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Mathematics 3 Online

OpenStudy (anonymous):

Check if it's correct please:

13 years ago

OpenStudy (anonymous):

\[\int\limits_{}^{} \exp(\sin^2(t))dt\] \[\exp(x) = \sum_{0}^{\infty} \frac{ x^n }{ n! }\] \[\exp(\sin^2(t))=\sum_{0}^{\infty}\frac{ (\sin^2(t))^n }{ n! }\] \[\int\limits_{}^{}\sum_{0}^{\infty}\frac{ (\sin^2(t))^n }{ n! }dt\] \[\sum_{0}^{\infty}\int\limits_{}^{}\frac{ (\sin^2(t))^n }{ n! }dt\] \[\sum_{0}^{\infty}\frac{ 1 }{ n! }\int\limits_{}^{}(\sin^2(t))^ndt\] \[\exp \int\limits\limits_{}^{}(\sin^2(t))^ndt\\]\]

13 years ago

OpenStudy (anonymous):

@mukushla

13 years ago

OpenStudy (anonymous):

what kind of math is dis

13 years ago

OpenStudy (shubhamsrg):

seems right to me, though I'll wait for @mukushla to give his input :|

13 years ago

OpenStudy (anonymous):

Oke, thanx @shubhamsrg

13 years ago

OpenStudy (anonymous):

but your tony stark YOU SHOULD KNOW!!!!! LOL

13 years ago

OpenStudy (anonymous):

xDD

13 years ago

OpenStudy (anonymous):

so what happen iron man ? black Sabbath would be disappointed :0

13 years ago

OpenStudy (anonymous):

I don't think so, anyway I will ask Ozzy in the dinner about that

13 years ago

OpenStudy (anonymous):

haha ok

13 years ago

OpenStudy (anonymous):

i think the dio years were better

13 years ago

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