Is there any way to get correct rounding with the i387 fsqrt instruction?...

...**aside from changing the precision mode** in the x87 control word - I know that's possible, but it's not a reasonable solution because it has nasty reentrancy-type issues where the precision mode will be wrong if the sqrt operation is interrupted.

The issue I'm dealing with is as follows: the x87 `fsqrt`

opcode performs a correctly-rounded (per IEEE 754) square root operation in the precision of the fpu registers, which I'll assume is extended (80-bit) precision. However, I want to use it to implement efficient single and double precision square root functions with the results correctly rounded (per the current rounding mode). Since the result has excess precision, the second step of converting the result to single or double precision rounds again, possibly leaving a not-correctly-rounded result.

With some operations it's possible to work around this with biases. For instance, I can avoid excess precision in the results of addition by adding a bias in the form of a power of two that forces the 52 significant bits of a double precision value into the last 52 bits of the 63-bit extended-precision mantissa. But I don't see any obvious way to do such a trick with square root.

Any clever ideas?

(Also tagged C because the intended application is implementation of the C `sqrt`

and `sqrtf`

functions.)

secondrounding step. Suppose I ask you to round 1.49 to an integer. Rounding it as one step yields 1. First rounding it to one place after the decimal point yields 1.5, then rounding it to an integer yields 2. Similarly,`fsqrt`

performs one rounding (since the exact value of square root is almost never representable) and converting it from 80-bit extended precision to the right type performs another rounding. – R.. Mar 13 '12 at 15:11