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| The Inconstant Gardener | Domaine concerné: maths
Hellu,
J'aurais besoin d'un site ou d'un logiciel me permettant d'obtenir la suite de nombres correspondant à ça :
(1 / 2) * 3 = a
(a / 2) * 3 = b
(b / 2) * 3 = c
(c / 2) * 3 = d
etc.
Je pourrais le faire à la main mais j'ai besoin des 300 premières valeurs donc ce serait trop long.
Merki d'avance. <3
|
Quel RPG Maker choisir ? • Ocarina of Time PC • Polaris 03 • Le matérialisme c'est quand tu as du matériel. |
Kno -
posté le 16/08/2023 à 16:24:49 (4184 messages postés)
- | IV L'Empereur | C'est facile à faire avec un tableur.
J'ai fais un Googlesheet avec les 300 premières valeurs, et tu peux "étirer" la formule si tu as besoin de plus.
|
Je suis venu ici pour corriger des bugs et botter des culs, et chez moi ça marche. |
| The Inconstant Gardener | Il me dit "accès refusé". :o
|
Quel RPG Maker choisir ? • Ocarina of Time PC • Polaris 03 • Le matérialisme c'est quand tu as du matériel. |
Kno -
posté le 16/08/2023 à 16:46:15 (4184 messages postés)
- | IV L'Empereur | Ah my bad, j'ai oublié de la passer en public. J'ai accepté ta demande d'accès, ça devrait être bon.
|
Je suis venu ici pour corriger des bugs et botter des culs, et chez moi ça marche. |
cantix -
posté le 16/08/2023 à 16:51:41 (40 messages postés)
| | (1 / 2) * 3 = 1.5 (a)
(1.5 / 2) * 3 = 2.25 (b)
(2.25 / 2) * 3 = 3.375 (c)
(3.375 / 2) * 3 = 5.0625 (d)
(5.0625 / 2) * 3 = 7.59375 (e)
(7.59375 / 2) * 3 = 11.390625 (f)
(11.390625 / 2) * 3 = 17.0859375 (g)
(17.0859375 / 2) * 3 = 25.62890625 (h)
(25.62890625 / 2) * 3 = 38.443359375 (i)
(38.443359375 / 2) * 3 = 57.6650390625 (j)
(57.6650390625 / 2) * 3 = 86.49755859375 (k)
(86.49755859375 / 2) * 3 = 129.746337890625 (l)
(129.746337890625 / 2) * 3 = 194.6195068359375 (m)
(194.6195068359375 / 2) * 3 = 291.92926025390625 (n)
(291.92926025390625 / 2) * 3 = 437.8938903808594 (o)
(437.8938903808594 / 2) * 3 = 656.8408355712891 (p)
(656.8408355712891 / 2) * 3 = 985.2612533569336 (q)
(985.2612533569336 / 2) * 3 = 1477.8918800354 (r)
(1477.8918800354 / 2) * 3 = 2216.8378200531 (s)
(2216.8378200531 / 2) * 3 = 3325.25673007965 (t)
(3325.25673007965 / 2) * 3 = 4987.88509511948 (u)
(4987.88509511948 / 2) * 3 = 7481.82764267922 (v)
(7481.82764267922 / 2) * 3 = 11222.7414640188 (w)
(11222.7414640188 / 2) * 3 = 16834.1121960282 (x)
(16834.1121960282 / 2) * 3 = 25251.1682940423 (y)
(25251.1682940423 / 2) * 3 = 37876.7524410635 (z)
(37876.7524410635 / 2) * 3 = 56815.1286615953 (aa)
(56815.1286615953 / 2) * 3 = 85222.6929923929 (ab)
(85222.6929923929 / 2) * 3 = 127834.039488589 (ac)
(127834.039488589 / 2) * 3 = 191751.059232884 (ad)
(191751.059232884 / 2) * 3 = 287626.588849326 (ae)
(287626.588849326 / 2) * 3 = 431439.883273989 (af)
(431439.883273989 / 2) * 3 = 647159.824910984 (ag)
(647159.824910984 / 2) * 3 = 970739.737366476 (ah)
(970739.737366476 / 2) * 3 = 1456109.60604971 (ai)
(1456109.60604971 / 2) * 3 = 2184164.40907457 (aj)
(2184164.40907457 / 2) * 3 = 3276246.61361185 (ak)
(3276246.61361185 / 2) * 3 = 4914369.92041778 (al)
(4914369.92041778 / 2) * 3 = 7371554.88062667 (am)
(7371554.88062667 / 2) * 3 = 11057332.3209400 (an)
(11057332.3209400 / 2) * 3 = 16585998.4814101 (ao)
(16585998.4814101 / 2) * 3 = 24878997.7221152 (ap)
(24878997.7221152 / 2) * 3 = 37318496.5831728 (aq)
(37318496.5831728 / 2) * 3 = 55977744.8747592 (ar)
(55977744.8747592 / 2) * 3 = 83966617.3121388 (as)
(83966617.3121388 / 2) * 3 = 125949925.968208 (at)
(125949925.968208 / 2) * 3 = 188924888.952312 (au)
(188924888.952312 / 2) * 3 = 283387333.428468 (av)
(283387333.428468 / 2) * 3 = 425080000.142702 (aw)
(425080000.142702 / 2) * 3 = 637620000.214054 (ax)
(637620000.214054 / 2) * 3 = 956430000.321082 (ay)
(956430000.321082 / 2) * 3 = 1434645000.48162 (az)
(1434645000.48162 / 2) * 3 = 2151967500.72243 (ba)
(2151967500.72243 / 2) * 3 = 3227951251.08365 (bb)
(3227951251.08365 / 2) * 3 = 4841926876.62547 (bc)
(4841926876.62547 / 2) * 3 = 7262890314.93820 (bd)
(7262890314.93820 / 2) * 3 = 10894335472.4073 (be)
(10894335472.4073 / 2) * 3 = 16341503208.6110 (bf)
(16341503208.6110 / 2) * 3 = 24512254812.9166 (bg)
(24512254812.9166 / 2) * 3 = 36768382219.3749 (bh)
(36768382219.3749 / 2) * 3 = 55152573329.5624 (bi)
(55152573329.5624 / 2) * 3 = 82728859994.3437 (bj)
(82728859994.3437 / 2) * 3 = 124093289991.516 (bk)
(124093289991.516 / 2) * 3 = 186139934987.274 (bl)
(186139934987.274 / 2) * 3 = 279209902480.912 (bm)
(279209902480.912 / 2) * 3 = 418814853721.369 (bn)
(418814853721.369 / 2) * 3 = 628222280582.053 (bo)
(628222280582.053 / 2) * 3 = 942333420873.080 (bp)
(942333420873.080 / 2) * 3 = 1413500131309.62 (bq)
(1413500131309.62 / 2) * 3 = 2120250196964.43 (br)
(2120250196964.43 / 2) * 3 = 3180375295446.64 (bs)
(3180375295446.64 / 2) * 3 = 4770562943169.96 (bt)
(4770562943169.96 / 2) * 3 = 7155844414754.94 (bu)
(7155844414754.94 / 2) * 3 = 10733766622132.4 (bv)
(10733766622132.4 / 2) * 3 = 16100649933298.6 (bw)
(16100649933298.6 / 2) * 3 = 24150974899947.9 (bx)
(24150974899947.9 / 2) * 3 = 36226462349921.8 (by)
(36226462349921.8 / 2) * 3 = 54339693524882.7 (bz)
(54339693524882.7 / 2) * 3 = 81509540287324.1 (ca)
(81509540287324.1 / 2) * 3 = 122264310430986 (cb)
(122264310430986 / 2) * 3 = 183396465646479 (cc)
(183396465646479 / 2) * 3 = 275094698469718 (cd)
(275094698469718 / 2) * 3 = 412642047704577 (ce)
(412642047704577 / 2) * 3 = 618963071556866 (cf)
(618963071556866 / 2) * 3 = 928444607335299 (cg)
(928444607335299 / 2) * 3 = 1392666911002940 (ch)
(1392666911002940 / 2) * 3 = 2089000366504410 (ci)
(2089000366504410 / 2) * 3 = 3133500549756610 (cj)
(3133500549756610 / 2) * 3 = 4700250824634910 (ck)
(4700250824634910 / 2) * 3 = 7050376236952360 (cl)
(7050376236952360 / 2) * 3 = 10575564355428500 (cm)
(10575564355428500 / 2) * 3 = 15863346533142700 (cn)
(15863346533142700 / 2) * 3 = 23795019899714000 (co)
(23795019899714000 / 2) * 3 = 35692529849571000 (cp)
(35692529849571000 / 2) * 3 = 53538794774356500 (cq)
(53538794774356500 / 2) * 3 = 80308192161534700 (cr)
(80308192161534700 / 2) * 3 = 120462288242802000 (cs)
(120462288242802000 / 2) * 3 = 180693432364203000 (ct)
(180693432364203000 / 2) * 3 = 271040148546304000 (cu)
(271040148546304000 / 2) * 3 = 406560222819456000 (cv)
(406560222819456000 / 2) * 3 = 609840334229184000 (cw)
(609840334229184000 / 2) * 3 = 914760501343776000 (cx)
(914760501343776000 / 2) * 3 = 1372140752015660000 (cy)
(1372140752015660000 / 2) * 3 = 2058211128023490000 (cz)
(2058211128023490000 / 2) * 3 = 3087316692035230000 (da)
(3087316692035230000 / 2) * 3 = 4630975038052840000 (db)
(4630975038052840000 / 2) * 3 = 6946462557079260000 (dc)
(6946462557079260000 / 2) * 3 = 10419693835618900000 (dd)
(10419693835618900000 / 2) * 3 = 15629540753428300000 (de)
(15629540753428300000 / 2) * 3 = 23444311130142400000 (df)
(23444311130142400000 / 2) * 3 = 35166466695213600000 (dg)
(35166466695213600000 / 2) * 3 = 52749700042820400000 (dh)
(52749700042820400000 / 2) * 3 = 79124550064230600000 (di)
(79124550064230600000 / 2) * 3 = 118686825096346000000 (dj)
(118686825096346000000 / 2) * 3 = 178030237644519000000 (dk)
(178030237644519000000 / 2) * 3 = 267045356466779000000 (dl)
(267045356466779000000 / 2) * 3 = 400568034700168000000 (dm)
(400568034700168000000 / 2) * 3 = 600852052050252000000 (dn)
(600852052050252000000 / 2) * 3 = 901278078075378000000 (do)
(901278078075378000000 / 2) * 3 = 1351917117118070000000 (dp)
(1351917117118070000000 / 2) * 3 = 2027875675677100000000 (dq)
(2027875675677100000000 / 2) * 3 = 3041813513515650000000 (dr)
(3041813513515650000000 / 2) * 3 = 4562720270273470000000 (ds)
(4562720270273470000000 / 2) * 3 = 6844080405400200000000 (dt)
(6844080405400200000000 / 2) * 3 = 10266120608100300000000 (du)
(10266120608100300000000 / 2) * 3 = 15399180912150400000000 (dv)
(15399180912150400000000 / 2) * 3 = 23098771368225600000000 (dw)
(23098771368225600000000 / 2) * 3 = 34648157052338400000000 (dx)
(34648157052338400000000 / 2) * 3 = 51972235578507600000000 (dy)
(51972235578507600000000 / 2) * 3 = 77958353367761400000000 (dz)
(77958353367761400000000 / 2) * 3 = 116937530051642000000000 (ea)
(116937530051642000000000 / 2) * 3 = 175406295077463000000000 (eb)
(175406295077463000000000 / 2) * 3 = 263109442616195000000000 (ec)
(263109442616195000000000 / 2) * 3 = 394664163924292000000000 (ed)
(394664163924292000000000 / 2) * 3 = 591996245886438000000000 (ee)
(591996245886438000000000 / 2) * 3 = 887994368829657000000000 (ef)
(887994368829657000000000 / 2) * 3 = 1331991553244480000000000 (eg)
(1331991553244480000000000 / 2) * 3 = 1997987329866720000000000 (eh)
(1997987329866720000000000 / 2) * 3 = 2996980994790080000000000 (ei)
(2996980994790080000000000 / 2) * 3 = 4495471492185120000000000 (ej)
(4495471492185120000000000 / 2) * 3 = 6743207238277680000000000 (ek)
(6743207238277680000000000 / 2) * 3 = 10114810857416500000000000 (el)
(10114810857416500000000000 / 2) * 3 = 15172216286124800000000000 (em)
(15172216286124800000000000 / 2) * 3 = 22758324429187200000000000 (en)
(22758324429187200000000000 / 2) * 3 = 34137486643780800000000000 (eo)
(34137486643780800000000000 / 2) * 3 = 51206229965671200000000000 (ep)
(51206229965671200000000000 / 2) * 3 = 76809344948506800000000000 (eq)
(76809344948506800000000000 / 2) * 3 = 115214017422760000000000000 (er)
(115214017422760000000000000 / 2) * 3 = 172821026134140000000000000 (es)
(172821026134140000000000000 / 2) * 3 = 259231539201210000000000000 (et)
(259231539201210000000000000 / 2) * 3 = 388847308801815000000000000 (eu)
(388847308801815000000000000 / 2) * 3 = 583270963202723000000000000 (ev)
(583270963202723000000000000 / 2) * 3 = 874906444804085000000000000 (ew)
(874906444804085000000000000 / 2) * 3 = 1312359667206120000000000000 (ex)
(1312359667206120000000000000 / 2) * 3 = 1968539500809180000000000000 (ey)
(1968539500809180000000000000 / 2) * 3 = 2952809251213770000000000000 (ez)
(2952809251213770000000000000 / 2) * 3 = 4429213876820650000000000000 (fa)
(4429213876820650000000000000 / 2) * 3 = 6643820815230980000000000000 (fb)
(6643820815230980000000000000 / 2) * 3 = 9965731222846470000000000000 (fc)
(9965731222846470000000000000 / 2) * 3 = 14948696834269700000000000000 (fd)
(14948696834269700000000000000 / 2) * 3 = 22423045251404600000000000000 (fe)
(22423045251404600000000000000 / 2) * 3 = 33634567877106900000000000000 (ff)
(33634567877106900000000000000 / 2) * 3 = 50451851815660300000000000000 (fg)
(50451851815660300000000000000 / 2) * 3 = 75677777723490500000000000000 (fh)
(75677777723490500000000000000 / 2) * 3 = 113516666585235000000000000000 (fi)
(113516666585235000000000000000 / 2) * 3 = 170274999877853000000000000000 (fj)
(170274999877853000000000000000 / 2) * 3 = 255412499816779000000000000000 (fk)
(255412499816779000000000000000 / 2) * 3 = 383118749725168000000000000000 (fl)
(383118749725168000000000000000 / 2) * 3 = 574678124587753000000000000000 (fm)
(574678124587753000000000000000 / 2) * 3 = 862017186881630000000000000000 (fn)
(862017186881630000000000000000 / 2) * 3 = 1293025770322440000000000000000 (fo)
(1293025770322440000000000000000 / 2) * 3 = 1939538655483660000000000000000 (fp)
(1939538655483660000000000000000 / 2) * 3 = 2909307983225500000000000000000 (fq)
(2909307983225500000000000000000 / 2) * 3 = 4363961974838250000000000000000 (fr)
(4363961974838250000000000000000 / 2) * 3 = 6545942962257380000000000000000 (fs)
(6545942962257380000000000000000 / 2) * 3 = 9818914443386070000000000000000 (ft)
(9818914443386070000000000000000 / 2) * 3 = 14728371665079100000000000000000 (fu)
(14728371665079100000000000000000 / 2) * 3 = 22092557497618600000000000000000 (fv)
(22092557497618600000000000000000 / 2) * 3 = 33138836246427900000000000000000 (fw)
(33138836246427900000000000000000 / 2) * 3 = 49708254369641900000000000000000 (fx)
(49708254369641900000000000000000 / 2) * 3 = 74562381554462800000000000000000 (fy)
(74562381554462800000000000000000 / 2) * 3 = 111843572331694000000000000000000 (fz)
(111843572331694000000000000000000 / 2) * 3 = 167765358497541000000000000000000 (ga)
(167765358497541000000000000000000 / 2) * 3 = 251648037746312000000000000000000 (gb)
(251648037746312000000000000000000 / 2) * 3 = 377472056619468000000000000000000 (gc)
(377472056619468000000000000000000 / 2) * 3 = 566208084929203000000000000000000 (gd)
(566208084929203000000000000000000 / 2) * 3 = 849312127393805000000000000000000 (ge)
(849312127393805000000000000000000 / 2) * 3 = 1273968191080700000000000000000000 (gf)
(1273968191080700000000000000000000 / 2) * 3 = 1910952286621060000000000000000000 (gg)
(1910952286621060000000000000000000 / 2) * 3 = 2866428429931600000000000000000000 (gh)
(2866428429931600000000000000000000 / 2) * 3 = 4299642644897400000000000000000000 (gi)
(4299642644897400000000000000000000 / 2) * 3 = 6449463967346100000000000000000000 (gj)
(6449463967346100000000000000000000 / 2) * 3 = 9674195951019150000000000000000000 (gk)
(9674195951019150000000000000000000 / 2) * 3 = 14511293926528700000000000000000000 (gl)
(14511293926528700000000000000000000 / 2) * 3 = 21766940889793100000000000000000000 (gm)
(21766940889793100000000000000000000 / 2) * 3 = 32650411334689700000000000000000000 (gn)
(32650411334689700000000000000000000 / 2) * 3 = 48975617002034500000000000000000000 (go)
(48975617002034500000000000000000000 / 2) * 3 = 73463425503051800000000000000000000 (gp)
(73463425503051800000000000000000000 / 2) * 3 = 110195138754577000000000000000000000 (gq)
(110195138754577000000000000000000000 / 2) * 3 = 165292708131865000000000000000000000 (gr)
(165292708131865000000000000000000000 / 2) * 3 = 247939062197798000000000000000000000 (gs)
(247939062197798000000000000000000000 / 2) * 3 = 371908593296697000000000000000000000 (gt)
(371908593296697000000000000000000000 / 2) * 3 = 557862889945046000000000000000000000 (gu)
(557862889945046000000000000000000000 / 2) * 3 = 836794334917569000000000000000000000 (gv)
(836794334917569000000000000000000000 / 2) * 3 = 1255191502376350000000000000000000000 (gw)
(1255191502376350000000000000000000000 / 2) * 3 = 1882787253564530000000000000000000000 (gx)
(1882787253564530000000000000000000000 / 2) * 3 = 2824180880346800000000000000000000000 (gy)
(2824180880346800000000000000000000000 / 2) * 3 = 4236271320520200000000000000000000000 (gz)
(4236271320520200000000000000000000000 / 2) * 3 = 6354406980780300000000000000000000000 (ha)
(6354406980780300000000000000000000000 / 2) * 3 = 9531610471170450000000000000000000000 (hb)
(9531610471170450000000000000000000000 / 2) * 3 = 14297415706755600000000000000000000000 (hc)
(14297415706755600000000000000000000000 / 2) * 3 = 21446123560133400000000000000000000000 (hd)
(21446123560133400000000000000000000000 / 2) * 3 = 32169185340200100000000000000000000000 (he)
(32169185340200100000000000000000000000 / 2) * 3 = 48253778010300100000000000000000000000 (hf)
(48253778010300100000000000000000000000 / 2) * 3 = 72380667015450200000000000000000000000 (hg)
(72380667015450200000000000000000000000 / 2) * 3 = 108570100523175000000000000000000000000 (hh)
(108570100523175000000000000000000000000 / 2) * 3 = 162855150784762000000000000000000000000 (hi)
(162855150784762000000000000000000000000 / 2) * 3 = 244282726177143000000000000000000000000 (hj)
(244282726177143000000000000000000000000 / 2) * 3 = 366424089265715000000000000000000000000 (hk)
(366424089265715000000000000000000000000 / 2) * 3 = 549636133898573000000000000000000000000 (hl)
(549636133898573000000000000000000000000 / 2) * 3 = 824454200847859000000000000000000000000 (hm)
(824454200847859000000000000000000000000 / 2) * 3 = 1236681301271780000000000000000000000000 (hn)
(1236681301271780000000000000000000000000 / 2) * 3 = 1855021951907670000000000000000000000000 (ho)
(1855021951907670000000000000000000000000 / 2) * 3 = 2782532927861500000000000000000000000000 (hp)
(2782532927861500000000000000000000000000 / 2) * 3 = 4173799391792250000000000000000000000000 (hq)
(4173799391792250000000000000000000000000 / 2) * 3 = 6260699087688370000000000000000000000000 (hr)
(6260699087688370000000000000000000000000 / 2) * 3 = 9391048631532550000000000000000000000000 (hs)
(9391048631532550000000000000000000000000 / 2) * 3 = 14086572947298800000000000000000000000000 (ht)
(14086572947298800000000000000000000000000 / 2) * 3 = 21129859420948200000000000000000000000000 (hu)
(21129859420948200000000000000000000000000 / 2) * 3 = 31694789131422300000000000000000000000000 (hv)
(31694789131422300000000000000000000000000 / 2) * 3 = 47542183697133500000000000000000000000000 (hw)
(47542183697133500000000000000000000000000 / 2) * 3 = 71313275545600200000000000000000000000000 (hx)
(71313275545600200000000000000000000000000 / 2) * 3 = 106969913318400000000000000000000000000000 (hy)
(106969913318400000000000000000000000000000 / 2) * 3 = 160454869977600000000000000000000000000000 (hz)
(160454869977600000000000000000000000000000 / 2) * 3 = 240682304966400000000000000000000000000000 (ia)
(240682304966400000000000000000000000000000 / 2) * 3 = 361023457449600000000000000000000000000000 (ib)
(361023457449600000000000000000000000000000 / 2) * 3 = 541535186174400000000000000000000000000000 (ic)
(541535186174400000000000000000000000000000 / 2) * 3 = 812302779261600000000000000000000000000000 (id)
(812302779261600000000000000000000000000000 / 2) * 3 = 1218454168892400000000000000000000000000000 (ie)
(1218454168892400000000000000000000000000000 / 2) * 3 = 1827681253338600000000000000000000000000000 (if)
(1827681253338600000000000000000000000000000 / 2) * 3 = 2741521870007900000000000000000000000000000 (ig)
(2741521870007900000000000000000000000000000 / 2) * 3 = 4112282805011850000000000000000000000000000 (ih)
(4112282805011850000000000000000000000000000 / 2) * 3 = 6168424207517770000000000000000000000000000 (ii)
(6168424207517770000000000000000000000000000 / 2) * 3 = 9252636311276650000000000000000000000000000 (ij)
(9252636311276650000000000000000000000000000 / 2) * 3 = 13878954466914900000000000000000000000000000 (ik)
(13878954466914900000000000000000000000000000 / 2) * 3 = 20818431600372300000000000000000000000000000 (il)
(20818431600372300000000000000000000000000000 / 2) * 3 = 31227647400558400000000000000000000000000000 (im)
(31227647400558400000000000000000000000000000 / 2) * 3 = 46841471100837600000000000000000000000000000 (in)
(46841471100837600000000000000000000000000000 / 2) * 3 = 70262206651256400000000000000000000000000000 (io)
(70262206651256400000000000000000000000000000 / 2) * 3 = 105393309976884000000000000000000000000000000 (ip)
(105393309976884000000000000000000000000000000 / 2) * 3 = 158089964965326000000000000000000000000000000 (iq)
(158089964965326000000000000000000000000000000 / 2) * 3 = 237134947447989000000000000000000000000000000 (ir)
(237134947447989000000000000000000000000000000 / 2) * 3 = 355702421171983000000000000000000000000000000 (is)
(355702421171983000000000000000000000000000000 / 2) * 3 = 533553631757974000000000000000000000000000000 (it)
(533553631757974000000000000000000000000000000 / 2) * 3 = 800330447636961000000000000000000000000000000 (iu)
(800330447636961000000000000000000000000000000 / 2) * 3 = 1200495671455440000000000000000000000000000000 (iv)
(1200495671455440000000000000000000000000000000 / 2) * 3 = 1800743507183160000000000000000000000000000000 (iw)
(1800743507183160000000000000000000000000000000 / 2) * 3 = 2701115260774740000000000000000000000000000000 (ix)
(2701115260774740000000000000000000000000000000 / 2) * 3 = 4051672891162110000000000000000000000000000000 (iy)
(4051672891162110000000000000000000000000000000 / 2) * 3 = 6077509336743170000000000000000000000000000000 (iz)
(6077509336743170000000000000000000000000000000 / 2) * 3 = 9116264005114750000000000000000000000000000000 (ja)
(9116264005114750000000000000000000000000000000 / 2) * 3 = 13674396007672100000000000000000000000000000000 (jb)
(13674396007672100000000000000000000000000000000 / 2) * 3 = 20511594011508100000000000000000000000000000000 (jc)
(20511594011508100000000000000000000000000000000 / 2) * 3 = 30767391017262200000000000000000000000000000000 (jd)
(30767391017262200000000000000000000000000000000 / 2) * 3 = 46151086525893300000000000000000000000000000000 (je)
(46151086525893300000000000000000000000000000000 / 2) * 3 = 69226629788840000000000000000000000000000000000 (jf)
(69226629788840000000000000000000000000000000000 / 2) * 3 = 103839944683260000000000000000000000000000000000 (jg)
(103839944683260000000000000000000000000000000000 / 2) * 3 = 155759917024891000000000000000000000000000000000 (jh)
(155759917024891000000000000000000000000000000000 / 2) * 3 = 233639875537336000000000000000000000000000000000 (ji)
(233639875537336000000000000000000000000000000000 / 2) * 3 = 350459813305004000000000000000000000000000000000 (jj)
(350459813305004000000000000000000000000000000000 / 2) * 3 = 525689719957506000000000000000000000000000000000 (jk)
(525689719957506000000000000000000000000000000000 / 2) * 3 = 788534579936259000000000000000000000000000000000 (jl)
(788534579936259000000000000000000000000000000000 / 2) * 3 = 1182801869909390000000000000000000000000000000000 (jm)
(1182801869909390000000000000000000000000000000000 / 2) * 3 = 1774202804864080000000000000000000000000000000000 (jn)
(1774202804864080000000000000000000000000000000000 / 2) * 3 = 2661304207296120000000000000000000000000000000000 (jo)
(2661304207296120000000000000000000000000000000000 / 2) * 3 = 3991956310944180000000000000000000000000000000000 (jp)
(3991956310944180000000000000000000000000000000000 / 2) * 3 = 5987934466416270000000000000000000000000000000000 (jq)
(5987934466416270000000000000000000000000000000000 / 2) * 3 = 8981901709624400000000000000000000000000000000000 (jr)
(8981901709624400000000000000000000000000000000000 / 2) * 3 = 13472852564436600000000000000000000000000000000000 (js)
(13472852564436600000000000000000000000000000000000 / 2) * 3 = 20209278846654900000000000000000000000000000000000 (jt)
(20209278846654900000000000000000000000000000000000 / 2) * 3 = 30313918269982400000000000000000000000000000000000 (ju)
(30313918269982400000000000000000000000000000000000 / 2) * 3 = 45470877404973600000000000000000000000000000000000 (jv)
(45470877404973600000000000000000000000000000000000 / 2) * 3 = 68206316107460400000000000000000000000000000000000 (jw)
(68206316107460400000000000000000000000000000000000 / 2) * 3 = 102309474161190000000000000000000000000000000000000 (jx)
(102309474161190000000000000000000000000000000000000 / 2) * 3 = 153464211241785000000000000000000000000000000000000 (jy)
(153464211241785000000000000000000000000000000000000 / 2) * 3 = 230196316862677000000000000000000000000000000000000 (jz)
(230196316862677000000000000000000000000000000000000 / 2) * 3 = 345294475294016000000000000000000000000000000000000 (ka)
(345294475294016000000000000000000000000000000000000 / 2) * 3 = 517941712941024000000000000000000000000000000000000 (kb)
(517941712941024000000000000000000000000000000000000 / 2) * 3 = 776912569411536000000000000000000000000000000000000 (kc)
(776912569411536000000000000000000000000000000000000 / 2) * 3 = 1165368854117300000000000000000000000000000000000000 (kd)
(1165368854117300000000000000000000000000000000000000 / 2) * 3 = 1748053281175950000000000000000000000000000000000000 (ke)
(1748053281175950000000000000000000000000000000000000 / 2) * 3 = 2622079921763920000000000000000000000000000000000000 (kf)
(2622079921763920000000000000000000000000000000000000 / 2) * 3 = 3933119882645880000000000000000000000000000000000000 (kg)
(3933119882645880000000000000000000000000000000000000 / 2) * 3 = 5899679823968820000000000000000000000000000000000000 (kh)
(5899679823968820000000000000000000000000000000000000 / 2) * 3 = 8849519735953230000000000000000000000000000000000000 (ki)
(8849519735953230000000000000000000000000000000000000 / 2) * 3 = 13274279603929800000000000000000000000000000000000000 (kj)
(13274279603929800000000000000000000000000000000000000 / 2) * 3 = 19911419405894700000000000000000000000000000000000000 (kk)
(19911419405894700000000000000000000000000000000000000 / 2) * 3 = 29867129108842000000000000000000000000000000000000000 (kl)
(29867129108842000000000000000000000000000000000000000 / 2) * 3 = 44800693663263000000000000000000000000000000000000000 (km)
(44800693663263000000000000000000000000000000000000000 / 2) * 3 = 67201040494894500000000000000000000000000000000000000 (kn)
j'ai juste demandé ça à ChatGPT:
suite de nombres correspondant à ça (300 réponses) :
(1 / 2) * 3 = a
(a / 2) * 3 = b
(b / 2) * 3 = c
(c / 2) * 3 = d
la formule générale pour cette suite serait :
a_n = a_(n-1) * 1.5
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cortez -
posté le 16/08/2023 à 17:13:07 (523 messages postés)
| | Nemau a dit: Domaine concerné: maths
Hellu,
J'aurais besoin d'un site ou d'un logiciel me permettant d'obtenir la suite de nombres correspondant à ça :
(1 / 2) * 3 = a
(a / 2) * 3 = b
(b / 2) * 3 = c
(c / 2) * 3 = d
etc.
Je pourrais le faire à la main mais j'ai besoin des 300 premières valeurs donc ce serait trop long.
Merki d'avance. <3 |
Question indiscrète : Quel usage va tu faire de ces nombres ?
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cantix -
posté le 16/08/2023 à 17:19:26 (40 messages postés)
| | Pour avoir l'air intelligent
Non en fait je ne comprends rien
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| The Inconstant Gardener | Merci à tous !
Citation: Question indiscrète : Quel usage va tu faire de ces nombres ? |
C'est pour un éventuel-futur-probabe-ex-projet de jeu.
Ça aurait été pour déterminer combien de points d'XP en plus il faut pour passer tel niveau par rapport au nombre de points d'XP qu'il fallait pour le niveau précédent, mais je me rend compte (grâce aux résultats fournis par Kno et Cantix) que rapidement on atteint des nombres beaucoup trop grands. Une meilleure solution sera peut-être que la courbe d'augmentation soit de type +1 (1), +2 (3), +3 (6), +4 (10) etc.
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Quel RPG Maker choisir ? • Ocarina of Time PC • Polaris 03 • Le matérialisme c'est quand tu as du matériel. |
Verehn -
posté le 16/08/2023 à 23:49:49 (9058 messages postés)
- | Vhehrhehn | Dans Diablo 2 pour éviter de distribuer des sommes astronomiques d'XP ils mettent en place des pénalités qui sont plus fortes à mesure que le niveau du joueur est élevé. Par exemple au niveau 82 le joueur ne touche que 61% de l'XP. Il y a aussi une seconde pénalité en cas de différence de niveau élevée entre le joueur et le monstre.
Avec ce genre de système, si on ne regarde que les totaux, l'XP nécessaire pour passer un niveau ne semble pas augmenter si rapidement, mais en pratique l'XP devient de plus en plus difficile à collecter.
Il y a aussi Paper Mario (64 et NGC) qui a sa propre manière de faire par tranches de 100 points (ni plus ni moins) dont le gain est très contrôlé, mais ça fonctionne surtout parce que le jeu est très linéaire et qu'ils savent très bien qui va affronter le joueur et quand.
Spoiler (cliquez pour afficher) Citation: (Enemy Level – Mario’s Level)*(Battle Multiplier), rounded down, adding on the Base EXP if Mario’s Level is not greater than the enemy’s. The battle multiplier is determined by the number of enemies present at the start of the battle; 0.5 for 1 or 2 enemies, 0.55 for 3, 0.65 for 4, and 0.75 for 5. |
Comme le gain est conditionné par le niveau des ennemis, le niveau des boss / ennemis forts est artificiellement gonflé (sans que leur puissance suive) pour que la récompense en XP soit à la hauteur.
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Eldrao ~ PakuPaku ~ Winged Light ~ Ruin ~ Ma galerie ~ LTDAD ~ Don de graphismes plateforme 2D |
| The Inconstant Gardener | Pour l'exemple de Diablo II, ça a l'air pas mal, mais je vais viser un système plus simple, pour différentes raisons, l'une d'elles étant mon inexpérience dans le domaine.
A priori je vais faire le système dont j'ai parlé :
niveau 1 : 1 point d'xp nécessaire
niveau 2 : 3 (1 + 2)
niveau 3 : 6 (3 + 3)
niveau 4 : 10 (6 + 4)
niveau 5 : 15 (10 + 5)
niveau 6 : 21 (15 + 6)
etc.
Le joueur commencera au niveau 16 (car trois stats, qui au départ sont de 10, 1 et 5).
Niveau 17 : 153
Niveau 50 : 1275
Niveau 100 : 5050
Niveau 150 : 11325
Niveau 200 : 20100
Niveau 250 : 31375
Niveau 300 : 45150
Le niveau 300 sera le niveau max, car chaque stat peut aller jusqu'à 100 maximum, mais la plupart des joueurs devraient finir le jeu entre ~100 et ~150.
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Quel RPG Maker choisir ? • Ocarina of Time PC • Polaris 03 • Le matérialisme c'est quand tu as du matériel. | Index du forum > Entraide > [RESOLU] Suite de nombres
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