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roblox is bad
hi im ali r but you can call me theme fat cat
themefatcat is a roblox user that joined roblox to say why roblox is bad. he hates skibidi toilet ohio rizzly bear grimace shake toilet rizz sigma brainrot.
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{\displaystyle \left(\log _{\left(\cos \left(180\right)+{\frac {8!}{112\left(5!\right)}}\right)}\left(\left(\left(\int _{5^{\cos \left(78.46304\right)}}^{\sqrt[{\left(\log 100000\right)}]{15}}{\frac {x^{2!^{\left(\log _{2}\left({\frac {5!}{4!}}\right)\right)}}}{\log _{2}2^{x}}}dx\right)\right)^{\frac {x^{\log \left(10\right)}}{x^{-\left(\log 10^{0}\right)}}}\right)\right)^{\left(\left(\sum _{n=\sin \left(90\right)}^{2!{\sqrt {0.5\left(2\right)}}}{\frac {\sqrt {n^{\left(\arctan \left(\tan \left(\ln e\cdot e\right)\right)\right)}}}{\left(\cos 90\right)n+0.5{\sqrt[{31}]{2147483648}}}}\right)-\left(\int _{0}^{\sqrt {9^{\frac {2\cdot \tan \left(0\right)+2}{3^{\left(\sin 90\right)}}}}}\left({\frac {d}{dx}}\left({\frac {2!}{3!-3}}\right)x^{1+{\frac {1}{2}}}\right)dx\right)+{\frac {d}{dx}}\left(\log _{\left(\sum _{n=0}^{5!}\left(n!\right)^{-1}\right)}\left(\sum _{H_{x}=\left(\cot 90\right)}^{3.14159\cdot 10!}{\frac {\operatorname {floor} \left(1.95\right)}{H_{x}!}}\right)x\right)\right)}+\left(\log _{\left(\sum _{z=\log 1}^{\sqrt {10000}}{\frac {\cos \left(0\right)}{\left(\left(\log 10^{z}\right)!\right)}}\right)}\left(\log _{\pi }\left({\sqrt {6\sum _{\tau =1}^{6!}\tau ^{-2}}}\right)^{\left(\log \left(1x^{\left(\cos 90\right)}\right)\right)}\left(y^{\left(1-\cos 0\right)}\right)\left(\sum _{\beta _{B}=0}^{2^{2^{2}}}\beta _{B}!^{\cos 180}\right)^{\left(\int _{\arccos \left(1\right)}^{\frac {\sin 0}{\cos 0}}d\phi \right)+\left(\log \left(10^{y^{\left(\sin \left({\frac {180}{2}}\right)\right)}}\right)\right)}\right)\right)^{\left(\int _{1}^{\ln e^{3}}dx+\cos \left(\left({\sqrt[{4}]{81^{4}}}+3^{2}\right)\left(\log _{e}\left(\sum _{\phi =-1+1}^{\left(\cos \left({\frac {22}{7}}+e^{\pi !}\right)\cdot \tan \left({\frac {22}{7}}+e^{\pi !}\right)+10^{\left(\log \left(\left(100\right)\right)\right)}\right)}{\frac {\sin \left(\arcsin \left(1\right)\right)}{\phi !}}\right)\right)\right)\right)}=\sum _{J=0}^{\left(\ln \left(\sum _{\alpha =0}^{10^{\left(\prod _{n=2}^{2!}n\right)}}{\frac {\log \left(10\right)}{\alpha !}}\right)\right)}\log _{\left({\sqrt {100}}\right)}10^{J}+\prod _{n=1+\sin \left(0\right)}^{\tan \left({\frac {90}{2\sin \left(90\right)}}\right)}1-\log _{\left(\sum _{n=0}^{\tan \left(-90\ -{\frac {1}{10^{3}}}\right)}{\frac {1}{n!}}\right)}\left(\ln \left(e^{e}\left(\log _{e}\left(\sum _{\beta _{3}=\sin \left({\frac {360}{2\left(2\right)}}\right)+\cos \left({\frac {360}{2}}\right)}^{10^{2}\cdot \ln \left(e^{2.71828}\right)}{\frac {\prod _{i_{A}=1}^{\left(\tan 0\right)+1}\ln \left(\sum _{\beta =0}^{10^{2}}\left(\beta !\right)^{-1}\right)}{\beta _{3}!}}\right)^{\left(\sum _{k=\ln 1}^{10^{\left(\log 10^{2}\right)}}{\frac {1}{\left(\prod _{a=1}^{k}a\right)}}\right)}\right)\right)\right)}
im happy i can copy and paste equations from my graphs https://www.desmos.com/calculator/sg1nwppktw