Fresnel integrals, S(x) is a transcendental functions named after Augustin-Jean Fresnel that are used in optics, which are closely related to the error function (erf). They arise in the description of ...

(ii) Using Cauchy Integral formula we have: \int_{\gamma}\frac{1}{z}dz=2\pi i f(0) where f(z) is the constant function f(z)=1 which is entire then f(0)=1

\displaystyle{5}\frac{{d}}{{\left.{d}{x}\right.}}{\int_{{{e}^{{x}}}}^{{5}}}{{\sin}^{{5}}{t}}{\left.{d}{t}\right.}==-{5}{e}^{{x}}{{\sin}^{{5}}{\left({e}^{{x}}\right)}} Explanation: \displaystyle{5}\frac{{d}}{{\left.{d}{x}\right.}}{\int_{{{e}^{{x}}}}^{{5}}}{{\sin}^{{5}}{t}}{\left.{d}{t}\right.}=-{5}\frac{{d}}{{\left.{d}{x}\right.}}{\int_{{5}}^{{{e}^{{x}}}}}{{\sin}^{{5}}{t}}{\left.{d}{t}\right.} ...

As @TheBridge already pointed out, this does not work; not even for determinstic "standard" integrals. Please note that the integral \int_0^t \sin(B_s) \,ds \tag{1} is not of the form \int_0^x \sin(y) \, dy. ...

You can construct the resolvent. For \lambda \ne 1, the resolvent equation is (T-\lambda I)f=g, which is a first order differentiable equation that can solved by using an integrating factor. The ...

Try using the chain rule where the outer function is simply \int_{-3}^x and the inner function is 8\sin(x), and use the fundamental theorem of calculus. (I may have flipped "outer" and "inner". ...