Feb 18, 2013 · Intuition comes from knowledge and experience! Learning facts about complex exponentiation then making use of those facts to solve problems will build your experience.

Oct 17, 2019 · $$\operatorname {Ei} (x)=\operatorname {Ei} (-1)-\int_ {-x}^1\frac {e^ {-t}}t~\mathrm dt$$ which are both easily differentiated using the fundamental theorem of calculus, now that …

Apr 19, 2024 · This result can be obtained directly from a Maclaurin expansion of the function. By denoting \begin {equation} y=\mathrm {Ei}^ {-1} (x) \end {equation} the integral ...

$\operatorname {Ei} (x)$ is a special function and is generally agreed to be considered useful enough to have it's own place amongst the special functions.

Feb 17, 2019 · Having an integral like $\int_ {2}^ {10} {\frac {x} {\ln x}}dx$ How does this function turns to an exponential integral of the form: $ \operatorname {Ei} (x)=-\int ...

Quiz: Spelling- 'ie' and 'ei' This is a intermediate-level quiz containing 10 multichoice quiz questions from our 'spelling and punctuation' category. Simply answer all questions and press …

Oct 13, 2021 · Prove Euler's identity $e^ {i\theta} = \cos \theta + i \sin \theta$ using Taylor series. Then plug in $\theta = \pi$.

Aug 28, 2010 · Please provide additional context, which ideally explains why the question is relevant to you and our community. Some forms of context include: background and …

Nov 10, 2025 · So I tried some u-sub like $\frac {\operatorname {Ei} (x)} {\ln x}$, $\frac {\operatorname {li} (x)} {\ln x}$ but I think it's some other u-substitute. (I tried to show effort but …

Euler's formula describes two equivalent ways to move in a circle. Starting at the number $1$, see multiplication as a transformation that changes the number $1 \cdot e^ {i\pi}$. Regular …