I currently have a large expression with many terms of the form

```
Abs[-2 b + 2 d1 m + l Tan[\[Theta]]]
```

I know, from the geometry of my problem, that

```
-2 b + 2 d1 m + l Tan[\[Theta]] > 0
```

However, when I try to simplify my expression,

```
Simplify[Abs[-2 b + 2 d1 m + l Tan[\[Theta]]], -2 b + 2 d1 m + l Tan[\[Theta]] > 0]
```

I just get back

```
Abs[-2 b + 2 d1 m + l Tan[\[Theta]]]
```

How can I make Mathematica simplify out the unnecessary absolute value?

**EDIT 1**

The full expression which I'm trying to simplify is

```
-(1/(2 (m - Tan[\[Theta]])))
Sqrt[1 + m^2] (B2 Sqrt[(-2 b + 2 d1 m + l Tan[\[Theta]])^2] +
B4 Sqrt[(-2 b + 2 d2 m + l Tan[\[Theta]])^2] +
B5 Sqrt[(2 b + 2 d3 m + l Tan[\[Theta]])^2] +
B7 Sqrt[(2 b + 2 d4 m + l Tan[\[Theta]])^2] +
B1 Sqrt[(2 b - 2 (d1 + l) m + l Tan[\[Theta]])^2] +
B3 Sqrt[(2 b - 2 (d2 + l) m + l Tan[\[Theta]])^2] +
B6 Sqrt[(-2 (b + (d3 + l) m) + l Tan[\[Theta]])^2] +
B8 Sqrt[(-2 (b + (d4 + l) m) + l Tan[\[Theta]])^2])
```

The terms being squared under each of the radicals is known to be a positive real number.