\displaystyle \int_0^x e^{t^2}\,dt=\frac{\sqrt{π}}{2}erfi(x) This is known as the imaginary error function.

The limit is computed (almost) correctly: the derivative of g(x)=\frac{1}{2x}e^{x^2} is g'(x)=-\frac{1}{2x^2}e^{x^2}+e^{x^2}=e^{x^2}\left(1-\frac{1}{2x^2}\right) whereas the derivative of ...

It is correct, although I would have integrated each term between 0 and x instead of the indefinite integral. Power series are series of the form \sum_{n=0}^\infty a_n(x-x_0)^n. A Taylor series ...

\displaystyle{f{{\left({x}\right)}}}=\frac{{{e}^{{{3}{x}}}{\left({2}{x}+{1}\right)}}}{{{e}^{{x}}-{1}}} Explanation: \displaystyle{\int_{{0}}^{{x}}}{f{{\left({t}\right)}}}{\left.{d}{t}\right.}={x}{e}^{{{2}{x}}}+{\int_{{0}}^{{x}}}{e}^{{-{t}}}{f{{\left({t}\right)}}}{\left.{d}{t}\right.} ...

I will map out the approach and see if you can fill in the details. We are asked to find the value of x where: \int_0^x e^{t^3}~dt = 4 We need two numerical approaches here. One to find the ...

\displaystyle{e}^{{2}}+{1} or \displaystyle{8.389} Explanation: You can't find the integral of a function with its derivative. We can do this by, differentiating \displaystyle{x}{e}^{{x}} ...