# How can one describe the Deltap " and " Deltax in respect to the Schrodinger Equation?

## in the equation $\frac{\mathrm{dp} h i}{\mathrm{dx}} + 12 {\pi}^{2} \cdot {p}^{2} m V = 0$ Can you convert x and p into $\Delta p \text{ and } \Delta x$

##### 1 Answer
Feb 4, 2018

You have to know the form of $\phi$ first. So solve this and find $\phi$.

$\phi = - \int 12 {\pi}^{2} {p}^{2} m V \mathrm{dx}$

What are the system boundary conditions? What is the form of the potential? Without them this cannot be solved. If you somehow know them, then try to follow this:

https://socratic.org/questions/calculate-for-the-first-excited-state-psi-1-x-of-the-simple-harmonic-oscillator-?source=search