I want to write a scala program simplifying this mathematical expression using distributivity rule:

a*b+a*c = a(b+c)

I quickly wrote the following code in order to solve this example:

```
object Test {
sealed abstract class Expr
case class Var(name: String) extends Expr
case class BinOp(operator: String, left: Expr, right: Expr) extends Expr
def main(args: Array[String]) {
val expr = BinOp("+", BinOp("*", Var("a"), Var("b")), BinOp("*", Var("a"), Var("c")))
println(simplify(expr)) //outputs "a(b + c)"
}
def simplify(expr: Expr) : String = expr match {
case BinOp("+", BinOp("*", Var(x), Var(a)), BinOp("*", Var(y), Var(b))) if (x == y) => "" + x + "*(" + a + " + " + b + ")"
case _ => "" //no matter for the test since I test the first case statically
}
}
```

Is there a better way to achieve this?

What is the best way to manage the order of operand without duplicating cases for each combination (would be ugly...)? Indeed, what about these expressions:

a*b+a*c = a(b+c)

a*b+c*a = a(b+c)

b*a+a*c = a(b+c)

b*a+c*a = a(b+c)

`+`

and`*`

chains such that the operands were placed in alphabetical order? Then there'd always be a unique expression for all commutatively equivalent expressions. You can extend this to work for groups as well, simply by abstractly considering the whole expression a "word" in itself (Unicode sorting). – Andrew Cheong Dec 20 '12 at 3:06