot-zzexp5k09-i (2)Abb.: I-5-4-2- 13 f ^i2021-01-23T19:35:20+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/power-of-root-1-i/2020-11-28T19:55:41+00:00weekly0.6https://complex-pictures.com/i-5-potenzieren-mit-wurzel-1-i/2020-10-29T19:51:23+00:00weekly0.6https://complex-pictures.com/im-zentrum/2020-10-20T20:24:18+00:00weekly0.6https://complex-pictures.com/bilder-mit-dem-computer-in-oel-und-zeichnungen/https://complex-pictures.com/wp-content/uploads/2018/09/xhochinegativ.pngxhochinegativAbb.: 6 -2a,b f = x hoch i 3D-Darstellung x kleiner 0https://complex-pictures.com/wp-content/uploads/2018/09/xhochi-a.pngxhochi-aAbb.: VI-1a,b f = x hoch i 3D-Darstellung x größer 0 https://complex-pictures.com/wp-content/uploads/2018/09/xhochi900pos.pngxhochi900posf = x hoch i , Projektion yz ' entlang der x-Achse 'https://complex-pictures.com/wp-content/uploads/2018/09/xhochi900neg.pngxhochi900negf = x hoch i yz-Projektion x kleiner 0https://complex-pictures.com/wp-content/uploads/2018/09/img_0245-e1537091082447.jpgIMG_0245Spätsommer A. Bogomazov nachempfunden2020-10-20T20:10:40+00:00weekly0.6https://complex-pictures.com/bleistift-zeichnungen/https://complex-pictures.com/wp-content/uploads/2018/11/img_0252.jpgIMG_0252https://complex-pictures.com/wp-content/uploads/2018/11/img_0503-2.jpgIMG_0503 (2)Zeichnung (modifizierte Perspektive )https://complex-pictures.com/wp-content/uploads/2018/11/img_0500a-2.jpgIMG_0500a (2)Al-Kerzenhalterhttps://complex-pictures.com/wp-content/uploads/2018/11/img_0504-4.jpgIMG_0504 (4)Zeichnunghttps://complex-pictures.com/wp-content/uploads/2018/11/img_0330a.jpgIMG_0330ahttps://complex-pictures.com/wp-content/uploads/2018/11/img_0141-nain-pars.jpgIMG_0141-Nain-parsNain Werkstatt Habibian ca 1940https://complex-pictures.com/wp-content/uploads/2018/11/zz-1durch16zhoch16.pngzz-1durch16zhoch16https://complex-pictures.com/wp-content/uploads/2018/11/sechseckorig-1.pngSechseckorig-1Abb. 5 - 7a f = (cos(tan((z ^6 + phi ^k) / ( z ^12 - phi ^k) 99 , phi=exp(2pi*i/10) , k=0:9 .https://complex-pictures.com/wp-content/uploads/2018/10/img_0327-e1540503240422.jpgIMG_0327Esskastanien aus Ponte de Lime , Portugalhttps://complex-pictures.com/wp-content/uploads/2018/10/img_0257-e1540502925611.jpgIMG_0257Compaqc -Computer mit Docking Station2020-10-13T13:28:13+00:00weekly0.6https://complex-pictures.com/bildgestaltung/https://complex-pictures.com/wp-content/uploads/2018/12/exp3z-2-II-pars.pngexp3z-2-II-parsNachtrag TEILBEREICH Abb.4-14https://complex-pictures.com/wp-content/uploads/2018/10/ccc-43.pngccc-43https://complex-pictures.com/wp-content/uploads/2018/10/ccc-15a.pngccc-15ahttps://complex-pictures.com/wp-content/uploads/2018/10/v-7exp1overz-ii.pngV-7exp1overz-IIhttps://complex-pictures.com/wp-content/uploads/2018/10/bild-1-17.pngbild-1-17Abb.: 4 -8 f = exp( z ^2 + phi ^^k) / (z ^4 - phi^k)) , phi=log(2pi*i/12) , k=0:12https://complex-pictures.com/wp-content/uploads/2018/10/sinzplomhochkoversinzminomhochk.pngsinzplomhochkoversinzminomhochkhttps://complex-pictures.com/wp-content/uploads/2018/10/bild-1-9.pngbild-1-9https://complex-pictures.com/wp-content/uploads/2018/10/bild-4.pngbild-4https://complex-pictures.com/wp-content/uploads/2018/10/ccc-14.pngccc-14https://complex-pictures.com/wp-content/uploads/2018/10/bild-2-8.pngbild 2-82020-04-10T12:48:53+00:00weekly0.6https://complex-pictures.com/ueber/2020-04-01T16:34:11+00:00weekly0.6https://complex-pictures.comdaily1.02023-10-08T19:21:49+00:00