This is not correct. First of all, subtracting the underestimate from the overestimate does not produce the area under the curve. It instead produces an error estimate for the two estimates of the ...

The short version is that you are using an incorrect expression for the energy of a particle in motion. The correct, general expression for the kinetic energy of a particle of mass m is T = (\gamma - 1) m c^2 \,, ...

\begin{align} \mathscr{L}\{u(t-5)e^{-(t-5)}\}&=\int_0^{\infty} u(t-5)e^{-(t-5)}e^{-st}dt\\\\ &=\int_5^{\infty} e^{-(t-5)}e^{-st}dt\\\\ &=\int_0^{\infty} e^{-t}e^{-s(t+5)}dt\\\\ &=e^{-5s}\int_0^{\infty} e^{-t}e^{-st}dt\\\\ &=e^{-5s}\mathscr{L}\{e^{-t}\}\\\\ &=e^{-5s}\frac{1}{s+1} \end{align} ...

Aside from a couple of typos, it looks pretty good! Here's a cleaned up version of your proof. Given any \epsilon > 0, let \delta = \min\left(1, \dfrac{\epsilon}{(1 + 2|a|)(1 + 2|a| + 2a^2)}\right) > 0 ...

First show that for any \epsilon > 0 there exists N depending only on \epsilon and \delta(\epsilon) > 0 such that for all x,y \in [N, \infty), if |x - y| < \delta(\epsilon) then |x^2 - y^2| < \epsilon ...

For the calculation of the roots of the depressed cubic y^{\,3} + p\,y + q = 0 where p and q are real or complex, I personally adopt a method indicated in this work by A. Cauli , by which ...