# Finding roots of equation made of Bessel functions, some of which have complex arguments

I want to find the roots (values or w) for an equation of spherical Bessel functions for L = 1 and \Omega^2 = 14.28 (capital Omega, not w):

My code is:

```
L = 1
ome = 14.28 #MeV
w = var('w')
Arg1 = sqrt(ome*(1-w^2))
Arg2 = I*sqrt(ome)*w
a = -I*sqrt(1-w^2)
b = spherical_bessel_J(L-1, Arg1)
c = spherical_bessel_J(L, Arg1)
d = spherical_bessel_J(L, Arg2)+I*spherical_bessel_Y(L, Arg2)
e = spherical_bessel_J(L-1, Arg2)+I*spherical_bessel_Y(L-1, Arg2)
eq = a*(b/c)*(d/e)-w == 0
eq.find_root(0, 1)
```

But I get an error on line 12, which specifies:

"TypeError: unable to convert 3.77888872553824*I to float; use abs() or real_part() as desired"