Bitwise math is not something we use much anymore. As such, when I went searching for an answer to this I found nothing that helped so I worked it out. Sharing my math with the world in case others find it useful.

I created a simple helper method to do this, as follows:

```
public static MigrationStage ClearHigherFlags(MigrationStage orig, MigrationStage highBit)
{
var lowerBits = (int)orig % (int)highBit;
return highBit + lowerBits;
}
```

Usage example:

```
currentStage = ClearHigherFlags(currentStage, MigrationStages.MiddleStage);
```

Obviously, if you want to clear higher flags including the `highBit`

, just don't add it back. To clear lower flags, `return orig - lowerBits`

.

In bitwise math, modulus (`%`

) is often your friend.

## Addendum

There are those who will find this answer and think that it's not really bit math. I hope this assuages those folks.

First, recall that this is flags we're talking about so a very specific subset of bit manipulation where modulus makes the math easier to read and is very appropriate. The actual math performed by the compiler replacement will be something like what follows, which I find much less intuitive to read.

```
public static MigrationStage ClearHigherFlags(MigrationStage orig, MigrationStage highBit)
{
var bitMask = highBit - 1;
var lowerBits = orig & bitMask;
return highBit + lowerBits;
}
```

It's really not too hard to read but the conversion to a bit mask is done implicitly in my original solution.