User:ThemeFatCat

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.$$\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(\log100000\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(\log10^{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(\cos90\right)n+0.5\sqrt[31]{2147483648}}\right)-\left(\int_{0}^{\sqrt{9^{\frac{2\cdot\tan\left(0\right)+2}{3^{\left(\sin90\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(\cot90\right)}^{3.14159\cdot10!}\frac{\operatorname{floor}\left(1.95\right)}{H_{x}!}\right)x\right)\right)}+\left(\log_{\left(\sum_{z=\log1}^{\sqrt{10000}}\frac{\cos\left(0\right)}{\left(\left(\log10^{z}\right)!\right)}\right)}\left(\log_{\pi}\left(\sqrt{6\sum_{\tau=1}^{6!}\tau^{-2}}\right)^{\left(\log\left(1x^{\left(\cos90\right)}\right)\right)}\left(y^{\left(1-\cos0\right)}\right)\left(\sum_{\beta_{B}=0}^{2^{2^{2}}}\beta_{B}!^{\cos180}\right)^{\left(\int_{\arccos\left(1\right)}^{\frac{\sin0}{\cos0}}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(\tan0\right)+1}\ln\left(\sum_{\beta=0}^{10^{2}}\left(\beta!\right)^{-1}\right)}{\beta_{3}!}\right)^{\left(\sum_{k=\ln1}^{10^{\left(\log10^{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


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