Question

How to find the auxillary equation and the final solution for `(d^2Phi)/(dphi^2) + BPhi = 0` assuming `Phi = e^(im_lphi)`?

Answer 1

How to find the auxiliary equation and the final solution
for `(d^2Phi)/(dphi^2) + BPhi = 0` assuming `Phi = e^(im_lphi)`?

Explanation:

We have:

`(d^2Phi)/(dphi^2) + BPhi = 0`

We assume that `B in RR, B != 0`

This is a second order linear Homogeneous Differentiation Equation with constant coefficients. The standard approach is to find a solution of the homogeneous equation by looking at the Auxiliary Equation, which is the polynomial equation with the coefficients of the derivatives.

Complementary Function

The associated Auxiliary equation is:

`m^2+0m+B = 0`
`:. m^2 = B`

The sign of B will determine the possible solution. Then

Case 1: `B gt 0`

Real distinct roots, given by `m=+-B`, so that:

`Phi = C_1e^(Bphi) + C_2Be^(-Bphi)`

Case 2: `B lt 0`

Pure imaginary roots, given by `m=+-Bi`, so that:

`Phi = e^(0phi){C_1cos(Bphi) + C_2sin(Bphi)}`
`\ \ \ = C_1cos(Bphi) + C_2sin(Bphi)`

Here, we are given the form of the solution. Let us consider the given solution:

`Phi = e^(i m_l phi)`

Using Euler's formula , we can write this given solution as:

`Phi = cos(m_l phi) + isin(m_l phi)`

Comparing the given solution with the two possible cases we conclude that `B lt 0`, leading to the solution

`Phi = C_1cos(Bphi) + C_2sin(Bphi)`

We further conclude that:

`C_1=1, C_2=i, B=m_l`