Say I have an expression as follows:

```
a*b*c + b*c + a*d
```

One could factorize it as:

```
b*(a*c + c) + (a*d)
```

or as

```
c*(a*b + b) + (a*d)
```

or as

```
a*d + b*c*(a + 1)
```

among other possibilities.

For other expressions, the # of possibilities can be much larger.

My question is, does SymPy have any utility that allows the user to choose which of them to display? Is there a way to specify the common factor/s to use when factorizing / grouping terms in an expression?

**EDIT:** As @user772649 points out below, I can use `collect`

for this. However, `collect`

seems to give different outputs depending on the initial factorization of the mathematical expression e.g.:

```
a,b,c,d = symbols("a,b,c,d")
# These two equations are mathematically equivalent:
eq1 = a*b*c + b*c + a*d
eq2 = a*d + b*c*(a + 1)
print collect(eq1, a)
print collect(eq2, a)
```

prints:

```
a*(b*c + d) + b*c
a*d + b*c*(a + 1)
```

The equations `eq1`

and `eq2`

are mathematically equivalent, but `collect`

outputs a different factorization for each of them, despite of the fact that the call to the `collect`

command was the same for both. This brings me to the following two questions:

- Is there a way to "expand" an expression before calling
`collect`

? - Is there a way of "collecting" (factoring an expression) in a way that is invariant to the initial factorization without having to expand the expression first?

`c * b * (a + 1) + (a * d)`

? – TorelTwiddler Jul 29 '11 at 21:33`a * (b * c + d) + (b * c)`

– agf Jul 29 '11 at 21:38