Hi -

I really need to get this question and although I'm pretty confident in my own answer would like expert view ?

Many Thanks

You will answer this question by dragging and dropping elements from the list below into boxes. The elements below are colour-coded: you can only drop an element into a box with a matching colour. Please note that you may need to leave some of the boxes blank. Do not include any items that are equal to zero. The following wavefunction is a solution for the time-independent Schrodinger equation for a particle in a one-dimensional infinite square well: W = A cos (kx). (a) The potential energy of the particle inside the well is equal to Epot. The particle has total energy E > Epot. Taking this into account, complete the Schrodinger equation below for the system under consideration: d2 us 2m dx 2 72 2 W = 0 . (b) In order to show that the wavefunction is indeed a solution of the Schrodinger equation above, differentiate it twice with respect to the coordinate x and complete the equation below: dx-2 (c) Finally, introduce the above result into the Schrodinger equation and determine the expression for k that is consistent with y being one of its solutions. Write this expression using the boxes below: k = + - E Epot 2m A A- k sin COS sin- COS exp