Skip to main content Scour Feed Discover Likes ⠀ oooooooooooooooo.raindrop.page api.raindrop.io ·1d1 day ago TXT.Ƨ⅃X.𔗢᪣𔗢𖥕𔗢᪣𔗢᯽𔗢᪣𔗢𖥕𔗢᪣𔗢⠀𔗢᪣𔗢𖥕𔗢᪣𔗢᯽𔗢᪣𔗢𖥕𔗢᪣𔗢.XLS.TXT desmos.com ·1d1 day ago 𔗢᪣𔗢𖥕𔗢᪣𔗢᯽𔗢᪣𔗢𖥕𔗢᪣𔗢⠀𔗢᪣𔗢𖥕𔗢᪣𔗢᯽𔗢᪣𔗢𖥕𔗢᪣𔗢 api.raindrop.io ·4d4 days ago TXT.𖧷𖧷⯏𖧷𖧷⚙ꖅ✸Ⓞ⦻⊞⯏⦻ꖅ𖧷𐫱𖧷ꖅ⦻⯏⊞⦻Ⓞ✸ꖅ⚙𖧷𖧷⯏𖧷𖧷⚪𖡗⚪𖡼⚪𖡗⚪𔗢⚪𖡗⚪𖡼⚪𖡗⚪◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦𔗢᯽𔗢 𔗢᯽𔗢◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⚪𖡗⚪𖡼⚪𖡗⚪𔗢⚪𖡗⚪𖡼⚪𖡗⚪𖧷𖧷⯏𖧷𖧷⚙ꖅ✸Ⓞ⦻⊞⯏⦻ꖅ𖧷𐫱𖧷ꖅ⦻⯏⊞⦻Ⓞ✸ꖅ⚙𖧷𖧷⯏𖧷𖧷.TXT web.archive.org ·5d5 days ago 𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢𞢨𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢᯽𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢𞢨𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢 𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢𞢨𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢᯽𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢𞢨𔗢𓇬𔗢𐄪𔗢𓇬𔗢𖢒𔗢𓇬𔗢𐄪𔗢𓇬𔗢 web.archive.org ·5d5 days ago 𖢒✺𖢒𞢨𖢒✺𖢒𔗢𖢒✺𖢒𞢨𖢒✺𖢒᯽𖢒✺𖢒𞢨𖢒✺𖢒𔗢𖢒✺𖢒𞢨𖢒✺𖢒 𖢒✺𖢒𞢨𖢒✺𖢒𔗢𖢒✺𖢒𞢨𖢒✺𖢒᯽𖢒✺𖢒𞢨𖢒✺𖢒𔗢𖢒✺𖢒𞢨𖢒✺𖢒 web.archive.org ·6d6 days ago ⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀𖥕⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀⚪◎⚪⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀𖥕⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀𔗢᯽𔗢 𔗢᯽𔗢⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀𖥕⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀⚪◎⚪⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀𖥕⠀⠀⠀⠀⠀⠀◦୦◦◯... desmos.com ·1w1 week ago ◦୦◦◯◦୦◦⊚⚪⊚◦୦◦◯◦୦◦᪣🞊᪣𝆯᪣🞊᪣ ᪣🞊᪣𝆯᪣🞊᪣◦୦◦◯◦୦◦⊚⚪⊚◦୦◦◯◦୦◦ desmos.com ·1w1 week ago 𔗢ꔹ𔗢᯽𔗢ꔹ𔗢⠀𔗢ꔹ𔗢᯽𔗢ꔹ𔗢 desmos.com ·1w1 week ago ⠀𖤞𖥕𖤞⠀ ◦୦◦◯◦୦◦⠀ ⠀◦୦◦◯◦୦◦ ⠀𖤞𖥕𖤞⠀ desmos.com ·1w1 week ago 𖣠⚪𑽇Ⓞ𖧷ⵙ⦻⛋🝊✸Ⓞ⯏⚪𖣓⚪𑽇Ⓞⵙ✢⯏𑽇𐫱𖥠⚪◯⚪𑽇Ⓞⵙ✢⛋◇Ⓞ🝊⦻ꖅ✢𑽇ⵙ⚪𖢌⚪𓊗⚪𖣠⚪𔗢⚪𖡼⚪𔗢⚪🞋⚪𔗢⚪𖡼⚪𔗢⚪𖣠⚪𓊗⚪𖢌⚪ⵙ𑽇✢ꖅ⦻🝊Ⓞ◇⛋✢ⵙⓄ𑽇⚪◯⚪𖥠𐫱𑽇⯏✢ⵙⓄ𑽇⚪𖣓⚪⯏Ⓞ✸🝊⛋⦻ⵙ𖧷Ⓞ𑽇⚪𖣠 desmos.com ·1w1 week ago 𓇬◦୦◦◯◦୦◦𞢨🟗⦻⛋⊞⯏⦻Ⓞ⦻⯏⊞⛋⦻🟗𖢄🟗ⵙ◇⯏𐫱ꖅ𐫱⯏◇ⵙ🟗𖢄🟗⦻⛋⊞⯏⦻Ⓞ⦻⯏⊞⛋⦻🟗𞢨◦୦◦◯◦୦◦𓇬 𓇬◦୦◦◯◦୦◦𞢨🟗⦻⛋⊞⯏⦻Ⓞ⦻⯏⊞⛋⦻🟗𖢄🟗ⵙ◇⯏𐫱ꖅ𐫱⯏◇ⵙ🟗𖢄🟗⦻⛋⊞⯏⦻Ⓞ⦻⯏⊞⛋⦻🟗𞢨◦୦◦◯◦୦◦𓇬 desmos.com ·1w1 week ago 𖤞᯽𖤞 desmos.com ·1w1 week ago 𖢨⎈𖢄◦୦◦◯◦୦◦⊚⚪᪣🞊𝆯 𝆯🞊᪣⚪⊚◦୦◦◯◦୦◦𖢄⎈𖢨 desmos.com ·1w1 week ago ✽𖢄◦୦◦◯◦୦◦⊚⚪᪣🞊𝆯⠀𝆯🞊᪣⚪⊚◦୦◦◯◦୦◦𖢄✽ desmos.com ·1w1 week ago ᯽◦᯽୦᯽◦᯽◯᯽◦᯽୦᯽◦᯽⠀᯽ ᯽ ᯽ ᯽ ᯽ ᯽ ᯽ ᯽⠀᯽◦᯽୦᯽◦᯽◯᯽◦᯽୦᯽◦᯽⊚⚪᪣🞊𝆯 𝆯🞊᪣⚪⊚᯽◦᯽୦᯽◦᯽◯᯽◦᯽୦᯽◦᯽⠀᯽ ᯽ ᯽ ᯽ ᯽ ᯽ ᯽ ᯽⠀᯽◦᯽୦᯽◦᯽◯᯽◦᯽୦᯽◦᯽ desmos.com ·1w1 week ago 𖣠⚪⟠⊚ИNⓄᔓᔕꖴᴥᗩߦᙏⓄᑐᑕ⚪𖣓⚪ИNⓄꖴ✤ᗩᙏꖴꕤⓄᴥߦᗩ⚪𖣓⚪ᔓᔕᑎꖴ⚭ᗩꗳ⚪𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠⚪ꗳᗩ⚭ꖴᑎᔓᔕ⚪𖣓⚪ᗩߦᴥⓄꕤꖴᙏᗩ✤ꖴⓄИN⚪𖣓⚪ᑐᑕⓄᙏߦᗩᴥꖴᔓᔕⓄИN⊚⟠⚪𖣠 desmos.com ·1w1 week ago 𖣠⚪ИNⓄᔓᔕꖴᴥᗩߦᙏⓄᑐᑕ⚪𖣓⚪ИNⓄꖴ✤ᗩᙏꖴꕤⓄᴥߦᗩ⚪𖣓⚪ᔓᔕᑎꖴ⚭ᗩꗳ⚪𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠⚪ꗳᗩ⚭ꖴᑎᔓᔕ⚪𖣓⚪ᗩߦᴥⓄꕤꖴᙏᗩ✤ꖴⓄИN⚪𖣓⚪ᑐᑕⓄᙏߦᗩᴥꖴᔓᔕⓄИN⚪𖣠 desmos.com ·1w1 week ago 𖢌⸭❋ⵔⵔ𐧾❋❋ⵔ❋·𐧾❋❋ⵈ𐧾❋ⵔ𐧾❋∶ⵔⵔⵔ·𐧾ⵔ∶𐧾ⵔ𐧼··𐧾𐧾❋❋⠿𐧼ⵔⵈⵔ⁘⸭𐧾𐧾❋⸭∶∶ⵔ⠿ⵔ⁘◌⁘❋⁘◌⁘ⵔ⠿ⵔ∶∶⸭❋𐧾𐧾⸭⁘ⵔⵈⵔ𐧼⠿❋❋𐧾𐧾··𐧼ⵔ𐧾∶ⵔ𐧾·ⵔⵔⵔ∶❋𐧾ⵔ❋𐧾ⵈ❋❋𐧾·❋ⵔ❋❋𐧾ⵔⵔ❋⸭𖢌 desmos.com ·1w1 week ago ≎◦≎୦≎◦≎◯≎◦≎୦≎◦≎⠀≎ ≎ ≎ ≎ ≎ ≎ ≎ ≎⠀≎◦≎୦≎◦≎◯≎◦≎୦≎◦≎ desmos.com ·1w1 week ago ⦿✣ᗱᗴߦᴥᗩᑐᑕ⦿ⵙ✻ᔓᔕИNⵙߦᴥᗱᗴⵙᔓᔕ⦿ↀᗱᗴ✣ᴥᗱᗴᗯИNⵙ𖣠◦︎୦◦︎⚪︎◦︎୦◦◯◦︎୦◦︎⚪︎◦︎୦◦⠀⠀⠀⠀⠀ ⚪ ⠀⠀⠀⠀⠀◦୦︎◦⚪︎◦୦︎◦◯◦୦︎◦⚪︎◦୦︎◦𖣠ⵙИNᗯᗱᗴᴥ✣ᗱᗴↀ⦿ᔓᔕⵙᗱᗴᴥߦⵙИNᔓᔕ✻ⵙ⦿ᑐᑕᗩᴥߦᗱᗴ✣⦿ ⚪ SCOUR.ING ◌
Skip to main content Scour Discover Docs Login Sign Up Recent Commits to OOOO00000000OOOO:⠀ github.com GitHub ·5w5 weeks ago 𖧷𐫱ⵙ𖢌⛋𖥠⛋𖢌ⵙ𐫱𖧷𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠𖧷𐫱ⵙ𖢌⛋𖥠⛋𖢌ⵙ𐫱𖧷 GitHub ·5w5 weeks ago ⊞⯏⦻⛋ꖅ𖧷ꖅ⦻ꖅ𖧷ꖅ⛋⦻⯏⊞𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠⊞⯏⦻⛋ꖅ𖧷ꖅ⦻ꖅ𖧷ꖅ⛋⦻⯏⊞ GitHub ·5w5 weeks ago GitHub ·5w5 weeks ago GitHub ·9w9 weeks ago 𖢌··꞉·꞉꞉꞉·꞉꞉꞉···꞉ⵔ꞉ⵔ꞉ⵔ·ⵔⵔ·ⵔⵔⵔ꞉·꞉꞉·ⵔ꞉·꞉꞉·꞉ⵔⵔⵔⵔⵔⵔⵔ꞉ⵔ꞉ⵔⵔ꞉ⵔ·꞉·ⵔ·ⵔ·ⵔ···꞉ⵔ꞉꞉… GitHub ·9w9 weeks ago 🌐⚪🌐🅯🌐⚪🌐𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦𖣠⚪𔗢⚪🞋⚪𔗢⚪𖣠🌐⚪🌐🅯🌐⚪🌐 GitHub ·11w11 weeks ago 𑁍 ◦୦◦◯◦୦◦⠀ ⠀◦୦◦◯◦୦◦ 𑁍 GitHub ·11w11 weeks ago ⠀⠀⠀⠀⠀⠀ 𖢒𖤞𖢒 ⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀ ⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀ 𖢒𖤞𖢒 ⠀⠀⠀⠀⠀⠀ GitHub ·11w11 weeks ago ◦୦◦◯◦୦◦⠀ ⠀◦୦◦◯◦୦◦ꖅ✢ⵙ𖧷ⵙ✢ꖅ✺✻𑽇ⵙ◇ⵙ𑽇✻✺ꖅ✢ⵙ𖧷ⵙ✢ꖅ◦୦◦◯◦୦◦⠀ ⠀◦୦◦◯◦୦◦ GitHub ·28w28 weeks ago 𓇬◦୦◦◯◦୦◦፨⬡፨◦୦◦◯◦୦◦𓇬 𓇬◦୦◦◯◦୦◦፨⬡፨◦୦… GitHub ·28w28 weeks ago 𓇬◦୦◦◯◦୦◦⎈⬡⎈◦୦◦◯◦୦◦𓇬 𓇬◦୦◦◯◦୦◦⎈⬡⎈◦୦… GitHub ·28w28 weeks ago 𓇬◦୦◦◯◦୦◦⎈ꙮ⎈◦୦◦◯◦୦◦𓇬 𓇬◦୦◦◯◦୦◦⎈ꙮ⎈◦୦… GitHub ·28w28 weeks ago ⊚◦୦◦◯◦୦◦⬢◦୦◦◯◦୦◦⊚ ⊚◦୦◦◯◦୦◦⬢◦୦◦◯◦୦… GitHub ·28w28 weeks ago ꙮ◦୦◦◯◦୦◦🕛፨🕛◦୦◦◯◦୦◦𝆯 𝆯◦୦◦◯◦୦◦🕛፨🕛◦୦… GitHub ·28w28 weeks ago ⊚◦୦◦◯◦୦◦⬡◦୦◦◯◦୦◦⊚ ⊚◦୦◦◯◦୦◦⬡◦୦◦◯◦୦… GitHub ·30w30 weeks ago ⠀ GitHub ·30w30 weeks ago ⠀ GitHub ·30w30 weeks ago ⊚◦୦◦◯◦୦◦𞢨🟗𑽇⛋🝊ꕤꖅꕤ🝊⛋𑽇🟗𖢄𖥠◇ꖅ𖧷ꖅ◇𖥠𖢄◦୦◦… GitHub ·30w30 weeks ago GitHub ·30w30 weeks ago
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<svg xmlns="http://www.w3.org/2000/svg" viewBox="0 0 729 729"> <title>𔗢᯽𔗢 𔗢᯽𔗢◦୦◦◯◦୦◦𖥕⚪◎⚪𖥕◦୦◦◯◦୦◦𔗢᯽𔗢 𔗢᯽𔗢</title> <style> {SHAPE-RENDERING:GEOMETRICPRECISION;--O:#F5F5F5;--OO:CALC(0.00666666666/6);--OOO:⠀⠀⠀⠀⠀⠀◦୦◦◯◦୦◦⠀⠀⠀⠀⠀⠀} .⁘{ANIMATION:VAR(--OOO) CALC(84.406022589954030768899117092091000289089388918088900852079S/3/3/3/3/3/333) LINEAR INFINITE;ANIMATION-TIMING-FUNCTION:STEPS(9)} .⋮{ANIMATION:VAR(--OOO) CALC(84.406022589954030768899117092091000289089388918088900852079S/3/3/3/333) LINEAR INFINITE;ANIMATION-TIMING-FUNCTION:STEPS(81)} .꞉{ANIMATION:VAR(--OOO) CALC(84.406022589954030768899117092091000289089388918088900852079S/3/333) LINEAR INFINITE;ANIMATION-TIMING-FUNCTION:STEPS(729)} .·{ANIMATION:VAR(--OOO) CALC(84.406022589954030768899117092091000289089388918088900852079S3*3) LINEAR INFINITE;ANIMATION-TIMING-FUNCTION:STEPS(6561)}
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</style> </svg>
I=9
\sum{n=1}^{I}\left(\left(0.5-0.5\cos\left(\pi\cdot3^{n}\cdot\left((2x-1)-\frac{\operatorname{floor}(x\cdot3^{n})}{3^{n}}\right)\right)\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{n}),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{k}),3\right)\right|\right)\left{0<x<1\right}
\sum{n=1}^{I}\left(\left(0.5-0.5\cos\left(\pi\cdot3^{n}\cdot\left(x-\frac{\operatorname{floor}((0.5x+0.5)3^{n})}{3^{n}}\right)\right)\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)3^{n}\right),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)3^{k}\right),3\right)\right|\right)\left{-1<x<1\right}
\sum{n=1}^{I}\left(\sin\left(\pi(2x-1)\cdot3^{n}\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{n}),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{k}),3\right)\right|\right)\left{0<x<1\right}
\sum{n=1}^{I}\left(\sin\left(\pi x\cdot3^{n}\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)\cdot3^{n}\right),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)\cdot3^{k}\right),3\right)\right|\right)\left{-1<x<1\right}
I=9
\sum{n=1}^{I}\left(\sin\left(\pi(2x-1)\cdot3^{n}\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{n}),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{k}),3\right)\right|\right)\left{0<x<1\right} \sum{n=1}^{I}\left(\sin\left(\pi x\cdot3^{n}\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)\cdot3^{n}\right),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)\cdot3^{k}\right),3\right)\right|\right)\left{-1<x<1\right}
\sum{n=1}^{I}\left(\left(0.5-0.5\cos\left(\pi\cdot3^{n}\cdot\left((2x-1)-\frac{\operatorname{floor}(x\cdot3^{n})}{3^{n}}\right)\right)\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{n}),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{k}),3\right)\right|\right)\left{0<x<1\right} \sum{n=1}^{I}\left(\left(0.5-0.5\cos\left(\pi\cdot3^{n}\cdot\left(x-\frac{\operatorname{floor}((0.5x+0.5)3^{n})}{3^{n}}\right)\right)\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)3^{n}\right),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)3^{k}\right),3\right)\right|\right)\left{-1<x<1\right}
I=2
g(n)=\sum_{k=0}^{I}\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left(n/3^{k}\right),3\right)\right|\right)
0,1,2,3,4,5,6,7,8,9,10,11,12,13,14,15,16,17,18,19,20,21,22,23,24,25,26
0,1,0,1,2,1,0,1,0,1,2,1,2,3,2,1,2,1,0,1,0,1,2,1,0,1,0
O=84.406022589954030768899117092091000289089388918088900852079
U=3
T=3.1261489848131122506999672997070740847810884784477370685955185
\Lambda\left(x\right)=\operatorname{abs}(\operatorname{mod}(x/2-.5,1)-.5)*2
\Pi\left(x\right)=-\cos(\pi*x)/2+.5
\Omega\left(x\right)=(-1)^{\operatorname{floor}((x-.5)/1)}\cdot(1-\operatorname{abs}(\operatorname{mod}((x-.5)*2,2)-1)^{2})^{(1/2)}/2+.5
\Theta\left(x\right)=(-(0-(-1)^{\operatorname{floor}(x/1+.0)}(\exp(-1/(x-(1)\operatorname{floor}(x/(1))))/(\exp(-1/(x-(1)\operatorname{floor}(x/(1))))+\exp(-1/(1-(x-(1)\operatorname{floor}(x/(1)))))))+(-1)^{\operatorname{floor}(x/1+.0)}(\exp(-1/(1-(x-(1)\operatorname{floor}(x/(1)))))/(\exp(-1/(x-(1)\operatorname{floor}(x/(1))))+\exp(-1/(1-(x-(1)\operatorname{floor}(x/(1))))))))/2+.5)
M=3
\Lambda\left(\frac{T}{O}\cdot3^{M}\right)\cdot\Lambda\left(x\right)
\Pi\left(\frac{T}{O}\cdot3^{M}\right)\cdot\Pi\left(x\right)
\Omega\left(\frac{T}{O}\cdot3^{M}\right)\cdot\Omega\left(x\right)
\Theta\left(\frac{T}{O}\cdot3^{M}\right)\cdot\Theta\left(x\right)
A=0
V=0
W=13
\operatorname{tone}\left(\frac{1}{O}\cdot U^{\frac{\left[V\cdot U^{A}...W\cdot U^{A}\right]}{U^{A}}},\frac{\Pi\left(\frac{T}{O}\cdot3^{3}\right)}{3^{3}}\right)
I=27 O=4
\left[F\left(\left{j\le i:\frac{1}{15\left(i+1\right)}f\left(\operatorname{mod}\left(Ot,1\right)\right)+\left(\sqrt{O}\left(\frac{j}{i+1}-\frac{1}{2}\right),1\left(\frac{2}{i+1}-1\right)\right)\right},\frac{\operatorname{floor}\left(Ot\right)}{O}\right)\operatorname{for}\ i=\left[1...I\right],j=\left[1...I\right]\right]
f\left(t\right)=\left(\cos\left(\tau t\right),\sin\left(\tau t\right)\right) F\left(T,t\right)=\left(f\left(t\right).xT.x-f\left(t\right).yT.y,f\left(t\right).yT.x+f\left(t\right).xT.y\right)
\Lambda=\operatorname{rgb}\left(0,244,124\right)
\left[V\cdot U^{A}...W\cdot U^{A}\right]
\frac{U^{\frac{\left[V\cdot U^{A}...W\cdot U^{A}\right]}{U^{A}}}}{O}
\frac{O}{U^{\frac{\left[V\cdot U^{A}...W\cdot U^{A}\right]}{U^{A}}}}
\frac{299792458*O}{U^{\frac{\left[V\cdot U^{A}...W\cdot U^{A}\right]}{U^{A}}}}
O=84.406022589954030768899117092091000289089388918088900852079
\operatorname{tone}\left(\frac{U^{\frac{\left[V\cdot U^{A}...W\cdot U^{A}\right]}{U^{A}}}}{O},\frac{1}{3^{3}}\right)
V=0
W=14
I=2
A=0
U=3
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⠿⠿ Y{66}+\frac{3}{2\sqrt{3}}=-\frac{\sin(\pi*\left(X{66}-\frac{1}{2}\right)*\left(U^{\left(A+1\right)}\right)^{\left[0...I\right]})/\left(U^{\left(A+1\right)}\right)^{\left[0...I\right]}\left{-\frac{1}{2}<X_{66}<\frac{1}{2}\right}}{\sqrt{3}\pi}
Y{66}+\frac{3}{2\sqrt{3}}=\frac{\sin(\pi*\left(X{66}-\frac{1}{2}\right)*\left(U^{\left(A+1\right)}\right)^{\left[0...I\right]})/\left(U^{\left(A+1\right)}\right)^{\left[0...I\right]}\left{-\frac{1}{2}<X_{66}<\frac{1}{2}\right}}{\sqrt{3}\pi}
Y{66}=-x\sin A{66}+y\cos A_{66}
X{66}=x\cos A{66}+y\sin A_{66}
A_{66}=\frac{90\pi}{180}
H=\operatorname{rgb}\left(0,244,124\right)
X=\operatorname{rgb}\left(255,11,131\right)
y=\frac{\left(.5-.5\cos(\pi*x\cdot2\cdot2^{\left[0...I\right]})\ \right)}{2\cdot.5\pi\left(2^{\left[0...I\right]}\right)^{2}}\left{-1<x<1\right}
y=-\frac{\left(.5-.5\cos(\pi*x\cdot2\cdot2^{\left[0...I\right]})\ \right)}{2\cdot.5\pi\left(2^{\left[0...I\right]}\right)^{2}}\left{-1<x<1\right}
x=\frac{\left(.5-.5\cos(\pi*y\cdot2\cdot2^{\left[0...I\right]})\ \right)}{2\cdot.5\pi\left(2^{\left[0...I\right]}\right)^{2}}\left{-1<y<1\right}
x=-\frac{\left(.5-.5\cos(\pi*y\cdot2\cdot2^{\left[0...I\right]})\ \right)}{2\cdot.5\pi\left(2^{\left[0...I\right]}\right)^{2}}\left{-1<y<1\right}
y=-\frac{\sin(\pix3^{\left[0...I\right]})/3^{\left[0...I\right]}\left{-1<x<1\right}}{\pi}
y=\frac{\sin(\pix3^{\left[0...I\right]})/3^{\left[0...I\right]}\left{-1<x<1\right}}{\pi}
x=-\frac{\sin(\piy3^{\left[0...I\right]})/3^{\left[0...I\right]}\left{-1<y<1\right}}{\pi}
x=\frac{\sin(\piy3^{\left[0...I\right]})/3^{\left[0...I\right]}\left{-1<y<1\right}}{\pi}
I=3
I=\left[2...3\right]
\Phi_{0}\left(x\right)=\frac{\max\left(x,0\right)^{8}}{8!}
\Phi{1}\left(x\right)=I^{1}\left(\Phi{0}\left(x\right)-\Phi_{0}\left(x-I^{-1}\right)\right)
\Phi{2}\left(x\right)=I^{2}\left(\Phi{1}\left(x\right)-\Phi_{1}\left(x-I^{-2}\right)\right)
\Phi{3}\left(x\right)=I^{3}\left(\Phi{2}\left(x\right)-\Phi_{2}\left(x-I^{-3}\right)\right)
\Phi{4}\left(x\right)=I^{4}\left(\Phi{3}\left(x\right)-\Phi_{3}\left(x-I^{-4}\right)\right)
\Phi{5}\left(x\right)=I^{5}\left(\Phi{4}\left(x\right)-\Phi_{4}\left(x-I^{-5}\right)\right)
\Phi{6}\left(x\right)=I^{6}\left(\Phi{5}\left(x\right)-\Phi_{5}\left(x-I^{-6}\right)\right)
\Phi{7}\left(x\right)=I^{7}\left(\Phi{6}\left(x\right)-\Phi_{6}\left(x-I^{-7}\right)\right)
\Phi{8}\left(x\right)=I^{8}\left(\Phi{7}\left(x\right)-\Phi_{7}\left(x-I^{-8}\right)\right)
O\left(x\right)=\Phi_{8}\left(\frac{\left(x-I^{-9}\right)}{I-1}\right)
A\left(x\right)=1/(\exp\left(1/x+1/(x-1))+1)\right)
I=9
\sum{n=1}^{I}\left(\left(0.5-0.5\cos\left(\pi\cdot3^{n}\cdot\left((2x-1)-\frac{\operatorname{floor}(x\cdot3^{n})}{3^{n}}\right)\right)\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{n}),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{k}),3\right)\right|\right)\left{0<x<1\right}
\sum{n=1}^{I}\left(\left(0.5-0.5\cos\left(\pi\cdot3^{n}\cdot\left(x-\frac{\operatorname{floor}((0.5x+0.5)3^{n})}{3^{n}}\right)\right)\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)3^{n}\right),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)3^{k}\right),3\right)\right|\right)\left{-1<x<1\right}
\sum{n=1}^{I}\left(\sin\left(\pi(2x-1)\cdot3^{n}\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{n}),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}(x\cdot3^{k}),3\right)\right|\right)\left{0<x<1\right}
\sum{n=1}^{I}\left(\sin\left(\pi x\cdot3^{n}\right)\cdot\left(1-\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)\cdot3^{n}\right),3\right)\right|\right)\cdot\prod{k=1}^{n-1}\left|1-\operatorname{mod}\left(\operatorname{floor}\left((0.5x+0.5)\cdot3^{k}\right),3\right)\right|\right)\left{-1<x<1\right}
\Xi=\operatorname{rgb}\left(0,244,124\right)
\Theta=\operatorname{rgb}\left(255,255,255\right)
H=\operatorname{rgb}\left(0,255,255\right)
\Phi\left(x\right)=x-\operatorname{floor}\left(x\right)
O=3
\left(1-\prod_{I=0}^{O}\left(\operatorname{sign}\left(\left(\min\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{2\cdot3^{2}}\right)\right)+1\right)\right)\ge0\left{-.5<x<.5\right}\left{-.5<y<.5\right}
1-\prod_{I=0}^{0}\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right)\ge0\left{-.5<x<.5\right}\left{-.5<y<.5\right}
1-\prod_{I=0}^{O}\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right)\ge0\left{-.5<x<.5\right}\left{-.5<y<.5\right}
\Phi\left(x\right)=x-\operatorname{floor}\left(x\right)
\Xi=\operatorname{rgb}\left(0,244,124\right)
O=3
1-\prod_{I=0}^{O}\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right)\ge0\left{-.5<x<.5\right}\left{-.5<y<.5\right}
\min\left(1-\prod{I=0}^{O}\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right),1-\prod{I=0}^{0}\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right)\right)\ge0\left{-.5<x<.5\right}\left{-.5<y<.5\right}
\min\left(1-\prod_{I=0}^{3}\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{I}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{I}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right),1-\left(\operatorname{sign}\left(\left(\max\left(\left|\Phi\left(3^{3}\left(x-.5\right)\right)-.5\right|,\left|\Phi\left(3^{3}\left(y-.5\right)\right)-.5\right|\right)-\frac{1}{6}\right)\right)+0\right)\right)\ge0\left{-.5<x<.5\right}\left{-.5<y<.5\right}
C\left(x,A,M\right)=\max(A,\min(M,x))
\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5*\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi}
\Phi_{1}\left(x\right)=0.5-0.5\cos(x\pi)
\Phi{2}\left(x\right)=\operatorname{round}(\Phi{1}(x)*3)/3
\Phi_{3}\left(x\right)=((((.5-.5(\cos(C(x,0,\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi})\frac{\pi}{\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi}}))))))/3
\Phi_{4}\left(x\right)=(((((.5-.5(\cos((C(x,\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi},1-\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi})-(\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi}))\ \frac{\pi}{(1-2\cdot\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi})}))))))/3)+1/3
\Phi_{5}(x)=(((((.5-.5(\cos((C(x,1-\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi},1)-(\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi})-(1-2\cdot\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi}))\frac{\pi}{\frac{\arccos\left(\frac{\operatorname{round}\left(\left(0.5-0.5\cos(\pi\ \cdot\frac{1}{3})\right)\cdot3\right)}{3}\right)}{\pi}}))))))/3)+1/3+1/3
\Phi{6}\left(x\right)=\Phi{3}\left(x\right)+\Phi{4}\left(x\right)+\Phi{5}\left(x\right)-1
I\left(x\right)=(-1)^{\operatorname{floor}(x)}\cdot(\Phi_{6}(\operatorname{mod}(x/1,1))-.5)+.5
C\left(x,A,I\right)=\max(A,\min(I,x))
\Phi_{1}=0.25
\Phi{2}\left(x\right)=C(\Phi{1}\left(x\right)*(1-((C(x,(1-\Phi{1}(x)),1)-1)/\Phi{1}(x))^{2})^{(1/2)}+(1-\Phi_{1}(x)),0,1)
\Phi{3}\left(x\right)=(1-\Phi{1}(x))*(1-(1-(C(x,0,(1-\Phi{1}(x)))/(1-\Phi{1}(x)))^{2})^{(1/2)})
\Phi{4}\left(x\right)=\Phi{2}(x)+\Phi{3}(x)-(1-\Phi{1}(x))
V\left(x\right)=(-1)^{\operatorname{floor}(x)}*(\Phi_{4}(\operatorname{mod}(x/1,1))-.5)+.5\ \ \ \ -\ \ \ \ 0
H\left(x\right)=\Phi{4}(\operatorname{mod}(x,1))*\operatorname{mod}\left(\operatorname{floor}(x+1),2\right)+\Phi{4}(1-\operatorname{mod}(x,1))*\operatorname{mod}\left(\operatorname{floor}(-x+1),2\right)\ \ \ \ -\ \ \ \ 1
\sin(x4\arctan(1)/2)
\left(-1\right)^{\operatorname{round}\left(\frac{x+1}{2}\right)}\left(\left(\operatorname{mod}\left(x+2,2\right)-1\right)^{2}-1\right)
\left(-1\right)^{\operatorname{floor}\left(\frac{x}{2}\right)}\sqrt{1-\left(\operatorname{mod}\left(x,2\right)-1\right)^{2}}
\left(-1\right)^{\operatorname{floor}\left(\frac{x}{2}\right)}\left(2-\sqrt{3\left(\operatorname{mod}\left(x,2\right)-1\right)^{2}+1}\right)
-\left(-1\right)^{\operatorname{floor}\left(\frac{x}{2}\right)}\left(\cosh\left(\cosh^{-1}\left(2\right)\left(\operatorname{mod}\left(x,2\right)-1\right)\right)-2\right)
-\left(-\left(-1\right)^{\operatorname{floor}\left(\frac{x}{2}+.5\right)}\left(\exp(-1/\operatorname{mod}\left(\frac{x}{2}+.5,1\right))/(\exp(-1/\operatorname{mod}\left(\frac{x}{2}+.5,1\right))+\exp(-1/(1-\operatorname{mod}\left(\frac{x}{2}+.5,1\right))))\right)+\left(-1\right)^{\operatorname{floor}\left(\frac{x}{2}+.5\right)}\left(\exp(-1/\operatorname{mod}\left(-\frac{x}{2}+.5,1\right))/(\exp(-1/\operatorname{mod}\left(\frac{x}{2}+.5,1\right))+\exp(-1/(1-\operatorname{mod}\left(\frac{x}{2}+.5,1\right))))\right)\right)