To motivate the question, `sympy.concrete`

has some efficient tools to manipulate symbolic sums. In order to apply these tools to symbolic products, one has to take a logarithm. However, straightforward taking the logarithm doesn't automatically give the transformation:

```
import sympy as sp
sp.init_printing() # display math as latex
z = sp.Symbol('z')
j,k = sp.symbols('j,k')
Prod = sp.Product( (z + sp.sqrt(1-4*j*z**2))**(-1), (j,1,k) )
sp.log(Prod)
```

gives

in all possible variations:

```
sp.log(Prod)
sp.log(Prod).expand()
sp.log(Prod).simplify()
sp.expand_log(sp.log(Prod),force=True)
```

Question. How to convert it into sum of logarithms?

`z`

and`j`

don't commute? What if`z`

is a quaternion? The fact that`z`

is complex is always assumed by default, but I suspect that a human assumes that a variable is real by default and would specify a flag`is_complex = True`

instead. Well, this is a detail of implementation, I have to get used to it. Thanks for the remark.`expand_log`

with a`force`

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