\displaystyle{s}={33} Explanation: \displaystyle\text{substitute the given values into the equation} \displaystyle\Rightarrow{s}={\left({3}\right)}+{\left({\left({5}\right)}\times{6}\right)} ...

\begin{align*} s_A &= u_A t+\frac{1}{2}a_A t^2 \\ &= 0(t)+\frac{1}{2}(1.5)t^2 \\ s_B &= u_B t+\frac{1}{2}a_B t^2 \\ &= 0(t)+\frac{1}{2}(2)t^2 \\ s_B &= s_A + 100 \\ t^2 &= 0.75t^2 ...

For \sigma > 1, with x = e^{-u} \Gamma(\sigma+2i\pi\xi)\zeta(\sigma+2i\pi\xi) = \int_0^\infty \frac{x^{(\sigma+2i\pi\xi)-1}}{e^x-1}dx = \int_{-\infty}^\infty \frac{e^{-(\sigma+2i\pi\xi) u}}{e^{e^{-u}}-1} du= \mathcal{F}[\frac{e^{-\sigma u}}{e^{e^{-u}}-1}](\xi) ...

For 1, the logic is unnecessarily long-winded. We have that c_2 (hence also \frac12 c_2) is a d-number and that \frac12 c_2 is relatively prime to d. But the only d-number that is ...

I don't see that Itô's formula is of much use for this problem (in particular, since there is the sinularity at zero which means that you would need to work with local times). It's much easier to use ...

First of all, one of your kinematic equations is completely wrong. The correct equations should be: v=u+at s=ut + \frac 12 at^2 (note the correction in the second) The key is to eliminate t ...