User:Hotdogjuicer/math

$$ 1+1\ne2 $$

$$ -\sqrt{-1}^2-\sqrt{-1}^2= $$

$$ log_{10}(10(-\sqrt{-1}^2))+(ln(\sum_{n=0}^\infty{{1}\over{n!}}(-\sqrt{-1}^2)))^2= $$

$$ log(\sqrt[3]{1000}(-\sqrt{-1}^2))+(1n(\sum_{n=0}^\infty{{1}\over{n!}}(-\sqrt{-1}^2)))^2= $$

$$ log((\sqrt[3]{2000}-\sqrt[3]{1000})(-\sqrt{-1}^2))+(log_e(\sum_{n=0}^\infty{{1}\over{n!}}(-\sqrt{-1}^2)))^2= $$

$$ (log_e(\sum_{n=0}^\infty{{1}\over{n!}})(10^{-1})(\sqrt[3]{2000}-10)(-\sqrt{-1}^2))+(log_e(\sum_{n=0}^\infty{{1}\over{n!}}(-\sqrt{-1}^2)))^2= $$

$$ (log_e(\sum_{n=0}^\infty{{1}\over{n!}})(\sqrt{10}^{-2})(\sqrt[3]{2000}-10)(-\sqrt{-1}^2))+(log_e(\sum_{n=0}^\infty{{1}\over{n!}}(-\sqrt{-1}^2)))^2\ne2 $$